1e27a552bSJed Brown /* 261692a83SJed Brown Code for timestepping with Rosenbrock W methods 3e27a552bSJed Brown 4e27a552bSJed Brown Notes: 5e27a552bSJed Brown The general system is written as 6e27a552bSJed Brown 7f9c1d6abSBarry Smith F(t,U,Udot) = G(t,U) 8e27a552bSJed Brown 9f9c1d6abSBarry Smith where F represents the stiff part of the physics and G represents the non-stiff part. 10f9c1d6abSBarry Smith This method is designed to be linearly implicit on F and can use an approximate and lagged Jacobian. 11e27a552bSJed Brown 12e27a552bSJed Brown */ 13af0996ceSBarry Smith #include <petsc/private/tsimpl.h> /*I "petscts.h" I*/ 141e25c274SJed Brown #include <petscdm.h> 15e27a552bSJed Brown 16af0996ceSBarry Smith #include <petsc/private/kernels/blockinvert.h> 1761692a83SJed Brown 1819fd82e9SBarry Smith static TSRosWType TSRosWDefault = TSROSWRA34PW2; 19e27a552bSJed Brown static PetscBool TSRosWRegisterAllCalled; 20e27a552bSJed Brown static PetscBool TSRosWPackageInitialized; 21e27a552bSJed Brown 2261692a83SJed Brown typedef struct _RosWTableau *RosWTableau; 2361692a83SJed Brown struct _RosWTableau { 24e27a552bSJed Brown char *name; 25e27a552bSJed Brown PetscInt order; /* Classical approximation order of the method */ 26e27a552bSJed Brown PetscInt s; /* Number of stages */ 27f4aed992SEmil Constantinescu PetscInt pinterp; /* Interpolation order */ 2861692a83SJed Brown PetscReal *A; /* Propagation table, strictly lower triangular */ 2961692a83SJed Brown PetscReal *Gamma; /* Stage table, lower triangular with nonzero diagonal */ 30c17803e7SJed Brown PetscBool *GammaZeroDiag; /* Diagonal entries that are zero in stage table Gamma, vector indicating explicit statages */ 3143b21953SEmil Constantinescu PetscReal *GammaExplicitCorr; /* Coefficients for correction terms needed for explicit stages in transformed variables*/ 3261692a83SJed Brown PetscReal *b; /* Step completion table */ 33fe7e6d57SJed Brown PetscReal *bembed; /* Step completion table for embedded method of order one less */ 3461692a83SJed Brown PetscReal *ASum; /* Row sum of A */ 3561692a83SJed Brown PetscReal *GammaSum; /* Row sum of Gamma, only needed for non-autonomous systems */ 3661692a83SJed Brown PetscReal *At; /* Propagation table in transformed variables */ 3761692a83SJed Brown PetscReal *bt; /* Step completion table in transformed variables */ 38fe7e6d57SJed Brown PetscReal *bembedt; /* Step completion table of order one less in transformed variables */ 3961692a83SJed Brown PetscReal *GammaInv; /* Inverse of Gamma, used for transformed variables */ 408d59e960SJed Brown PetscReal ccfl; /* Placeholder for CFL coefficient relative to forward Euler */ 413ca35412SEmil Constantinescu PetscReal *binterpt; /* Dense output formula */ 42e27a552bSJed Brown }; 4361692a83SJed Brown typedef struct _RosWTableauLink *RosWTableauLink; 4461692a83SJed Brown struct _RosWTableauLink { 4561692a83SJed Brown struct _RosWTableau tab; 4661692a83SJed Brown RosWTableauLink next; 47e27a552bSJed Brown }; 4861692a83SJed Brown static RosWTableauLink RosWTableauList; 49e27a552bSJed Brown 50e27a552bSJed Brown typedef struct { 5161692a83SJed Brown RosWTableau tableau; 5261692a83SJed Brown Vec *Y; /* States computed during the step, used to complete the step */ 53e27a552bSJed Brown Vec Ydot; /* Work vector holding Ydot during residual evaluation */ 5461692a83SJed Brown Vec Ystage; /* Work vector for the state value at each stage */ 5561692a83SJed Brown Vec Zdot; /* Ydot = Zdot + shift*Y */ 5661692a83SJed Brown Vec Zstage; /* Y = Zstage + Y */ 573ca35412SEmil Constantinescu Vec VecSolPrev; /* Work vector holding the solution from the previous step (used for interpolation)*/ 581c3436cfSJed Brown PetscScalar *work; /* Scalar work space of length number of stages, used to prepare VecMAXPY() */ 59b296d7d5SJed Brown PetscReal scoeff; /* shift = scoeff/dt */ 60e27a552bSJed Brown PetscReal stage_time; 61c17803e7SJed Brown PetscReal stage_explicit; /* Flag indicates that the current stage is explicit */ 6261692a83SJed Brown PetscBool recompute_jacobian; /* Recompute the Jacobian at each stage, default is to freeze the Jacobian at the start of each step */ 63108c343cSJed Brown TSStepStatus status; 64e27a552bSJed Brown } TS_RosW; 65e27a552bSJed Brown 66fe7e6d57SJed Brown /*MC 673606a31eSEmil Constantinescu TSROSWTHETA1 - One stage first order L-stable Rosenbrock-W scheme (aka theta method). 683606a31eSEmil Constantinescu 693606a31eSEmil Constantinescu Only an approximate Jacobian is needed. 703606a31eSEmil Constantinescu 713606a31eSEmil Constantinescu Level: intermediate 723606a31eSEmil Constantinescu 733606a31eSEmil Constantinescu .seealso: TSROSW 743606a31eSEmil Constantinescu M*/ 753606a31eSEmil Constantinescu 763606a31eSEmil Constantinescu /*MC 773606a31eSEmil Constantinescu TSROSWTHETA2 - One stage second order A-stable Rosenbrock-W scheme (aka theta method). 783606a31eSEmil Constantinescu 793606a31eSEmil Constantinescu Only an approximate Jacobian is needed. 803606a31eSEmil Constantinescu 813606a31eSEmil Constantinescu Level: intermediate 823606a31eSEmil Constantinescu 833606a31eSEmil Constantinescu .seealso: TSROSW 843606a31eSEmil Constantinescu M*/ 853606a31eSEmil Constantinescu 863606a31eSEmil Constantinescu /*MC 87fe7e6d57SJed Brown TSROSW2M - Two stage second order L-stable Rosenbrock-W scheme. 88fe7e6d57SJed Brown 89fe7e6d57SJed Brown Only an approximate Jacobian is needed. By default, it is only recomputed once per step. This method is a reflection of TSROSW2P. 90fe7e6d57SJed Brown 91fe7e6d57SJed Brown Level: intermediate 92fe7e6d57SJed Brown 93fe7e6d57SJed Brown .seealso: TSROSW 94fe7e6d57SJed Brown M*/ 95fe7e6d57SJed Brown 96fe7e6d57SJed Brown /*MC 97fe7e6d57SJed Brown TSROSW2P - Two stage second order L-stable Rosenbrock-W scheme. 98fe7e6d57SJed Brown 99fe7e6d57SJed Brown Only an approximate Jacobian is needed. By default, it is only recomputed once per step. This method is a reflection of TSROSW2M. 100fe7e6d57SJed Brown 101fe7e6d57SJed Brown Level: intermediate 102fe7e6d57SJed Brown 103fe7e6d57SJed Brown .seealso: TSROSW 104fe7e6d57SJed Brown M*/ 105fe7e6d57SJed Brown 106fe7e6d57SJed Brown /*MC 107fe7e6d57SJed Brown TSROSWRA3PW - Three stage third order Rosenbrock-W scheme for PDAE of index 1. 108fe7e6d57SJed Brown 109fe7e6d57SJed Brown Only an approximate Jacobian is needed. By default, it is only recomputed once per step. 110fe7e6d57SJed Brown 111fe7e6d57SJed Brown This is strongly A-stable with R(infty) = 0.73. The embedded method of order 2 is strongly A-stable with R(infty) = 0.73. 112fe7e6d57SJed Brown 113fe7e6d57SJed Brown References: 114fe7e6d57SJed Brown Rang and Angermann, New Rosenbrock-W methods of order 3 for partial differential algebraic equations of index 1, 2005. 115fe7e6d57SJed Brown 116fe7e6d57SJed Brown Level: intermediate 117fe7e6d57SJed Brown 118fe7e6d57SJed Brown .seealso: TSROSW 119fe7e6d57SJed Brown M*/ 120fe7e6d57SJed Brown 121fe7e6d57SJed Brown /*MC 122fe7e6d57SJed Brown TSROSWRA34PW2 - Four stage third order L-stable Rosenbrock-W scheme for PDAE of index 1. 123fe7e6d57SJed Brown 124fe7e6d57SJed Brown Only an approximate Jacobian is needed. By default, it is only recomputed once per step. 125fe7e6d57SJed Brown 126fe7e6d57SJed Brown This is strongly A-stable with R(infty) = 0. The embedded method of order 2 is strongly A-stable with R(infty) = 0.48. 127fe7e6d57SJed Brown 128fe7e6d57SJed Brown References: 129fe7e6d57SJed Brown Rang and Angermann, New Rosenbrock-W methods of order 3 for partial differential algebraic equations of index 1, 2005. 130fe7e6d57SJed Brown 131fe7e6d57SJed Brown Level: intermediate 132fe7e6d57SJed Brown 133fe7e6d57SJed Brown .seealso: TSROSW 134fe7e6d57SJed Brown M*/ 135fe7e6d57SJed Brown 136ef3c5b88SJed Brown /*MC 137ef3c5b88SJed Brown TSROSWRODAS3 - Four stage third order L-stable Rosenbrock scheme 138ef3c5b88SJed Brown 139ef3c5b88SJed Brown By default, the Jacobian is only recomputed once per step. 140ef3c5b88SJed Brown 141ef3c5b88SJed Brown Both the third order and embedded second order methods are stiffly accurate and L-stable. 142ef3c5b88SJed Brown 143ef3c5b88SJed Brown References: 144ef3c5b88SJed Brown Sandu et al, Benchmarking stiff ODE solvers for atmospheric chemistry problems II, Rosenbrock solvers, 1997. 145ef3c5b88SJed Brown 146ef3c5b88SJed Brown Level: intermediate 147ef3c5b88SJed Brown 148ef3c5b88SJed Brown .seealso: TSROSW, TSROSWSANDU3 149ef3c5b88SJed Brown M*/ 150ef3c5b88SJed Brown 151ef3c5b88SJed Brown /*MC 152ef3c5b88SJed Brown TSROSWSANDU3 - Three stage third order L-stable Rosenbrock scheme 153ef3c5b88SJed Brown 154ef3c5b88SJed Brown By default, the Jacobian is only recomputed once per step. 155ef3c5b88SJed Brown 156ef3c5b88SJed Brown The third order method is L-stable, but not stiffly accurate. 157ef3c5b88SJed Brown The second order embedded method is strongly A-stable with R(infty) = 0.5. 158ef3c5b88SJed Brown The internal stages are L-stable. 159ef3c5b88SJed Brown This method is called ROS3 in the paper. 160ef3c5b88SJed Brown 161ef3c5b88SJed Brown References: 162ef3c5b88SJed Brown Sandu et al, Benchmarking stiff ODE solvers for atmospheric chemistry problems II, Rosenbrock solvers, 1997. 163ef3c5b88SJed Brown 164ef3c5b88SJed Brown Level: intermediate 165ef3c5b88SJed Brown 166ef3c5b88SJed Brown .seealso: TSROSW, TSROSWRODAS3 167ef3c5b88SJed Brown M*/ 168ef3c5b88SJed Brown 169961f28d0SJed Brown /*MC 170961f28d0SJed Brown TSROSWASSP3P3S1C - A-stable Rosenbrock-W method with SSP explicit part, third order, three stages 171961f28d0SJed Brown 172961f28d0SJed Brown By default, the Jacobian is only recomputed once per step. 173961f28d0SJed Brown 174961f28d0SJed Brown A-stable SPP explicit order 3, 3 stages, CFL 1 (eff = 1/3) 175961f28d0SJed Brown 176961f28d0SJed Brown References: 177961f28d0SJed Brown Emil Constantinescu 178961f28d0SJed Brown 179961f28d0SJed Brown Level: intermediate 180961f28d0SJed Brown 18143b21953SEmil Constantinescu .seealso: TSROSW, TSROSWLASSP3P4S2C, TSROSWLLSSP3P4S2C, SSP 182961f28d0SJed Brown M*/ 183961f28d0SJed Brown 184961f28d0SJed Brown /*MC 185998eb97aSJed Brown TSROSWLASSP3P4S2C - L-stable Rosenbrock-W method with SSP explicit part, third order, four stages 186961f28d0SJed Brown 187961f28d0SJed Brown By default, the Jacobian is only recomputed once per step. 188961f28d0SJed Brown 189961f28d0SJed Brown L-stable (A-stable embedded) SPP explicit order 3, 4 stages, CFL 2 (eff = 1/2) 190961f28d0SJed Brown 191961f28d0SJed Brown References: 192961f28d0SJed Brown Emil Constantinescu 193961f28d0SJed Brown 194961f28d0SJed Brown Level: intermediate 195961f28d0SJed Brown 19643b21953SEmil Constantinescu .seealso: TSROSW, TSROSWASSP3P3S1C, TSROSWLLSSP3P4S2C, TSSSP 197961f28d0SJed Brown M*/ 198961f28d0SJed Brown 199961f28d0SJed Brown /*MC 200998eb97aSJed Brown TSROSWLLSSP3P4S2C - L-stable Rosenbrock-W method with SSP explicit part, third order, four stages 201961f28d0SJed Brown 202961f28d0SJed Brown By default, the Jacobian is only recomputed once per step. 203961f28d0SJed Brown 204961f28d0SJed Brown L-stable (L-stable embedded) SPP explicit order 3, 4 stages, CFL 2 (eff = 1/2) 205961f28d0SJed Brown 206961f28d0SJed Brown References: 207961f28d0SJed Brown Emil Constantinescu 208961f28d0SJed Brown 209961f28d0SJed Brown Level: intermediate 210961f28d0SJed Brown 211961f28d0SJed Brown .seealso: TSROSW, TSROSWASSP3P3S1C, TSROSWLASSP3P4S2C, TSSSP 212961f28d0SJed Brown M*/ 213961f28d0SJed Brown 21442faf41dSJed Brown /*MC 21542faf41dSJed Brown TSROSWGRK4T - four stage, fourth order Rosenbrock (not W) method from Kaps and Rentrop 21642faf41dSJed Brown 21742faf41dSJed Brown By default, the Jacobian is only recomputed once per step. 21842faf41dSJed Brown 21942faf41dSJed Brown A(89.3 degrees)-stable, |R(infty)| = 0.454. 22042faf41dSJed Brown 22142faf41dSJed Brown This method does not provide a dense output formula. 22242faf41dSJed Brown 22342faf41dSJed Brown References: 22442faf41dSJed Brown Kaps and Rentrop, Generalized Runge-Kutta methods of order four with stepsize control for stiff ordinary differential equations, 1979. 22542faf41dSJed Brown 22642faf41dSJed Brown Hairer and Wanner, Solving Ordinary Differential Equations II, Section 4 Table 7.2. 22742faf41dSJed Brown 22842faf41dSJed Brown Hairer's code ros4.f 22942faf41dSJed Brown 23042faf41dSJed Brown Level: intermediate 23142faf41dSJed Brown 23242faf41dSJed Brown .seealso: TSROSW, TSROSWSHAMP4, TSROSWVELDD4, TSROSW4L 23342faf41dSJed Brown M*/ 23442faf41dSJed Brown 23542faf41dSJed Brown /*MC 23642faf41dSJed Brown TSROSWSHAMP4 - four stage, fourth order Rosenbrock (not W) method from Shampine 23742faf41dSJed Brown 23842faf41dSJed Brown By default, the Jacobian is only recomputed once per step. 23942faf41dSJed Brown 24042faf41dSJed Brown A-stable, |R(infty)| = 1/3. 24142faf41dSJed Brown 24242faf41dSJed Brown This method does not provide a dense output formula. 24342faf41dSJed Brown 24442faf41dSJed Brown References: 24542faf41dSJed Brown Shampine, Implementation of Rosenbrock methods, 1982. 24642faf41dSJed Brown 24742faf41dSJed Brown Hairer and Wanner, Solving Ordinary Differential Equations II, Section 4 Table 7.2. 24842faf41dSJed Brown 24942faf41dSJed Brown Hairer's code ros4.f 25042faf41dSJed Brown 25142faf41dSJed Brown Level: intermediate 25242faf41dSJed Brown 25342faf41dSJed Brown .seealso: TSROSW, TSROSWGRK4T, TSROSWVELDD4, TSROSW4L 25442faf41dSJed Brown M*/ 25542faf41dSJed Brown 25642faf41dSJed Brown /*MC 25742faf41dSJed Brown TSROSWVELDD4 - four stage, fourth order Rosenbrock (not W) method from van Veldhuizen 25842faf41dSJed Brown 25942faf41dSJed Brown By default, the Jacobian is only recomputed once per step. 26042faf41dSJed Brown 26142faf41dSJed Brown A(89.5 degrees)-stable, |R(infty)| = 0.24. 26242faf41dSJed Brown 26342faf41dSJed Brown This method does not provide a dense output formula. 26442faf41dSJed Brown 26542faf41dSJed Brown References: 26642faf41dSJed Brown van Veldhuizen, D-stability and Kaps-Rentrop methods, 1984. 26742faf41dSJed Brown 26842faf41dSJed Brown Hairer and Wanner, Solving Ordinary Differential Equations II, Section 4 Table 7.2. 26942faf41dSJed Brown 27042faf41dSJed Brown Hairer's code ros4.f 27142faf41dSJed Brown 27242faf41dSJed Brown Level: intermediate 27342faf41dSJed Brown 27442faf41dSJed Brown .seealso: TSROSW, TSROSWGRK4T, TSROSWSHAMP4, TSROSW4L 27542faf41dSJed Brown M*/ 27642faf41dSJed Brown 27742faf41dSJed Brown /*MC 27842faf41dSJed Brown TSROSW4L - four stage, fourth order Rosenbrock (not W) method 27942faf41dSJed Brown 28042faf41dSJed Brown By default, the Jacobian is only recomputed once per step. 28142faf41dSJed Brown 28242faf41dSJed Brown A-stable and L-stable 28342faf41dSJed Brown 28442faf41dSJed Brown This method does not provide a dense output formula. 28542faf41dSJed Brown 28642faf41dSJed Brown References: 28742faf41dSJed Brown Hairer and Wanner, Solving Ordinary Differential Equations II, Section 4 Table 7.2. 28842faf41dSJed Brown 28942faf41dSJed Brown Hairer's code ros4.f 29042faf41dSJed Brown 29142faf41dSJed Brown Level: intermediate 29242faf41dSJed Brown 29342faf41dSJed Brown .seealso: TSROSW, TSROSWGRK4T, TSROSWSHAMP4, TSROSW4L 29442faf41dSJed Brown M*/ 29542faf41dSJed Brown 296e27a552bSJed Brown #undef __FUNCT__ 297e27a552bSJed Brown #define __FUNCT__ "TSRosWRegisterAll" 298e27a552bSJed Brown /*@C 299e27a552bSJed Brown TSRosWRegisterAll - Registers all of the additive Runge-Kutta implicit-explicit methods in TSRosW 300e27a552bSJed Brown 301e27a552bSJed Brown Not Collective, but should be called by all processes which will need the schemes to be registered 302e27a552bSJed Brown 303e27a552bSJed Brown Level: advanced 304e27a552bSJed Brown 305e27a552bSJed Brown .keywords: TS, TSRosW, register, all 306e27a552bSJed Brown 307e27a552bSJed Brown .seealso: TSRosWRegisterDestroy() 308e27a552bSJed Brown @*/ 309e27a552bSJed Brown PetscErrorCode TSRosWRegisterAll(void) 310e27a552bSJed Brown { 311e27a552bSJed Brown PetscErrorCode ierr; 312e27a552bSJed Brown 313e27a552bSJed Brown PetscFunctionBegin; 314e27a552bSJed Brown if (TSRosWRegisterAllCalled) PetscFunctionReturn(0); 315e27a552bSJed Brown TSRosWRegisterAllCalled = PETSC_TRUE; 316e27a552bSJed Brown 317e27a552bSJed Brown { 318bbd56ea5SKarl Rupp const PetscReal A = 0; 319bbd56ea5SKarl Rupp const PetscReal Gamma = 1; 320bbd56ea5SKarl Rupp const PetscReal b = 1; 321bbd56ea5SKarl Rupp const PetscReal binterpt=1; 3221f80e275SEmil Constantinescu 3230298fd71SBarry Smith ierr = TSRosWRegister(TSROSWTHETA1,1,1,&A,&Gamma,&b,NULL,1,&binterpt);CHKERRQ(ierr); 3243606a31eSEmil Constantinescu } 3253606a31eSEmil Constantinescu 3263606a31eSEmil Constantinescu { 327bbd56ea5SKarl Rupp const PetscReal A = 0; 328bbd56ea5SKarl Rupp const PetscReal Gamma = 0.5; 329bbd56ea5SKarl Rupp const PetscReal b = 1; 330bbd56ea5SKarl Rupp const PetscReal binterpt=1; 331bbd56ea5SKarl Rupp 3320298fd71SBarry Smith ierr = TSRosWRegister(TSROSWTHETA2,2,1,&A,&Gamma,&b,NULL,1,&binterpt);CHKERRQ(ierr); 3333606a31eSEmil Constantinescu } 3343606a31eSEmil Constantinescu 3353606a31eSEmil Constantinescu { 336da80777bSKarl Rupp /*const PetscReal g = 1. + 1./PetscSqrtReal(2.0); Direct evaluation: 1.707106781186547524401. Used for setting up arrays of values known at compile time below. */ 337e27a552bSJed Brown const PetscReal 33861692a83SJed Brown A[2][2] = {{0,0}, {1.,0}}, 339da80777bSKarl Rupp Gamma[2][2] = {{1.707106781186547524401,0}, {-2.*1.707106781186547524401,1.707106781186547524401}}, 3401c3436cfSJed Brown b[2] = {0.5,0.5}, 3411c3436cfSJed Brown b1[2] = {1.0,0.0}; 3421f80e275SEmil Constantinescu PetscReal binterpt[2][2]; 343da80777bSKarl Rupp binterpt[0][0] = 1.707106781186547524401 - 1.0; 344da80777bSKarl Rupp binterpt[1][0] = 2.0 - 1.707106781186547524401; 345da80777bSKarl Rupp binterpt[0][1] = 1.707106781186547524401 - 1.5; 346da80777bSKarl Rupp binterpt[1][1] = 1.5 - 1.707106781186547524401; 347bbd56ea5SKarl Rupp 3481f80e275SEmil Constantinescu ierr = TSRosWRegister(TSROSW2P,2,2,&A[0][0],&Gamma[0][0],b,b1,2,&binterpt[0][0]);CHKERRQ(ierr); 349e27a552bSJed Brown } 350e27a552bSJed Brown { 351da80777bSKarl Rupp /*const PetscReal g = 1. - 1./PetscSqrtReal(2.0); Direct evaluation: 0.2928932188134524755992. Used for setting up arrays of values known at compile time below. */ 352e27a552bSJed Brown const PetscReal 35361692a83SJed Brown A[2][2] = {{0,0}, {1.,0}}, 354da80777bSKarl Rupp Gamma[2][2] = {{0.2928932188134524755992,0}, {-2.*0.2928932188134524755992,0.2928932188134524755992}}, 3551c3436cfSJed Brown b[2] = {0.5,0.5}, 3561c3436cfSJed Brown b1[2] = {1.0,0.0}; 3571f80e275SEmil Constantinescu PetscReal binterpt[2][2]; 358da80777bSKarl Rupp binterpt[0][0] = 0.2928932188134524755992 - 1.0; 359da80777bSKarl Rupp binterpt[1][0] = 2.0 - 0.2928932188134524755992; 360da80777bSKarl Rupp binterpt[0][1] = 0.2928932188134524755992 - 1.5; 361da80777bSKarl Rupp binterpt[1][1] = 1.5 - 0.2928932188134524755992; 362bbd56ea5SKarl Rupp 3631f80e275SEmil Constantinescu ierr = TSRosWRegister(TSROSW2M,2,2,&A[0][0],&Gamma[0][0],b,b1,2,&binterpt[0][0]);CHKERRQ(ierr); 364fe7e6d57SJed Brown } 365fe7e6d57SJed Brown { 366da80777bSKarl Rupp /*const PetscReal g = 7.8867513459481287e-01; Directly written in-place below */ 3671f80e275SEmil Constantinescu PetscReal binterpt[3][2]; 368fe7e6d57SJed Brown const PetscReal 369fe7e6d57SJed Brown A[3][3] = {{0,0,0}, 370fe7e6d57SJed Brown {1.5773502691896257e+00,0,0}, 371fe7e6d57SJed Brown {0.5,0,0}}, 372da80777bSKarl Rupp Gamma[3][3] = {{7.8867513459481287e-01,0,0}, 373da80777bSKarl Rupp {-1.5773502691896257e+00,7.8867513459481287e-01,0}, 374da80777bSKarl Rupp {-6.7075317547305480e-01,-1.7075317547305482e-01,7.8867513459481287e-01}}, 375fe7e6d57SJed Brown b[3] = {1.0566243270259355e-01,4.9038105676657971e-02,8.4529946162074843e-01}, 376fe7e6d57SJed Brown b2[3] = {-1.7863279495408180e-01,1./3.,8.4529946162074843e-01}; 3771f80e275SEmil Constantinescu 3781f80e275SEmil Constantinescu binterpt[0][0] = -0.8094010767585034; 3791f80e275SEmil Constantinescu binterpt[1][0] = -0.5; 3801f80e275SEmil Constantinescu binterpt[2][0] = 2.3094010767585034; 3811f80e275SEmil Constantinescu binterpt[0][1] = 0.9641016151377548; 3821f80e275SEmil Constantinescu binterpt[1][1] = 0.5; 3831f80e275SEmil Constantinescu binterpt[2][1] = -1.4641016151377548; 384bbd56ea5SKarl Rupp 3851f80e275SEmil Constantinescu ierr = TSRosWRegister(TSROSWRA3PW,3,3,&A[0][0],&Gamma[0][0],b,b2,2,&binterpt[0][0]);CHKERRQ(ierr); 386fe7e6d57SJed Brown } 387fe7e6d57SJed Brown { 3883ca35412SEmil Constantinescu PetscReal binterpt[4][3]; 389da80777bSKarl Rupp /*const PetscReal g = 4.3586652150845900e-01; Directly written in-place below */ 390fe7e6d57SJed Brown const PetscReal 391fe7e6d57SJed Brown A[4][4] = {{0,0,0,0}, 392fe7e6d57SJed Brown {8.7173304301691801e-01,0,0,0}, 393fe7e6d57SJed Brown {8.4457060015369423e-01,-1.1299064236484185e-01,0,0}, 394fe7e6d57SJed Brown {0,0,1.,0}}, 395da80777bSKarl Rupp Gamma[4][4] = {{4.3586652150845900e-01,0,0,0}, 396da80777bSKarl Rupp {-8.7173304301691801e-01,4.3586652150845900e-01,0,0}, 397da80777bSKarl Rupp {-9.0338057013044082e-01,5.4180672388095326e-02,4.3586652150845900e-01,0}, 398da80777bSKarl Rupp {2.4212380706095346e-01,-1.2232505839045147e+00,5.4526025533510214e-01,4.3586652150845900e-01}}, 399fe7e6d57SJed Brown b[4] = {2.4212380706095346e-01,-1.2232505839045147e+00,1.5452602553351020e+00,4.3586652150845900e-01}, 4003ca35412SEmil Constantinescu b2[4] = {3.7810903145819369e-01,-9.6042292212423178e-02,5.0000000000000000e-01,2.1793326075422950e-01}; 4013ca35412SEmil Constantinescu 4023ca35412SEmil Constantinescu binterpt[0][0]=1.0564298455794094; 4033ca35412SEmil Constantinescu binterpt[1][0]=2.296429974281067; 4043ca35412SEmil Constantinescu binterpt[2][0]=-1.307599564525376; 4053ca35412SEmil Constantinescu binterpt[3][0]=-1.045260255335102; 4063ca35412SEmil Constantinescu binterpt[0][1]=-1.3864882699759573; 4073ca35412SEmil Constantinescu binterpt[1][1]=-8.262611700275677; 4083ca35412SEmil Constantinescu binterpt[2][1]=7.250979895056055; 4093ca35412SEmil Constantinescu binterpt[3][1]=2.398120075195581; 4103ca35412SEmil Constantinescu binterpt[0][2]=0.5721822314575016; 4113ca35412SEmil Constantinescu binterpt[1][2]=4.742931142090097; 4123ca35412SEmil Constantinescu binterpt[2][2]=-4.398120075195578; 4133ca35412SEmil Constantinescu binterpt[3][2]=-0.9169932983520199; 4143ca35412SEmil Constantinescu 4153ca35412SEmil Constantinescu ierr = TSRosWRegister(TSROSWRA34PW2,3,4,&A[0][0],&Gamma[0][0],b,b2,3,&binterpt[0][0]);CHKERRQ(ierr); 416e27a552bSJed Brown } 417ef3c5b88SJed Brown { 418da80777bSKarl Rupp /* const PetscReal g = 0.5; Directly written in-place below */ 419ef3c5b88SJed Brown const PetscReal 420ef3c5b88SJed Brown A[4][4] = {{0,0,0,0}, 421ef3c5b88SJed Brown {0,0,0,0}, 422ef3c5b88SJed Brown {1.,0,0,0}, 423ef3c5b88SJed Brown {0.75,-0.25,0.5,0}}, 424da80777bSKarl Rupp Gamma[4][4] = {{0.5,0,0,0}, 425da80777bSKarl Rupp {1.,0.5,0,0}, 426da80777bSKarl Rupp {-0.25,-0.25,0.5,0}, 427da80777bSKarl Rupp {1./12,1./12,-2./3,0.5}}, 428ef3c5b88SJed Brown b[4] = {5./6,-1./6,-1./6,0.5}, 429ef3c5b88SJed Brown b2[4] = {0.75,-0.25,0.5,0}; 430bbd56ea5SKarl Rupp 4310298fd71SBarry Smith ierr = TSRosWRegister(TSROSWRODAS3,3,4,&A[0][0],&Gamma[0][0],b,b2,0,NULL);CHKERRQ(ierr); 432ef3c5b88SJed Brown } 433ef3c5b88SJed Brown { 434da80777bSKarl Rupp /*const PetscReal g = 0.43586652150845899941601945119356; Directly written in-place below */ 435ef3c5b88SJed Brown const PetscReal 436ef3c5b88SJed Brown A[3][3] = {{0,0,0}, 437da80777bSKarl Rupp {0.43586652150845899941601945119356,0,0}, 438da80777bSKarl Rupp {0.43586652150845899941601945119356,0,0}}, 439da80777bSKarl Rupp Gamma[3][3] = {{0.43586652150845899941601945119356,0,0}, 440da80777bSKarl Rupp {-0.19294655696029095575009695436041,0.43586652150845899941601945119356,0}, 441da80777bSKarl Rupp {0,1.74927148125794685173529749738960,0.43586652150845899941601945119356}}, 442ef3c5b88SJed Brown b[3] = {-0.75457412385404315829818998646589,1.94100407061964420292840123379419,-0.18642994676560104463021124732829}, 443ef3c5b88SJed Brown b2[3] = {-1.53358745784149585370766523913002,2.81745131148625772213931745457622,-0.28386385364476186843165221544619}; 4441f80e275SEmil Constantinescu 4451f80e275SEmil Constantinescu PetscReal binterpt[3][2]; 4461f80e275SEmil Constantinescu binterpt[0][0] = 3.793692883777660870425141387941; 4471f80e275SEmil Constantinescu binterpt[1][0] = -2.918692883777660870425141387941; 4481f80e275SEmil Constantinescu binterpt[2][0] = 0.125; 4491f80e275SEmil Constantinescu binterpt[0][1] = -0.725741064379812106687651020584; 4501f80e275SEmil Constantinescu binterpt[1][1] = 0.559074397713145440020984353917; 4511f80e275SEmil Constantinescu binterpt[2][1] = 0.16666666666666666666666666666667; 4521f80e275SEmil Constantinescu 4531f80e275SEmil Constantinescu ierr = TSRosWRegister(TSROSWSANDU3,3,3,&A[0][0],&Gamma[0][0],b,b2,2,&binterpt[0][0]);CHKERRQ(ierr); 454ef3c5b88SJed Brown } 455b1c69cc3SEmil Constantinescu { 456da80777bSKarl Rupp /*const PetscReal s3 = PetscSqrtReal(3.),g = (3.0+s3)/6.0; 457da80777bSKarl Rupp * Direct evaluation: s3 = 1.732050807568877293527; 458da80777bSKarl Rupp * g = 0.7886751345948128822546; 459da80777bSKarl Rupp * Values are directly inserted below to ensure availability at compile time (compiler warnings otherwise...) */ 460b1c69cc3SEmil Constantinescu const PetscReal 461b1c69cc3SEmil Constantinescu A[3][3] = {{0,0,0}, 462b1c69cc3SEmil Constantinescu {1,0,0}, 463b1c69cc3SEmil Constantinescu {0.25,0.25,0}}, 464b1c69cc3SEmil Constantinescu Gamma[3][3] = {{0,0,0}, 465da80777bSKarl Rupp {(-3.0-1.732050807568877293527)/6.0,0.7886751345948128822546,0}, 466da80777bSKarl Rupp {(-3.0-1.732050807568877293527)/24.0,(-3.0-1.732050807568877293527)/8.0,0.7886751345948128822546}}, 467b1c69cc3SEmil Constantinescu b[3] = {1./6.,1./6.,2./3.}, 468b1c69cc3SEmil Constantinescu b2[3] = {1./4.,1./4.,1./2.}; 469c0cb691aSEmil Constantinescu PetscReal binterpt[3][2]; 470da80777bSKarl Rupp 471c0cb691aSEmil Constantinescu binterpt[0][0]=0.089316397477040902157517886164709; 472c0cb691aSEmil Constantinescu binterpt[1][0]=-0.91068360252295909784248211383529; 473c0cb691aSEmil Constantinescu binterpt[2][0]=1.8213672050459181956849642276706; 474c0cb691aSEmil Constantinescu binterpt[0][1]=0.077350269189625764509148780501957; 475c0cb691aSEmil Constantinescu binterpt[1][1]=1.077350269189625764509148780502; 476c0cb691aSEmil Constantinescu binterpt[2][1]=-1.1547005383792515290182975610039; 477bbd56ea5SKarl Rupp 478c0cb691aSEmil Constantinescu ierr = TSRosWRegister(TSROSWASSP3P3S1C,3,3,&A[0][0],&Gamma[0][0],b,b2,2,&binterpt[0][0]);CHKERRQ(ierr); 479b1c69cc3SEmil Constantinescu } 480b1c69cc3SEmil Constantinescu 481b1c69cc3SEmil Constantinescu { 482b1c69cc3SEmil Constantinescu const PetscReal 483b1c69cc3SEmil Constantinescu A[4][4] = {{0,0,0,0}, 484b1c69cc3SEmil Constantinescu {1./2.,0,0,0}, 485b1c69cc3SEmil Constantinescu {1./2.,1./2.,0,0}, 486b1c69cc3SEmil Constantinescu {1./6.,1./6.,1./6.,0}}, 487b1c69cc3SEmil Constantinescu Gamma[4][4] = {{1./2.,0,0,0}, 488b1c69cc3SEmil Constantinescu {0.0,1./4.,0,0}, 489b1c69cc3SEmil Constantinescu {-2.,-2./3.,2./3.,0}, 490b1c69cc3SEmil Constantinescu {1./2.,5./36.,-2./9,0}}, 491b1c69cc3SEmil Constantinescu b[4] = {1./6.,1./6.,1./6.,1./2.}, 492b1c69cc3SEmil Constantinescu b2[4] = {1./8.,3./4.,1./8.,0}; 493c0cb691aSEmil Constantinescu PetscReal binterpt[4][3]; 494da80777bSKarl Rupp 495c0cb691aSEmil Constantinescu binterpt[0][0]=6.25; 496c0cb691aSEmil Constantinescu binterpt[1][0]=-30.25; 497c0cb691aSEmil Constantinescu binterpt[2][0]=1.75; 498c0cb691aSEmil Constantinescu binterpt[3][0]=23.25; 499c0cb691aSEmil Constantinescu binterpt[0][1]=-9.75; 500c0cb691aSEmil Constantinescu binterpt[1][1]=58.75; 501c0cb691aSEmil Constantinescu binterpt[2][1]=-3.25; 502c0cb691aSEmil Constantinescu binterpt[3][1]=-45.75; 503c0cb691aSEmil Constantinescu binterpt[0][2]=3.6666666666666666666666666666667; 504c0cb691aSEmil Constantinescu binterpt[1][2]=-28.333333333333333333333333333333; 505c0cb691aSEmil Constantinescu binterpt[2][2]=1.6666666666666666666666666666667; 506c0cb691aSEmil Constantinescu binterpt[3][2]=23.; 507bbd56ea5SKarl Rupp 508c0cb691aSEmil Constantinescu ierr = TSRosWRegister(TSROSWLASSP3P4S2C,3,4,&A[0][0],&Gamma[0][0],b,b2,3,&binterpt[0][0]);CHKERRQ(ierr); 509b1c69cc3SEmil Constantinescu } 510b1c69cc3SEmil Constantinescu 511b1c69cc3SEmil Constantinescu { 512b1c69cc3SEmil Constantinescu const PetscReal 513b1c69cc3SEmil Constantinescu A[4][4] = {{0,0,0,0}, 514b1c69cc3SEmil Constantinescu {1./2.,0,0,0}, 515b1c69cc3SEmil Constantinescu {1./2.,1./2.,0,0}, 516b1c69cc3SEmil Constantinescu {1./6.,1./6.,1./6.,0}}, 517b1c69cc3SEmil Constantinescu Gamma[4][4] = {{1./2.,0,0,0}, 518b1c69cc3SEmil Constantinescu {0.0,3./4.,0,0}, 519b1c69cc3SEmil Constantinescu {-2./3.,-23./9.,2./9.,0}, 520b1c69cc3SEmil Constantinescu {1./18.,65./108.,-2./27,0}}, 521b1c69cc3SEmil Constantinescu b[4] = {1./6.,1./6.,1./6.,1./2.}, 522b1c69cc3SEmil Constantinescu b2[4] = {3./16.,10./16.,3./16.,0}; 523c0cb691aSEmil Constantinescu PetscReal binterpt[4][3]; 524da80777bSKarl Rupp 525c0cb691aSEmil Constantinescu binterpt[0][0]=1.6911764705882352941176470588235; 526c0cb691aSEmil Constantinescu binterpt[1][0]=3.6813725490196078431372549019608; 527c0cb691aSEmil Constantinescu binterpt[2][0]=0.23039215686274509803921568627451; 528c0cb691aSEmil Constantinescu binterpt[3][0]=-4.6029411764705882352941176470588; 529c0cb691aSEmil Constantinescu binterpt[0][1]=-0.95588235294117647058823529411765; 530c0cb691aSEmil Constantinescu binterpt[1][1]=-6.2401960784313725490196078431373; 531c0cb691aSEmil Constantinescu binterpt[2][1]=-0.31862745098039215686274509803922; 532c0cb691aSEmil Constantinescu binterpt[3][1]=7.5147058823529411764705882352941; 533c0cb691aSEmil Constantinescu binterpt[0][2]=-0.56862745098039215686274509803922; 534c0cb691aSEmil Constantinescu binterpt[1][2]=2.7254901960784313725490196078431; 535c0cb691aSEmil Constantinescu binterpt[2][2]=0.25490196078431372549019607843137; 536c0cb691aSEmil Constantinescu binterpt[3][2]=-2.4117647058823529411764705882353; 537bbd56ea5SKarl Rupp 538c0cb691aSEmil Constantinescu ierr = TSRosWRegister(TSROSWLLSSP3P4S2C,3,4,&A[0][0],&Gamma[0][0],b,b2,3,&binterpt[0][0]);CHKERRQ(ierr); 539b1c69cc3SEmil Constantinescu } 540753f8adbSEmil Constantinescu 541753f8adbSEmil Constantinescu { 542753f8adbSEmil Constantinescu PetscReal A[4][4],Gamma[4][4],b[4],b2[4]; 5433ca35412SEmil Constantinescu PetscReal binterpt[4][3]; 544753f8adbSEmil Constantinescu 545753f8adbSEmil Constantinescu Gamma[0][0]=0.4358665215084589994160194475295062513822671686978816; 54605e8e825SJed Brown Gamma[0][1]=0; Gamma[0][2]=0; Gamma[0][3]=0; 547753f8adbSEmil Constantinescu Gamma[1][0]=-1.997527830934941248426324674704153457289527280554476; 548753f8adbSEmil Constantinescu Gamma[1][1]=0.4358665215084589994160194475295062513822671686978816; 54905e8e825SJed Brown Gamma[1][2]=0; Gamma[1][3]=0; 550753f8adbSEmil Constantinescu Gamma[2][0]=-1.007948511795029620852002345345404191008352770119903; 551753f8adbSEmil Constantinescu Gamma[2][1]=-0.004648958462629345562774289390054679806993396798458131; 552753f8adbSEmil Constantinescu Gamma[2][2]=0.4358665215084589994160194475295062513822671686978816; 55305e8e825SJed Brown Gamma[2][3]=0; 554753f8adbSEmil Constantinescu Gamma[3][0]=-0.6685429734233467180451604600279552604364311322650783; 555753f8adbSEmil Constantinescu Gamma[3][1]=0.6056625986449338476089525334450053439525178740492984; 556753f8adbSEmil Constantinescu Gamma[3][2]=-0.9717899277217721234705114616271378792182450260943198; 557753f8adbSEmil Constantinescu Gamma[3][3]=0; 558753f8adbSEmil Constantinescu 55905e8e825SJed Brown A[0][0]=0; A[0][1]=0; A[0][2]=0; A[0][3]=0; 560753f8adbSEmil Constantinescu A[1][0]=0.8717330430169179988320388950590125027645343373957631; 56105e8e825SJed Brown A[1][1]=0; A[1][2]=0; A[1][3]=0; 562753f8adbSEmil Constantinescu A[2][0]=0.5275890119763004115618079766722914408876108660811028; 563753f8adbSEmil Constantinescu A[2][1]=0.07241098802369958843819203208518599088698057726988732; 56405e8e825SJed Brown A[2][2]=0; A[2][3]=0; 565753f8adbSEmil Constantinescu A[3][0]=0.3990960076760701320627260685975778145384666450351314; 566753f8adbSEmil Constantinescu A[3][1]=-0.4375576546135194437228463747348862825846903771419953; 567753f8adbSEmil Constantinescu A[3][2]=1.038461646937449311660120300601880176655352737312713; 56805e8e825SJed Brown A[3][3]=0; 569753f8adbSEmil Constantinescu 570753f8adbSEmil Constantinescu b[0]=0.1876410243467238251612921333138006734899663569186926; 571753f8adbSEmil Constantinescu b[1]=-0.5952974735769549480478230473706443582188442040780541; 572753f8adbSEmil Constantinescu b[2]=0.9717899277217721234705114616271378792182450260943198; 573753f8adbSEmil Constantinescu b[3]=0.4358665215084589994160194475295062513822671686978816; 574753f8adbSEmil Constantinescu 575753f8adbSEmil Constantinescu b2[0]=0.2147402862233891404862383521089097657790734483804460; 576753f8adbSEmil Constantinescu b2[1]=-0.4851622638849390928209050538171743017757490232519684; 577753f8adbSEmil Constantinescu b2[2]=0.8687250025203875511662123688667549217531982787600080; 578753f8adbSEmil Constantinescu b2[3]=0.4016969751411624011684543450940068201770721128357014; 579753f8adbSEmil Constantinescu 5803ca35412SEmil Constantinescu binterpt[0][0]=2.2565812720167954547104627844105; 5813ca35412SEmil Constantinescu binterpt[1][0]=1.349166413351089573796243820819; 5823ca35412SEmil Constantinescu binterpt[2][0]=-2.4695174540533503758652847586647; 5833ca35412SEmil Constantinescu binterpt[3][0]=-0.13623023131453465264142184656474; 5843ca35412SEmil Constantinescu binterpt[0][1]=-3.0826699111559187902922463354557; 5853ca35412SEmil Constantinescu binterpt[1][1]=-2.4689115685996042534544925650515; 5863ca35412SEmil Constantinescu binterpt[2][1]=5.7428279814696677152129332773553; 5873ca35412SEmil Constantinescu binterpt[3][1]=-0.19124650171414467146619437684812; 5883ca35412SEmil Constantinescu binterpt[0][2]=1.0137296634858471607430756831148; 5893ca35412SEmil Constantinescu binterpt[1][2]=0.52444768167155973161042570784064; 5903ca35412SEmil Constantinescu binterpt[2][2]=-2.3015205996945452158771370439586; 5913ca35412SEmil Constantinescu binterpt[3][2]=0.76334325453713832352363565300308; 592f4aed992SEmil Constantinescu 593f73f8d2cSSatish Balay ierr = TSRosWRegister(TSROSWARK3,3,4,&A[0][0],&Gamma[0][0],b,b2,3,&binterpt[0][0]);CHKERRQ(ierr); 594753f8adbSEmil Constantinescu } 59542faf41dSJed Brown ierr = TSRosWRegisterRos4(TSROSWGRK4T,0.231,PETSC_DEFAULT,PETSC_DEFAULT,0,-0.1282612945269037e+01);CHKERRQ(ierr); 59642faf41dSJed Brown ierr = TSRosWRegisterRos4(TSROSWSHAMP4,0.5,PETSC_DEFAULT,PETSC_DEFAULT,0,125./108.);CHKERRQ(ierr); 59742faf41dSJed Brown ierr = TSRosWRegisterRos4(TSROSWVELDD4,0.22570811482256823492,PETSC_DEFAULT,PETSC_DEFAULT,0,-1.355958941201148);CHKERRQ(ierr); 59842faf41dSJed Brown ierr = TSRosWRegisterRos4(TSROSW4L,0.57282,PETSC_DEFAULT,PETSC_DEFAULT,0,-1.093502252409163);CHKERRQ(ierr); 599e27a552bSJed Brown PetscFunctionReturn(0); 600e27a552bSJed Brown } 601e27a552bSJed Brown 602d5e6173cSPeter Brune 603d5e6173cSPeter Brune 604e27a552bSJed Brown #undef __FUNCT__ 605e27a552bSJed Brown #define __FUNCT__ "TSRosWRegisterDestroy" 606e27a552bSJed Brown /*@C 607e27a552bSJed Brown TSRosWRegisterDestroy - Frees the list of schemes that were registered by TSRosWRegister(). 608e27a552bSJed Brown 609e27a552bSJed Brown Not Collective 610e27a552bSJed Brown 611e27a552bSJed Brown Level: advanced 612e27a552bSJed Brown 613e27a552bSJed Brown .keywords: TSRosW, register, destroy 614607a6623SBarry Smith .seealso: TSRosWRegister(), TSRosWRegisterAll() 615e27a552bSJed Brown @*/ 616e27a552bSJed Brown PetscErrorCode TSRosWRegisterDestroy(void) 617e27a552bSJed Brown { 618e27a552bSJed Brown PetscErrorCode ierr; 61961692a83SJed Brown RosWTableauLink link; 620e27a552bSJed Brown 621e27a552bSJed Brown PetscFunctionBegin; 62261692a83SJed Brown while ((link = RosWTableauList)) { 62361692a83SJed Brown RosWTableau t = &link->tab; 62461692a83SJed Brown RosWTableauList = link->next; 62561692a83SJed Brown ierr = PetscFree5(t->A,t->Gamma,t->b,t->ASum,t->GammaSum);CHKERRQ(ierr); 62643b21953SEmil Constantinescu ierr = PetscFree5(t->At,t->bt,t->GammaInv,t->GammaZeroDiag,t->GammaExplicitCorr);CHKERRQ(ierr); 627fe7e6d57SJed Brown ierr = PetscFree2(t->bembed,t->bembedt);CHKERRQ(ierr); 628f4aed992SEmil Constantinescu ierr = PetscFree(t->binterpt);CHKERRQ(ierr); 629e27a552bSJed Brown ierr = PetscFree(t->name);CHKERRQ(ierr); 630e27a552bSJed Brown ierr = PetscFree(link);CHKERRQ(ierr); 631e27a552bSJed Brown } 632e27a552bSJed Brown TSRosWRegisterAllCalled = PETSC_FALSE; 633e27a552bSJed Brown PetscFunctionReturn(0); 634e27a552bSJed Brown } 635e27a552bSJed Brown 636e27a552bSJed Brown #undef __FUNCT__ 637e27a552bSJed Brown #define __FUNCT__ "TSRosWInitializePackage" 638e27a552bSJed Brown /*@C 639e27a552bSJed Brown TSRosWInitializePackage - This function initializes everything in the TSRosW package. It is called 640e27a552bSJed Brown from PetscDLLibraryRegister() when using dynamic libraries, and on the first call to TSCreate_RosW() 641e27a552bSJed Brown when using static libraries. 642e27a552bSJed Brown 643e27a552bSJed Brown Level: developer 644e27a552bSJed Brown 645e27a552bSJed Brown .keywords: TS, TSRosW, initialize, package 646e27a552bSJed Brown .seealso: PetscInitialize() 647e27a552bSJed Brown @*/ 648607a6623SBarry Smith PetscErrorCode TSRosWInitializePackage(void) 649e27a552bSJed Brown { 650e27a552bSJed Brown PetscErrorCode ierr; 651e27a552bSJed Brown 652e27a552bSJed Brown PetscFunctionBegin; 653e27a552bSJed Brown if (TSRosWPackageInitialized) PetscFunctionReturn(0); 654e27a552bSJed Brown TSRosWPackageInitialized = PETSC_TRUE; 655e27a552bSJed Brown ierr = TSRosWRegisterAll();CHKERRQ(ierr); 656e27a552bSJed Brown ierr = PetscRegisterFinalize(TSRosWFinalizePackage);CHKERRQ(ierr); 657e27a552bSJed Brown PetscFunctionReturn(0); 658e27a552bSJed Brown } 659e27a552bSJed Brown 660e27a552bSJed Brown #undef __FUNCT__ 661e27a552bSJed Brown #define __FUNCT__ "TSRosWFinalizePackage" 662e27a552bSJed Brown /*@C 663e27a552bSJed Brown TSRosWFinalizePackage - This function destroys everything in the TSRosW package. It is 664e27a552bSJed Brown called from PetscFinalize(). 665e27a552bSJed Brown 666e27a552bSJed Brown Level: developer 667e27a552bSJed Brown 668e27a552bSJed Brown .keywords: Petsc, destroy, package 669e27a552bSJed Brown .seealso: PetscFinalize() 670e27a552bSJed Brown @*/ 671e27a552bSJed Brown PetscErrorCode TSRosWFinalizePackage(void) 672e27a552bSJed Brown { 673e27a552bSJed Brown PetscErrorCode ierr; 674e27a552bSJed Brown 675e27a552bSJed Brown PetscFunctionBegin; 676e27a552bSJed Brown TSRosWPackageInitialized = PETSC_FALSE; 677e27a552bSJed Brown ierr = TSRosWRegisterDestroy();CHKERRQ(ierr); 678e27a552bSJed Brown PetscFunctionReturn(0); 679e27a552bSJed Brown } 680e27a552bSJed Brown 681e27a552bSJed Brown #undef __FUNCT__ 682e27a552bSJed Brown #define __FUNCT__ "TSRosWRegister" 683e27a552bSJed Brown /*@C 68461692a83SJed Brown TSRosWRegister - register a Rosenbrock W scheme by providing the entries in the Butcher tableau and optionally embedded approximations and interpolation 685e27a552bSJed Brown 686e27a552bSJed Brown Not Collective, but the same schemes should be registered on all processes on which they will be used 687e27a552bSJed Brown 688e27a552bSJed Brown Input Parameters: 689e27a552bSJed Brown + name - identifier for method 690e27a552bSJed Brown . order - approximation order of method 691e27a552bSJed Brown . s - number of stages, this is the dimension of the matrices below 69261692a83SJed Brown . A - Table of propagated stage coefficients (dimension s*s, row-major), strictly lower triangular 69361692a83SJed Brown . Gamma - Table of coefficients in implicit stage equations (dimension s*s, row-major), lower triangular with nonzero diagonal 694fe7e6d57SJed Brown . b - Step completion table (dimension s) 6950298fd71SBarry Smith . bembed - Step completion table for a scheme of order one less (dimension s, NULL if no embedded scheme is available) 696f4aed992SEmil Constantinescu . pinterp - Order of the interpolation scheme, equal to the number of columns of binterpt 69742faf41dSJed Brown - binterpt - Coefficients of the interpolation formula (dimension s*pinterp) 698e27a552bSJed Brown 699e27a552bSJed Brown Notes: 70061692a83SJed Brown Several Rosenbrock W methods are provided, this function is only needed to create new methods. 701e27a552bSJed Brown 702e27a552bSJed Brown Level: advanced 703e27a552bSJed Brown 704e27a552bSJed Brown .keywords: TS, register 705e27a552bSJed Brown 706e27a552bSJed Brown .seealso: TSRosW 707e27a552bSJed Brown @*/ 708f9c1d6abSBarry Smith PetscErrorCode TSRosWRegister(TSRosWType name,PetscInt order,PetscInt s,const PetscReal A[],const PetscReal Gamma[],const PetscReal b[],const PetscReal bembed[], 709f4aed992SEmil Constantinescu PetscInt pinterp,const PetscReal binterpt[]) 710e27a552bSJed Brown { 711e27a552bSJed Brown PetscErrorCode ierr; 71261692a83SJed Brown RosWTableauLink link; 71361692a83SJed Brown RosWTableau t; 71461692a83SJed Brown PetscInt i,j,k; 71561692a83SJed Brown PetscScalar *GammaInv; 716e27a552bSJed Brown 717e27a552bSJed Brown PetscFunctionBegin; 718fe7e6d57SJed Brown PetscValidCharPointer(name,1); 719fe7e6d57SJed Brown PetscValidPointer(A,4); 720fe7e6d57SJed Brown PetscValidPointer(Gamma,5); 721fe7e6d57SJed Brown PetscValidPointer(b,6); 722fe7e6d57SJed Brown if (bembed) PetscValidPointer(bembed,7); 723fe7e6d57SJed Brown 7241795a4d1SJed Brown ierr = PetscCalloc1(1,&link);CHKERRQ(ierr); 725e27a552bSJed Brown t = &link->tab; 726e27a552bSJed Brown ierr = PetscStrallocpy(name,&t->name);CHKERRQ(ierr); 727e27a552bSJed Brown t->order = order; 728e27a552bSJed Brown t->s = s; 729dcca6d9dSJed Brown ierr = PetscMalloc5(s*s,&t->A,s*s,&t->Gamma,s,&t->b,s,&t->ASum,s,&t->GammaSum);CHKERRQ(ierr); 730dcca6d9dSJed Brown ierr = PetscMalloc5(s*s,&t->At,s,&t->bt,s*s,&t->GammaInv,s,&t->GammaZeroDiag,s*s,&t->GammaExplicitCorr);CHKERRQ(ierr); 731e27a552bSJed Brown ierr = PetscMemcpy(t->A,A,s*s*sizeof(A[0]));CHKERRQ(ierr); 73261692a83SJed Brown ierr = PetscMemcpy(t->Gamma,Gamma,s*s*sizeof(Gamma[0]));CHKERRQ(ierr); 73343b21953SEmil Constantinescu ierr = PetscMemcpy(t->GammaExplicitCorr,Gamma,s*s*sizeof(Gamma[0]));CHKERRQ(ierr); 73461692a83SJed Brown ierr = PetscMemcpy(t->b,b,s*sizeof(b[0]));CHKERRQ(ierr); 735fe7e6d57SJed Brown if (bembed) { 736dcca6d9dSJed Brown ierr = PetscMalloc2(s,&t->bembed,s,&t->bembedt);CHKERRQ(ierr); 737fe7e6d57SJed Brown ierr = PetscMemcpy(t->bembed,bembed,s*sizeof(bembed[0]));CHKERRQ(ierr); 738fe7e6d57SJed Brown } 73961692a83SJed Brown for (i=0; i<s; i++) { 74061692a83SJed Brown t->ASum[i] = 0; 74161692a83SJed Brown t->GammaSum[i] = 0; 74261692a83SJed Brown for (j=0; j<s; j++) { 74361692a83SJed Brown t->ASum[i] += A[i*s+j]; 744fe7e6d57SJed Brown t->GammaSum[i] += Gamma[i*s+j]; 74561692a83SJed Brown } 74661692a83SJed Brown } 747785e854fSJed Brown ierr = PetscMalloc1(s*s,&GammaInv);CHKERRQ(ierr); /* Need to use Scalar for inverse, then convert back to Real */ 74861692a83SJed Brown for (i=0; i<s*s; i++) GammaInv[i] = Gamma[i]; 749fd96d5b0SEmil Constantinescu for (i=0; i<s; i++) { 750fd96d5b0SEmil Constantinescu if (Gamma[i*s+i] == 0.0) { 751fd96d5b0SEmil Constantinescu GammaInv[i*s+i] = 1.0; 752c17803e7SJed Brown t->GammaZeroDiag[i] = PETSC_TRUE; 753fd96d5b0SEmil Constantinescu } else { 754c17803e7SJed Brown t->GammaZeroDiag[i] = PETSC_FALSE; 755fd96d5b0SEmil Constantinescu } 756fd96d5b0SEmil Constantinescu } 757fd96d5b0SEmil Constantinescu 75861692a83SJed Brown switch (s) { 75961692a83SJed Brown case 1: GammaInv[0] = 1./GammaInv[0]; break; 76096b95a6bSBarry Smith case 2: ierr = PetscKernel_A_gets_inverse_A_2(GammaInv,0);CHKERRQ(ierr); break; 76196b95a6bSBarry Smith case 3: ierr = PetscKernel_A_gets_inverse_A_3(GammaInv,0);CHKERRQ(ierr); break; 76296b95a6bSBarry Smith case 4: ierr = PetscKernel_A_gets_inverse_A_4(GammaInv,0);CHKERRQ(ierr); break; 76361692a83SJed Brown case 5: { 76461692a83SJed Brown PetscInt ipvt5[5]; 76561692a83SJed Brown MatScalar work5[5*5]; 76696b95a6bSBarry Smith ierr = PetscKernel_A_gets_inverse_A_5(GammaInv,ipvt5,work5,0);CHKERRQ(ierr); break; 76761692a83SJed Brown } 76896b95a6bSBarry Smith case 6: ierr = PetscKernel_A_gets_inverse_A_6(GammaInv,0);CHKERRQ(ierr); break; 76996b95a6bSBarry Smith case 7: ierr = PetscKernel_A_gets_inverse_A_7(GammaInv,0);CHKERRQ(ierr); break; 77061692a83SJed Brown default: SETERRQ1(PETSC_COMM_SELF,PETSC_ERR_SUP,"Not implemented for %D stages",s); 77161692a83SJed Brown } 77261692a83SJed Brown for (i=0; i<s*s; i++) t->GammaInv[i] = PetscRealPart(GammaInv[i]); 77361692a83SJed Brown ierr = PetscFree(GammaInv);CHKERRQ(ierr); 77443b21953SEmil Constantinescu 77543b21953SEmil Constantinescu for (i=0; i<s; i++) { 77643b21953SEmil Constantinescu for (k=0; k<i+1; k++) { 77743b21953SEmil Constantinescu t->GammaExplicitCorr[i*s+k]=(t->GammaExplicitCorr[i*s+k])*(t->GammaInv[k*s+k]); 77843b21953SEmil Constantinescu for (j=k+1; j<i+1; j++) { 77943b21953SEmil Constantinescu t->GammaExplicitCorr[i*s+k]+=(t->GammaExplicitCorr[i*s+j])*(t->GammaInv[j*s+k]); 78043b21953SEmil Constantinescu } 78143b21953SEmil Constantinescu } 78243b21953SEmil Constantinescu } 78343b21953SEmil Constantinescu 78461692a83SJed Brown for (i=0; i<s; i++) { 78561692a83SJed Brown for (j=0; j<s; j++) { 78661692a83SJed Brown t->At[i*s+j] = 0; 78761692a83SJed Brown for (k=0; k<s; k++) { 78861692a83SJed Brown t->At[i*s+j] += t->A[i*s+k] * t->GammaInv[k*s+j]; 78961692a83SJed Brown } 79061692a83SJed Brown } 79161692a83SJed Brown t->bt[i] = 0; 79261692a83SJed Brown for (j=0; j<s; j++) { 79361692a83SJed Brown t->bt[i] += t->b[j] * t->GammaInv[j*s+i]; 79461692a83SJed Brown } 795fe7e6d57SJed Brown if (bembed) { 796fe7e6d57SJed Brown t->bembedt[i] = 0; 797fe7e6d57SJed Brown for (j=0; j<s; j++) { 798fe7e6d57SJed Brown t->bembedt[i] += t->bembed[j] * t->GammaInv[j*s+i]; 799fe7e6d57SJed Brown } 800fe7e6d57SJed Brown } 80161692a83SJed Brown } 8028d59e960SJed Brown t->ccfl = 1.0; /* Fix this */ 8038d59e960SJed Brown 804f4aed992SEmil Constantinescu t->pinterp = pinterp; 805785e854fSJed Brown ierr = PetscMalloc1(s*pinterp,&t->binterpt);CHKERRQ(ierr); 8063ca35412SEmil Constantinescu ierr = PetscMemcpy(t->binterpt,binterpt,s*pinterp*sizeof(binterpt[0]));CHKERRQ(ierr); 80761692a83SJed Brown link->next = RosWTableauList; 80861692a83SJed Brown RosWTableauList = link; 809e27a552bSJed Brown PetscFunctionReturn(0); 810e27a552bSJed Brown } 811e27a552bSJed Brown 812e27a552bSJed Brown #undef __FUNCT__ 81342faf41dSJed Brown #define __FUNCT__ "TSRosWRegisterRos4" 81442faf41dSJed Brown /*@C 81542faf41dSJed Brown TSRosWRegisterRos4 - register a fourth order Rosenbrock scheme by providing paramter choices 81642faf41dSJed Brown 81742faf41dSJed Brown Not Collective, but the same schemes should be registered on all processes on which they will be used 81842faf41dSJed Brown 81942faf41dSJed Brown Input Parameters: 82042faf41dSJed Brown + name - identifier for method 82142faf41dSJed Brown . gamma - leading coefficient (diagonal entry) 82242faf41dSJed Brown . a2 - design parameter, see Table 7.2 of Hairer&Wanner 82342faf41dSJed Brown . a3 - design parameter or PETSC_DEFAULT to satisfy one of the order five conditions (Eq 7.22) 82442faf41dSJed Brown . b3 - design parameter, see Table 7.2 of Hairer&Wanner 82542faf41dSJed Brown . beta43 - design parameter or PETSC_DEFAULT to use Equation 7.21 of Hairer&Wanner 82642faf41dSJed Brown . e4 - design parameter for embedded method, see coefficient E4 in ros4.f code from Hairer 82742faf41dSJed Brown 82842faf41dSJed Brown Notes: 82942faf41dSJed Brown This routine encodes the design of fourth order Rosenbrock methods as described in Hairer and Wanner volume 2. 83042faf41dSJed Brown It is used here to implement several methods from the book and can be used to experiment with new methods. 83142faf41dSJed Brown It was written this way instead of by copying coefficients in order to provide better than double precision satisfaction of the order conditions. 83242faf41dSJed Brown 83342faf41dSJed Brown Level: developer 83442faf41dSJed Brown 83542faf41dSJed Brown .keywords: TS, register 83642faf41dSJed Brown 83742faf41dSJed Brown .seealso: TSRosW, TSRosWRegister() 83842faf41dSJed Brown @*/ 83919fd82e9SBarry Smith PetscErrorCode TSRosWRegisterRos4(TSRosWType name,PetscReal gamma,PetscReal a2,PetscReal a3,PetscReal b3,PetscReal e4) 84042faf41dSJed Brown { 84142faf41dSJed Brown PetscErrorCode ierr; 84242faf41dSJed Brown /* Declare numeric constants so they can be quad precision without being truncated at double */ 84342faf41dSJed Brown const PetscReal one = 1,two = 2,three = 3,four = 4,five = 5,six = 6,eight = 8,twelve = 12,twenty = 20,twentyfour = 24, 84442faf41dSJed Brown p32 = one/six - gamma + gamma*gamma, 84542faf41dSJed Brown p42 = one/eight - gamma/three, 84642faf41dSJed Brown p43 = one/twelve - gamma/three, 84742faf41dSJed Brown p44 = one/twentyfour - gamma/two + three/two*gamma*gamma - gamma*gamma*gamma, 84842faf41dSJed Brown p56 = one/twenty - gamma/four; 84942faf41dSJed Brown PetscReal a4,a32,a42,a43,b1,b2,b4,beta2p,beta3p,beta4p,beta32,beta42,beta43,beta32beta2p,beta4jbetajp; 85042faf41dSJed Brown PetscReal A[4][4],Gamma[4][4],b[4],bm[4]; 85142faf41dSJed Brown PetscScalar M[3][3],rhs[3]; 85242faf41dSJed Brown 85342faf41dSJed Brown PetscFunctionBegin; 85442faf41dSJed Brown /* Step 1: choose Gamma (input) */ 85542faf41dSJed Brown /* Step 2: choose a2,a3,a4; b1,b2,b3,b4 to satisfy order conditions */ 85642faf41dSJed Brown if (a3 == PETSC_DEFAULT) a3 = (one/five - a2/four)/(one/four - a2/three); /* Eq 7.22 */ 85742faf41dSJed Brown a4 = a3; /* consequence of 7.20 */ 85842faf41dSJed Brown 85942faf41dSJed Brown /* Solve order conditions 7.15a, 7.15c, 7.15e */ 86042faf41dSJed Brown M[0][0] = one; M[0][1] = one; M[0][2] = one; /* 7.15a */ 86142faf41dSJed Brown M[1][0] = 0.0; M[1][1] = a2*a2; M[1][2] = a4*a4; /* 7.15c */ 86242faf41dSJed Brown M[2][0] = 0.0; M[2][1] = a2*a2*a2; M[2][2] = a4*a4*a4; /* 7.15e */ 86342faf41dSJed Brown rhs[0] = one - b3; 86442faf41dSJed Brown rhs[1] = one/three - a3*a3*b3; 86542faf41dSJed Brown rhs[2] = one/four - a3*a3*a3*b3; 86642faf41dSJed Brown ierr = PetscKernel_A_gets_inverse_A_3(&M[0][0],0);CHKERRQ(ierr); 86742faf41dSJed Brown b1 = PetscRealPart(M[0][0]*rhs[0] + M[0][1]*rhs[1] + M[0][2]*rhs[2]); 86842faf41dSJed Brown b2 = PetscRealPart(M[1][0]*rhs[0] + M[1][1]*rhs[1] + M[1][2]*rhs[2]); 86942faf41dSJed Brown b4 = PetscRealPart(M[2][0]*rhs[0] + M[2][1]*rhs[1] + M[2][2]*rhs[2]); 87042faf41dSJed Brown 87142faf41dSJed Brown /* Step 3 */ 87242faf41dSJed Brown beta43 = (p56 - a2*p43) / (b4*a3*a3*(a3 - a2)); /* 7.21 */ 87342faf41dSJed Brown beta32beta2p = p44 / (b4*beta43); /* 7.15h */ 87442faf41dSJed Brown beta4jbetajp = (p32 - b3*beta32beta2p) / b4; 87542faf41dSJed Brown M[0][0] = b2; M[0][1] = b3; M[0][2] = b4; 87642faf41dSJed Brown M[1][0] = a4*a4*beta32beta2p-a3*a3*beta4jbetajp; M[1][1] = a2*a2*beta4jbetajp; M[1][2] = -a2*a2*beta32beta2p; 87742faf41dSJed Brown M[2][0] = b4*beta43*a3*a3-p43; M[2][1] = -b4*beta43*a2*a2; M[2][2] = 0; 87842faf41dSJed Brown rhs[0] = one/two - gamma; rhs[1] = 0; rhs[2] = -a2*a2*p32; 87942faf41dSJed Brown ierr = PetscKernel_A_gets_inverse_A_3(&M[0][0],0);CHKERRQ(ierr); 88042faf41dSJed Brown beta2p = PetscRealPart(M[0][0]*rhs[0] + M[0][1]*rhs[1] + M[0][2]*rhs[2]); 88142faf41dSJed Brown beta3p = PetscRealPart(M[1][0]*rhs[0] + M[1][1]*rhs[1] + M[1][2]*rhs[2]); 88242faf41dSJed Brown beta4p = PetscRealPart(M[2][0]*rhs[0] + M[2][1]*rhs[1] + M[2][2]*rhs[2]); 88342faf41dSJed Brown 88442faf41dSJed Brown /* Step 4: back-substitute */ 88542faf41dSJed Brown beta32 = beta32beta2p / beta2p; 88642faf41dSJed Brown beta42 = (beta4jbetajp - beta43*beta3p) / beta2p; 88742faf41dSJed Brown 88842faf41dSJed Brown /* Step 5: 7.15f and 7.20, then 7.16 */ 88942faf41dSJed Brown a43 = 0; 89042faf41dSJed Brown a32 = p42 / (b3*a3*beta2p + b4*a4*beta2p); 89142faf41dSJed Brown a42 = a32; 89242faf41dSJed Brown 89342faf41dSJed Brown A[0][0] = 0; A[0][1] = 0; A[0][2] = 0; A[0][3] = 0; 89442faf41dSJed Brown A[1][0] = a2; A[1][1] = 0; A[1][2] = 0; A[1][3] = 0; 89542faf41dSJed Brown A[2][0] = a3-a32; A[2][1] = a32; A[2][2] = 0; A[2][3] = 0; 89642faf41dSJed Brown A[3][0] = a4-a43-a42; A[3][1] = a42; A[3][2] = a43; A[3][3] = 0; 89742faf41dSJed Brown Gamma[0][0] = gamma; Gamma[0][1] = 0; Gamma[0][2] = 0; Gamma[0][3] = 0; 89842faf41dSJed Brown Gamma[1][0] = beta2p-A[1][0]; Gamma[1][1] = gamma; Gamma[1][2] = 0; Gamma[1][3] = 0; 89942faf41dSJed Brown Gamma[2][0] = beta3p-beta32-A[2][0]; Gamma[2][1] = beta32-A[2][1]; Gamma[2][2] = gamma; Gamma[2][3] = 0; 90042faf41dSJed Brown Gamma[3][0] = beta4p-beta42-beta43-A[3][0]; Gamma[3][1] = beta42-A[3][1]; Gamma[3][2] = beta43-A[3][2]; Gamma[3][3] = gamma; 90142faf41dSJed Brown b[0] = b1; b[1] = b2; b[2] = b3; b[3] = b4; 90242faf41dSJed Brown 90342faf41dSJed Brown /* Construct embedded formula using given e4. We are solving Equation 7.18. */ 90442faf41dSJed Brown bm[3] = b[3] - e4*gamma; /* using definition of E4 */ 90542faf41dSJed Brown bm[2] = (p32 - beta4jbetajp*bm[3]) / (beta32*beta2p); /* fourth row of 7.18 */ 90642faf41dSJed Brown bm[1] = (one/two - gamma - beta3p*bm[2] - beta4p*bm[3]) / beta2p; /* second row */ 90742faf41dSJed Brown bm[0] = one - bm[1] - bm[2] - bm[3]; /* first row */ 90842faf41dSJed Brown 90942faf41dSJed Brown { 91042faf41dSJed Brown const PetscReal misfit = a2*a2*bm[1] + a3*a3*bm[2] + a4*a4*bm[3] - one/three; 91142faf41dSJed Brown if (PetscAbs(misfit) > PETSC_SMALL) SETERRQ(PETSC_COMM_SELF,PETSC_ERR_SUP,"Assumptions violated, could not construct a third order embedded method"); 91242faf41dSJed Brown } 9130298fd71SBarry Smith ierr = TSRosWRegister(name,4,4,&A[0][0],&Gamma[0][0],b,bm,0,NULL);CHKERRQ(ierr); 91442faf41dSJed Brown PetscFunctionReturn(0); 91542faf41dSJed Brown } 91642faf41dSJed Brown 91742faf41dSJed Brown #undef __FUNCT__ 9181c3436cfSJed Brown #define __FUNCT__ "TSEvaluateStep_RosW" 9191c3436cfSJed Brown /* 9201c3436cfSJed Brown The step completion formula is 9211c3436cfSJed Brown 9221c3436cfSJed Brown x1 = x0 + b^T Y 9231c3436cfSJed Brown 9241c3436cfSJed Brown where Y is the multi-vector of stages corrections. This function can be called before or after ts->vec_sol has been 9251c3436cfSJed Brown updated. Suppose we have a completion formula b and an embedded formula be of different order. We can write 9261c3436cfSJed Brown 9271c3436cfSJed Brown x1e = x0 + be^T Y 9281c3436cfSJed Brown = x1 - b^T Y + be^T Y 9291c3436cfSJed Brown = x1 + (be - b)^T Y 9301c3436cfSJed Brown 9311c3436cfSJed Brown so we can evaluate the method of different order even after the step has been optimistically completed. 9321c3436cfSJed Brown */ 933f9c1d6abSBarry Smith static PetscErrorCode TSEvaluateStep_RosW(TS ts,PetscInt order,Vec U,PetscBool *done) 9341c3436cfSJed Brown { 9351c3436cfSJed Brown TS_RosW *ros = (TS_RosW*)ts->data; 9361c3436cfSJed Brown RosWTableau tab = ros->tableau; 9371c3436cfSJed Brown PetscScalar *w = ros->work; 9381c3436cfSJed Brown PetscInt i; 9391c3436cfSJed Brown PetscErrorCode ierr; 9401c3436cfSJed Brown 9411c3436cfSJed Brown PetscFunctionBegin; 9421c3436cfSJed Brown if (order == tab->order) { 943108c343cSJed Brown if (ros->status == TS_STEP_INCOMPLETE) { /* Use standard completion formula */ 944f9c1d6abSBarry Smith ierr = VecCopy(ts->vec_sol,U);CHKERRQ(ierr); 945de19f811SJed Brown for (i=0; i<tab->s; i++) w[i] = tab->bt[i]; 946f9c1d6abSBarry Smith ierr = VecMAXPY(U,tab->s,w,ros->Y);CHKERRQ(ierr); 947f9c1d6abSBarry Smith } else {ierr = VecCopy(ts->vec_sol,U);CHKERRQ(ierr);} 9481c3436cfSJed Brown if (done) *done = PETSC_TRUE; 9491c3436cfSJed Brown PetscFunctionReturn(0); 9501c3436cfSJed Brown } else if (order == tab->order-1) { 9511c3436cfSJed Brown if (!tab->bembedt) goto unavailable; 952108c343cSJed Brown if (ros->status == TS_STEP_INCOMPLETE) { /* Use embedded completion formula */ 953f9c1d6abSBarry Smith ierr = VecCopy(ts->vec_sol,U);CHKERRQ(ierr); 954de19f811SJed Brown for (i=0; i<tab->s; i++) w[i] = tab->bembedt[i]; 955f9c1d6abSBarry Smith ierr = VecMAXPY(U,tab->s,w,ros->Y);CHKERRQ(ierr); 956108c343cSJed Brown } else { /* Use rollback-and-recomplete formula (bembedt - bt) */ 957108c343cSJed Brown for (i=0; i<tab->s; i++) w[i] = tab->bembedt[i] - tab->bt[i]; 958f9c1d6abSBarry Smith ierr = VecCopy(ts->vec_sol,U);CHKERRQ(ierr); 959f9c1d6abSBarry Smith ierr = VecMAXPY(U,tab->s,w,ros->Y);CHKERRQ(ierr); 9601c3436cfSJed Brown } 9611c3436cfSJed Brown if (done) *done = PETSC_TRUE; 9621c3436cfSJed Brown PetscFunctionReturn(0); 9631c3436cfSJed Brown } 9641c3436cfSJed Brown unavailable: 9651c3436cfSJed Brown if (done) *done = PETSC_FALSE; 966*a7fac7c2SEmil Constantinescu else SETERRQ3(PetscObjectComm((PetscObject)ts),PETSC_ERR_SUP,"Rosenbrock-W '%s' of order %D cannot evaluate step at order %D. Consider using -ts_adapt_type none or a different method that has an embedded estimate.",tab->name,tab->order,order); 9671c3436cfSJed Brown PetscFunctionReturn(0); 9681c3436cfSJed Brown } 9691c3436cfSJed Brown 9701c3436cfSJed Brown #undef __FUNCT__ 97124655328SShri #define __FUNCT__ "TSRollBack_RosW" 97224655328SShri PetscErrorCode TSRollBack_RosW(TS ts) 97324655328SShri { 97424655328SShri TS_RosW *ros = (TS_RosW*)ts->data; 97524655328SShri RosWTableau tab = ros->tableau; 97624655328SShri const PetscInt s = tab->s; 97724655328SShri PetscScalar *w = ros->work; 97824655328SShri PetscInt i; 97924655328SShri Vec *Y = ros->Y; 98024655328SShri PetscErrorCode ierr; 98124655328SShri 98224655328SShri PetscFunctionBegin; 98324655328SShri for (i=0; i<s; i++) w[i] = -tab->bt[i]; 98424655328SShri ierr = VecMAXPY(ts->vec_sol,s,w,Y);CHKERRQ(ierr); 98524655328SShri ros->status = TS_STEP_INCOMPLETE; 98624655328SShri PetscFunctionReturn(0); 98724655328SShri } 98824655328SShri 98924655328SShri #undef __FUNCT__ 990e27a552bSJed Brown #define __FUNCT__ "TSStep_RosW" 991e27a552bSJed Brown static PetscErrorCode TSStep_RosW(TS ts) 992e27a552bSJed Brown { 99361692a83SJed Brown TS_RosW *ros = (TS_RosW*)ts->data; 99461692a83SJed Brown RosWTableau tab = ros->tableau; 995e27a552bSJed Brown const PetscInt s = tab->s; 9961c3436cfSJed Brown const PetscReal *At = tab->At,*Gamma = tab->Gamma,*ASum = tab->ASum,*GammaInv = tab->GammaInv; 9970feba352SEmil Constantinescu const PetscReal *GammaExplicitCorr = tab->GammaExplicitCorr; 998c17803e7SJed Brown const PetscBool *GammaZeroDiag = tab->GammaZeroDiag; 99961692a83SJed Brown PetscScalar *w = ros->work; 10007d4bf2deSEmil Constantinescu Vec *Y = ros->Y,Ydot = ros->Ydot,Zdot = ros->Zdot,Zstage = ros->Zstage; 1001e27a552bSJed Brown SNES snes; 10021c3436cfSJed Brown TSAdapt adapt; 10031c3436cfSJed Brown PetscInt i,j,its,lits,reject,next_scheme; 10041c3436cfSJed Brown PetscBool accept; 100524655328SShri PetscReal next_time_step; 1006e27a552bSJed Brown PetscErrorCode ierr; 1007e27a552bSJed Brown 1008e27a552bSJed Brown PetscFunctionBegin; 1009e27a552bSJed Brown ierr = TSGetSNES(ts,&snes);CHKERRQ(ierr); 10101c3436cfSJed Brown accept = PETSC_TRUE; 101124655328SShri next_time_step = ts->time_step; 1012108c343cSJed Brown ros->status = TS_STEP_INCOMPLETE; 1013e27a552bSJed Brown 101497335746SJed Brown for (reject=0; reject<ts->max_reject && !ts->reason; reject++,ts->reject++) { 10151c3436cfSJed Brown const PetscReal h = ts->time_step; 1016b8123daeSJed Brown ierr = TSPreStep(ts);CHKERRQ(ierr); 10173ca35412SEmil Constantinescu ierr = VecCopy(ts->vec_sol,ros->VecSolPrev);CHKERRQ(ierr); /*move this at the end*/ 1018e27a552bSJed Brown for (i=0; i<s; i++) { 10191c3436cfSJed Brown ros->stage_time = ts->ptime + h*ASum[i]; 1020b8123daeSJed Brown ierr = TSPreStage(ts,ros->stage_time);CHKERRQ(ierr); 1021c17803e7SJed Brown if (GammaZeroDiag[i]) { 1022c17803e7SJed Brown ros->stage_explicit = PETSC_TRUE; 1023b296d7d5SJed Brown ros->scoeff = 1.; 1024c17803e7SJed Brown } else { 1025c17803e7SJed Brown ros->stage_explicit = PETSC_FALSE; 1026b296d7d5SJed Brown ros->scoeff = 1./Gamma[i*s+i]; 1027fd96d5b0SEmil Constantinescu } 102861692a83SJed Brown 102961692a83SJed Brown ierr = VecCopy(ts->vec_sol,Zstage);CHKERRQ(ierr); 1030de19f811SJed Brown for (j=0; j<i; j++) w[j] = At[i*s+j]; 1031de19f811SJed Brown ierr = VecMAXPY(Zstage,i,w,Y);CHKERRQ(ierr); 103261692a83SJed Brown 103361692a83SJed Brown for (j=0; j<i; j++) w[j] = 1./h * GammaInv[i*s+j]; 103461692a83SJed Brown ierr = VecZeroEntries(Zdot);CHKERRQ(ierr); 103561692a83SJed Brown ierr = VecMAXPY(Zdot,i,w,Y);CHKERRQ(ierr); 103661692a83SJed Brown 1037e27a552bSJed Brown /* Initial guess taken from last stage */ 103861692a83SJed Brown ierr = VecZeroEntries(Y[i]);CHKERRQ(ierr); 103961692a83SJed Brown 10407d4bf2deSEmil Constantinescu if (!ros->stage_explicit) { 104161692a83SJed Brown if (!ros->recompute_jacobian && !i) { 104261692a83SJed Brown ierr = SNESSetLagJacobian(snes,-2);CHKERRQ(ierr); /* Recompute the Jacobian on this solve, but not again */ 104361692a83SJed Brown } 10440298fd71SBarry Smith ierr = SNESSolve(snes,NULL,Y[i]);CHKERRQ(ierr); 1045e27a552bSJed Brown ierr = SNESGetIterationNumber(snes,&its);CHKERRQ(ierr); 1046e27a552bSJed Brown ierr = SNESGetLinearSolveIterations(snes,&lits);CHKERRQ(ierr); 10475ef26d82SJed Brown ts->snes_its += its; ts->ksp_its += lits; 1048552698daSJed Brown ierr = TSGetAdapt(ts,&adapt);CHKERRQ(ierr); 104997335746SJed Brown ierr = TSAdaptCheckStage(adapt,ts,&accept);CHKERRQ(ierr); 105097335746SJed Brown if (!accept) goto reject_step; 10517d4bf2deSEmil Constantinescu } else { 10521ce71dffSSatish Balay Mat J,Jp; 10530feba352SEmil Constantinescu ierr = VecZeroEntries(Ydot);CHKERRQ(ierr); /* Evaluate Y[i]=G(t,Ydot=0,Zstage) */ 10540feba352SEmil Constantinescu ierr = TSComputeIFunction(ts,ros->stage_time,Zstage,Ydot,Y[i],PETSC_FALSE);CHKERRQ(ierr); 105522d28d08SBarry Smith ierr = VecScale(Y[i],-1.0);CHKERRQ(ierr); 10560feba352SEmil Constantinescu ierr = VecAXPY(Y[i],-1.0,Zdot);CHKERRQ(ierr); /*Y[i]=F(Zstage)-Zdot[=GammaInv*Y]*/ 10570feba352SEmil Constantinescu 10580feba352SEmil Constantinescu ierr = VecZeroEntries(Zstage);CHKERRQ(ierr); /* Zstage = GammaExplicitCorr[i,j] * Y[j] */ 10590feba352SEmil Constantinescu for (j=0; j<i; j++) w[j] = GammaExplicitCorr[i*s+j]; 10600feba352SEmil Constantinescu ierr = VecMAXPY(Zstage,i,w,Y);CHKERRQ(ierr); 10610feba352SEmil Constantinescu /*Y[i] += Y[i] + Jac*Zstage[=Jac*GammaExplicitCorr[i,j] * Y[j]] */ 10620298fd71SBarry Smith ierr = TSGetIJacobian(ts,&J,&Jp,NULL,NULL);CHKERRQ(ierr); 1063d1e9a80fSBarry Smith ierr = TSComputeIJacobian(ts,ros->stage_time,ts->vec_sol,Ydot,0,J,Jp,PETSC_FALSE);CHKERRQ(ierr); 106422d28d08SBarry Smith ierr = MatMult(J,Zstage,Zdot);CHKERRQ(ierr); 10650feba352SEmil Constantinescu 10660feba352SEmil Constantinescu ierr = VecAXPY(Y[i],-1.0,Zdot);CHKERRQ(ierr); 1067302440fdSBarry Smith ierr = VecScale(Y[i],h);CHKERRQ(ierr); 10685ef26d82SJed Brown ts->ksp_its += 1; 10697d4bf2deSEmil Constantinescu } 10709be3e283SDebojyoti Ghosh ierr = TSPostStage(ts,ros->stage_time,i,Y);CHKERRQ(ierr); 1071e27a552bSJed Brown } 10720298fd71SBarry Smith ierr = TSEvaluateStep(ts,tab->order,ts->vec_sol,NULL);CHKERRQ(ierr); 1073108c343cSJed Brown ros->status = TS_STEP_PENDING; 1074e27a552bSJed Brown 10751c3436cfSJed Brown /* Register only the current method as a candidate because we're not supporting multiple candidates yet. */ 1076552698daSJed Brown ierr = TSGetAdapt(ts,&adapt);CHKERRQ(ierr); 10771c3436cfSJed Brown ierr = TSAdaptCandidatesClear(adapt);CHKERRQ(ierr); 10788d59e960SJed Brown ierr = TSAdaptCandidateAdd(adapt,tab->name,tab->order,1,tab->ccfl,1.*tab->s,PETSC_TRUE);CHKERRQ(ierr); 10791c3436cfSJed Brown ierr = TSAdaptChoose(adapt,ts,ts->time_step,&next_scheme,&next_time_step,&accept);CHKERRQ(ierr); 10801c3436cfSJed Brown if (accept) { 10811c3436cfSJed Brown /* ignore next_scheme for now */ 1082e27a552bSJed Brown ts->ptime += ts->time_step; 1083cdbf8f93SLisandro Dalcin ts->time_step = next_time_step; 1084e27a552bSJed Brown ts->steps++; 1085108c343cSJed Brown ros->status = TS_STEP_COMPLETE; 10861c3436cfSJed Brown break; 10871c3436cfSJed Brown } else { /* Roll back the current step */ 108824655328SShri ts->ptime += next_time_step; /* This will be undone in rollback */ 1089ec5563edSShri ros->status = TS_STEP_INCOMPLETE; 109024655328SShri ierr = TSRollBack(ts);CHKERRQ(ierr); 10911c3436cfSJed Brown } 1092476b6736SJed Brown reject_step: continue; 10931c3436cfSJed Brown } 1094b2ce242eSJed Brown if (ros->status != TS_STEP_COMPLETE && !ts->reason) ts->reason = TS_DIVERGED_STEP_REJECTED; 1095e27a552bSJed Brown PetscFunctionReturn(0); 1096e27a552bSJed Brown } 1097e27a552bSJed Brown 1098e27a552bSJed Brown #undef __FUNCT__ 1099e27a552bSJed Brown #define __FUNCT__ "TSInterpolate_RosW" 1100f9c1d6abSBarry Smith static PetscErrorCode TSInterpolate_RosW(TS ts,PetscReal itime,Vec U) 1101e27a552bSJed Brown { 110261692a83SJed Brown TS_RosW *ros = (TS_RosW*)ts->data; 1103f4aed992SEmil Constantinescu PetscInt s = ros->tableau->s,pinterp = ros->tableau->pinterp,i,j; 1104f4aed992SEmil Constantinescu PetscReal h; 1105f4aed992SEmil Constantinescu PetscReal tt,t; 1106f4aed992SEmil Constantinescu PetscScalar *bt; 1107f4aed992SEmil Constantinescu const PetscReal *Bt = ros->tableau->binterpt; 1108f4aed992SEmil Constantinescu PetscErrorCode ierr; 1109f4aed992SEmil Constantinescu const PetscReal *GammaInv = ros->tableau->GammaInv; 1110f4aed992SEmil Constantinescu PetscScalar *w = ros->work; 1111f4aed992SEmil Constantinescu Vec *Y = ros->Y; 1112e27a552bSJed Brown 1113e27a552bSJed Brown PetscFunctionBegin; 1114ce94432eSBarry Smith if (!Bt) SETERRQ1(PetscObjectComm((PetscObject)ts),PETSC_ERR_SUP,"TSRosW %s does not have an interpolation formula",ros->tableau->name); 1115f4aed992SEmil Constantinescu 1116f4aed992SEmil Constantinescu switch (ros->status) { 1117f4aed992SEmil Constantinescu case TS_STEP_INCOMPLETE: 1118f4aed992SEmil Constantinescu case TS_STEP_PENDING: 1119f4aed992SEmil Constantinescu h = ts->time_step; 1120f4aed992SEmil Constantinescu t = (itime - ts->ptime)/h; 1121f4aed992SEmil Constantinescu break; 1122f4aed992SEmil Constantinescu case TS_STEP_COMPLETE: 1123f4aed992SEmil Constantinescu h = ts->time_step_prev; 1124f4aed992SEmil Constantinescu t = (itime - ts->ptime)/h + 1; /* In the interval [0,1] */ 1125f4aed992SEmil Constantinescu break; 1126ce94432eSBarry Smith default: SETERRQ(PetscObjectComm((PetscObject)ts),PETSC_ERR_PLIB,"Invalid TSStepStatus"); 1127f4aed992SEmil Constantinescu } 1128785e854fSJed Brown ierr = PetscMalloc1(s,&bt);CHKERRQ(ierr); 1129f4aed992SEmil Constantinescu for (i=0; i<s; i++) bt[i] = 0; 1130f4aed992SEmil Constantinescu for (j=0,tt=t; j<pinterp; j++,tt*=t) { 1131f4aed992SEmil Constantinescu for (i=0; i<s; i++) { 11323ca35412SEmil Constantinescu bt[i] += Bt[i*pinterp+j] * tt; 1133f4aed992SEmil Constantinescu } 1134f4aed992SEmil Constantinescu } 1135f4aed992SEmil Constantinescu 1136f4aed992SEmil Constantinescu /* y(t+tt*h) = y(t) + Sum bt(tt) * GammaInv * Ydot */ 1137f9c1d6abSBarry Smith /*U<-0*/ 1138f9c1d6abSBarry Smith ierr = VecZeroEntries(U);CHKERRQ(ierr); 1139f4aed992SEmil Constantinescu 1140f9c1d6abSBarry Smith /*U<- Sum bt_i * GammaInv(i,1:i) * Y(1:i) */ 11413ca35412SEmil Constantinescu for (j=0; j<s; j++) w[j]=0; 11423ca35412SEmil Constantinescu for (j=0; j<s; j++) { 11433ca35412SEmil Constantinescu for (i=j; i<s; i++) { 11443ca35412SEmil Constantinescu w[j] += bt[i]*GammaInv[i*s+j]; 1145f4aed992SEmil Constantinescu } 11463ca35412SEmil Constantinescu } 1147f9c1d6abSBarry Smith ierr = VecMAXPY(U,i,w,Y);CHKERRQ(ierr); 1148f4aed992SEmil Constantinescu 1149f4aed992SEmil Constantinescu /*X<-y(t) + X*/ 1150f9c1d6abSBarry Smith ierr = VecAXPY(U,1.0,ros->VecSolPrev);CHKERRQ(ierr); 1151f4aed992SEmil Constantinescu 1152f4aed992SEmil Constantinescu ierr = PetscFree(bt);CHKERRQ(ierr); 1153e27a552bSJed Brown PetscFunctionReturn(0); 1154e27a552bSJed Brown } 1155e27a552bSJed Brown 1156e27a552bSJed Brown /*------------------------------------------------------------*/ 1157e27a552bSJed Brown #undef __FUNCT__ 1158e27a552bSJed Brown #define __FUNCT__ "TSReset_RosW" 1159e27a552bSJed Brown static PetscErrorCode TSReset_RosW(TS ts) 1160e27a552bSJed Brown { 116161692a83SJed Brown TS_RosW *ros = (TS_RosW*)ts->data; 1162e27a552bSJed Brown PetscInt s; 1163e27a552bSJed Brown PetscErrorCode ierr; 1164e27a552bSJed Brown 1165e27a552bSJed Brown PetscFunctionBegin; 116661692a83SJed Brown if (!ros->tableau) PetscFunctionReturn(0); 116761692a83SJed Brown s = ros->tableau->s; 116861692a83SJed Brown ierr = VecDestroyVecs(s,&ros->Y);CHKERRQ(ierr); 116961692a83SJed Brown ierr = VecDestroy(&ros->Ydot);CHKERRQ(ierr); 117061692a83SJed Brown ierr = VecDestroy(&ros->Ystage);CHKERRQ(ierr); 117161692a83SJed Brown ierr = VecDestroy(&ros->Zdot);CHKERRQ(ierr); 117261692a83SJed Brown ierr = VecDestroy(&ros->Zstage);CHKERRQ(ierr); 11733ca35412SEmil Constantinescu ierr = VecDestroy(&ros->VecSolPrev);CHKERRQ(ierr); 117461692a83SJed Brown ierr = PetscFree(ros->work);CHKERRQ(ierr); 1175e27a552bSJed Brown PetscFunctionReturn(0); 1176e27a552bSJed Brown } 1177e27a552bSJed Brown 1178e27a552bSJed Brown #undef __FUNCT__ 1179e27a552bSJed Brown #define __FUNCT__ "TSDestroy_RosW" 1180e27a552bSJed Brown static PetscErrorCode TSDestroy_RosW(TS ts) 1181e27a552bSJed Brown { 1182e27a552bSJed Brown PetscErrorCode ierr; 1183e27a552bSJed Brown 1184e27a552bSJed Brown PetscFunctionBegin; 1185e27a552bSJed Brown ierr = TSReset_RosW(ts);CHKERRQ(ierr); 1186e27a552bSJed Brown ierr = PetscFree(ts->data);CHKERRQ(ierr); 1187bdf89e91SBarry Smith ierr = PetscObjectComposeFunction((PetscObject)ts,"TSRosWGetType_C",NULL);CHKERRQ(ierr); 1188bdf89e91SBarry Smith ierr = PetscObjectComposeFunction((PetscObject)ts,"TSRosWSetType_C",NULL);CHKERRQ(ierr); 1189bdf89e91SBarry Smith ierr = PetscObjectComposeFunction((PetscObject)ts,"TSRosWSetRecomputeJacobian_C",NULL);CHKERRQ(ierr); 1190e27a552bSJed Brown PetscFunctionReturn(0); 1191e27a552bSJed Brown } 1192e27a552bSJed Brown 1193d5e6173cSPeter Brune 1194d5e6173cSPeter Brune #undef __FUNCT__ 1195d5e6173cSPeter Brune #define __FUNCT__ "TSRosWGetVecs" 1196d5e6173cSPeter Brune static PetscErrorCode TSRosWGetVecs(TS ts,DM dm,Vec *Ydot,Vec *Zdot,Vec *Ystage,Vec *Zstage) 1197d5e6173cSPeter Brune { 1198d5e6173cSPeter Brune TS_RosW *rw = (TS_RosW*)ts->data; 1199d5e6173cSPeter Brune PetscErrorCode ierr; 1200d5e6173cSPeter Brune 1201d5e6173cSPeter Brune PetscFunctionBegin; 1202d5e6173cSPeter Brune if (Ydot) { 1203d5e6173cSPeter Brune if (dm && dm != ts->dm) { 1204d5e6173cSPeter Brune ierr = DMGetNamedGlobalVector(dm,"TSRosW_Ydot",Ydot);CHKERRQ(ierr); 1205d5e6173cSPeter Brune } else *Ydot = rw->Ydot; 1206d5e6173cSPeter Brune } 1207d5e6173cSPeter Brune if (Zdot) { 1208d5e6173cSPeter Brune if (dm && dm != ts->dm) { 1209d5e6173cSPeter Brune ierr = DMGetNamedGlobalVector(dm,"TSRosW_Zdot",Zdot);CHKERRQ(ierr); 1210d5e6173cSPeter Brune } else *Zdot = rw->Zdot; 1211d5e6173cSPeter Brune } 1212d5e6173cSPeter Brune if (Ystage) { 1213d5e6173cSPeter Brune if (dm && dm != ts->dm) { 1214d5e6173cSPeter Brune ierr = DMGetNamedGlobalVector(dm,"TSRosW_Ystage",Ystage);CHKERRQ(ierr); 1215d5e6173cSPeter Brune } else *Ystage = rw->Ystage; 1216d5e6173cSPeter Brune } 1217d5e6173cSPeter Brune if (Zstage) { 1218d5e6173cSPeter Brune if (dm && dm != ts->dm) { 1219d5e6173cSPeter Brune ierr = DMGetNamedGlobalVector(dm,"TSRosW_Zstage",Zstage);CHKERRQ(ierr); 1220d5e6173cSPeter Brune } else *Zstage = rw->Zstage; 1221d5e6173cSPeter Brune } 1222d5e6173cSPeter Brune PetscFunctionReturn(0); 1223d5e6173cSPeter Brune } 1224d5e6173cSPeter Brune 1225d5e6173cSPeter Brune 1226d5e6173cSPeter Brune #undef __FUNCT__ 1227d5e6173cSPeter Brune #define __FUNCT__ "TSRosWRestoreVecs" 1228d5e6173cSPeter Brune static PetscErrorCode TSRosWRestoreVecs(TS ts,DM dm,Vec *Ydot,Vec *Zdot, Vec *Ystage, Vec *Zstage) 1229d5e6173cSPeter Brune { 1230d5e6173cSPeter Brune PetscErrorCode ierr; 1231d5e6173cSPeter Brune 1232d5e6173cSPeter Brune PetscFunctionBegin; 1233d5e6173cSPeter Brune if (Ydot) { 1234d5e6173cSPeter Brune if (dm && dm != ts->dm) { 1235d5e6173cSPeter Brune ierr = DMRestoreNamedGlobalVector(dm,"TSRosW_Ydot",Ydot);CHKERRQ(ierr); 1236d5e6173cSPeter Brune } 1237d5e6173cSPeter Brune } 1238d5e6173cSPeter Brune if (Zdot) { 1239d5e6173cSPeter Brune if (dm && dm != ts->dm) { 1240d5e6173cSPeter Brune ierr = DMRestoreNamedGlobalVector(dm,"TSRosW_Zdot",Zdot);CHKERRQ(ierr); 1241d5e6173cSPeter Brune } 1242d5e6173cSPeter Brune } 1243d5e6173cSPeter Brune if (Ystage) { 1244d5e6173cSPeter Brune if (dm && dm != ts->dm) { 1245d5e6173cSPeter Brune ierr = DMRestoreNamedGlobalVector(dm,"TSRosW_Ystage",Ystage);CHKERRQ(ierr); 1246d5e6173cSPeter Brune } 1247d5e6173cSPeter Brune } 1248d5e6173cSPeter Brune if (Zstage) { 1249d5e6173cSPeter Brune if (dm && dm != ts->dm) { 1250d5e6173cSPeter Brune ierr = DMRestoreNamedGlobalVector(dm,"TSRosW_Zstage",Zstage);CHKERRQ(ierr); 1251d5e6173cSPeter Brune } 1252d5e6173cSPeter Brune } 1253d5e6173cSPeter Brune PetscFunctionReturn(0); 1254d5e6173cSPeter Brune } 1255d5e6173cSPeter Brune 1256d5e6173cSPeter Brune #undef __FUNCT__ 1257d5e6173cSPeter Brune #define __FUNCT__ "DMCoarsenHook_TSRosW" 1258d5e6173cSPeter Brune static PetscErrorCode DMCoarsenHook_TSRosW(DM fine,DM coarse,void *ctx) 1259d5e6173cSPeter Brune { 1260d5e6173cSPeter Brune PetscFunctionBegin; 1261d5e6173cSPeter Brune PetscFunctionReturn(0); 1262d5e6173cSPeter Brune } 1263d5e6173cSPeter Brune 1264d5e6173cSPeter Brune #undef __FUNCT__ 1265d5e6173cSPeter Brune #define __FUNCT__ "DMRestrictHook_TSRosW" 1266d5e6173cSPeter Brune static PetscErrorCode DMRestrictHook_TSRosW(DM fine,Mat restrct,Vec rscale,Mat inject,DM coarse,void *ctx) 1267d5e6173cSPeter Brune { 1268d5e6173cSPeter Brune TS ts = (TS)ctx; 1269d5e6173cSPeter Brune PetscErrorCode ierr; 1270d5e6173cSPeter Brune Vec Ydot,Zdot,Ystage,Zstage; 1271d5e6173cSPeter Brune Vec Ydotc,Zdotc,Ystagec,Zstagec; 1272d5e6173cSPeter Brune 1273d5e6173cSPeter Brune PetscFunctionBegin; 1274d5e6173cSPeter Brune ierr = TSRosWGetVecs(ts,fine,&Ydot,&Ystage,&Zdot,&Zstage);CHKERRQ(ierr); 1275d5e6173cSPeter Brune ierr = TSRosWGetVecs(ts,coarse,&Ydotc,&Ystagec,&Zdotc,&Zstagec);CHKERRQ(ierr); 1276d5e6173cSPeter Brune ierr = MatRestrict(restrct,Ydot,Ydotc);CHKERRQ(ierr); 1277d5e6173cSPeter Brune ierr = VecPointwiseMult(Ydotc,rscale,Ydotc);CHKERRQ(ierr); 1278d5e6173cSPeter Brune ierr = MatRestrict(restrct,Ystage,Ystagec);CHKERRQ(ierr); 1279d5e6173cSPeter Brune ierr = VecPointwiseMult(Ystagec,rscale,Ystagec);CHKERRQ(ierr); 1280d5e6173cSPeter Brune ierr = MatRestrict(restrct,Zdot,Zdotc);CHKERRQ(ierr); 1281d5e6173cSPeter Brune ierr = VecPointwiseMult(Zdotc,rscale,Zdotc);CHKERRQ(ierr); 1282d5e6173cSPeter Brune ierr = MatRestrict(restrct,Zstage,Zstagec);CHKERRQ(ierr); 1283d5e6173cSPeter Brune ierr = VecPointwiseMult(Zstagec,rscale,Zstagec);CHKERRQ(ierr); 1284d5e6173cSPeter Brune ierr = TSRosWRestoreVecs(ts,fine,&Ydot,&Ystage,&Zdot,&Zstage);CHKERRQ(ierr); 1285d5e6173cSPeter Brune ierr = TSRosWRestoreVecs(ts,coarse,&Ydotc,&Ystagec,&Zdotc,&Zstagec);CHKERRQ(ierr); 1286d5e6173cSPeter Brune PetscFunctionReturn(0); 1287d5e6173cSPeter Brune } 1288d5e6173cSPeter Brune 1289258e1594SPeter Brune 1290258e1594SPeter Brune #undef __FUNCT__ 1291258e1594SPeter Brune #define __FUNCT__ "DMSubDomainHook_TSRosW" 1292258e1594SPeter Brune static PetscErrorCode DMSubDomainHook_TSRosW(DM fine,DM coarse,void *ctx) 1293258e1594SPeter Brune { 1294258e1594SPeter Brune PetscFunctionBegin; 1295258e1594SPeter Brune PetscFunctionReturn(0); 1296258e1594SPeter Brune } 1297258e1594SPeter Brune 1298258e1594SPeter Brune #undef __FUNCT__ 1299258e1594SPeter Brune #define __FUNCT__ "DMSubDomainRestrictHook_TSRosW" 1300258e1594SPeter Brune static PetscErrorCode DMSubDomainRestrictHook_TSRosW(DM dm,VecScatter gscat,VecScatter lscat,DM subdm,void *ctx) 1301258e1594SPeter Brune { 1302258e1594SPeter Brune TS ts = (TS)ctx; 1303258e1594SPeter Brune PetscErrorCode ierr; 1304258e1594SPeter Brune Vec Ydot,Zdot,Ystage,Zstage; 1305258e1594SPeter Brune Vec Ydots,Zdots,Ystages,Zstages; 1306258e1594SPeter Brune 1307258e1594SPeter Brune PetscFunctionBegin; 1308258e1594SPeter Brune ierr = TSRosWGetVecs(ts,dm,&Ydot,&Ystage,&Zdot,&Zstage);CHKERRQ(ierr); 1309258e1594SPeter Brune ierr = TSRosWGetVecs(ts,subdm,&Ydots,&Ystages,&Zdots,&Zstages);CHKERRQ(ierr); 1310258e1594SPeter Brune 1311258e1594SPeter Brune ierr = VecScatterBegin(gscat,Ydot,Ydots,INSERT_VALUES,SCATTER_FORWARD);CHKERRQ(ierr); 1312258e1594SPeter Brune ierr = VecScatterEnd(gscat,Ydot,Ydots,INSERT_VALUES,SCATTER_FORWARD);CHKERRQ(ierr); 1313258e1594SPeter Brune 1314258e1594SPeter Brune ierr = VecScatterBegin(gscat,Ystage,Ystages,INSERT_VALUES,SCATTER_FORWARD);CHKERRQ(ierr); 1315258e1594SPeter Brune ierr = VecScatterEnd(gscat,Ystage,Ystages,INSERT_VALUES,SCATTER_FORWARD);CHKERRQ(ierr); 1316258e1594SPeter Brune 1317258e1594SPeter Brune ierr = VecScatterBegin(gscat,Zdot,Zdots,INSERT_VALUES,SCATTER_FORWARD);CHKERRQ(ierr); 1318258e1594SPeter Brune ierr = VecScatterEnd(gscat,Zdot,Zdots,INSERT_VALUES,SCATTER_FORWARD);CHKERRQ(ierr); 1319258e1594SPeter Brune 1320258e1594SPeter Brune ierr = VecScatterBegin(gscat,Zstage,Zstages,INSERT_VALUES,SCATTER_FORWARD);CHKERRQ(ierr); 1321258e1594SPeter Brune ierr = VecScatterEnd(gscat,Zstage,Zstages,INSERT_VALUES,SCATTER_FORWARD);CHKERRQ(ierr); 1322258e1594SPeter Brune 1323258e1594SPeter Brune ierr = TSRosWRestoreVecs(ts,dm,&Ydot,&Ystage,&Zdot,&Zstage);CHKERRQ(ierr); 1324258e1594SPeter Brune ierr = TSRosWRestoreVecs(ts,subdm,&Ydots,&Ystages,&Zdots,&Zstages);CHKERRQ(ierr); 1325258e1594SPeter Brune PetscFunctionReturn(0); 1326258e1594SPeter Brune } 1327258e1594SPeter Brune 1328e27a552bSJed Brown /* 1329e27a552bSJed Brown This defines the nonlinear equation that is to be solved with SNES 1330e27a552bSJed Brown G(U) = F[t0+Theta*dt, U, (U-U0)*shift] = 0 1331e27a552bSJed Brown */ 1332e27a552bSJed Brown #undef __FUNCT__ 1333e27a552bSJed Brown #define __FUNCT__ "SNESTSFormFunction_RosW" 1334f9c1d6abSBarry Smith static PetscErrorCode SNESTSFormFunction_RosW(SNES snes,Vec U,Vec F,TS ts) 1335e27a552bSJed Brown { 133661692a83SJed Brown TS_RosW *ros = (TS_RosW*)ts->data; 1337e27a552bSJed Brown PetscErrorCode ierr; 1338d5e6173cSPeter Brune Vec Ydot,Zdot,Ystage,Zstage; 1339b296d7d5SJed Brown PetscReal shift = ros->scoeff / ts->time_step; 1340d5e6173cSPeter Brune DM dm,dmsave; 1341e27a552bSJed Brown 1342e27a552bSJed Brown PetscFunctionBegin; 1343d5e6173cSPeter Brune ierr = SNESGetDM(snes,&dm);CHKERRQ(ierr); 1344d5e6173cSPeter Brune ierr = TSRosWGetVecs(ts,dm,&Ydot,&Zdot,&Ystage,&Zstage);CHKERRQ(ierr); 1345b296d7d5SJed Brown ierr = VecWAXPY(Ydot,shift,U,Zdot);CHKERRQ(ierr); /* Ydot = shift*U + Zdot */ 1346f9c1d6abSBarry Smith ierr = VecWAXPY(Ystage,1.0,U,Zstage);CHKERRQ(ierr); /* Ystage = U + Zstage */ 1347d5e6173cSPeter Brune dmsave = ts->dm; 1348d5e6173cSPeter Brune ts->dm = dm; 1349d5e6173cSPeter Brune ierr = TSComputeIFunction(ts,ros->stage_time,Ystage,Ydot,F,PETSC_FALSE);CHKERRQ(ierr); 1350d5e6173cSPeter Brune ts->dm = dmsave; 1351d5e6173cSPeter Brune ierr = TSRosWRestoreVecs(ts,dm,&Ydot,&Zdot,&Ystage,&Zstage);CHKERRQ(ierr); 1352e27a552bSJed Brown PetscFunctionReturn(0); 1353e27a552bSJed Brown } 1354e27a552bSJed Brown 1355e27a552bSJed Brown #undef __FUNCT__ 1356e27a552bSJed Brown #define __FUNCT__ "SNESTSFormJacobian_RosW" 1357d1e9a80fSBarry Smith static PetscErrorCode SNESTSFormJacobian_RosW(SNES snes,Vec U,Mat A,Mat B,TS ts) 1358e27a552bSJed Brown { 135961692a83SJed Brown TS_RosW *ros = (TS_RosW*)ts->data; 1360d5e6173cSPeter Brune Vec Ydot,Zdot,Ystage,Zstage; 1361b296d7d5SJed Brown PetscReal shift = ros->scoeff / ts->time_step; 1362e27a552bSJed Brown PetscErrorCode ierr; 1363d5e6173cSPeter Brune DM dm,dmsave; 1364e27a552bSJed Brown 1365e27a552bSJed Brown PetscFunctionBegin; 136661692a83SJed Brown /* ros->Ydot and ros->Ystage have already been computed in SNESTSFormFunction_RosW (SNES guarantees this) */ 1367d5e6173cSPeter Brune ierr = SNESGetDM(snes,&dm);CHKERRQ(ierr); 1368d5e6173cSPeter Brune ierr = TSRosWGetVecs(ts,dm,&Ydot,&Zdot,&Ystage,&Zstage);CHKERRQ(ierr); 1369d5e6173cSPeter Brune dmsave = ts->dm; 1370d5e6173cSPeter Brune ts->dm = dm; 1371d1e9a80fSBarry Smith ierr = TSComputeIJacobian(ts,ros->stage_time,Ystage,Ydot,shift,A,B,PETSC_TRUE);CHKERRQ(ierr); 1372d5e6173cSPeter Brune ts->dm = dmsave; 1373d5e6173cSPeter Brune ierr = TSRosWRestoreVecs(ts,dm,&Ydot,&Zdot,&Ystage,&Zstage);CHKERRQ(ierr); 1374e27a552bSJed Brown PetscFunctionReturn(0); 1375e27a552bSJed Brown } 1376e27a552bSJed Brown 1377e27a552bSJed Brown #undef __FUNCT__ 1378e27a552bSJed Brown #define __FUNCT__ "TSSetUp_RosW" 1379e27a552bSJed Brown static PetscErrorCode TSSetUp_RosW(TS ts) 1380e27a552bSJed Brown { 138161692a83SJed Brown TS_RosW *ros = (TS_RosW*)ts->data; 138261692a83SJed Brown RosWTableau tab = ros->tableau; 1383e27a552bSJed Brown PetscInt s = tab->s; 1384e27a552bSJed Brown PetscErrorCode ierr; 1385d5e6173cSPeter Brune DM dm; 1386e27a552bSJed Brown 1387e27a552bSJed Brown PetscFunctionBegin; 138861692a83SJed Brown if (!ros->tableau) { 1389e27a552bSJed Brown ierr = TSRosWSetType(ts,TSRosWDefault);CHKERRQ(ierr); 1390e27a552bSJed Brown } 139161692a83SJed Brown ierr = VecDuplicateVecs(ts->vec_sol,s,&ros->Y);CHKERRQ(ierr); 139261692a83SJed Brown ierr = VecDuplicate(ts->vec_sol,&ros->Ydot);CHKERRQ(ierr); 139361692a83SJed Brown ierr = VecDuplicate(ts->vec_sol,&ros->Ystage);CHKERRQ(ierr); 139461692a83SJed Brown ierr = VecDuplicate(ts->vec_sol,&ros->Zdot);CHKERRQ(ierr); 139561692a83SJed Brown ierr = VecDuplicate(ts->vec_sol,&ros->Zstage);CHKERRQ(ierr); 13963ca35412SEmil Constantinescu ierr = VecDuplicate(ts->vec_sol,&ros->VecSolPrev);CHKERRQ(ierr); 1397785e854fSJed Brown ierr = PetscMalloc1(s,&ros->work);CHKERRQ(ierr); 139822d28d08SBarry Smith ierr = TSGetDM(ts,&dm);CHKERRQ(ierr); 1399d5e6173cSPeter Brune if (dm) { 1400d5e6173cSPeter Brune ierr = DMCoarsenHookAdd(dm,DMCoarsenHook_TSRosW,DMRestrictHook_TSRosW,ts);CHKERRQ(ierr); 1401258e1594SPeter Brune ierr = DMSubDomainHookAdd(dm,DMSubDomainHook_TSRosW,DMSubDomainRestrictHook_TSRosW,ts);CHKERRQ(ierr); 1402d5e6173cSPeter Brune } 1403e27a552bSJed Brown PetscFunctionReturn(0); 1404e27a552bSJed Brown } 1405e27a552bSJed Brown /*------------------------------------------------------------*/ 1406e27a552bSJed Brown 1407e27a552bSJed Brown #undef __FUNCT__ 1408e27a552bSJed Brown #define __FUNCT__ "TSSetFromOptions_RosW" 14098c34d3f5SBarry Smith static PetscErrorCode TSSetFromOptions_RosW(PetscOptions *PetscOptionsObject,TS ts) 1410e27a552bSJed Brown { 141161692a83SJed Brown TS_RosW *ros = (TS_RosW*)ts->data; 1412e27a552bSJed Brown PetscErrorCode ierr; 141361692a83SJed Brown char rostype[256]; 1414e27a552bSJed Brown 1415e27a552bSJed Brown PetscFunctionBegin; 1416e55864a3SBarry Smith ierr = PetscOptionsHead(PetscOptionsObject,"RosW ODE solver options");CHKERRQ(ierr); 1417e27a552bSJed Brown { 141861692a83SJed Brown RosWTableauLink link; 1419e27a552bSJed Brown PetscInt count,choice; 1420e27a552bSJed Brown PetscBool flg; 1421e27a552bSJed Brown const char **namelist; 142261692a83SJed Brown SNES snes; 142361692a83SJed Brown 14248caf3d72SBarry Smith ierr = PetscStrncpy(rostype,TSRosWDefault,sizeof(rostype));CHKERRQ(ierr); 142561692a83SJed Brown for (link=RosWTableauList,count=0; link; link=link->next,count++) ; 1426785e854fSJed Brown ierr = PetscMalloc1(count,&namelist);CHKERRQ(ierr); 142761692a83SJed Brown for (link=RosWTableauList,count=0; link; link=link->next,count++) namelist[count] = link->tab.name; 142861692a83SJed Brown ierr = PetscOptionsEList("-ts_rosw_type","Family of Rosenbrock-W method","TSRosWSetType",(const char*const*)namelist,count,rostype,&choice,&flg);CHKERRQ(ierr); 142961692a83SJed Brown ierr = TSRosWSetType(ts,flg ? namelist[choice] : rostype);CHKERRQ(ierr); 1430e27a552bSJed Brown ierr = PetscFree(namelist);CHKERRQ(ierr); 143161692a83SJed Brown 14320298fd71SBarry Smith ierr = PetscOptionsBool("-ts_rosw_recompute_jacobian","Recompute the Jacobian at each stage","TSRosWSetRecomputeJacobian",ros->recompute_jacobian,&ros->recompute_jacobian,NULL);CHKERRQ(ierr); 143361692a83SJed Brown 143461692a83SJed Brown /* Rosenbrock methods are linearly implicit, so set that unless the user has specifically asked for something else */ 143561692a83SJed Brown ierr = TSGetSNES(ts,&snes);CHKERRQ(ierr); 143661692a83SJed Brown if (!((PetscObject)snes)->type_name) { 143761692a83SJed Brown ierr = SNESSetType(snes,SNESKSPONLY);CHKERRQ(ierr); 143861692a83SJed Brown } 1439e27a552bSJed Brown } 1440e27a552bSJed Brown ierr = PetscOptionsTail();CHKERRQ(ierr); 1441e27a552bSJed Brown PetscFunctionReturn(0); 1442e27a552bSJed Brown } 1443e27a552bSJed Brown 1444e27a552bSJed Brown #undef __FUNCT__ 1445e27a552bSJed Brown #define __FUNCT__ "PetscFormatRealArray" 1446e27a552bSJed Brown static PetscErrorCode PetscFormatRealArray(char buf[],size_t len,const char *fmt,PetscInt n,const PetscReal x[]) 1447e27a552bSJed Brown { 1448e27a552bSJed Brown PetscErrorCode ierr; 1449e408995aSJed Brown PetscInt i; 1450e408995aSJed Brown size_t left,count; 1451e27a552bSJed Brown char *p; 1452e27a552bSJed Brown 1453e27a552bSJed Brown PetscFunctionBegin; 1454e408995aSJed Brown for (i=0,p=buf,left=len; i<n; i++) { 1455e408995aSJed Brown ierr = PetscSNPrintfCount(p,left,fmt,&count,x[i]);CHKERRQ(ierr); 1456e27a552bSJed Brown if (count >= left) SETERRQ(PETSC_COMM_SELF,PETSC_ERR_ARG_OUTOFRANGE,"Insufficient space in buffer"); 1457e27a552bSJed Brown left -= count; 1458e27a552bSJed Brown p += count; 1459e27a552bSJed Brown *p++ = ' '; 1460e27a552bSJed Brown } 1461e27a552bSJed Brown p[i ? 0 : -1] = 0; 1462e27a552bSJed Brown PetscFunctionReturn(0); 1463e27a552bSJed Brown } 1464e27a552bSJed Brown 1465e27a552bSJed Brown #undef __FUNCT__ 1466e27a552bSJed Brown #define __FUNCT__ "TSView_RosW" 1467e27a552bSJed Brown static PetscErrorCode TSView_RosW(TS ts,PetscViewer viewer) 1468e27a552bSJed Brown { 146961692a83SJed Brown TS_RosW *ros = (TS_RosW*)ts->data; 147061692a83SJed Brown RosWTableau tab = ros->tableau; 1471e27a552bSJed Brown PetscBool iascii; 1472e27a552bSJed Brown PetscErrorCode ierr; 1473ef20d060SBarry Smith TSAdapt adapt; 1474e27a552bSJed Brown 1475e27a552bSJed Brown PetscFunctionBegin; 1476251f4c67SDmitry Karpeev ierr = PetscObjectTypeCompare((PetscObject)viewer,PETSCVIEWERASCII,&iascii);CHKERRQ(ierr); 1477e27a552bSJed Brown if (iascii) { 147819fd82e9SBarry Smith TSRosWType rostype; 1479e408995aSJed Brown PetscInt i; 1480e408995aSJed Brown PetscReal abscissa[512]; 1481e27a552bSJed Brown char buf[512]; 148261692a83SJed Brown ierr = TSRosWGetType(ts,&rostype);CHKERRQ(ierr); 148361692a83SJed Brown ierr = PetscViewerASCIIPrintf(viewer," Rosenbrock-W %s\n",rostype);CHKERRQ(ierr); 14848caf3d72SBarry Smith ierr = PetscFormatRealArray(buf,sizeof(buf),"% 8.6f",tab->s,tab->ASum);CHKERRQ(ierr); 148561692a83SJed Brown ierr = PetscViewerASCIIPrintf(viewer," Abscissa of A = %s\n",buf);CHKERRQ(ierr); 1486e408995aSJed Brown for (i=0; i<tab->s; i++) abscissa[i] = tab->ASum[i] + tab->Gamma[i]; 14878caf3d72SBarry Smith ierr = PetscFormatRealArray(buf,sizeof(buf),"% 8.6f",tab->s,abscissa);CHKERRQ(ierr); 1488e408995aSJed Brown ierr = PetscViewerASCIIPrintf(viewer," Abscissa of A+Gamma = %s\n",buf);CHKERRQ(ierr); 1489e27a552bSJed Brown } 1490552698daSJed Brown ierr = TSGetAdapt(ts,&adapt);CHKERRQ(ierr); 1491ef20d060SBarry Smith ierr = TSAdaptView(adapt,viewer);CHKERRQ(ierr); 1492e27a552bSJed Brown ierr = SNESView(ts->snes,viewer);CHKERRQ(ierr); 1493e27a552bSJed Brown PetscFunctionReturn(0); 1494e27a552bSJed Brown } 1495e27a552bSJed Brown 1496e27a552bSJed Brown #undef __FUNCT__ 14979200755eSBarry Smith #define __FUNCT__ "TSLoad_RosW" 14989200755eSBarry Smith static PetscErrorCode TSLoad_RosW(TS ts,PetscViewer viewer) 14999200755eSBarry Smith { 15009200755eSBarry Smith PetscErrorCode ierr; 15019200755eSBarry Smith SNES snes; 15029200755eSBarry Smith TSAdapt tsadapt; 15039200755eSBarry Smith 15049200755eSBarry Smith PetscFunctionBegin; 15059200755eSBarry Smith ierr = TSGetAdapt(ts,&tsadapt);CHKERRQ(ierr); 15069200755eSBarry Smith ierr = TSAdaptLoad(tsadapt,viewer);CHKERRQ(ierr); 15079200755eSBarry Smith ierr = TSGetSNES(ts,&snes);CHKERRQ(ierr); 15089200755eSBarry Smith ierr = SNESLoad(snes,viewer);CHKERRQ(ierr); 15099200755eSBarry Smith /* function and Jacobian context for SNES when used with TS is always ts object */ 15109200755eSBarry Smith ierr = SNESSetFunction(snes,NULL,NULL,ts);CHKERRQ(ierr); 15119200755eSBarry Smith ierr = SNESSetJacobian(snes,NULL,NULL,NULL,ts);CHKERRQ(ierr); 15129200755eSBarry Smith PetscFunctionReturn(0); 15139200755eSBarry Smith } 15149200755eSBarry Smith 15159200755eSBarry Smith #undef __FUNCT__ 1516e27a552bSJed Brown #define __FUNCT__ "TSRosWSetType" 1517e27a552bSJed Brown /*@C 151861692a83SJed Brown TSRosWSetType - Set the type of Rosenbrock-W scheme 1519e27a552bSJed Brown 1520e27a552bSJed Brown Logically collective 1521e27a552bSJed Brown 1522e27a552bSJed Brown Input Parameter: 1523e27a552bSJed Brown + ts - timestepping context 152461692a83SJed Brown - rostype - type of Rosenbrock-W scheme 1525e27a552bSJed Brown 1526020d8f30SJed Brown Level: beginner 1527e27a552bSJed Brown 1528020d8f30SJed Brown .seealso: TSRosWGetType(), TSROSW, TSROSW2M, TSROSW2P, TSROSWRA3PW, TSROSWRA34PW2, TSROSWRODAS3, TSROSWSANDU3, TSROSWASSP3P3S1C, TSROSWLASSP3P4S2C, TSROSWLLSSP3P4S2C, TSROSWARK3 1529e27a552bSJed Brown @*/ 153019fd82e9SBarry Smith PetscErrorCode TSRosWSetType(TS ts,TSRosWType rostype) 1531e27a552bSJed Brown { 1532e27a552bSJed Brown PetscErrorCode ierr; 1533e27a552bSJed Brown 1534e27a552bSJed Brown PetscFunctionBegin; 1535e27a552bSJed Brown PetscValidHeaderSpecific(ts,TS_CLASSID,1); 153619fd82e9SBarry Smith ierr = PetscTryMethod(ts,"TSRosWSetType_C",(TS,TSRosWType),(ts,rostype));CHKERRQ(ierr); 1537e27a552bSJed Brown PetscFunctionReturn(0); 1538e27a552bSJed Brown } 1539e27a552bSJed Brown 1540e27a552bSJed Brown #undef __FUNCT__ 1541e27a552bSJed Brown #define __FUNCT__ "TSRosWGetType" 1542e27a552bSJed Brown /*@C 154361692a83SJed Brown TSRosWGetType - Get the type of Rosenbrock-W scheme 1544e27a552bSJed Brown 1545e27a552bSJed Brown Logically collective 1546e27a552bSJed Brown 1547e27a552bSJed Brown Input Parameter: 1548e27a552bSJed Brown . ts - timestepping context 1549e27a552bSJed Brown 1550e27a552bSJed Brown Output Parameter: 155161692a83SJed Brown . rostype - type of Rosenbrock-W scheme 1552e27a552bSJed Brown 1553e27a552bSJed Brown Level: intermediate 1554e27a552bSJed Brown 1555e27a552bSJed Brown .seealso: TSRosWGetType() 1556e27a552bSJed Brown @*/ 155719fd82e9SBarry Smith PetscErrorCode TSRosWGetType(TS ts,TSRosWType *rostype) 1558e27a552bSJed Brown { 1559e27a552bSJed Brown PetscErrorCode ierr; 1560e27a552bSJed Brown 1561e27a552bSJed Brown PetscFunctionBegin; 1562e27a552bSJed Brown PetscValidHeaderSpecific(ts,TS_CLASSID,1); 156319fd82e9SBarry Smith ierr = PetscUseMethod(ts,"TSRosWGetType_C",(TS,TSRosWType*),(ts,rostype));CHKERRQ(ierr); 1564e27a552bSJed Brown PetscFunctionReturn(0); 1565e27a552bSJed Brown } 1566e27a552bSJed Brown 1567e27a552bSJed Brown #undef __FUNCT__ 156861692a83SJed Brown #define __FUNCT__ "TSRosWSetRecomputeJacobian" 1569e27a552bSJed Brown /*@C 157061692a83SJed Brown TSRosWSetRecomputeJacobian - Set whether to recompute the Jacobian at each stage. The default is to update the Jacobian once per step. 1571e27a552bSJed Brown 1572e27a552bSJed Brown Logically collective 1573e27a552bSJed Brown 1574e27a552bSJed Brown Input Parameter: 1575e27a552bSJed Brown + ts - timestepping context 157661692a83SJed Brown - flg - PETSC_TRUE to recompute the Jacobian at each stage 1577e27a552bSJed Brown 1578e27a552bSJed Brown Level: intermediate 1579e27a552bSJed Brown 1580e27a552bSJed Brown .seealso: TSRosWGetType() 1581e27a552bSJed Brown @*/ 158261692a83SJed Brown PetscErrorCode TSRosWSetRecomputeJacobian(TS ts,PetscBool flg) 1583e27a552bSJed Brown { 1584e27a552bSJed Brown PetscErrorCode ierr; 1585e27a552bSJed Brown 1586e27a552bSJed Brown PetscFunctionBegin; 1587e27a552bSJed Brown PetscValidHeaderSpecific(ts,TS_CLASSID,1); 158861692a83SJed Brown ierr = PetscTryMethod(ts,"TSRosWSetRecomputeJacobian_C",(TS,PetscBool),(ts,flg));CHKERRQ(ierr); 1589e27a552bSJed Brown PetscFunctionReturn(0); 1590e27a552bSJed Brown } 1591e27a552bSJed Brown 1592e27a552bSJed Brown #undef __FUNCT__ 1593e27a552bSJed Brown #define __FUNCT__ "TSRosWGetType_RosW" 159419fd82e9SBarry Smith PetscErrorCode TSRosWGetType_RosW(TS ts,TSRosWType *rostype) 1595e27a552bSJed Brown { 159661692a83SJed Brown TS_RosW *ros = (TS_RosW*)ts->data; 1597e27a552bSJed Brown PetscErrorCode ierr; 1598e27a552bSJed Brown 1599e27a552bSJed Brown PetscFunctionBegin; 160061692a83SJed Brown if (!ros->tableau) {ierr = TSRosWSetType(ts,TSRosWDefault);CHKERRQ(ierr);} 160161692a83SJed Brown *rostype = ros->tableau->name; 1602e27a552bSJed Brown PetscFunctionReturn(0); 1603e27a552bSJed Brown } 1604ef20d060SBarry Smith 1605e27a552bSJed Brown #undef __FUNCT__ 1606e27a552bSJed Brown #define __FUNCT__ "TSRosWSetType_RosW" 160719fd82e9SBarry Smith PetscErrorCode TSRosWSetType_RosW(TS ts,TSRosWType rostype) 1608e27a552bSJed Brown { 160961692a83SJed Brown TS_RosW *ros = (TS_RosW*)ts->data; 1610e27a552bSJed Brown PetscErrorCode ierr; 1611e27a552bSJed Brown PetscBool match; 161261692a83SJed Brown RosWTableauLink link; 1613e27a552bSJed Brown 1614e27a552bSJed Brown PetscFunctionBegin; 161561692a83SJed Brown if (ros->tableau) { 161661692a83SJed Brown ierr = PetscStrcmp(ros->tableau->name,rostype,&match);CHKERRQ(ierr); 1617e27a552bSJed Brown if (match) PetscFunctionReturn(0); 1618e27a552bSJed Brown } 161961692a83SJed Brown for (link = RosWTableauList; link; link=link->next) { 162061692a83SJed Brown ierr = PetscStrcmp(link->tab.name,rostype,&match);CHKERRQ(ierr); 1621e27a552bSJed Brown if (match) { 1622e27a552bSJed Brown ierr = TSReset_RosW(ts);CHKERRQ(ierr); 162361692a83SJed Brown ros->tableau = &link->tab; 1624e27a552bSJed Brown PetscFunctionReturn(0); 1625e27a552bSJed Brown } 1626e27a552bSJed Brown } 1627ce94432eSBarry Smith SETERRQ1(PetscObjectComm((PetscObject)ts),PETSC_ERR_ARG_UNKNOWN_TYPE,"Could not find '%s'",rostype); 1628e27a552bSJed Brown PetscFunctionReturn(0); 1629e27a552bSJed Brown } 163061692a83SJed Brown 1631e27a552bSJed Brown #undef __FUNCT__ 163261692a83SJed Brown #define __FUNCT__ "TSRosWSetRecomputeJacobian_RosW" 163361692a83SJed Brown PetscErrorCode TSRosWSetRecomputeJacobian_RosW(TS ts,PetscBool flg) 1634e27a552bSJed Brown { 163561692a83SJed Brown TS_RosW *ros = (TS_RosW*)ts->data; 1636e27a552bSJed Brown 1637e27a552bSJed Brown PetscFunctionBegin; 163861692a83SJed Brown ros->recompute_jacobian = flg; 1639e27a552bSJed Brown PetscFunctionReturn(0); 1640e27a552bSJed Brown } 1641e27a552bSJed Brown 1642d5e6173cSPeter Brune 1643e27a552bSJed Brown /* ------------------------------------------------------------ */ 1644e27a552bSJed Brown /*MC 1645020d8f30SJed Brown TSROSW - ODE solver using Rosenbrock-W schemes 1646e27a552bSJed Brown 1647e27a552bSJed Brown These methods are intended for problems with well-separated time scales, especially when a slow scale is strongly 1648e27a552bSJed Brown nonlinear such that it is expensive to solve with a fully implicit method. The user should provide the stiff part 1649e27a552bSJed Brown of the equation using TSSetIFunction() and the non-stiff part with TSSetRHSFunction(). 1650e27a552bSJed Brown 1651e27a552bSJed Brown Notes: 165261692a83SJed Brown This method currently only works with autonomous ODE and DAE. 165361692a83SJed Brown 1654d0685a90SJed Brown Consider trying TSARKIMEX if the stiff part is strongly nonlinear. 1655d0685a90SJed Brown 165661692a83SJed Brown Developer notes: 165761692a83SJed Brown Rosenbrock-W methods are typically specified for autonomous ODE 165861692a83SJed Brown 1659f9c1d6abSBarry Smith $ udot = f(u) 166061692a83SJed Brown 166161692a83SJed Brown by the stage equations 166261692a83SJed Brown 1663f9c1d6abSBarry Smith $ k_i = h f(u_0 + sum_j alpha_ij k_j) + h J sum_j gamma_ij k_j 166461692a83SJed Brown 166561692a83SJed Brown and step completion formula 166661692a83SJed Brown 1667f9c1d6abSBarry Smith $ u_1 = u_0 + sum_j b_j k_j 166861692a83SJed Brown 1669f9c1d6abSBarry Smith with step size h and coefficients alpha_ij, gamma_ij, and b_i. Implementing the method in this form would require f(u) 167061692a83SJed Brown and the Jacobian J to be available, in addition to the shifted matrix I - h gamma_ii J. Following Hairer and Wanner, 167161692a83SJed Brown we define new variables for the stage equations 167261692a83SJed Brown 167361692a83SJed Brown $ y_i = gamma_ij k_j 167461692a83SJed Brown 167561692a83SJed Brown The k_j can be recovered because Gamma is invertible. Let C be the lower triangular part of Gamma^{-1} and define 167661692a83SJed Brown 1677b70472e2SJed Brown $ A = Alpha Gamma^{-1}, bt^T = b^T Gamma^{-1} 167861692a83SJed Brown 167961692a83SJed Brown to rewrite the method as 168061692a83SJed Brown 1681f9c1d6abSBarry Smith $ [M/(h gamma_ii) - J] y_i = f(u_0 + sum_j a_ij y_j) + M sum_j (c_ij/h) y_j 1682f9c1d6abSBarry Smith $ u_1 = u_0 + sum_j bt_j y_j 168361692a83SJed Brown 168461692a83SJed Brown where we have introduced the mass matrix M. Continue by defining 168561692a83SJed Brown 168661692a83SJed Brown $ ydot_i = 1/(h gamma_ii) y_i - sum_j (c_ij/h) y_j 168761692a83SJed Brown 168861692a83SJed Brown or, more compactly in tensor notation 168961692a83SJed Brown 169061692a83SJed Brown $ Ydot = 1/h (Gamma^{-1} \otimes I) Y . 169161692a83SJed Brown 169261692a83SJed Brown Note that Gamma^{-1} is lower triangular. With this definition of Ydot in terms of known quantities and the current 169361692a83SJed Brown stage y_i, the stage equations reduce to performing one Newton step (typically with a lagged Jacobian) on the 169461692a83SJed Brown equation 169561692a83SJed Brown 1696f9c1d6abSBarry Smith $ g(u_0 + sum_j a_ij y_j + y_i, ydot_i) = 0 169761692a83SJed Brown 169861692a83SJed Brown with initial guess y_i = 0. 1699e27a552bSJed Brown 1700e27a552bSJed Brown Level: beginner 1701e27a552bSJed Brown 1702d0685a90SJed Brown .seealso: TSCreate(), TS, TSSetType(), TSRosWSetType(), TSRosWRegister(), TSROSWTHETA1, TSROSWTHETA2, TSROSW2M, TSROSW2P, TSROSWRA3PW, TSROSWRA34PW2, TSROSWRODAS3, 1703a4386c9eSJed Brown TSROSWSANDU3, TSROSWASSP3P3S1C, TSROSWLASSP3P4S2C, TSROSWLLSSP3P4S2C, TSROSWGRK4T, TSROSWSHAMP4, TSROSWVELDD4, TSROSW4L 1704e27a552bSJed Brown M*/ 1705e27a552bSJed Brown #undef __FUNCT__ 1706e27a552bSJed Brown #define __FUNCT__ "TSCreate_RosW" 17078cc058d9SJed Brown PETSC_EXTERN PetscErrorCode TSCreate_RosW(TS ts) 1708e27a552bSJed Brown { 170961692a83SJed Brown TS_RosW *ros; 1710e27a552bSJed Brown PetscErrorCode ierr; 1711e27a552bSJed Brown 1712e27a552bSJed Brown PetscFunctionBegin; 1713607a6623SBarry Smith ierr = TSRosWInitializePackage();CHKERRQ(ierr); 1714e27a552bSJed Brown 1715e27a552bSJed Brown ts->ops->reset = TSReset_RosW; 1716e27a552bSJed Brown ts->ops->destroy = TSDestroy_RosW; 1717e27a552bSJed Brown ts->ops->view = TSView_RosW; 17189200755eSBarry Smith ts->ops->load = TSLoad_RosW; 1719e27a552bSJed Brown ts->ops->setup = TSSetUp_RosW; 1720e27a552bSJed Brown ts->ops->step = TSStep_RosW; 1721e27a552bSJed Brown ts->ops->interpolate = TSInterpolate_RosW; 17221c3436cfSJed Brown ts->ops->evaluatestep = TSEvaluateStep_RosW; 172324655328SShri ts->ops->rollback = TSRollBack_RosW; 1724e27a552bSJed Brown ts->ops->setfromoptions = TSSetFromOptions_RosW; 1725e27a552bSJed Brown ts->ops->snesfunction = SNESTSFormFunction_RosW; 1726e27a552bSJed Brown ts->ops->snesjacobian = SNESTSFormJacobian_RosW; 1727e27a552bSJed Brown 1728b00a9115SJed Brown ierr = PetscNewLog(ts,&ros);CHKERRQ(ierr); 172961692a83SJed Brown ts->data = (void*)ros; 1730e27a552bSJed Brown 1731bdf89e91SBarry Smith ierr = PetscObjectComposeFunction((PetscObject)ts,"TSRosWGetType_C",TSRosWGetType_RosW);CHKERRQ(ierr); 1732bdf89e91SBarry Smith ierr = PetscObjectComposeFunction((PetscObject)ts,"TSRosWSetType_C",TSRosWSetType_RosW);CHKERRQ(ierr); 1733bdf89e91SBarry Smith ierr = PetscObjectComposeFunction((PetscObject)ts,"TSRosWSetRecomputeJacobian_C",TSRosWSetRecomputeJacobian_RosW);CHKERRQ(ierr); 1734e27a552bSJed Brown PetscFunctionReturn(0); 1735e27a552bSJed Brown } 1736