18a381b04SJed Brown /* 28a381b04SJed Brown Code for timestepping with additive Runge-Kutta IMEX method 38a381b04SJed Brown 48a381b04SJed Brown Notes: 58a381b04SJed Brown The general system is written as 68a381b04SJed Brown 7f9c1d6abSBarry Smith F(t,U,Udot) = G(t,U) 88a381b04SJed Brown 98a381b04SJed Brown where F represents the stiff part of the physics and G represents the non-stiff part. 108a381b04SJed Brown 118a381b04SJed Brown */ 12b45d2f2cSJed Brown #include <petsc-private/tsimpl.h> /*I "petscts.h" I*/ 131e25c274SJed Brown #include <petscdm.h> 148a381b04SJed Brown 1519fd82e9SBarry Smith static TSARKIMEXType TSARKIMEXDefault = TSARKIMEX3; 168a381b04SJed Brown static PetscBool TSARKIMEXRegisterAllCalled; 178a381b04SJed Brown static PetscBool TSARKIMEXPackageInitialized; 18e817cc15SEmil Constantinescu static PetscInt explicit_stage_time_id; 198a381b04SJed Brown 208a381b04SJed Brown typedef struct _ARKTableau *ARKTableau; 218a381b04SJed Brown struct _ARKTableau { 228a381b04SJed Brown char *name; 234f385281SJed Brown PetscInt order; /* Classical approximation order of the method */ 244f385281SJed Brown PetscInt s; /* Number of stages */ 25e817cc15SEmil Constantinescu PetscBool stiffly_accurate; /* The implicit part is stiffly accurate*/ 26e817cc15SEmil Constantinescu PetscBool FSAL_implicit; /* The implicit part is FSAL*/ 27e817cc15SEmil Constantinescu PetscBool explicit_first_stage; /* The implicit part has an explicit first stage*/ 284f385281SJed Brown PetscInt pinterp; /* Interpolation order */ 294f385281SJed Brown PetscReal *At,*bt,*ct; /* Stiff tableau */ 308a381b04SJed Brown PetscReal *A,*b,*c; /* Non-stiff tableau */ 31108c343cSJed Brown PetscReal *bembedt,*bembed; /* Embedded formula of order one less (order-1) */ 32cd652676SJed Brown PetscReal *binterpt,*binterp; /* Dense output formula */ 33108c343cSJed Brown PetscReal ccfl; /* Placeholder for CFL coefficient relative to forward Euler */ 348a381b04SJed Brown }; 358a381b04SJed Brown typedef struct _ARKTableauLink *ARKTableauLink; 368a381b04SJed Brown struct _ARKTableauLink { 378a381b04SJed Brown struct _ARKTableau tab; 388a381b04SJed Brown ARKTableauLink next; 398a381b04SJed Brown }; 408a381b04SJed Brown static ARKTableauLink ARKTableauList; 418a381b04SJed Brown 428a381b04SJed Brown typedef struct { 438a381b04SJed Brown ARKTableau tableau; 448a381b04SJed Brown Vec *Y; /* States computed during the step */ 458a381b04SJed Brown Vec *YdotI; /* Time derivatives for the stiff part */ 468a381b04SJed Brown Vec *YdotRHS; /* Function evaluations for the non-stiff part */ 47e817cc15SEmil Constantinescu Vec Ydot0; /* Holds the slope from the previous step in FSAL case */ 488a381b04SJed Brown Vec Ydot; /* Work vector holding Ydot during residual evaluation */ 498a381b04SJed Brown Vec Work; /* Generic work vector */ 508a381b04SJed Brown Vec Z; /* Ydot = shift(Y-Z) */ 518a381b04SJed Brown PetscScalar *work; /* Scalar work */ 52b296d7d5SJed Brown PetscReal scoeff; /* shift = scoeff/dt */ 538a381b04SJed Brown PetscReal stage_time; 544cc180ffSJed Brown PetscBool imex; 55108c343cSJed Brown TSStepStatus status; 568a381b04SJed Brown } TS_ARKIMEX; 571f80e275SEmil Constantinescu /*MC 581f80e275SEmil Constantinescu TSARKIMEXARS122 - Second order ARK IMEX scheme. 598a381b04SJed Brown 601f80e275SEmil Constantinescu This method has one explicit stage and one implicit stage. 611f80e275SEmil Constantinescu 621f80e275SEmil Constantinescu References: 631f80e275SEmil Constantinescu U. Ascher, S. Ruuth, R. J. Spitheri, Implicit-explicit Runge-Kutta methods for time dependent Partial Differential Equations. Appl. Numer. Math. 25, (1997), pp. 151–167. 641f80e275SEmil Constantinescu 651f80e275SEmil Constantinescu Level: advanced 661f80e275SEmil Constantinescu 671f80e275SEmil Constantinescu .seealso: TSARKIMEX 681f80e275SEmil Constantinescu M*/ 691f80e275SEmil Constantinescu /*MC 701f80e275SEmil Constantinescu TSARKIMEXA2 - Second order ARK IMEX scheme with A-stable implicit part. 711f80e275SEmil Constantinescu 721f80e275SEmil Constantinescu This method has an explicit stage and one implicit stage, and has an A-stable implicit scheme. This method was provided by Emil Constantinescu. 731f80e275SEmil Constantinescu 741f80e275SEmil Constantinescu Level: advanced 751f80e275SEmil Constantinescu 761f80e275SEmil Constantinescu .seealso: TSARKIMEX 771f80e275SEmil Constantinescu M*/ 781f80e275SEmil Constantinescu /*MC 791f80e275SEmil Constantinescu TSARKIMEXL2 - Second order ARK IMEX scheme with L-stable implicit part. 801f80e275SEmil Constantinescu 811f80e275SEmil Constantinescu This method has two implicit stages, and L-stable implicit scheme. 821f80e275SEmil Constantinescu 831f80e275SEmil Constantinescu References: 841f80e275SEmil Constantinescu L. Pareschi, G. Russo, Implicit-Explicit Runge-Kutta schemes and applications to hyperbolic systems with relaxations. Journal of Scientific Computing Volume: 25, Issue: 1, October, 2005, pp. 129-155 851f80e275SEmil Constantinescu 861f80e275SEmil Constantinescu Level: advanced 871f80e275SEmil Constantinescu 881f80e275SEmil Constantinescu .seealso: TSARKIMEX 891f80e275SEmil Constantinescu M*/ 901f80e275SEmil Constantinescu /*MC 91e817cc15SEmil Constantinescu TSARKIMEX1BEE - First order Backward Euler represented as an ARK IMEX scheme with extrapolation as error estimator. This is a 3-stage method. 92e817cc15SEmil Constantinescu 93e817cc15SEmil Constantinescu This method is aimed at starting the integration of implicit DAEs when explicit first-stage ARK methods are used. 94e817cc15SEmil Constantinescu 95e817cc15SEmil Constantinescu Level: advanced 96e817cc15SEmil Constantinescu 97e817cc15SEmil Constantinescu .seealso: TSARKIMEX 98e817cc15SEmil Constantinescu M*/ 99e817cc15SEmil Constantinescu /*MC 1001f80e275SEmil Constantinescu TSARKIMEX2C - Second order ARK IMEX scheme with L-stable implicit part. 1011f80e275SEmil Constantinescu 1021f80e275SEmil Constantinescu This method has one explicit stage and two implicit stages. The implicit part is the same as in TSARKIMEX2D and TSARKIMEX2E, but the explicit part has a larger stability region on the negative real axis. This method was provided by Emil Constantinescu. 1031f80e275SEmil Constantinescu 1041f80e275SEmil Constantinescu Level: advanced 1051f80e275SEmil Constantinescu 1061f80e275SEmil Constantinescu .seealso: TSARKIMEX 1071f80e275SEmil Constantinescu M*/ 10864f491ddSJed Brown /*MC 10964f491ddSJed Brown TSARKIMEX2D - Second order ARK IMEX scheme with L-stable implicit part. 11064f491ddSJed Brown 111617a39beSEmil Constantinescu This method has one explicit stage and two implicit stages. The stability function is independent of the explicit part in the infinity limit of the implict component. This method was provided by Emil Constantinescu. 11264f491ddSJed Brown 113b330ce4dSSatish Balay Level: advanced 114b330ce4dSSatish Balay 11564f491ddSJed Brown .seealso: TSARKIMEX 11664f491ddSJed Brown M*/ 11764f491ddSJed Brown /*MC 11864f491ddSJed Brown TSARKIMEX2E - Second order ARK IMEX scheme with L-stable implicit part. 11964f491ddSJed Brown 12064f491ddSJed Brown This method has one explicit stage and two implicit stages. It is is an optimal method developed by Emil Constantinescu. 12164f491ddSJed Brown 122b330ce4dSSatish Balay Level: advanced 123b330ce4dSSatish Balay 12464f491ddSJed Brown .seealso: TSARKIMEX 12564f491ddSJed Brown M*/ 12664f491ddSJed Brown /*MC 1276cf0794eSJed Brown TSARKIMEXPRSSP2 - Second order SSP ARK IMEX scheme. 1286cf0794eSJed Brown 1296cf0794eSJed Brown This method has three implicit stages. 1306cf0794eSJed Brown 1316cf0794eSJed Brown References: 1326cf0794eSJed Brown L. Pareschi, G. Russo, Implicit-Explicit Runge-Kutta schemes and applications to hyperbolic systems with relaxations. Journal of Scientific Computing Volume: 25, Issue: 1, October, 2005, pp. 129-155 1336cf0794eSJed Brown 1346cf0794eSJed Brown This method is referred to as SSP2-(3,3,2) in http://arxiv.org/abs/1110.4375 1356cf0794eSJed Brown 1366cf0794eSJed Brown Level: advanced 1376cf0794eSJed Brown 1386cf0794eSJed Brown .seealso: TSARKIMEX 1396cf0794eSJed Brown M*/ 1406cf0794eSJed Brown /*MC 14164f491ddSJed Brown TSARKIMEX3 - Third order ARK IMEX scheme with L-stable implicit part. 14264f491ddSJed Brown 14364f491ddSJed Brown This method has one explicit stage and three implicit stages. 14464f491ddSJed Brown 14564f491ddSJed Brown References: 14664f491ddSJed Brown Kennedy and Carpenter 2003. 14764f491ddSJed Brown 148b330ce4dSSatish Balay Level: advanced 149b330ce4dSSatish Balay 15064f491ddSJed Brown .seealso: TSARKIMEX 15164f491ddSJed Brown M*/ 15264f491ddSJed Brown /*MC 1536cf0794eSJed Brown TSARKIMEXARS443 - Third order ARK IMEX scheme. 1546cf0794eSJed Brown 1556cf0794eSJed Brown This method has one explicit stage and four implicit stages. 1566cf0794eSJed Brown 1576cf0794eSJed Brown References: 1586cf0794eSJed Brown U. Ascher, S. Ruuth, R. J. Spitheri, Implicit-explicit Runge-Kutta methods for time dependent Partial Differential Equations. Appl. Numer. Math. 25, (1997), pp. 151–167. 1596cf0794eSJed Brown 1606cf0794eSJed Brown This method is referred to as ARS(4,4,3) in http://arxiv.org/abs/1110.4375 1616cf0794eSJed Brown 1626cf0794eSJed Brown Level: advanced 1636cf0794eSJed Brown 1646cf0794eSJed Brown .seealso: TSARKIMEX 1656cf0794eSJed Brown M*/ 1666cf0794eSJed Brown /*MC 1676cf0794eSJed Brown TSARKIMEXBPR3 - Third order ARK IMEX scheme. 1686cf0794eSJed Brown 1696cf0794eSJed Brown This method has one explicit stage and four implicit stages. 1706cf0794eSJed Brown 1716cf0794eSJed Brown References: 1726cf0794eSJed Brown This method is referred to as ARK3 in http://arxiv.org/abs/1110.4375 1736cf0794eSJed Brown 1746cf0794eSJed Brown Level: advanced 1756cf0794eSJed Brown 1766cf0794eSJed Brown .seealso: TSARKIMEX 1776cf0794eSJed Brown M*/ 1786cf0794eSJed Brown /*MC 17964f491ddSJed Brown TSARKIMEX4 - Fourth order ARK IMEX scheme with L-stable implicit part. 18064f491ddSJed Brown 18164f491ddSJed Brown This method has one explicit stage and four implicit stages. 18264f491ddSJed Brown 18364f491ddSJed Brown References: 18464f491ddSJed Brown Kennedy and Carpenter 2003. 18564f491ddSJed Brown 186b330ce4dSSatish Balay Level: advanced 187b330ce4dSSatish Balay 18864f491ddSJed Brown .seealso: TSARKIMEX 18964f491ddSJed Brown M*/ 19064f491ddSJed Brown /*MC 19164f491ddSJed Brown TSARKIMEX5 - Fifth order ARK IMEX scheme with L-stable implicit part. 19264f491ddSJed Brown 19364f491ddSJed Brown This method has one explicit stage and five implicit stages. 19464f491ddSJed Brown 19564f491ddSJed Brown References: 19664f491ddSJed Brown Kennedy and Carpenter 2003. 19764f491ddSJed Brown 198b330ce4dSSatish Balay Level: advanced 199b330ce4dSSatish Balay 20064f491ddSJed Brown .seealso: TSARKIMEX 20164f491ddSJed Brown M*/ 20264f491ddSJed Brown 2038a381b04SJed Brown #undef __FUNCT__ 2048a381b04SJed Brown #define __FUNCT__ "TSARKIMEXRegisterAll" 2058a381b04SJed Brown /*@C 2068a381b04SJed Brown TSARKIMEXRegisterAll - Registers all of the additive Runge-Kutta implicit-explicit methods in TSARKIMEX 2078a381b04SJed Brown 208fca742c7SJed Brown Not Collective, but should be called by all processes which will need the schemes to be registered 2098a381b04SJed Brown 2108a381b04SJed Brown Level: advanced 2118a381b04SJed Brown 2128a381b04SJed Brown .keywords: TS, TSARKIMEX, register, all 2138a381b04SJed Brown 2148a381b04SJed Brown .seealso: TSARKIMEXRegisterDestroy() 2158a381b04SJed Brown @*/ 2168a381b04SJed Brown PetscErrorCode TSARKIMEXRegisterAll(void) 2178a381b04SJed Brown { 2188a381b04SJed Brown PetscErrorCode ierr; 2198a381b04SJed Brown 2208a381b04SJed Brown PetscFunctionBegin; 2218a381b04SJed Brown if (TSARKIMEXRegisterAllCalled) PetscFunctionReturn(0); 2228a381b04SJed Brown TSARKIMEXRegisterAllCalled = PETSC_TRUE; 223e817cc15SEmil Constantinescu 224e817cc15SEmil Constantinescu { 225e817cc15SEmil Constantinescu const PetscReal 226e817cc15SEmil Constantinescu A[3][3] = {{0.0,0.0,0.0}, 227e817cc15SEmil Constantinescu {0.0,0.0,0.0}, 228748ad121SEmil Constantinescu {0.0,0.5,0.0}}, 229e817cc15SEmil Constantinescu At[3][3] = {{1.0,0.0,0.0}, 230e817cc15SEmil Constantinescu {0.0,0.5,0.0}, 231e817cc15SEmil Constantinescu {0.0,0.5,0.5}}, 232e817cc15SEmil Constantinescu b[3] = {0.0,0.5,0.5}, 233e817cc15SEmil Constantinescu bembedt[3] = {1.0,0.0,0.0}; 2340298fd71SBarry Smith ierr = TSARKIMEXRegister(TSARKIMEX1BEE,2,3,&At[0][0],b,NULL,&A[0][0],b,NULL,bembedt,bembedt,1,b,NULL);CHKERRQ(ierr); 235e817cc15SEmil Constantinescu } 2368a381b04SJed Brown { 2378a381b04SJed Brown const PetscReal 2381f80e275SEmil Constantinescu A[2][2] = {{0.0,0.0}, 2391f80e275SEmil Constantinescu {0.5,0.0}}, 2401f80e275SEmil Constantinescu At[2][2] = {{0.0,0.0}, 2411f80e275SEmil Constantinescu {0.0,0.5}}, 2421f80e275SEmil Constantinescu b[2] = {0.0,1.0}, 2431f80e275SEmil Constantinescu bembedt[2] = {0.5,0.5}; 2441f80e275SEmil Constantinescu /* binterpt[2][2] = {{1.0,-1.0},{0.0,1.0}}; second order dense output has poor stability properties and hence it is not currently in use*/ 2450298fd71SBarry Smith ierr = TSARKIMEXRegister(TSARKIMEXARS122,2,2,&At[0][0],b,NULL,&A[0][0],b,NULL,bembedt,bembedt,1,b,NULL);CHKERRQ(ierr); 2461f80e275SEmil Constantinescu } 2471f80e275SEmil Constantinescu { 2481f80e275SEmil Constantinescu const PetscReal 2491f80e275SEmil Constantinescu A[2][2] = {{0.0,0.0}, 2501f80e275SEmil Constantinescu {1.0,0.0}}, 2511f80e275SEmil Constantinescu At[2][2] = {{0.0,0.0}, 2521f80e275SEmil Constantinescu {0.5,0.5}}, 2531f80e275SEmil Constantinescu b[2] = {0.5,0.5}, 2541f80e275SEmil Constantinescu bembedt[2] = {0.0,1.0}; 2551f80e275SEmil Constantinescu /* binterpt[2][2] = {{1.0,-0.5},{0.0,0.5}} second order dense output has poor stability properties and hence it is not currently in use*/ 2560298fd71SBarry Smith ierr = TSARKIMEXRegister(TSARKIMEXA2,2,2,&At[0][0],b,NULL,&A[0][0],b,NULL,bembedt,bembedt,1,b,NULL);CHKERRQ(ierr); 2571f80e275SEmil Constantinescu } 2581f80e275SEmil Constantinescu { 259da80777bSKarl Rupp /* const PetscReal us2 = 1.0-1.0/PetscSqrtReal((PetscReal)2.0); Direct evaluation: 0.2928932188134524755992. Used below to ensure all values are available at compile time */ 2601f80e275SEmil Constantinescu const PetscReal 2611f80e275SEmil Constantinescu A[2][2] = {{0.0,0.0}, 2621f80e275SEmil Constantinescu {1.0,0.0}}, 263da80777bSKarl Rupp At[2][2] = {{0.2928932188134524755992,0.0}, 264da80777bSKarl Rupp {1.0-2.0*0.2928932188134524755992,0.2928932188134524755992}}, 2651f80e275SEmil Constantinescu b[2] = {0.5,0.5}, 2661f80e275SEmil Constantinescu bembedt[2] = {0.0,1.0}, 267da80777bSKarl Rupp binterpt[2][2] = {{ (0.2928932188134524755992-1.0)/(2.0*0.2928932188134524755992-1.0),-1/(2.0*(1.0-2.0*0.2928932188134524755992))}, 268da80777bSKarl Rupp {1-(0.2928932188134524755992-1.0)/(2.0*0.2928932188134524755992-1.0),-1/(2.0*(1.0-2.0*0.2928932188134524755992))}}, 2691f80e275SEmil Constantinescu binterp[2][2] = {{1.0,-0.5},{0.0,0.5}}; 2700298fd71SBarry Smith ierr = TSARKIMEXRegister(TSARKIMEXL2,2,2,&At[0][0],b,NULL,&A[0][0],b,NULL,bembedt,bembedt,2,binterpt[0],binterp[0]);CHKERRQ(ierr); 2711f80e275SEmil Constantinescu } 2721f80e275SEmil Constantinescu { 273da80777bSKarl Rupp /* const PetscReal s2 = PetscSqrtReal((PetscReal)2.0), Direct evaluation: 1.414213562373095048802. Used below to ensure all values are available at compile time */ 274da80777bSKarl Rupp const PetscReal 2758a381b04SJed Brown A[3][3] = {{0,0,0}, 276da80777bSKarl Rupp {2-1.414213562373095048802,0,0}, 277617a39beSEmil Constantinescu {0.5,0.5,0}}, 278da80777bSKarl Rupp At[3][3] = {{0,0,0}, 279da80777bSKarl Rupp {1-1/1.414213562373095048802,1-1/1.414213562373095048802,0}, 280da80777bSKarl Rupp {1/(2*1.414213562373095048802),1/(2*1.414213562373095048802),1-1/1.414213562373095048802}}, 281da80777bSKarl Rupp bembedt[3] = {(4.-1.414213562373095048802)/8.,(4.-1.414213562373095048802)/8.,1/(2.*1.414213562373095048802)}, 282da80777bSKarl Rupp binterpt[3][2] = {{1.0/1.414213562373095048802,-1.0/(2.0*1.414213562373095048802)}, 283da80777bSKarl Rupp {1.0/1.414213562373095048802,-1.0/(2.0*1.414213562373095048802)}, 284da80777bSKarl Rupp {1.0-1.414213562373095048802,1.0/1.414213562373095048802}}; 2850298fd71SBarry Smith ierr = TSARKIMEXRegister(TSARKIMEX2C,2,3,&At[0][0],NULL,NULL,&A[0][0],NULL,NULL,bembedt,bembedt,2,binterpt[0],NULL);CHKERRQ(ierr); 2861f80e275SEmil Constantinescu } 2871f80e275SEmil Constantinescu { 288da80777bSKarl Rupp /* const PetscReal s2 = PetscSqrtReal((PetscReal)2.0), Direct evaluation: 1.414213562373095048802. Used below to ensure all values are available at compile time */ 289da80777bSKarl Rupp const PetscReal 2901f80e275SEmil Constantinescu A[3][3] = {{0,0,0}, 291da80777bSKarl Rupp {2-1.414213562373095048802,0,0}, 2928a381b04SJed Brown {0.75,0.25,0}}, 293da80777bSKarl Rupp At[3][3] = {{0,0,0}, 294da80777bSKarl Rupp {1-1/1.414213562373095048802,1-1/1.414213562373095048802,0}, 295da80777bSKarl Rupp {1/(2*1.414213562373095048802),1/(2*1.414213562373095048802),1-1/1.414213562373095048802}}, 296da80777bSKarl Rupp bembedt[3] = {(4.-1.414213562373095048802)/8.,(4.-1.414213562373095048802)/8.,1/(2.*1.414213562373095048802)}, 297da80777bSKarl Rupp binterpt[3][2] = {{1.0/1.414213562373095048802,-1.0/(2.0*1.414213562373095048802)}, 298da80777bSKarl Rupp {1.0/1.414213562373095048802,-1.0/(2.0*1.414213562373095048802)}, 299da80777bSKarl Rupp {1.0-1.414213562373095048802,1.0/1.414213562373095048802}}; 3000298fd71SBarry Smith ierr = TSARKIMEXRegister(TSARKIMEX2D,2,3,&At[0][0],NULL,NULL,&A[0][0],NULL,NULL,bembedt,bembedt,2,binterpt[0],NULL);CHKERRQ(ierr); 3018a381b04SJed Brown } 30206db7b1cSJed Brown { /* Optimal for linear implicit part */ 303da80777bSKarl Rupp /* const PetscReal s2 = PetscSqrtReal((PetscReal)2.0), Direct evaluation: 1.414213562373095048802. Used below to ensure all values are available at compile time */ 304da80777bSKarl Rupp const PetscReal 305da80777bSKarl Rupp A[3][3] = {{0,0,0}, 306da80777bSKarl Rupp {2-1.414213562373095048802,0,0}, 307da80777bSKarl Rupp {(3-2*1.414213562373095048802)/6,(3+2*1.414213562373095048802)/6,0}}, 308da80777bSKarl Rupp At[3][3] = {{0,0,0}, 309da80777bSKarl Rupp {1-1/1.414213562373095048802,1-1/1.414213562373095048802,0}, 310da80777bSKarl Rupp {1/(2*1.414213562373095048802),1/(2*1.414213562373095048802),1-1/1.414213562373095048802}}, 311da80777bSKarl Rupp bembedt[3] = {(4.-1.414213562373095048802)/8.,(4.-1.414213562373095048802)/8.,1/(2.*1.414213562373095048802)}, 312da80777bSKarl Rupp binterpt[3][2] = {{1.0/1.414213562373095048802,-1.0/(2.0*1.414213562373095048802)}, 313da80777bSKarl Rupp {1.0/1.414213562373095048802,-1.0/(2.0*1.414213562373095048802)}, 314da80777bSKarl Rupp {1.0-1.414213562373095048802,1.0/1.414213562373095048802}}; 3150298fd71SBarry Smith ierr = TSARKIMEXRegister(TSARKIMEX2E,2,3,&At[0][0],NULL,NULL,&A[0][0],NULL,NULL,bembedt,bembedt,2,binterpt[0],NULL);CHKERRQ(ierr); 316a3a57f36SJed Brown } 3176cf0794eSJed Brown { /* Optimal for linear implicit part */ 3186cf0794eSJed Brown const PetscReal 3196cf0794eSJed Brown A[3][3] = {{0,0,0}, 3206cf0794eSJed Brown {0.5,0,0}, 3216cf0794eSJed Brown {0.5,0.5,0}}, 3226cf0794eSJed Brown At[3][3] = {{0.25,0,0}, 3236cf0794eSJed Brown {0,0.25,0}, 3246cf0794eSJed Brown {1./3,1./3,1./3}}; 3250298fd71SBarry Smith ierr = TSARKIMEXRegister(TSARKIMEXPRSSP2,2,3,&At[0][0],NULL,NULL,&A[0][0],NULL,NULL,NULL,NULL,0,NULL,NULL);CHKERRQ(ierr); 3266cf0794eSJed Brown } 327a3a57f36SJed Brown { 328a3a57f36SJed Brown const PetscReal 329a3a57f36SJed Brown A[4][4] = {{0,0,0,0}, 3304040e9f2SJed Brown {1767732205903./2027836641118.,0,0,0}, 3314040e9f2SJed Brown {5535828885825./10492691773637.,788022342437./10882634858940.,0,0}, 3324040e9f2SJed Brown {6485989280629./16251701735622.,-4246266847089./9704473918619.,10755448449292./10357097424841.,0}}, 333a3a57f36SJed Brown At[4][4] = {{0,0,0,0}, 3344040e9f2SJed Brown {1767732205903./4055673282236.,1767732205903./4055673282236.,0,0}, 3354040e9f2SJed Brown {2746238789719./10658868560708.,-640167445237./6845629431997.,1767732205903./4055673282236.,0}, 3364040e9f2SJed Brown {1471266399579./7840856788654.,-4482444167858./7529755066697.,11266239266428./11593286722821.,1767732205903./4055673282236.}}, 337cc46b9d1SJed Brown bembedt[4] = {2756255671327./12835298489170.,-10771552573575./22201958757719.,9247589265047./10645013368117.,2193209047091./5459859503100.}, 3384040e9f2SJed Brown binterpt[4][2] = {{4655552711362./22874653954995., -215264564351./13552729205753.}, 3394040e9f2SJed Brown {-18682724506714./9892148508045.,17870216137069./13817060693119.}, 3404040e9f2SJed Brown {34259539580243./13192909600954.,-28141676662227./17317692491321.}, 3414040e9f2SJed Brown {584795268549./6622622206610., 2508943948391./7218656332882.}}; 3420298fd71SBarry Smith ierr = TSARKIMEXRegister(TSARKIMEX3,3,4,&At[0][0],NULL,NULL,&A[0][0],NULL,NULL,bembedt,bembedt,2,binterpt[0],NULL);CHKERRQ(ierr); 343a3a57f36SJed Brown } 344a3a57f36SJed Brown { 345a3a57f36SJed Brown const PetscReal 346e74514c0SSatish Balay A[5][5] = {{0,0,0,0,0}, 3476cf0794eSJed Brown {1./2,0,0,0,0}, 3486cf0794eSJed Brown {11./18,1./18,0,0,0}, 3496cf0794eSJed Brown {5./6,-5./6,.5,0,0}, 3506cf0794eSJed Brown {1./4,7./4,3./4,-7./4,0}}, 3516cf0794eSJed Brown At[5][5] = {{0,0,0,0,0}, 3526cf0794eSJed Brown {0,1./2,0,0,0}, 3536cf0794eSJed Brown {0,1./6,1./2,0,0}, 3546cf0794eSJed Brown {0,-1./2,1./2,1./2,0}, 355108c343cSJed Brown {0,3./2,-3./2,1./2,1./2}}, 3560298fd71SBarry Smith *bembedt = NULL; 3570298fd71SBarry Smith ierr = TSARKIMEXRegister(TSARKIMEXARS443,3,5,&At[0][0],NULL,NULL,&A[0][0],NULL,NULL,bembedt,bembedt,0,NULL,NULL);CHKERRQ(ierr); 3586cf0794eSJed Brown } 3596cf0794eSJed Brown { 3606cf0794eSJed Brown const PetscReal 361e74514c0SSatish Balay A[5][5] = {{0,0,0,0,0}, 3626cf0794eSJed Brown {1,0,0,0,0}, 3636cf0794eSJed Brown {4./9,2./9,0,0,0}, 3646cf0794eSJed Brown {1./4,0,3./4,0,0}, 3656cf0794eSJed Brown {1./4,0,3./5,0,0}}, 366e74514c0SSatish Balay At[5][5] = {{0,0,0,0,0}, 3676cf0794eSJed Brown {.5,.5,0,0,0}, 3686cf0794eSJed Brown {5./18,-1./9,.5,0,0}, 3696cf0794eSJed Brown {.5,0,0,.5,0}, 370108c343cSJed Brown {.25,0,.75,-.5,.5}}, 3710298fd71SBarry Smith *bembedt = NULL; 3720298fd71SBarry Smith ierr = TSARKIMEXRegister(TSARKIMEXBPR3,3,5,&At[0][0],NULL,NULL,&A[0][0],NULL,NULL,bembedt,bembedt,0,NULL,NULL);CHKERRQ(ierr); 3736cf0794eSJed Brown } 3746cf0794eSJed Brown { 3756cf0794eSJed Brown const PetscReal 376a3a57f36SJed Brown A[6][6] = {{0,0,0,0,0,0}, 377a3a57f36SJed Brown {1./2,0,0,0,0,0}, 3784040e9f2SJed Brown {13861./62500.,6889./62500.,0,0,0,0}, 3794040e9f2SJed Brown {-116923316275./2393684061468.,-2731218467317./15368042101831.,9408046702089./11113171139209.,0,0,0}, 3804040e9f2SJed Brown {-451086348788./2902428689909.,-2682348792572./7519795681897.,12662868775082./11960479115383.,3355817975965./11060851509271.,0,0}, 3814040e9f2SJed Brown {647845179188./3216320057751.,73281519250./8382639484533.,552539513391./3454668386233.,3354512671639./8306763924573.,4040./17871.,0}}, 382a3a57f36SJed Brown At[6][6] = {{0,0,0,0,0,0}, 383a3a57f36SJed Brown {1./4,1./4,0,0,0,0}, 3844040e9f2SJed Brown {8611./62500.,-1743./31250.,1./4,0,0,0}, 3854040e9f2SJed Brown {5012029./34652500.,-654441./2922500.,174375./388108.,1./4,0,0}, 3864040e9f2SJed Brown {15267082809./155376265600.,-71443401./120774400.,730878875./902184768.,2285395./8070912.,1./4,0}, 3874040e9f2SJed Brown {82889./524892.,0,15625./83664.,69875./102672.,-2260./8211,1./4}}, 388cc46b9d1SJed Brown bembedt[6] = {4586570599./29645900160.,0,178811875./945068544.,814220225./1159782912.,-3700637./11593932.,61727./225920.}, 3894040e9f2SJed Brown binterpt[6][3] = {{6943876665148./7220017795957.,-54480133./30881146.,6818779379841./7100303317025.}, 390cd652676SJed Brown {0,0,0}, 3914040e9f2SJed Brown {7640104374378./9702883013639.,-11436875./14766696.,2173542590792./12501825683035.}, 3924040e9f2SJed Brown {-20649996744609./7521556579894.,174696575./18121608.,-31592104683404./5083833661969.}, 3934040e9f2SJed Brown {8854892464581./2390941311638.,-12120380./966161.,61146701046299./7138195549469.}, 3944040e9f2SJed Brown {-11397109935349./6675773540249.,3843./706.,-17219254887155./4939391667607.}}; 3950298fd71SBarry Smith ierr = TSARKIMEXRegister(TSARKIMEX4,4,6,&At[0][0],NULL,NULL,&A[0][0],NULL,NULL,bembedt,bembedt,3,binterpt[0],NULL);CHKERRQ(ierr); 396a3a57f36SJed Brown } 397a3a57f36SJed Brown { 398a3a57f36SJed Brown const PetscReal 399a3a57f36SJed Brown A[8][8] = {{0,0,0,0,0,0,0,0}, 400a3a57f36SJed Brown {41./100,0,0,0,0,0,0,0}, 4014040e9f2SJed Brown {367902744464./2072280473677.,677623207551./8224143866563.,0,0,0,0,0,0}, 4024040e9f2SJed Brown {1268023523408./10340822734521.,0,1029933939417./13636558850479.,0,0,0,0,0}, 4034040e9f2SJed Brown {14463281900351./6315353703477.,0,66114435211212./5879490589093.,-54053170152839./4284798021562.,0,0,0,0}, 4044040e9f2SJed Brown {14090043504691./34967701212078.,0,15191511035443./11219624916014.,-18461159152457./12425892160975.,-281667163811./9011619295870.,0,0,0}, 4054040e9f2SJed Brown {19230459214898./13134317526959.,0,21275331358303./2942455364971.,-38145345988419./4862620318723.,-1./8,-1./8,0,0}, 4064040e9f2SJed Brown {-19977161125411./11928030595625.,0,-40795976796054./6384907823539.,177454434618887./12078138498510.,782672205425./8267701900261.,-69563011059811./9646580694205.,7356628210526./4942186776405.,0}}, 407a3a57f36SJed Brown At[8][8] = {{0,0,0,0,0,0,0,0}, 4084040e9f2SJed Brown {41./200.,41./200.,0,0,0,0,0,0}, 4094040e9f2SJed Brown {41./400.,-567603406766./11931857230679.,41./200.,0,0,0,0,0}, 4104040e9f2SJed Brown {683785636431./9252920307686.,0,-110385047103./1367015193373.,41./200.,0,0,0,0}, 4114040e9f2SJed Brown {3016520224154./10081342136671.,0,30586259806659./12414158314087.,-22760509404356./11113319521817.,41./200.,0,0,0}, 4124040e9f2SJed Brown {218866479029./1489978393911.,0,638256894668./5436446318841.,-1179710474555./5321154724896.,-60928119172./8023461067671.,41./200.,0,0}, 4134040e9f2SJed Brown {1020004230633./5715676835656.,0,25762820946817./25263940353407.,-2161375909145./9755907335909.,-211217309593./5846859502534.,-4269925059573./7827059040749.,41./200,0}, 4144040e9f2SJed Brown {-872700587467./9133579230613.,0,0,22348218063261./9555858737531.,-1143369518992./8141816002931.,-39379526789629./19018526304540.,32727382324388./42900044865799.,41./200.}}, 415cc46b9d1SJed Brown bembedt[8] = {-975461918565./9796059967033.,0,0,78070527104295./32432590147079.,-548382580838./3424219808633.,-33438840321285./15594753105479.,3629800801594./4656183773603.,4035322873751./18575991585200.}, 4164040e9f2SJed Brown binterpt[8][3] = {{-17674230611817./10670229744614., 43486358583215./12773830924787., -9257016797708./5021505065439.}, 417cd652676SJed Brown {0, 0, 0 }, 418cd652676SJed Brown {0, 0, 0 }, 4194040e9f2SJed Brown {65168852399939./7868540260826., -91478233927265./11067650958493., 26096422576131./11239449250142.}, 4204040e9f2SJed Brown {15494834004392./5936557850923., -79368583304911./10890268929626., 92396832856987./20362823103730.}, 4214040e9f2SJed Brown {-99329723586156./26959484932159., -12239297817655./9152339842473., 30029262896817./10175596800299.}, 4224040e9f2SJed Brown {-19024464361622./5461577185407., 115839755401235./10719374521269., -26136350496073./3983972220547.}, 4234040e9f2SJed Brown {-6511271360970./6095937251113., 5843115559534./2180450260947., -5289405421727./3760307252460. }}; 4240298fd71SBarry Smith ierr = TSARKIMEXRegister(TSARKIMEX5,5,8,&At[0][0],NULL,NULL,&A[0][0],NULL,NULL,bembedt,bembedt,3,binterpt[0],NULL);CHKERRQ(ierr); 425a3a57f36SJed Brown } 4268a381b04SJed Brown PetscFunctionReturn(0); 4278a381b04SJed Brown } 4288a381b04SJed Brown 4298a381b04SJed Brown #undef __FUNCT__ 4308a381b04SJed Brown #define __FUNCT__ "TSARKIMEXRegisterDestroy" 4318a381b04SJed Brown /*@C 4328a381b04SJed Brown TSARKIMEXRegisterDestroy - Frees the list of schemes that were registered by TSARKIMEXRegister(). 4338a381b04SJed Brown 4348a381b04SJed Brown Not Collective 4358a381b04SJed Brown 4368a381b04SJed Brown Level: advanced 4378a381b04SJed Brown 4388a381b04SJed Brown .keywords: TSARKIMEX, register, destroy 4398a381b04SJed Brown .seealso: TSARKIMEXRegister(), TSARKIMEXRegisterAll(), TSARKIMEXRegisterDynamic() 4408a381b04SJed Brown @*/ 4418a381b04SJed Brown PetscErrorCode TSARKIMEXRegisterDestroy(void) 4428a381b04SJed Brown { 4438a381b04SJed Brown PetscErrorCode ierr; 4448a381b04SJed Brown ARKTableauLink link; 4458a381b04SJed Brown 4468a381b04SJed Brown PetscFunctionBegin; 4478a381b04SJed Brown while ((link = ARKTableauList)) { 4488a381b04SJed Brown ARKTableau t = &link->tab; 4498a381b04SJed Brown ARKTableauList = link->next; 4508a381b04SJed Brown ierr = PetscFree6(t->At,t->bt,t->ct,t->A,t->b,t->c);CHKERRQ(ierr); 451108c343cSJed Brown ierr = PetscFree2(t->bembedt,t->bembed);CHKERRQ(ierr); 452cd652676SJed Brown ierr = PetscFree2(t->binterpt,t->binterp);CHKERRQ(ierr); 4538a381b04SJed Brown ierr = PetscFree(t->name);CHKERRQ(ierr); 4548a381b04SJed Brown ierr = PetscFree(link);CHKERRQ(ierr); 4558a381b04SJed Brown } 4568a381b04SJed Brown TSARKIMEXRegisterAllCalled = PETSC_FALSE; 4578a381b04SJed Brown PetscFunctionReturn(0); 4588a381b04SJed Brown } 4598a381b04SJed Brown 4608a381b04SJed Brown #undef __FUNCT__ 4618a381b04SJed Brown #define __FUNCT__ "TSARKIMEXInitializePackage" 4628a381b04SJed Brown /*@C 4638a381b04SJed Brown TSARKIMEXInitializePackage - This function initializes everything in the TSARKIMEX package. It is called 4648a381b04SJed Brown from PetscDLLibraryRegister() when using dynamic libraries, and on the first call to TSCreate_ARKIMEX() 4658a381b04SJed Brown when using static libraries. 4668a381b04SJed Brown 4678a381b04SJed Brown Input Parameter: 4680298fd71SBarry Smith path - The dynamic library path, or NULL 4698a381b04SJed Brown 4708a381b04SJed Brown Level: developer 4718a381b04SJed Brown 4728a381b04SJed Brown .keywords: TS, TSARKIMEX, initialize, package 4738a381b04SJed Brown .seealso: PetscInitialize() 4748a381b04SJed Brown @*/ 4758a381b04SJed Brown PetscErrorCode TSARKIMEXInitializePackage(const char path[]) 4768a381b04SJed Brown { 4778a381b04SJed Brown PetscErrorCode ierr; 4788a381b04SJed Brown 4798a381b04SJed Brown PetscFunctionBegin; 4808a381b04SJed Brown if (TSARKIMEXPackageInitialized) PetscFunctionReturn(0); 4818a381b04SJed Brown TSARKIMEXPackageInitialized = PETSC_TRUE; 4828a381b04SJed Brown ierr = TSARKIMEXRegisterAll();CHKERRQ(ierr); 483e817cc15SEmil Constantinescu ierr = PetscObjectComposedDataRegister(&explicit_stage_time_id);CHKERRQ(ierr); 4848a381b04SJed Brown ierr = PetscRegisterFinalize(TSARKIMEXFinalizePackage);CHKERRQ(ierr); 4858a381b04SJed Brown PetscFunctionReturn(0); 4868a381b04SJed Brown } 4878a381b04SJed Brown 4888a381b04SJed Brown #undef __FUNCT__ 4898a381b04SJed Brown #define __FUNCT__ "TSARKIMEXFinalizePackage" 4908a381b04SJed Brown /*@C 4918a381b04SJed Brown TSARKIMEXFinalizePackage - This function destroys everything in the TSARKIMEX package. It is 4928a381b04SJed Brown called from PetscFinalize(). 4938a381b04SJed Brown 4948a381b04SJed Brown Level: developer 4958a381b04SJed Brown 4968a381b04SJed Brown .keywords: Petsc, destroy, package 4978a381b04SJed Brown .seealso: PetscFinalize() 4988a381b04SJed Brown @*/ 4998a381b04SJed Brown PetscErrorCode TSARKIMEXFinalizePackage(void) 5008a381b04SJed Brown { 5018a381b04SJed Brown PetscErrorCode ierr; 5028a381b04SJed Brown 5038a381b04SJed Brown PetscFunctionBegin; 5048a381b04SJed Brown TSARKIMEXPackageInitialized = PETSC_FALSE; 5058a381b04SJed Brown ierr = TSARKIMEXRegisterDestroy();CHKERRQ(ierr); 5068a381b04SJed Brown PetscFunctionReturn(0); 5078a381b04SJed Brown } 5088a381b04SJed Brown 5098a381b04SJed Brown #undef __FUNCT__ 5108a381b04SJed Brown #define __FUNCT__ "TSARKIMEXRegister" 511cd652676SJed Brown /*@C 512cd652676SJed Brown TSARKIMEXRegister - register an ARK IMEX scheme by providing the entries in the Butcher tableau and optionally embedded approximations and interpolation 513cd652676SJed Brown 514cd652676SJed Brown Not Collective, but the same schemes should be registered on all processes on which they will be used 515cd652676SJed Brown 516cd652676SJed Brown Input Parameters: 517cd652676SJed Brown + name - identifier for method 518cd652676SJed Brown . order - approximation order of method 519cd652676SJed Brown . s - number of stages, this is the dimension of the matrices below 520cd652676SJed Brown . At - Butcher table of stage coefficients for stiff part (dimension s*s, row-major) 5210298fd71SBarry Smith . bt - Butcher table for completing the stiff part of the step (dimension s; NULL to use the last row of At) 5220298fd71SBarry Smith . ct - Abscissa of each stiff stage (dimension s, NULL to use row sums of At) 523cd652676SJed Brown . A - Non-stiff stage coefficients (dimension s*s, row-major) 5240298fd71SBarry Smith . b - Non-stiff step completion table (dimension s; NULL to use last row of At) 5250298fd71SBarry Smith . c - Non-stiff abscissa (dimension s; NULL to use row sums of A) 5260298fd71SBarry Smith . bembedt - Stiff part of completion table for embedded method (dimension s; NULL if not available) 5270298fd71SBarry Smith . bembed - Non-stiff part of completion table for embedded method (dimension s; NULL to use bembedt if provided) 528cd652676SJed Brown . pinterp - Order of the interpolation scheme, equal to the number of columns of binterpt and binterp 529cd652676SJed Brown . binterpt - Coefficients of the interpolation formula for the stiff part (dimension s*pinterp) 5300298fd71SBarry Smith - binterp - Coefficients of the interpolation formula for the non-stiff part (dimension s*pinterp; NULL to reuse binterpt) 531cd652676SJed Brown 532cd652676SJed Brown Notes: 533cd652676SJed Brown Several ARK IMEX methods are provided, this function is only needed to create new methods. 534cd652676SJed Brown 535cd652676SJed Brown Level: advanced 536cd652676SJed Brown 537cd652676SJed Brown .keywords: TS, register 538cd652676SJed Brown 539cd652676SJed Brown .seealso: TSARKIMEX 540cd652676SJed Brown @*/ 54119fd82e9SBarry Smith PetscErrorCode TSARKIMEXRegister(TSARKIMEXType name,PetscInt order,PetscInt s, 5428a381b04SJed Brown const PetscReal At[],const PetscReal bt[],const PetscReal ct[], 543cd652676SJed Brown const PetscReal A[],const PetscReal b[],const PetscReal c[], 544108c343cSJed Brown const PetscReal bembedt[],const PetscReal bembed[], 545cd652676SJed Brown PetscInt pinterp,const PetscReal binterpt[],const PetscReal binterp[]) 5468a381b04SJed Brown { 5478a381b04SJed Brown PetscErrorCode ierr; 5488a381b04SJed Brown ARKTableauLink link; 5498a381b04SJed Brown ARKTableau t; 5508a381b04SJed Brown PetscInt i,j; 5518a381b04SJed Brown 5528a381b04SJed Brown PetscFunctionBegin; 5538a381b04SJed Brown ierr = PetscMalloc(sizeof(*link),&link);CHKERRQ(ierr); 554cd652676SJed Brown ierr = PetscMemzero(link,sizeof(*link));CHKERRQ(ierr); 5558a381b04SJed Brown t = &link->tab; 5568a381b04SJed Brown ierr = PetscStrallocpy(name,&t->name);CHKERRQ(ierr); 5578a381b04SJed Brown t->order = order; 5588a381b04SJed Brown t->s = s; 5598a381b04SJed Brown ierr = PetscMalloc6(s*s,PetscReal,&t->At,s,PetscReal,&t->bt,s,PetscReal,&t->ct,s*s,PetscReal,&t->A,s,PetscReal,&t->b,s,PetscReal,&t->c);CHKERRQ(ierr); 5608a381b04SJed Brown ierr = PetscMemcpy(t->At,At,s*s*sizeof(At[0]));CHKERRQ(ierr); 5618a381b04SJed Brown ierr = PetscMemcpy(t->A,A,s*s*sizeof(A[0]));CHKERRQ(ierr); 5628a381b04SJed Brown if (bt) { ierr = PetscMemcpy(t->bt,bt,s*sizeof(bt[0]));CHKERRQ(ierr); } 5638a381b04SJed Brown else for (i=0; i<s; i++) t->bt[i] = At[(s-1)*s+i]; 5648a381b04SJed Brown if (b) { ierr = PetscMemcpy(t->b,b,s*sizeof(b[0]));CHKERRQ(ierr); } 5658a381b04SJed Brown else for (i=0; i<s; i++) t->b[i] = At[(s-1)*s+i]; 5668a381b04SJed Brown if (ct) { ierr = PetscMemcpy(t->ct,ct,s*sizeof(ct[0]));CHKERRQ(ierr); } 5678a381b04SJed Brown else for (i=0; i<s; i++) for (j=0,t->ct[i]=0; j<s; j++) t->ct[i] += At[i*s+j]; 5688a381b04SJed Brown if (c) { ierr = PetscMemcpy(t->c,c,s*sizeof(c[0]));CHKERRQ(ierr); } 5698a381b04SJed Brown else for (i=0; i<s; i++) for (j=0,t->c[i]=0; j<s; j++) t->c[i] += A[i*s+j]; 570e817cc15SEmil Constantinescu t->stiffly_accurate = PETSC_TRUE; 571e817cc15SEmil Constantinescu for (i=0; i<s; i++) if (t->At[(s-1)*s+i] != t->bt[i]) t->stiffly_accurate = PETSC_FALSE; 572e817cc15SEmil Constantinescu t->explicit_first_stage = PETSC_TRUE; 573e817cc15SEmil Constantinescu for (i=0; i<s; i++) if (t->At[i] != 0.0) t->explicit_first_stage = PETSC_FALSE; 574e817cc15SEmil Constantinescu /*def of FSAL can be made more precise*/ 5754e9d4bf5SJed Brown t->FSAL_implicit = (PetscBool)(t->explicit_first_stage && t->stiffly_accurate); 576108c343cSJed Brown if (bembedt) { 577108c343cSJed Brown ierr = PetscMalloc2(s,PetscReal,&t->bembedt,s,PetscReal,&t->bembed);CHKERRQ(ierr); 578108c343cSJed Brown ierr = PetscMemcpy(t->bembedt,bembedt,s*sizeof(bembedt[0]));CHKERRQ(ierr); 579108c343cSJed Brown ierr = PetscMemcpy(t->bembed,bembed ? bembed : bembedt,s*sizeof(bembed[0]));CHKERRQ(ierr); 580108c343cSJed Brown } 581108c343cSJed Brown 5824f385281SJed Brown t->pinterp = pinterp; 583cd652676SJed Brown ierr = PetscMalloc2(s*pinterp,PetscReal,&t->binterpt,s*pinterp,PetscReal,&t->binterp);CHKERRQ(ierr); 584cd652676SJed Brown ierr = PetscMemcpy(t->binterpt,binterpt,s*pinterp*sizeof(binterpt[0]));CHKERRQ(ierr); 585cd652676SJed Brown ierr = PetscMemcpy(t->binterp,binterp ? binterp : binterpt,s*pinterp*sizeof(binterpt[0]));CHKERRQ(ierr); 5868a381b04SJed Brown link->next = ARKTableauList; 5878a381b04SJed Brown ARKTableauList = link; 5888a381b04SJed Brown PetscFunctionReturn(0); 5898a381b04SJed Brown } 5908a381b04SJed Brown 5918a381b04SJed Brown #undef __FUNCT__ 592108c343cSJed Brown #define __FUNCT__ "TSEvaluateStep_ARKIMEX" 593108c343cSJed Brown /* 594108c343cSJed Brown The step completion formula is 595108c343cSJed Brown 596108c343cSJed Brown x1 = x0 - h bt^T YdotI + h b^T YdotRHS 597108c343cSJed Brown 598108c343cSJed Brown This function can be called before or after ts->vec_sol has been updated. 599108c343cSJed Brown Suppose we have a completion formula (bt,b) and an embedded formula (bet,be) of different order. 600108c343cSJed Brown We can write 601108c343cSJed Brown 602108c343cSJed Brown x1e = x0 - h bet^T YdotI + h be^T YdotRHS 603108c343cSJed Brown = x1 + h bt^T YdotI - h b^T YdotRHS - h bet^T YdotI + h be^T YdotRHS 604108c343cSJed Brown = x1 - h (bet - bt)^T YdotI + h (be - b)^T YdotRHS 605108c343cSJed Brown 606108c343cSJed Brown so we can evaluate the method with different order even after the step has been optimistically completed. 607108c343cSJed Brown */ 608108c343cSJed Brown static PetscErrorCode TSEvaluateStep_ARKIMEX(TS ts,PetscInt order,Vec X,PetscBool *done) 609108c343cSJed Brown { 610108c343cSJed Brown TS_ARKIMEX *ark = (TS_ARKIMEX*)ts->data; 611108c343cSJed Brown ARKTableau tab = ark->tableau; 612108c343cSJed Brown PetscScalar *w = ark->work; 613108c343cSJed Brown PetscReal h; 614108c343cSJed Brown PetscInt s = tab->s,j; 615108c343cSJed Brown PetscErrorCode ierr; 616108c343cSJed Brown 617108c343cSJed Brown PetscFunctionBegin; 618108c343cSJed Brown switch (ark->status) { 619108c343cSJed Brown case TS_STEP_INCOMPLETE: 620108c343cSJed Brown case TS_STEP_PENDING: 621108c343cSJed Brown h = ts->time_step; break; 622108c343cSJed Brown case TS_STEP_COMPLETE: 623108c343cSJed Brown h = ts->time_step_prev; break; 624ce94432eSBarry Smith default: SETERRQ(PetscObjectComm((PetscObject)ts),PETSC_ERR_PLIB,"Invalid TSStepStatus"); 625108c343cSJed Brown } 626108c343cSJed Brown if (order == tab->order) { 627e817cc15SEmil Constantinescu if (ark->status == TS_STEP_INCOMPLETE) { 628740132f1SEmil Constantinescu if (!ark->imex && tab->stiffly_accurate) { /* Only the stiffly accurate implicit formula is used */ 629e817cc15SEmil Constantinescu ierr = VecCopy(ark->Y[s-1],X);CHKERRQ(ierr); 630e817cc15SEmil Constantinescu } else { /* Use the standard completion formula (bt,b) */ 631108c343cSJed Brown ierr = VecCopy(ts->vec_sol,X);CHKERRQ(ierr); 632e817cc15SEmil Constantinescu for (j=0; j<s; j++) w[j] = h*tab->bt[j]; 633108c343cSJed Brown ierr = VecMAXPY(X,s,w,ark->YdotI);CHKERRQ(ierr); 634e817cc15SEmil Constantinescu if (ark->imex) { /* Method is IMEX, complete the explicit formula */ 635108c343cSJed Brown for (j=0; j<s; j++) w[j] = h*tab->b[j]; 636108c343cSJed Brown ierr = VecMAXPY(X,s,w,ark->YdotRHS);CHKERRQ(ierr); 637e817cc15SEmil Constantinescu } 638e817cc15SEmil Constantinescu } 639108c343cSJed Brown } else {ierr = VecCopy(ts->vec_sol,X);CHKERRQ(ierr);} 640108c343cSJed Brown if (done) *done = PETSC_TRUE; 641108c343cSJed Brown PetscFunctionReturn(0); 642108c343cSJed Brown } else if (order == tab->order-1) { 643108c343cSJed Brown if (!tab->bembedt) goto unavailable; 644108c343cSJed Brown if (ark->status == TS_STEP_INCOMPLETE) { /* Complete with the embedded method (bet,be) */ 645108c343cSJed Brown ierr = VecCopy(ts->vec_sol,X);CHKERRQ(ierr); 646e817cc15SEmil Constantinescu for (j=0; j<s; j++) w[j] = h*tab->bembedt[j]; 647108c343cSJed Brown ierr = VecMAXPY(X,s,w,ark->YdotI);CHKERRQ(ierr); 648108c343cSJed Brown for (j=0; j<s; j++) w[j] = h*tab->bembed[j]; 649108c343cSJed Brown ierr = VecMAXPY(X,s,w,ark->YdotRHS);CHKERRQ(ierr); 650108c343cSJed Brown } else { /* Rollback and re-complete using (bet-be,be-b) */ 651108c343cSJed Brown ierr = VecCopy(ts->vec_sol,X);CHKERRQ(ierr); 652e817cc15SEmil Constantinescu for (j=0; j<s; j++) w[j] = h*(tab->bembedt[j] - tab->bt[j]); 653108c343cSJed Brown ierr = VecMAXPY(X,tab->s,w,ark->YdotI);CHKERRQ(ierr); 654108c343cSJed Brown for (j=0; j<s; j++) w[j] = h*(tab->bembed[j] - tab->b[j]); 655108c343cSJed Brown ierr = VecMAXPY(X,s,w,ark->YdotRHS);CHKERRQ(ierr); 656108c343cSJed Brown } 657108c343cSJed Brown if (done) *done = PETSC_TRUE; 658108c343cSJed Brown PetscFunctionReturn(0); 659108c343cSJed Brown } 660108c343cSJed Brown unavailable: 661108c343cSJed Brown if (done) *done = PETSC_FALSE; 662ce94432eSBarry Smith else SETERRQ3(PetscObjectComm((PetscObject)ts),PETSC_ERR_SUP,"ARKIMEX '%s' of order %D cannot evaluate step at order %D",tab->name,tab->order,order); 663108c343cSJed Brown PetscFunctionReturn(0); 664108c343cSJed Brown } 665108c343cSJed Brown 666108c343cSJed Brown #undef __FUNCT__ 6678a381b04SJed Brown #define __FUNCT__ "TSStep_ARKIMEX" 6688a381b04SJed Brown static PetscErrorCode TSStep_ARKIMEX(TS ts) 6698a381b04SJed Brown { 6708a381b04SJed Brown TS_ARKIMEX *ark = (TS_ARKIMEX*)ts->data; 6718a381b04SJed Brown ARKTableau tab = ark->tableau; 6728a381b04SJed Brown const PetscInt s = tab->s; 6738a381b04SJed Brown const PetscReal *At = tab->At,*A = tab->A,*bt = tab->bt,*b = tab->b,*ct = tab->ct,*c = tab->c; 674406d0ec2SJed Brown PetscScalar *w = ark->work; 675e817cc15SEmil Constantinescu Vec *Y = ark->Y,*YdotI = ark->YdotI,*YdotRHS = ark->YdotRHS,Ydot = ark->Ydot,Ydot0 = ark->Ydot0,W = ark->Work,Z = ark->Z; 676108c343cSJed Brown TSAdapt adapt; 6778a381b04SJed Brown SNES snes; 678108c343cSJed Brown PetscInt i,j,its,lits,reject,next_scheme; 679cdbf8f93SLisandro Dalcin PetscReal next_time_step; 680108c343cSJed Brown PetscReal t; 681108c343cSJed Brown PetscBool accept; 6828a381b04SJed Brown PetscErrorCode ierr; 6838a381b04SJed Brown 6848a381b04SJed Brown PetscFunctionBegin; 685e817cc15SEmil Constantinescu if (ts->equation_type >= TS_EQ_IMPLICIT && tab->explicit_first_stage) { 686e817cc15SEmil Constantinescu PetscReal valid_time; 687e817cc15SEmil Constantinescu PetscBool isvalid; 688e817cc15SEmil Constantinescu ierr = PetscObjectComposedDataGetReal((PetscObject)ts->vec_sol, 689e817cc15SEmil Constantinescu explicit_stage_time_id, 690e817cc15SEmil Constantinescu valid_time, 691e817cc15SEmil Constantinescu isvalid); 692e817cc15SEmil Constantinescu CHKERRQ(ierr); 693e817cc15SEmil Constantinescu if (!isvalid || valid_time != ts->ptime) { 694e817cc15SEmil Constantinescu TS ts_start; 695e817cc15SEmil Constantinescu SNES snes_start; 696740132f1SEmil Constantinescu DM dm; 697740132f1SEmil Constantinescu PetscReal atol; 698740132f1SEmil Constantinescu Vec vatol; 699740132f1SEmil Constantinescu PetscReal rtol; 700740132f1SEmil Constantinescu Vec vrtol; 70119436ca2SJed Brown 70219436ca2SJed Brown ierr = TSCreate(PETSC_COMM_WORLD,&ts_start);CHKERRQ(ierr); 70319436ca2SJed Brown ierr = TSGetSNES(ts,&snes_start);CHKERRQ(ierr); 70419436ca2SJed Brown ierr = TSSetSNES(ts_start,snes_start);CHKERRQ(ierr); 705e817cc15SEmil Constantinescu ierr = TSGetDM(ts,&dm);CHKERRQ(ierr); 706740132f1SEmil Constantinescu ierr = TSSetDM(ts_start,dm);CHKERRQ(ierr); 707bbd56ea5SKarl Rupp 708e817cc15SEmil Constantinescu ts_start->adapt=ts->adapt; 709740132f1SEmil Constantinescu PetscObjectReference((PetscObject)ts_start->adapt); 710bbd56ea5SKarl Rupp 711e817cc15SEmil Constantinescu ierr = TSSetSolution(ts_start,ts->vec_sol);CHKERRQ(ierr); 712e817cc15SEmil Constantinescu ierr = TSSetTime(ts_start,ts->ptime);CHKERRQ(ierr); 713e817cc15SEmil Constantinescu ierr = TSSetDuration(ts_start,1,ts->time_step);CHKERRQ(ierr); 714740132f1SEmil Constantinescu ierr = TSSetTimeStep(ts_start,ts->time_step);CHKERRQ(ierr); 715e817cc15SEmil Constantinescu ierr = TSSetType(ts_start,TSARKIMEX);CHKERRQ(ierr); 716740132f1SEmil Constantinescu ierr = TSARKIMEXSetFullyImplicit(ts_start,PETSC_TRUE);CHKERRQ(ierr); 717e817cc15SEmil Constantinescu ierr = TSARKIMEXSetType(ts_start,TSARKIMEX1BEE);CHKERRQ(ierr); 718e817cc15SEmil Constantinescu ierr = TSSetEquationType(ts_start,ts->equation_type);CHKERRQ(ierr); 719740132f1SEmil Constantinescu ierr = TSGetTolerances(ts,&atol,&vatol,&rtol,&vrtol);CHKERRQ(ierr); 720740132f1SEmil Constantinescu ierr = TSSetTolerances(ts_start,atol,vatol,rtol,vrtol);CHKERRQ(ierr); 721e817cc15SEmil Constantinescu ierr = TSSolve(ts_start,ts->vec_sol);CHKERRQ(ierr); 722e817cc15SEmil Constantinescu ierr = TSGetTime(ts_start,&ts->ptime);CHKERRQ(ierr); 723bbd56ea5SKarl Rupp 724740132f1SEmil Constantinescu ts->time_step = ts_start->time_step; 725740132f1SEmil Constantinescu ts->steps++; 726e817cc15SEmil Constantinescu ierr = VecCopy(((TS_ARKIMEX*)ts_start->data)->Ydot0,Ydot0);CHKERRQ(ierr); 727740132f1SEmil Constantinescu ierr = TSDestroy(&ts_start);CHKERRQ(ierr); 728740132f1SEmil Constantinescu ierr = TSSetSNES(ts,snes_start);CHKERRQ(ierr); 729e817cc15SEmil Constantinescu } 730e817cc15SEmil Constantinescu } 731e817cc15SEmil Constantinescu 7328a381b04SJed Brown ierr = TSGetSNES(ts,&snes);CHKERRQ(ierr); 733cdbf8f93SLisandro Dalcin next_time_step = ts->time_step; 7348a381b04SJed Brown t = ts->ptime; 735108c343cSJed Brown accept = PETSC_TRUE; 736108c343cSJed Brown ark->status = TS_STEP_INCOMPLETE; 7378a381b04SJed Brown 738e817cc15SEmil Constantinescu 73997335746SJed Brown for (reject=0; reject<ts->max_reject && !ts->reason; reject++,ts->reject++) { 740108c343cSJed Brown PetscReal h = ts->time_step; 741b8123daeSJed Brown ierr = TSPreStep(ts);CHKERRQ(ierr); 7428a381b04SJed Brown for (i=0; i<s; i++) { 7438a381b04SJed Brown if (At[i*s+i] == 0) { /* This stage is explicit */ 7448a381b04SJed Brown ierr = VecCopy(ts->vec_sol,Y[i]);CHKERRQ(ierr); 745e817cc15SEmil Constantinescu for (j=0; j<i; j++) w[j] = h*At[i*s+j]; 7468a381b04SJed Brown ierr = VecMAXPY(Y[i],i,w,YdotI);CHKERRQ(ierr); 7478a381b04SJed Brown for (j=0; j<i; j++) w[j] = h*A[i*s+j]; 7488a381b04SJed Brown ierr = VecMAXPY(Y[i],i,w,YdotRHS);CHKERRQ(ierr); 7498a381b04SJed Brown } else { 7508a381b04SJed Brown ark->stage_time = t + h*ct[i]; 751b296d7d5SJed Brown ark->scoeff = 1./At[i*s+i]; 752b8123daeSJed Brown ierr = TSPreStage(ts,ark->stage_time);CHKERRQ(ierr); 7538a381b04SJed Brown /* Affine part */ 7548a381b04SJed Brown ierr = VecZeroEntries(W);CHKERRQ(ierr); 7558a381b04SJed Brown for (j=0; j<i; j++) w[j] = h*A[i*s+j]; 7568a381b04SJed Brown ierr = VecMAXPY(W,i,w,YdotRHS);CHKERRQ(ierr); 757b296d7d5SJed Brown ierr = VecScale(W, ark->scoeff/h);CHKERRQ(ierr); 758f16577ceSEmil Constantinescu 7598a381b04SJed Brown /* Ydot = shift*(Y-Z) */ 7608a381b04SJed Brown ierr = VecCopy(ts->vec_sol,Z);CHKERRQ(ierr); 761e817cc15SEmil Constantinescu for (j=0; j<i; j++) w[j] = h*At[i*s+j]; 7624f385281SJed Brown ierr = VecMAXPY(Z,i,w,YdotI);CHKERRQ(ierr); 763f16577ceSEmil Constantinescu 7648a381b04SJed Brown /* Initial guess taken from last stage */ 7658a381b04SJed Brown ierr = VecCopy(i>0 ? Y[i-1] : ts->vec_sol,Y[i]);CHKERRQ(ierr); 7668a381b04SJed Brown ierr = SNESSolve(snes,W,Y[i]);CHKERRQ(ierr); 767e817cc15SEmil Constantinescu ierr = (ts->ops->snesfunction)(snes,Y[i],W,ts);CHKERRQ(ierr); 7688a381b04SJed Brown ierr = SNESGetIterationNumber(snes,&its);CHKERRQ(ierr); 7698a381b04SJed Brown ierr = SNESGetLinearSolveIterations(snes,&lits);CHKERRQ(ierr); 7705ef26d82SJed Brown ts->snes_its += its; ts->ksp_its += lits; 771ad6bc421SBarry Smith ierr = TSGetTSAdapt(ts,&adapt);CHKERRQ(ierr); 77297335746SJed Brown ierr = TSAdaptCheckStage(adapt,ts,&accept);CHKERRQ(ierr); 77397335746SJed Brown if (!accept) goto reject_step; 7748a381b04SJed Brown } 775e817cc15SEmil Constantinescu if (ts->equation_type>=TS_EQ_IMPLICIT) { 776e817cc15SEmil Constantinescu if (i==0 && tab->explicit_first_stage) { 777e817cc15SEmil Constantinescu ierr = VecCopy(Ydot0,YdotI[0]);CHKERRQ(ierr); 778e817cc15SEmil Constantinescu } else { 779e817cc15SEmil Constantinescu ierr = VecAXPBYPCZ(YdotI[i],-ark->scoeff/h,ark->scoeff/h,0,Z,Y[i]);CHKERRQ(ierr); /* Ydot = shift*(X-Z) */ 780e817cc15SEmil Constantinescu } 781e817cc15SEmil Constantinescu } else { 7828a381b04SJed Brown ierr = VecZeroEntries(Ydot);CHKERRQ(ierr); 7834cc180ffSJed Brown ierr = TSComputeIFunction(ts,t+h*ct[i],Y[i],Ydot,YdotI[i],ark->imex);CHKERRQ(ierr); 784e817cc15SEmil Constantinescu ierr = VecScale(YdotI[i], -1.0);CHKERRQ(ierr); 7854cc180ffSJed Brown if (ark->imex) { 7868a381b04SJed Brown ierr = TSComputeRHSFunction(ts,t+h*c[i],Y[i],YdotRHS[i]);CHKERRQ(ierr); 7874cc180ffSJed Brown } else { 7884cc180ffSJed Brown ierr = VecZeroEntries(YdotRHS[i]);CHKERRQ(ierr); 7894cc180ffSJed Brown } 7908a381b04SJed Brown } 791e817cc15SEmil Constantinescu } 7920298fd71SBarry Smith ierr = TSEvaluateStep(ts,tab->order,ts->vec_sol,NULL);CHKERRQ(ierr); 793108c343cSJed Brown ark->status = TS_STEP_PENDING; 7948a381b04SJed Brown 795108c343cSJed Brown /* Register only the current method as a candidate because we're not supporting multiple candidates yet. */ 796ad6bc421SBarry Smith ierr = TSGetTSAdapt(ts,&adapt);CHKERRQ(ierr); 797108c343cSJed Brown ierr = TSAdaptCandidatesClear(adapt);CHKERRQ(ierr); 798108c343cSJed Brown ierr = TSAdaptCandidateAdd(adapt,tab->name,tab->order,1,tab->ccfl,1.*tab->s,PETSC_TRUE);CHKERRQ(ierr); 799108c343cSJed Brown ierr = TSAdaptChoose(adapt,ts,ts->time_step,&next_scheme,&next_time_step,&accept);CHKERRQ(ierr); 800108c343cSJed Brown if (accept) { 801108c343cSJed Brown /* ignore next_scheme for now */ 8028a381b04SJed Brown ts->ptime += ts->time_step; 803cdbf8f93SLisandro Dalcin ts->time_step = next_time_step; 8048a381b04SJed Brown ts->steps++; 805e817cc15SEmil Constantinescu if (ts->equation_type>=TS_EQ_IMPLICIT) { /* save the initial slope for the next step*/ 806e817cc15SEmil Constantinescu ierr = VecCopy(YdotI[s-1],Ydot0);CHKERRQ(ierr); 807e817cc15SEmil Constantinescu } 808108c343cSJed Brown ark->status = TS_STEP_COMPLETE; 809e817cc15SEmil Constantinescu if (tab->explicit_first_stage) { 810e817cc15SEmil Constantinescu ierr = PetscObjectComposedDataSetReal((PetscObject)ts->vec_sol,explicit_stage_time_id,ts->ptime);CHKERRQ(ierr); 811e817cc15SEmil Constantinescu } 812e817cc15SEmil Constantinescu 813108c343cSJed Brown break; 814108c343cSJed Brown } else { /* Roll back the current step */ 8152c0c504eSEmil Constantinescu for (j=0; j<s; j++) w[j] = -h*bt[j]; 816108c343cSJed Brown ierr = VecMAXPY(ts->vec_sol,s,w,ark->YdotI);CHKERRQ(ierr); 8172c0c504eSEmil Constantinescu for (j=0; j<s; j++) w[j] = -h*b[j]; 818108c343cSJed Brown ierr = VecMAXPY(ts->vec_sol,s,w,ark->YdotRHS);CHKERRQ(ierr); 819108c343cSJed Brown ts->time_step = next_time_step; 820108c343cSJed Brown ark->status = TS_STEP_INCOMPLETE; 821108c343cSJed Brown } 822476b6736SJed Brown reject_step: continue; 823108c343cSJed Brown } 824b2ce242eSJed Brown if (ark->status != TS_STEP_COMPLETE && !ts->reason) ts->reason = TS_DIVERGED_STEP_REJECTED; 8258a381b04SJed Brown PetscFunctionReturn(0); 8268a381b04SJed Brown } 8278a381b04SJed Brown 828cd652676SJed Brown #undef __FUNCT__ 829cd652676SJed Brown #define __FUNCT__ "TSInterpolate_ARKIMEX" 830cd652676SJed Brown static PetscErrorCode TSInterpolate_ARKIMEX(TS ts,PetscReal itime,Vec X) 831cd652676SJed Brown { 832cd652676SJed Brown TS_ARKIMEX *ark = (TS_ARKIMEX*)ts->data; 8334f385281SJed Brown PetscInt s = ark->tableau->s,pinterp = ark->tableau->pinterp,i,j; 834108c343cSJed Brown PetscReal h; 835108c343cSJed Brown PetscReal tt,t; 836cd652676SJed Brown PetscScalar *bt,*b; 837cd652676SJed Brown const PetscReal *Bt = ark->tableau->binterpt,*B = ark->tableau->binterp; 838cd652676SJed Brown PetscErrorCode ierr; 839cd652676SJed Brown 840cd652676SJed Brown PetscFunctionBegin; 841ce94432eSBarry Smith if (!Bt || !B) SETERRQ1(PetscObjectComm((PetscObject)ts),PETSC_ERR_SUP,"TSARKIMEX %s does not have an interpolation formula",ark->tableau->name); 842108c343cSJed Brown switch (ark->status) { 843108c343cSJed Brown case TS_STEP_INCOMPLETE: 844108c343cSJed Brown case TS_STEP_PENDING: 845108c343cSJed Brown h = ts->time_step; 846108c343cSJed Brown t = (itime - ts->ptime)/h; 847108c343cSJed Brown break; 848108c343cSJed Brown case TS_STEP_COMPLETE: 849108c343cSJed Brown h = ts->time_step_prev; 850108c343cSJed Brown t = (itime - ts->ptime)/h + 1; /* In the interval [0,1] */ 851108c343cSJed Brown break; 852ce94432eSBarry Smith default: SETERRQ(PetscObjectComm((PetscObject)ts),PETSC_ERR_PLIB,"Invalid TSStepStatus"); 853108c343cSJed Brown } 854cd652676SJed Brown ierr = PetscMalloc2(s,PetscScalar,&bt,s,PetscScalar,&b);CHKERRQ(ierr); 855cd652676SJed Brown for (i=0; i<s; i++) bt[i] = b[i] = 0; 8564f385281SJed Brown for (j=0,tt=t; j<pinterp; j++,tt*=t) { 857cd652676SJed Brown for (i=0; i<s; i++) { 858108c343cSJed Brown bt[i] += h * Bt[i*pinterp+j] * tt * -1.0; 859108c343cSJed Brown b[i] += h * B[i*pinterp+j] * tt; 860cd652676SJed Brown } 861cd652676SJed Brown } 862ce94432eSBarry Smith if (ark->tableau->At[0*s+0] != 0.0) SETERRQ(PetscObjectComm((PetscObject)ts),PETSC_ERR_SUP,"First stage not explicit so starting stage not saved"); 863cd652676SJed Brown ierr = VecCopy(ark->Y[0],X);CHKERRQ(ierr); 864cd652676SJed Brown ierr = VecMAXPY(X,s,bt,ark->YdotI);CHKERRQ(ierr); 865cd652676SJed Brown ierr = VecMAXPY(X,s,b,ark->YdotRHS);CHKERRQ(ierr); 866cd652676SJed Brown ierr = PetscFree2(bt,b);CHKERRQ(ierr); 867cd652676SJed Brown PetscFunctionReturn(0); 868cd652676SJed Brown } 869cd652676SJed Brown 8708a381b04SJed Brown /*------------------------------------------------------------*/ 8718a381b04SJed Brown #undef __FUNCT__ 8728a381b04SJed Brown #define __FUNCT__ "TSReset_ARKIMEX" 8738a381b04SJed Brown static PetscErrorCode TSReset_ARKIMEX(TS ts) 8748a381b04SJed Brown { 8758a381b04SJed Brown TS_ARKIMEX *ark = (TS_ARKIMEX*)ts->data; 8768a381b04SJed Brown PetscInt s; 8778a381b04SJed Brown PetscErrorCode ierr; 8788a381b04SJed Brown 8798a381b04SJed Brown PetscFunctionBegin; 8808a381b04SJed Brown if (!ark->tableau) PetscFunctionReturn(0); 8818a381b04SJed Brown s = ark->tableau->s; 8828a381b04SJed Brown ierr = VecDestroyVecs(s,&ark->Y);CHKERRQ(ierr); 8838a381b04SJed Brown ierr = VecDestroyVecs(s,&ark->YdotI);CHKERRQ(ierr); 8848a381b04SJed Brown ierr = VecDestroyVecs(s,&ark->YdotRHS);CHKERRQ(ierr); 8858a381b04SJed Brown ierr = VecDestroy(&ark->Ydot);CHKERRQ(ierr); 8868a381b04SJed Brown ierr = VecDestroy(&ark->Work);CHKERRQ(ierr); 887e817cc15SEmil Constantinescu ierr = VecDestroy(&ark->Ydot0);CHKERRQ(ierr); 8888a381b04SJed Brown ierr = VecDestroy(&ark->Z);CHKERRQ(ierr); 8898a381b04SJed Brown ierr = PetscFree(ark->work);CHKERRQ(ierr); 8908a381b04SJed Brown PetscFunctionReturn(0); 8918a381b04SJed Brown } 8928a381b04SJed Brown 8938a381b04SJed Brown #undef __FUNCT__ 8948a381b04SJed Brown #define __FUNCT__ "TSDestroy_ARKIMEX" 8958a381b04SJed Brown static PetscErrorCode TSDestroy_ARKIMEX(TS ts) 8968a381b04SJed Brown { 8978a381b04SJed Brown PetscErrorCode ierr; 8988a381b04SJed Brown 8998a381b04SJed Brown PetscFunctionBegin; 9008a381b04SJed Brown ierr = TSReset_ARKIMEX(ts);CHKERRQ(ierr); 9018a381b04SJed Brown ierr = PetscFree(ts->data);CHKERRQ(ierr); 90200de8ff0SBarry Smith ierr = PetscObjectComposeFunction((PetscObject)ts,"TSARKIMEXGetType_C","",NULL);CHKERRQ(ierr); 90300de8ff0SBarry Smith ierr = PetscObjectComposeFunction((PetscObject)ts,"TSARKIMEXSetType_C","",NULL);CHKERRQ(ierr); 90400de8ff0SBarry Smith ierr = PetscObjectComposeFunction((PetscObject)ts,"TSARKIMEXSetFullyImplicit_C","",NULL);CHKERRQ(ierr); 9058a381b04SJed Brown PetscFunctionReturn(0); 9068a381b04SJed Brown } 9078a381b04SJed Brown 908d5e6173cSPeter Brune 909d5e6173cSPeter Brune #undef __FUNCT__ 910d5e6173cSPeter Brune #define __FUNCT__ "TSARKIMEXGetVecs" 911d5e6173cSPeter Brune static PetscErrorCode TSARKIMEXGetVecs(TS ts,DM dm,Vec *Z,Vec *Ydot) 912d5e6173cSPeter Brune { 913d5e6173cSPeter Brune TS_ARKIMEX *ax = (TS_ARKIMEX*)ts->data; 914d5e6173cSPeter Brune PetscErrorCode ierr; 915d5e6173cSPeter Brune 916d5e6173cSPeter Brune PetscFunctionBegin; 917d5e6173cSPeter Brune if (Z) { 918d5e6173cSPeter Brune if (dm && dm != ts->dm) { 919d5e6173cSPeter Brune ierr = DMGetNamedGlobalVector(dm,"TSARKIMEX_Z",Z);CHKERRQ(ierr); 920d5e6173cSPeter Brune } else *Z = ax->Z; 921d5e6173cSPeter Brune } 922d5e6173cSPeter Brune if (Ydot) { 923d5e6173cSPeter Brune if (dm && dm != ts->dm) { 924d5e6173cSPeter Brune ierr = DMGetNamedGlobalVector(dm,"TSARKIMEX_Ydot",Ydot);CHKERRQ(ierr); 925d5e6173cSPeter Brune } else *Ydot = ax->Ydot; 926d5e6173cSPeter Brune } 927d5e6173cSPeter Brune PetscFunctionReturn(0); 928d5e6173cSPeter Brune } 929d5e6173cSPeter Brune 930d5e6173cSPeter Brune 931d5e6173cSPeter Brune #undef __FUNCT__ 932d5e6173cSPeter Brune #define __FUNCT__ "TSARKIMEXRestoreVecs" 933d5e6173cSPeter Brune static PetscErrorCode TSARKIMEXRestoreVecs(TS ts,DM dm,Vec *Z,Vec *Ydot) 934d5e6173cSPeter Brune { 935d5e6173cSPeter Brune PetscErrorCode ierr; 936d5e6173cSPeter Brune 937d5e6173cSPeter Brune PetscFunctionBegin; 938d5e6173cSPeter Brune if (Z) { 939d5e6173cSPeter Brune if (dm && dm != ts->dm) { 940d5e6173cSPeter Brune ierr = DMRestoreNamedGlobalVector(dm,"TSARKIMEX_Z",Z);CHKERRQ(ierr); 941d5e6173cSPeter Brune } 942d5e6173cSPeter Brune } 943d5e6173cSPeter Brune if (Ydot) { 944d5e6173cSPeter Brune if (dm && dm != ts->dm) { 945d5e6173cSPeter Brune ierr = DMRestoreNamedGlobalVector(dm,"TSARKIMEX_Ydot",Ydot);CHKERRQ(ierr); 946d5e6173cSPeter Brune } 947d5e6173cSPeter Brune } 948d5e6173cSPeter Brune PetscFunctionReturn(0); 949d5e6173cSPeter Brune } 950d5e6173cSPeter Brune 9518a381b04SJed Brown /* 9528a381b04SJed Brown This defines the nonlinear equation that is to be solved with SNES 9538a381b04SJed Brown G(U) = F[t0+Theta*dt, U, (U-U0)*shift] = 0 9548a381b04SJed Brown */ 9558a381b04SJed Brown #undef __FUNCT__ 9568a381b04SJed Brown #define __FUNCT__ "SNESTSFormFunction_ARKIMEX" 9578a381b04SJed Brown static PetscErrorCode SNESTSFormFunction_ARKIMEX(SNES snes,Vec X,Vec F,TS ts) 9588a381b04SJed Brown { 9598a381b04SJed Brown TS_ARKIMEX *ark = (TS_ARKIMEX*)ts->data; 960d5e6173cSPeter Brune DM dm,dmsave; 961d5e6173cSPeter Brune Vec Z,Ydot; 962b296d7d5SJed Brown PetscReal shift = ark->scoeff / ts->time_step; 9638a381b04SJed Brown PetscErrorCode ierr; 9648a381b04SJed Brown 9658a381b04SJed Brown PetscFunctionBegin; 966d5e6173cSPeter Brune ierr = SNESGetDM(snes,&dm);CHKERRQ(ierr); 967d5e6173cSPeter Brune ierr = TSARKIMEXGetVecs(ts,dm,&Z,&Ydot);CHKERRQ(ierr); 968b296d7d5SJed Brown ierr = VecAXPBYPCZ(Ydot,-shift,shift,0,Z,X);CHKERRQ(ierr); /* Ydot = shift*(X-Z) */ 969d5e6173cSPeter Brune dmsave = ts->dm; 970d5e6173cSPeter Brune ts->dm = dm; 971740132f1SEmil Constantinescu 972d5e6173cSPeter Brune ierr = TSComputeIFunction(ts,ark->stage_time,X,Ydot,F,ark->imex);CHKERRQ(ierr); 973e817cc15SEmil Constantinescu 974d5e6173cSPeter Brune ts->dm = dmsave; 975d5e6173cSPeter Brune ierr = TSARKIMEXRestoreVecs(ts,dm,&Z,&Ydot);CHKERRQ(ierr); 9768a381b04SJed Brown PetscFunctionReturn(0); 9778a381b04SJed Brown } 9788a381b04SJed Brown 9798a381b04SJed Brown #undef __FUNCT__ 9808a381b04SJed Brown #define __FUNCT__ "SNESTSFormJacobian_ARKIMEX" 9818a381b04SJed Brown static PetscErrorCode SNESTSFormJacobian_ARKIMEX(SNES snes,Vec X,Mat *A,Mat *B,MatStructure *str,TS ts) 9828a381b04SJed Brown { 9838a381b04SJed Brown TS_ARKIMEX *ark = (TS_ARKIMEX*)ts->data; 984d5e6173cSPeter Brune DM dm,dmsave; 985d5e6173cSPeter Brune Vec Ydot; 986b296d7d5SJed Brown PetscReal shift = ark->scoeff / ts->time_step; 9878a381b04SJed Brown PetscErrorCode ierr; 9888a381b04SJed Brown 9898a381b04SJed Brown PetscFunctionBegin; 990d5e6173cSPeter Brune ierr = SNESGetDM(snes,&dm);CHKERRQ(ierr); 9910298fd71SBarry Smith ierr = TSARKIMEXGetVecs(ts,dm,NULL,&Ydot);CHKERRQ(ierr); 9928a381b04SJed Brown /* ark->Ydot has already been computed in SNESTSFormFunction_ARKIMEX (SNES guarantees this) */ 993d5e6173cSPeter Brune dmsave = ts->dm; 994d5e6173cSPeter Brune ts->dm = dm; 995740132f1SEmil Constantinescu 996b296d7d5SJed Brown ierr = TSComputeIJacobian(ts,ark->stage_time,X,Ydot,shift,A,B,str,ark->imex);CHKERRQ(ierr); 997740132f1SEmil Constantinescu 998d5e6173cSPeter Brune ts->dm = dmsave; 9990298fd71SBarry Smith ierr = TSARKIMEXRestoreVecs(ts,dm,NULL,&Ydot);CHKERRQ(ierr); 1000d5e6173cSPeter Brune PetscFunctionReturn(0); 1001d5e6173cSPeter Brune } 1002d5e6173cSPeter Brune 1003d5e6173cSPeter Brune #undef __FUNCT__ 1004d5e6173cSPeter Brune #define __FUNCT__ "DMCoarsenHook_TSARKIMEX" 1005d5e6173cSPeter Brune static PetscErrorCode DMCoarsenHook_TSARKIMEX(DM fine,DM coarse,void *ctx) 1006d5e6173cSPeter Brune { 1007d5e6173cSPeter Brune PetscFunctionBegin; 1008d5e6173cSPeter Brune PetscFunctionReturn(0); 1009d5e6173cSPeter Brune } 1010d5e6173cSPeter Brune 1011d5e6173cSPeter Brune #undef __FUNCT__ 1012d5e6173cSPeter Brune #define __FUNCT__ "DMRestrictHook_TSARKIMEX" 1013d5e6173cSPeter Brune static PetscErrorCode DMRestrictHook_TSARKIMEX(DM fine,Mat restrct,Vec rscale,Mat inject,DM coarse,void *ctx) 1014d5e6173cSPeter Brune { 1015d5e6173cSPeter Brune TS ts = (TS)ctx; 1016d5e6173cSPeter Brune PetscErrorCode ierr; 1017d5e6173cSPeter Brune Vec Z,Z_c; 1018d5e6173cSPeter Brune 1019d5e6173cSPeter Brune PetscFunctionBegin; 10200298fd71SBarry Smith ierr = TSARKIMEXGetVecs(ts,fine,&Z,NULL);CHKERRQ(ierr); 10210298fd71SBarry Smith ierr = TSARKIMEXGetVecs(ts,coarse,&Z_c,NULL);CHKERRQ(ierr); 1022d5e6173cSPeter Brune ierr = MatRestrict(restrct,Z,Z_c);CHKERRQ(ierr); 1023d5e6173cSPeter Brune ierr = VecPointwiseMult(Z_c,rscale,Z_c);CHKERRQ(ierr); 10240298fd71SBarry Smith ierr = TSARKIMEXRestoreVecs(ts,fine,&Z,NULL);CHKERRQ(ierr); 10250298fd71SBarry Smith ierr = TSARKIMEXRestoreVecs(ts,coarse,&Z_c,NULL);CHKERRQ(ierr); 10268a381b04SJed Brown PetscFunctionReturn(0); 10278a381b04SJed Brown } 10288a381b04SJed Brown 1029cdb298fcSPeter Brune 1030cdb298fcSPeter Brune #undef __FUNCT__ 1031cdb298fcSPeter Brune #define __FUNCT__ "DMSubDomainHook_TSARKIMEX" 1032cdb298fcSPeter Brune static PetscErrorCode DMSubDomainHook_TSARKIMEX(DM dm,DM subdm,void *ctx) 1033cdb298fcSPeter Brune { 1034cdb298fcSPeter Brune PetscFunctionBegin; 1035cdb298fcSPeter Brune PetscFunctionReturn(0); 1036cdb298fcSPeter Brune } 1037cdb298fcSPeter Brune 1038cdb298fcSPeter Brune #undef __FUNCT__ 1039cdb298fcSPeter Brune #define __FUNCT__ "DMSubDomainRestrictHook_TSARKIMEX" 1040cdb298fcSPeter Brune static PetscErrorCode DMSubDomainRestrictHook_TSARKIMEX(DM dm,VecScatter gscat,VecScatter lscat,DM subdm,void *ctx) 1041cdb298fcSPeter Brune { 1042cdb298fcSPeter Brune TS ts = (TS)ctx; 1043cdb298fcSPeter Brune PetscErrorCode ierr; 1044cdb298fcSPeter Brune Vec Z,Z_c; 1045cdb298fcSPeter Brune 1046cdb298fcSPeter Brune PetscFunctionBegin; 10470298fd71SBarry Smith ierr = TSARKIMEXGetVecs(ts,dm,&Z,NULL);CHKERRQ(ierr); 10480298fd71SBarry Smith ierr = TSARKIMEXGetVecs(ts,subdm,&Z_c,NULL);CHKERRQ(ierr); 1049cdb298fcSPeter Brune 1050cdb298fcSPeter Brune ierr = VecScatterBegin(gscat,Z,Z_c,INSERT_VALUES,SCATTER_FORWARD);CHKERRQ(ierr); 1051cdb298fcSPeter Brune ierr = VecScatterEnd(gscat,Z,Z_c,INSERT_VALUES,SCATTER_FORWARD);CHKERRQ(ierr); 1052cdb298fcSPeter Brune 10530298fd71SBarry Smith ierr = TSARKIMEXRestoreVecs(ts,dm,&Z,NULL);CHKERRQ(ierr); 10540298fd71SBarry Smith ierr = TSARKIMEXRestoreVecs(ts,subdm,&Z_c,NULL);CHKERRQ(ierr); 1055cdb298fcSPeter Brune PetscFunctionReturn(0); 1056cdb298fcSPeter Brune } 1057cdb298fcSPeter Brune 10588a381b04SJed Brown #undef __FUNCT__ 10598a381b04SJed Brown #define __FUNCT__ "TSSetUp_ARKIMEX" 10608a381b04SJed Brown static PetscErrorCode TSSetUp_ARKIMEX(TS ts) 10618a381b04SJed Brown { 10628a381b04SJed Brown TS_ARKIMEX *ark = (TS_ARKIMEX*)ts->data; 1063f2c2a1b9SBarry Smith ARKTableau tab; 1064f2c2a1b9SBarry Smith PetscInt s; 10658a381b04SJed Brown PetscErrorCode ierr; 1066d5e6173cSPeter Brune DM dm; 1067f9c1d6abSBarry Smith 10688a381b04SJed Brown PetscFunctionBegin; 10698a381b04SJed Brown if (!ark->tableau) { 1070e24355feSJed Brown ierr = TSARKIMEXSetType(ts,TSARKIMEXDefault);CHKERRQ(ierr); 10718a381b04SJed Brown } 1072f2c2a1b9SBarry Smith tab = ark->tableau; 1073f2c2a1b9SBarry Smith s = tab->s; 10748a381b04SJed Brown ierr = VecDuplicateVecs(ts->vec_sol,s,&ark->Y);CHKERRQ(ierr); 10758a381b04SJed Brown ierr = VecDuplicateVecs(ts->vec_sol,s,&ark->YdotI);CHKERRQ(ierr); 10768a381b04SJed Brown ierr = VecDuplicateVecs(ts->vec_sol,s,&ark->YdotRHS);CHKERRQ(ierr); 10778a381b04SJed Brown ierr = VecDuplicate(ts->vec_sol,&ark->Ydot);CHKERRQ(ierr); 10788a381b04SJed Brown ierr = VecDuplicate(ts->vec_sol,&ark->Work);CHKERRQ(ierr); 1079e817cc15SEmil Constantinescu ierr = VecDuplicate(ts->vec_sol,&ark->Ydot0);CHKERRQ(ierr); 10808a381b04SJed Brown ierr = VecDuplicate(ts->vec_sol,&ark->Z);CHKERRQ(ierr); 10818a381b04SJed Brown ierr = PetscMalloc(s*sizeof(ark->work[0]),&ark->work);CHKERRQ(ierr); 1082d5e6173cSPeter Brune ierr = TSGetDM(ts,&dm);CHKERRQ(ierr); 1083d5e6173cSPeter Brune if (dm) { 1084d5e6173cSPeter Brune ierr = DMCoarsenHookAdd(dm,DMCoarsenHook_TSARKIMEX,DMRestrictHook_TSARKIMEX,ts);CHKERRQ(ierr); 1085cdb298fcSPeter Brune ierr = DMSubDomainHookAdd(dm,DMSubDomainHook_TSARKIMEX,DMSubDomainRestrictHook_TSARKIMEX,ts);CHKERRQ(ierr); 1086d5e6173cSPeter Brune } 10878a381b04SJed Brown PetscFunctionReturn(0); 10888a381b04SJed Brown } 10898a381b04SJed Brown /*------------------------------------------------------------*/ 10908a381b04SJed Brown 10918a381b04SJed Brown #undef __FUNCT__ 10928a381b04SJed Brown #define __FUNCT__ "TSSetFromOptions_ARKIMEX" 10938a381b04SJed Brown static PetscErrorCode TSSetFromOptions_ARKIMEX(TS ts) 10948a381b04SJed Brown { 10954cc180ffSJed Brown TS_ARKIMEX *ark = (TS_ARKIMEX*)ts->data; 10968a381b04SJed Brown PetscErrorCode ierr; 10978a381b04SJed Brown char arktype[256]; 10988a381b04SJed Brown 10998a381b04SJed Brown PetscFunctionBegin; 11008a381b04SJed Brown ierr = PetscOptionsHead("ARKIMEX ODE solver options");CHKERRQ(ierr); 11018a381b04SJed Brown { 11028a381b04SJed Brown ARKTableauLink link; 11038a381b04SJed Brown PetscInt count,choice; 11048a381b04SJed Brown PetscBool flg; 11058a381b04SJed Brown const char **namelist; 11068caf3d72SBarry Smith ierr = PetscStrncpy(arktype,TSARKIMEXDefault,sizeof(arktype));CHKERRQ(ierr); 11078a381b04SJed Brown for (link=ARKTableauList,count=0; link; link=link->next,count++) ; 11088a381b04SJed Brown ierr = PetscMalloc(count*sizeof(char*),&namelist);CHKERRQ(ierr); 11098a381b04SJed Brown for (link=ARKTableauList,count=0; link; link=link->next,count++) namelist[count] = link->tab.name; 11108a381b04SJed Brown ierr = PetscOptionsEList("-ts_arkimex_type","Family of ARK IMEX method","TSARKIMEXSetType",(const char*const*)namelist,count,arktype,&choice,&flg);CHKERRQ(ierr); 11118a381b04SJed Brown ierr = TSARKIMEXSetType(ts,flg ? namelist[choice] : arktype);CHKERRQ(ierr); 11128a381b04SJed Brown ierr = PetscFree(namelist);CHKERRQ(ierr); 11134cc180ffSJed Brown flg = (PetscBool) !ark->imex; 11140298fd71SBarry Smith ierr = PetscOptionsBool("-ts_arkimex_fully_implicit","Solve the problem fully implicitly","TSARKIMEXSetFullyImplicit",flg,&flg,NULL);CHKERRQ(ierr); 11154cc180ffSJed Brown ark->imex = (PetscBool) !flg; 1116d52bd9f3SBarry Smith ierr = SNESSetFromOptions(ts->snes);CHKERRQ(ierr); 11178a381b04SJed Brown } 11188a381b04SJed Brown ierr = PetscOptionsTail();CHKERRQ(ierr); 11198a381b04SJed Brown PetscFunctionReturn(0); 11208a381b04SJed Brown } 11218a381b04SJed Brown 11228a381b04SJed Brown #undef __FUNCT__ 11238a381b04SJed Brown #define __FUNCT__ "PetscFormatRealArray" 11248a381b04SJed Brown static PetscErrorCode PetscFormatRealArray(char buf[],size_t len,const char *fmt,PetscInt n,const PetscReal x[]) 11258a381b04SJed Brown { 1126257d2499SJed Brown PetscErrorCode ierr; 1127f1d86077SJed Brown PetscInt i; 1128f1d86077SJed Brown size_t left,count; 11298a381b04SJed Brown char *p; 11308a381b04SJed Brown 11318a381b04SJed Brown PetscFunctionBegin; 1132f1d86077SJed Brown for (i=0,p=buf,left=len; i<n; i++) { 1133f1d86077SJed Brown ierr = PetscSNPrintfCount(p,left,fmt,&count,x[i]);CHKERRQ(ierr); 11348a381b04SJed Brown if (count >= left) SETERRQ(PETSC_COMM_SELF,PETSC_ERR_ARG_OUTOFRANGE,"Insufficient space in buffer"); 11358a381b04SJed Brown left -= count; 11368a381b04SJed Brown p += count; 11378a381b04SJed Brown *p++ = ' '; 11388a381b04SJed Brown } 11398a381b04SJed Brown p[i ? 0 : -1] = 0; 11408a381b04SJed Brown PetscFunctionReturn(0); 11418a381b04SJed Brown } 11428a381b04SJed Brown 11438a381b04SJed Brown #undef __FUNCT__ 11448a381b04SJed Brown #define __FUNCT__ "TSView_ARKIMEX" 11458a381b04SJed Brown static PetscErrorCode TSView_ARKIMEX(TS ts,PetscViewer viewer) 11468a381b04SJed Brown { 11478a381b04SJed Brown TS_ARKIMEX *ark = (TS_ARKIMEX*)ts->data; 11488a381b04SJed Brown ARKTableau tab = ark->tableau; 11498a381b04SJed Brown PetscBool iascii; 11508a381b04SJed Brown PetscErrorCode ierr; 1151559eea31SJed Brown TSAdapt adapt; 11528a381b04SJed Brown 11538a381b04SJed Brown PetscFunctionBegin; 1154251f4c67SDmitry Karpeev ierr = PetscObjectTypeCompare((PetscObject)viewer,PETSCVIEWERASCII,&iascii);CHKERRQ(ierr); 11558a381b04SJed Brown if (iascii) { 115619fd82e9SBarry Smith TSARKIMEXType arktype; 11578a381b04SJed Brown char buf[512]; 11588a381b04SJed Brown ierr = TSARKIMEXGetType(ts,&arktype);CHKERRQ(ierr); 11598a381b04SJed Brown ierr = PetscViewerASCIIPrintf(viewer," ARK IMEX %s\n",arktype);CHKERRQ(ierr); 11608caf3d72SBarry Smith ierr = PetscFormatRealArray(buf,sizeof(buf),"% 8.6f",tab->s,tab->ct);CHKERRQ(ierr); 116131f6fcc0SJed Brown ierr = PetscViewerASCIIPrintf(viewer," Stiff abscissa ct = %s\n",buf);CHKERRQ(ierr); 11628caf3d72SBarry Smith ierr = PetscFormatRealArray(buf,sizeof(buf),"% 8.6f",tab->s,tab->c);CHKERRQ(ierr); 1163e817cc15SEmil Constantinescu ierr = PetscViewerASCIIPrintf(viewer,"Stiffly accurate: %s\n",tab->stiffly_accurate ? "yes" : "no");CHKERRQ(ierr); 1164e817cc15SEmil Constantinescu ierr = PetscViewerASCIIPrintf(viewer,"Explicit first stage: %s\n",tab->explicit_first_stage ? "yes" : "no");CHKERRQ(ierr); 1165e817cc15SEmil Constantinescu ierr = PetscViewerASCIIPrintf(viewer,"FSAL property: %s\n",tab->FSAL_implicit ? "yes" : "no");CHKERRQ(ierr); 116631f6fcc0SJed Brown ierr = PetscViewerASCIIPrintf(viewer," Nonstiff abscissa c = %s\n",buf);CHKERRQ(ierr); 11678a381b04SJed Brown } 1168ad6bc421SBarry Smith ierr = TSGetTSAdapt(ts,&adapt);CHKERRQ(ierr); 1169559eea31SJed Brown ierr = TSAdaptView(adapt,viewer);CHKERRQ(ierr); 1170d52bd9f3SBarry Smith ierr = SNESView(ts->snes,viewer);CHKERRQ(ierr); 11718a381b04SJed Brown PetscFunctionReturn(0); 11728a381b04SJed Brown } 11738a381b04SJed Brown 11748a381b04SJed Brown #undef __FUNCT__ 1175f2c2a1b9SBarry Smith #define __FUNCT__ "TSLoad_ARKIMEX" 1176f2c2a1b9SBarry Smith static PetscErrorCode TSLoad_ARKIMEX(TS ts,PetscViewer viewer) 1177f2c2a1b9SBarry Smith { 1178f2c2a1b9SBarry Smith PetscErrorCode ierr; 1179f2c2a1b9SBarry Smith SNES snes; 1180ad6bc421SBarry Smith TSAdapt tsadapt; 1181f2c2a1b9SBarry Smith 1182f2c2a1b9SBarry Smith PetscFunctionBegin; 1183ad6bc421SBarry Smith ierr = TSGetTSAdapt(ts,&tsadapt);CHKERRQ(ierr); 1184ad6bc421SBarry Smith ierr = TSAdaptLoad(tsadapt,viewer);CHKERRQ(ierr); 1185f2c2a1b9SBarry Smith ierr = TSGetSNES(ts,&snes);CHKERRQ(ierr); 1186f2c2a1b9SBarry Smith ierr = SNESLoad(snes,viewer);CHKERRQ(ierr); 1187ad6bc421SBarry Smith /* function and Jacobian context for SNES when used with TS is always ts object */ 11880298fd71SBarry Smith ierr = SNESSetFunction(snes,NULL,NULL,ts);CHKERRQ(ierr); 11890298fd71SBarry Smith ierr = SNESSetJacobian(snes,NULL,NULL,NULL,ts);CHKERRQ(ierr); 1190f2c2a1b9SBarry Smith PetscFunctionReturn(0); 1191f2c2a1b9SBarry Smith } 1192f2c2a1b9SBarry Smith 1193f2c2a1b9SBarry Smith #undef __FUNCT__ 11948a381b04SJed Brown #define __FUNCT__ "TSARKIMEXSetType" 11958a381b04SJed Brown /*@C 11968a381b04SJed Brown TSARKIMEXSetType - Set the type of ARK IMEX scheme 11978a381b04SJed Brown 11988a381b04SJed Brown Logically collective 11998a381b04SJed Brown 12008a381b04SJed Brown Input Parameter: 12018a381b04SJed Brown + ts - timestepping context 12028a381b04SJed Brown - arktype - type of ARK-IMEX scheme 12038a381b04SJed Brown 12048a381b04SJed Brown Level: intermediate 12058a381b04SJed Brown 1206020d8f30SJed Brown .seealso: TSARKIMEXGetType(), TSARKIMEX, TSARKIMEX2D, TSARKIMEX2E, TSARKIMEXPRSSP2, TSARKIMEX3, TSARKIMEXBPR3, TSARKIMEXARS443, TSARKIMEX4, TSARKIMEX5 12078a381b04SJed Brown @*/ 120819fd82e9SBarry Smith PetscErrorCode TSARKIMEXSetType(TS ts,TSARKIMEXType arktype) 12098a381b04SJed Brown { 12108a381b04SJed Brown PetscErrorCode ierr; 12118a381b04SJed Brown 12128a381b04SJed Brown PetscFunctionBegin; 12138a381b04SJed Brown PetscValidHeaderSpecific(ts,TS_CLASSID,1); 121419fd82e9SBarry Smith ierr = PetscTryMethod(ts,"TSARKIMEXSetType_C",(TS,TSARKIMEXType),(ts,arktype));CHKERRQ(ierr); 12158a381b04SJed Brown PetscFunctionReturn(0); 12168a381b04SJed Brown } 12178a381b04SJed Brown 12188a381b04SJed Brown #undef __FUNCT__ 12198a381b04SJed Brown #define __FUNCT__ "TSARKIMEXGetType" 12208a381b04SJed Brown /*@C 12218a381b04SJed Brown TSARKIMEXGetType - Get the type of ARK IMEX scheme 12228a381b04SJed Brown 12238a381b04SJed Brown Logically collective 12248a381b04SJed Brown 12258a381b04SJed Brown Input Parameter: 12268a381b04SJed Brown . ts - timestepping context 12278a381b04SJed Brown 12288a381b04SJed Brown Output Parameter: 12298a381b04SJed Brown . arktype - type of ARK-IMEX scheme 12308a381b04SJed Brown 12318a381b04SJed Brown Level: intermediate 12328a381b04SJed Brown 12338a381b04SJed Brown .seealso: TSARKIMEXGetType() 12348a381b04SJed Brown @*/ 123519fd82e9SBarry Smith PetscErrorCode TSARKIMEXGetType(TS ts,TSARKIMEXType *arktype) 12368a381b04SJed Brown { 12378a381b04SJed Brown PetscErrorCode ierr; 12388a381b04SJed Brown 12398a381b04SJed Brown PetscFunctionBegin; 12408a381b04SJed Brown PetscValidHeaderSpecific(ts,TS_CLASSID,1); 124119fd82e9SBarry Smith ierr = PetscUseMethod(ts,"TSARKIMEXGetType_C",(TS,TSARKIMEXType*),(ts,arktype));CHKERRQ(ierr); 12428a381b04SJed Brown PetscFunctionReturn(0); 12438a381b04SJed Brown } 12448a381b04SJed Brown 12454cc180ffSJed Brown #undef __FUNCT__ 12464cc180ffSJed Brown #define __FUNCT__ "TSARKIMEXSetFullyImplicit" 12474cc180ffSJed Brown /*@C 12484cc180ffSJed Brown TSARKIMEXSetFullyImplicit - Solve both parts of the equation implicitly 12494cc180ffSJed Brown 12504cc180ffSJed Brown Logically collective 12514cc180ffSJed Brown 12524cc180ffSJed Brown Input Parameter: 12534cc180ffSJed Brown + ts - timestepping context 12544cc180ffSJed Brown - flg - PETSC_TRUE for fully implicit 12554cc180ffSJed Brown 12564cc180ffSJed Brown Level: intermediate 12574cc180ffSJed Brown 12584cc180ffSJed Brown .seealso: TSARKIMEXGetType() 12594cc180ffSJed Brown @*/ 12604cc180ffSJed Brown PetscErrorCode TSARKIMEXSetFullyImplicit(TS ts,PetscBool flg) 12614cc180ffSJed Brown { 12624cc180ffSJed Brown PetscErrorCode ierr; 12634cc180ffSJed Brown 12644cc180ffSJed Brown PetscFunctionBegin; 12654cc180ffSJed Brown PetscValidHeaderSpecific(ts,TS_CLASSID,1); 12664cc180ffSJed Brown ierr = PetscTryMethod(ts,"TSARKIMEXSetFullyImplicit_C",(TS,PetscBool),(ts,flg));CHKERRQ(ierr); 12674cc180ffSJed Brown PetscFunctionReturn(0); 12684cc180ffSJed Brown } 12694cc180ffSJed Brown 12708a381b04SJed Brown #undef __FUNCT__ 12718a381b04SJed Brown #define __FUNCT__ "TSARKIMEXGetType_ARKIMEX" 127219fd82e9SBarry Smith PetscErrorCode TSARKIMEXGetType_ARKIMEX(TS ts,TSARKIMEXType *arktype) 12738a381b04SJed Brown { 12748a381b04SJed Brown TS_ARKIMEX *ark = (TS_ARKIMEX*)ts->data; 12758a381b04SJed Brown PetscErrorCode ierr; 12768a381b04SJed Brown 12778a381b04SJed Brown PetscFunctionBegin; 1278f2c2a1b9SBarry Smith if (!ark->tableau) { 1279f2c2a1b9SBarry Smith ierr = TSARKIMEXSetType(ts,TSARKIMEXDefault);CHKERRQ(ierr); 1280f2c2a1b9SBarry Smith } 12818a381b04SJed Brown *arktype = ark->tableau->name; 12828a381b04SJed Brown PetscFunctionReturn(0); 12838a381b04SJed Brown } 12848a381b04SJed Brown #undef __FUNCT__ 12858a381b04SJed Brown #define __FUNCT__ "TSARKIMEXSetType_ARKIMEX" 128619fd82e9SBarry Smith PetscErrorCode TSARKIMEXSetType_ARKIMEX(TS ts,TSARKIMEXType arktype) 12878a381b04SJed Brown { 12888a381b04SJed Brown TS_ARKIMEX *ark = (TS_ARKIMEX*)ts->data; 12898a381b04SJed Brown PetscErrorCode ierr; 12908a381b04SJed Brown PetscBool match; 12918a381b04SJed Brown ARKTableauLink link; 12928a381b04SJed Brown 12938a381b04SJed Brown PetscFunctionBegin; 12948a381b04SJed Brown if (ark->tableau) { 12958a381b04SJed Brown ierr = PetscStrcmp(ark->tableau->name,arktype,&match);CHKERRQ(ierr); 12968a381b04SJed Brown if (match) PetscFunctionReturn(0); 12978a381b04SJed Brown } 12988a381b04SJed Brown for (link = ARKTableauList; link; link=link->next) { 12998a381b04SJed Brown ierr = PetscStrcmp(link->tab.name,arktype,&match);CHKERRQ(ierr); 13008a381b04SJed Brown if (match) { 13018a381b04SJed Brown ierr = TSReset_ARKIMEX(ts);CHKERRQ(ierr); 13028a381b04SJed Brown ark->tableau = &link->tab; 13038a381b04SJed Brown PetscFunctionReturn(0); 13048a381b04SJed Brown } 13058a381b04SJed Brown } 1306ce94432eSBarry Smith SETERRQ1(PetscObjectComm((PetscObject)ts),PETSC_ERR_ARG_UNKNOWN_TYPE,"Could not find '%s'",arktype); 13078a381b04SJed Brown PetscFunctionReturn(0); 13088a381b04SJed Brown } 13094cc180ffSJed Brown #undef __FUNCT__ 13104cc180ffSJed Brown #define __FUNCT__ "TSARKIMEXSetFullyImplicit_ARKIMEX" 13114cc180ffSJed Brown PetscErrorCode TSARKIMEXSetFullyImplicit_ARKIMEX(TS ts,PetscBool flg) 13124cc180ffSJed Brown { 13134cc180ffSJed Brown TS_ARKIMEX *ark = (TS_ARKIMEX*)ts->data; 13144cc180ffSJed Brown 13154cc180ffSJed Brown PetscFunctionBegin; 13164cc180ffSJed Brown ark->imex = (PetscBool)!flg; 13174cc180ffSJed Brown PetscFunctionReturn(0); 13184cc180ffSJed Brown } 13198a381b04SJed Brown 13208a381b04SJed Brown /* ------------------------------------------------------------ */ 13218a381b04SJed Brown /*MC 1322a4386c9eSJed Brown TSARKIMEX - ODE and DAE solver using Additive Runge-Kutta IMEX schemes 13238a381b04SJed Brown 1324fca742c7SJed Brown These methods are intended for problems with well-separated time scales, especially when a slow scale is strongly 1325fca742c7SJed Brown nonlinear such that it is expensive to solve with a fully implicit method. The user should provide the stiff part 1326fca742c7SJed Brown of the equation using TSSetIFunction() and the non-stiff part with TSSetRHSFunction(). 1327fca742c7SJed Brown 1328fca742c7SJed Brown Notes: 1329a4386c9eSJed Brown The default is TSARKIMEX3, it can be changed with TSARKIMEXSetType() or -ts_arkimex_type 1330c8058688SBarry Smith 1331a4386c9eSJed Brown Methods with an explicit stage can only be used with ODE in which the stiff part G(t,X,Xdot) has the form Xdot + Ghat(t,X). 1332fca742c7SJed Brown 13338a381b04SJed Brown Level: beginner 13348a381b04SJed Brown 1335c8058688SBarry Smith .seealso: TSCreate(), TS, TSSetType(), TSARKIMEXSetType(), TSARKIMEXGetType(), TSARKIMEXSetFullyImplicit(), TSARKIMEX2D, TTSARKIMEX2E, TSARKIMEX3, 1336a4386c9eSJed Brown TSARKIMEX4, TSARKIMEX5, TSARKIMEXPRSSP2, TSARKIMEXBPR3, TSARKIMEXType, TSARKIMEXRegister() 13378a381b04SJed Brown 13388a381b04SJed Brown M*/ 13398a381b04SJed Brown #undef __FUNCT__ 13408a381b04SJed Brown #define __FUNCT__ "TSCreate_ARKIMEX" 1341*8cc058d9SJed Brown PETSC_EXTERN PetscErrorCode TSCreate_ARKIMEX(TS ts) 13428a381b04SJed Brown { 13438a381b04SJed Brown TS_ARKIMEX *th; 13448a381b04SJed Brown PetscErrorCode ierr; 13458a381b04SJed Brown 13468a381b04SJed Brown PetscFunctionBegin; 13478a381b04SJed Brown #if !defined(PETSC_USE_DYNAMIC_LIBRARIES) 13480298fd71SBarry Smith ierr = TSARKIMEXInitializePackage(NULL);CHKERRQ(ierr); 13498a381b04SJed Brown #endif 13508a381b04SJed Brown 13518a381b04SJed Brown ts->ops->reset = TSReset_ARKIMEX; 13528a381b04SJed Brown ts->ops->destroy = TSDestroy_ARKIMEX; 13538a381b04SJed Brown ts->ops->view = TSView_ARKIMEX; 1354f2c2a1b9SBarry Smith ts->ops->load = TSLoad_ARKIMEX; 13558a381b04SJed Brown ts->ops->setup = TSSetUp_ARKIMEX; 13568a381b04SJed Brown ts->ops->step = TSStep_ARKIMEX; 1357cd652676SJed Brown ts->ops->interpolate = TSInterpolate_ARKIMEX; 1358108c343cSJed Brown ts->ops->evaluatestep = TSEvaluateStep_ARKIMEX; 13598a381b04SJed Brown ts->ops->setfromoptions = TSSetFromOptions_ARKIMEX; 13608a381b04SJed Brown ts->ops->snesfunction = SNESTSFormFunction_ARKIMEX; 13618a381b04SJed Brown ts->ops->snesjacobian = SNESTSFormJacobian_ARKIMEX; 13628a381b04SJed Brown 13638a381b04SJed Brown ierr = PetscNewLog(ts,TS_ARKIMEX,&th);CHKERRQ(ierr); 13648a381b04SJed Brown ts->data = (void*)th; 13654cc180ffSJed Brown th->imex = PETSC_TRUE; 13668a381b04SJed Brown 136700de8ff0SBarry Smith ierr = PetscObjectComposeFunction((PetscObject)ts,"TSARKIMEXGetType_C","TSARKIMEXGetType_ARKIMEX",TSARKIMEXGetType_ARKIMEX);CHKERRQ(ierr); 136800de8ff0SBarry Smith ierr = PetscObjectComposeFunction((PetscObject)ts,"TSARKIMEXSetType_C","TSARKIMEXSetType_ARKIMEX",TSARKIMEXSetType_ARKIMEX);CHKERRQ(ierr); 136900de8ff0SBarry Smith ierr = PetscObjectComposeFunction((PetscObject)ts,"TSARKIMEXSetFullyImplicit_C","TSARKIMEXSetFullyImplicit_ARKIMEX",TSARKIMEXSetFullyImplicit_ARKIMEX);CHKERRQ(ierr); 13708a381b04SJed Brown PetscFunctionReturn(0); 13718a381b04SJed Brown } 1372