1c4762a1bSJed Brown 2c4762a1bSJed Brown static char help[] ="Solves a simple data assimilation problem with one dimensional Burger's equation using TSAdjoint\n\n"; 3c4762a1bSJed Brown 4c4762a1bSJed Brown /* 5c4762a1bSJed Brown 6c4762a1bSJed Brown Not yet tested in parallel 7c4762a1bSJed Brown 8c4762a1bSJed Brown */ 9c4762a1bSJed Brown /* 10c4762a1bSJed Brown Concepts: TS^time-dependent nonlinear problems 11c4762a1bSJed Brown Concepts: TS^Burger's equation 12c4762a1bSJed Brown Concepts: adjoints 13c4762a1bSJed Brown Processors: n 14c4762a1bSJed Brown */ 15c4762a1bSJed Brown 16c4762a1bSJed Brown /* ------------------------------------------------------------------------ 17c4762a1bSJed Brown 18c4762a1bSJed Brown This program uses the one-dimensional Burger's equation 19c4762a1bSJed Brown u_t = mu*u_xx - u u_x, 20c4762a1bSJed Brown on the domain 0 <= x <= 1, with periodic boundary conditions 21c4762a1bSJed Brown 22c4762a1bSJed Brown to demonstrate solving a data assimilation problem of finding the initial conditions 23c4762a1bSJed Brown to produce a given solution at a fixed time. 24c4762a1bSJed Brown 25c4762a1bSJed Brown The operators are discretized with the spectral element method 26c4762a1bSJed Brown 27c4762a1bSJed Brown See the paper PDE-CONSTRAINED OPTIMIZATION WITH SPECTRAL ELEMENTS USING PETSC AND TAO 28c4762a1bSJed Brown by OANA MARIN, EMIL CONSTANTINESCU, AND BARRY SMITH for details on the exact solution 29c4762a1bSJed Brown used 30c4762a1bSJed Brown 31c4762a1bSJed Brown ------------------------------------------------------------------------- */ 32c4762a1bSJed Brown 33c4762a1bSJed Brown #include <petsctao.h> 34c4762a1bSJed Brown #include <petscts.h> 35c4762a1bSJed Brown #include <petscdt.h> 36c4762a1bSJed Brown #include <petscdraw.h> 37c4762a1bSJed Brown #include <petscdmda.h> 38c4762a1bSJed Brown 39c4762a1bSJed Brown /* 40c4762a1bSJed Brown User-defined application context - contains data needed by the 41c4762a1bSJed Brown application-provided call-back routines. 42c4762a1bSJed Brown */ 43c4762a1bSJed Brown 44c4762a1bSJed Brown typedef struct { 45c4762a1bSJed Brown PetscInt n; /* number of nodes */ 46c4762a1bSJed Brown PetscReal *nodes; /* GLL nodes */ 47c4762a1bSJed Brown PetscReal *weights; /* GLL weights */ 48c4762a1bSJed Brown } PetscGLL; 49c4762a1bSJed Brown 50c4762a1bSJed Brown typedef struct { 51c4762a1bSJed Brown PetscInt N; /* grid points per elements*/ 52c4762a1bSJed Brown PetscInt E; /* number of elements */ 53c4762a1bSJed Brown PetscReal tol_L2,tol_max; /* error norms */ 54c4762a1bSJed Brown PetscInt steps; /* number of timesteps */ 55c4762a1bSJed Brown PetscReal Tend; /* endtime */ 56c4762a1bSJed Brown PetscReal mu; /* viscosity */ 57c4762a1bSJed Brown PetscReal L; /* total length of domain */ 58c4762a1bSJed Brown PetscReal Le; 59c4762a1bSJed Brown PetscReal Tadj; 60c4762a1bSJed Brown } PetscParam; 61c4762a1bSJed Brown 62c4762a1bSJed Brown typedef struct { 63c4762a1bSJed Brown Vec obj; /* desired end state */ 64c4762a1bSJed Brown Vec grid; /* total grid */ 65c4762a1bSJed Brown Vec grad; 66c4762a1bSJed Brown Vec ic; 67c4762a1bSJed Brown Vec curr_sol; 68c4762a1bSJed Brown Vec true_solution; /* actual initial conditions for the final solution */ 69c4762a1bSJed Brown } PetscData; 70c4762a1bSJed Brown 71c4762a1bSJed Brown typedef struct { 72c4762a1bSJed Brown Vec grid; /* total grid */ 73c4762a1bSJed Brown Vec mass; /* mass matrix for total integration */ 74c4762a1bSJed Brown Mat stiff; /* stifness matrix */ 75c4762a1bSJed Brown Mat keptstiff; 76c4762a1bSJed Brown Mat grad; 77c4762a1bSJed Brown PetscGLL gll; 78c4762a1bSJed Brown } PetscSEMOperators; 79c4762a1bSJed Brown 80c4762a1bSJed Brown typedef struct { 81c4762a1bSJed Brown DM da; /* distributed array data structure */ 82c4762a1bSJed Brown PetscSEMOperators SEMop; 83c4762a1bSJed Brown PetscParam param; 84c4762a1bSJed Brown PetscData dat; 85c4762a1bSJed Brown TS ts; 86c4762a1bSJed Brown PetscReal initial_dt; 87c4762a1bSJed Brown } AppCtx; 88c4762a1bSJed Brown 89c4762a1bSJed Brown /* 90c4762a1bSJed Brown User-defined routines 91c4762a1bSJed Brown */ 92c4762a1bSJed Brown extern PetscErrorCode FormFunctionGradient(Tao,Vec,PetscReal*,Vec,void*); 93c4762a1bSJed Brown extern PetscErrorCode RHSMatrixLaplaciangllDM(TS,PetscReal,Vec,Mat,Mat,void*); 94c4762a1bSJed Brown extern PetscErrorCode RHSMatrixAdvectiongllDM(TS,PetscReal,Vec,Mat,Mat,void*); 95c4762a1bSJed Brown extern PetscErrorCode InitialConditions(Vec,AppCtx*); 96c4762a1bSJed Brown extern PetscErrorCode TrueSolution(Vec,AppCtx*); 97c4762a1bSJed Brown extern PetscErrorCode ComputeObjective(PetscReal,Vec,AppCtx*); 98c4762a1bSJed Brown extern PetscErrorCode MonitorError(Tao,void*); 99c4762a1bSJed Brown extern PetscErrorCode RHSFunction(TS,PetscReal,Vec,Vec,void*); 100c4762a1bSJed Brown extern PetscErrorCode RHSJacobian(TS,PetscReal,Vec,Mat,Mat,void*); 101c4762a1bSJed Brown 102c4762a1bSJed Brown int main(int argc,char **argv) 103c4762a1bSJed Brown { 104c4762a1bSJed Brown AppCtx appctx; /* user-defined application context */ 105c4762a1bSJed Brown Tao tao; 106c4762a1bSJed Brown Vec u; /* approximate solution vector */ 107c4762a1bSJed Brown PetscErrorCode ierr; 108c4762a1bSJed Brown PetscInt i, xs, xm, ind, j, lenglob; 109c4762a1bSJed Brown PetscReal x, *wrk_ptr1, *wrk_ptr2; 110c4762a1bSJed Brown MatNullSpace nsp; 111c4762a1bSJed Brown PetscMPIInt size; 112c4762a1bSJed Brown 113c4762a1bSJed Brown /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 114c4762a1bSJed Brown Initialize program and set problem parameters 115c4762a1bSJed Brown - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 116c4762a1bSJed Brown PetscFunctionBegin; 117c4762a1bSJed Brown 118c4762a1bSJed Brown ierr = PetscInitialize(&argc,&argv,(char*)0,help);if (ierr) return ierr; 119c4762a1bSJed Brown 120c4762a1bSJed Brown /*initialize parameters */ 121c4762a1bSJed Brown appctx.param.N = 10; /* order of the spectral element */ 122c4762a1bSJed Brown appctx.param.E = 10; /* number of elements */ 123c4762a1bSJed Brown appctx.param.L = 4.0; /* length of the domain */ 124c4762a1bSJed Brown appctx.param.mu = 0.01; /* diffusion coefficient */ 125c4762a1bSJed Brown appctx.initial_dt = 5e-3; 126c4762a1bSJed Brown appctx.param.steps = PETSC_MAX_INT; 127c4762a1bSJed Brown appctx.param.Tend = 4; 128c4762a1bSJed Brown 129c4762a1bSJed Brown ierr = PetscOptionsGetInt(NULL,NULL,"-N",&appctx.param.N,NULL);CHKERRQ(ierr); 130c4762a1bSJed Brown ierr = PetscOptionsGetInt(NULL,NULL,"-E",&appctx.param.E,NULL);CHKERRQ(ierr); 131c4762a1bSJed Brown ierr = PetscOptionsGetReal(NULL,NULL,"-Tend",&appctx.param.Tend,NULL);CHKERRQ(ierr); 132c4762a1bSJed Brown ierr = PetscOptionsGetReal(NULL,NULL,"-mu",&appctx.param.mu,NULL);CHKERRQ(ierr); 133c4762a1bSJed Brown appctx.param.Le = appctx.param.L/appctx.param.E; 134c4762a1bSJed Brown 135*ffc4695bSBarry Smith ierr = MPI_Comm_size(PETSC_COMM_WORLD,&size);CHKERRMPI(ierr); 136c4762a1bSJed Brown if (appctx.param.E % size) SETERRQ(PETSC_COMM_WORLD,PETSC_ERR_ARG_WRONG,"Number of elements must be divisible by number of processes"); 137c4762a1bSJed Brown 138c4762a1bSJed Brown 139c4762a1bSJed Brown /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 140c4762a1bSJed Brown Create GLL data structures 141c4762a1bSJed Brown - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 142c4762a1bSJed Brown ierr = PetscMalloc2(appctx.param.N,&appctx.SEMop.gll.nodes,appctx.param.N,&appctx.SEMop.gll.weights);CHKERRQ(ierr); 143c4762a1bSJed Brown ierr = PetscDTGaussLobattoLegendreQuadrature(appctx.param.N,PETSCGAUSSLOBATTOLEGENDRE_VIA_LINEAR_ALGEBRA,appctx.SEMop.gll.nodes,appctx.SEMop.gll.weights);CHKERRQ(ierr); 144c4762a1bSJed Brown appctx.SEMop.gll.n = appctx.param.N; 145c4762a1bSJed Brown lenglob = appctx.param.E*(appctx.param.N-1); 146c4762a1bSJed Brown 147c4762a1bSJed Brown /* 148c4762a1bSJed Brown Create distributed array (DMDA) to manage parallel grid and vectors 149c4762a1bSJed Brown and to set up the ghost point communication pattern. There are E*(Nl-1)+1 150c4762a1bSJed Brown total grid values spread equally among all the processors, except first and last 151c4762a1bSJed Brown */ 152c4762a1bSJed Brown 153c4762a1bSJed Brown ierr = DMDACreate1d(PETSC_COMM_WORLD,DM_BOUNDARY_PERIODIC,lenglob,1,1,NULL,&appctx.da);CHKERRQ(ierr); 154c4762a1bSJed Brown ierr = DMSetFromOptions(appctx.da);CHKERRQ(ierr); 155c4762a1bSJed Brown ierr = DMSetUp(appctx.da);CHKERRQ(ierr); 156c4762a1bSJed Brown 157c4762a1bSJed Brown /* 158c4762a1bSJed Brown Extract global and local vectors from DMDA; we use these to store the 159c4762a1bSJed Brown approximate solution. Then duplicate these for remaining vectors that 160c4762a1bSJed Brown have the same types. 161c4762a1bSJed Brown */ 162c4762a1bSJed Brown 163c4762a1bSJed Brown ierr = DMCreateGlobalVector(appctx.da,&u);CHKERRQ(ierr); 164c4762a1bSJed Brown ierr = VecDuplicate(u,&appctx.dat.ic);CHKERRQ(ierr); 165c4762a1bSJed Brown ierr = VecDuplicate(u,&appctx.dat.true_solution);CHKERRQ(ierr); 166c4762a1bSJed Brown ierr = VecDuplicate(u,&appctx.dat.obj);CHKERRQ(ierr); 167c4762a1bSJed Brown ierr = VecDuplicate(u,&appctx.SEMop.grid);CHKERRQ(ierr); 168c4762a1bSJed Brown ierr = VecDuplicate(u,&appctx.SEMop.mass);CHKERRQ(ierr); 169c4762a1bSJed Brown ierr = VecDuplicate(u,&appctx.dat.curr_sol);CHKERRQ(ierr); 170c4762a1bSJed Brown 171c4762a1bSJed Brown ierr = DMDAGetCorners(appctx.da,&xs,NULL,NULL,&xm,NULL,NULL);CHKERRQ(ierr); 172c4762a1bSJed Brown ierr = DMDAVecGetArray(appctx.da,appctx.SEMop.grid,&wrk_ptr1);CHKERRQ(ierr); 173c4762a1bSJed Brown ierr = DMDAVecGetArray(appctx.da,appctx.SEMop.mass,&wrk_ptr2);CHKERRQ(ierr); 174c4762a1bSJed Brown 175c4762a1bSJed Brown /* Compute function over the locally owned part of the grid */ 176c4762a1bSJed Brown 177c4762a1bSJed Brown xs=xs/(appctx.param.N-1); 178c4762a1bSJed Brown xm=xm/(appctx.param.N-1); 179c4762a1bSJed Brown 180c4762a1bSJed Brown /* 181c4762a1bSJed Brown Build total grid and mass over entire mesh (multi-elemental) 182c4762a1bSJed Brown */ 183c4762a1bSJed Brown 184c4762a1bSJed Brown for (i=xs; i<xs+xm; i++) { 185c4762a1bSJed Brown for (j=0; j<appctx.param.N-1; j++) { 186c4762a1bSJed Brown x = (appctx.param.Le/2.0)*(appctx.SEMop.gll.nodes[j]+1.0)+appctx.param.Le*i; 187c4762a1bSJed Brown ind=i*(appctx.param.N-1)+j; 188c4762a1bSJed Brown wrk_ptr1[ind]=x; 189c4762a1bSJed Brown wrk_ptr2[ind]=.5*appctx.param.Le*appctx.SEMop.gll.weights[j]; 190c4762a1bSJed Brown if (j==0) wrk_ptr2[ind]+=.5*appctx.param.Le*appctx.SEMop.gll.weights[j]; 191c4762a1bSJed Brown } 192c4762a1bSJed Brown } 193c4762a1bSJed Brown ierr = DMDAVecRestoreArray(appctx.da,appctx.SEMop.grid,&wrk_ptr1);CHKERRQ(ierr); 194c4762a1bSJed Brown ierr = DMDAVecRestoreArray(appctx.da,appctx.SEMop.mass,&wrk_ptr2);CHKERRQ(ierr); 195c4762a1bSJed Brown 196c4762a1bSJed Brown 197c4762a1bSJed Brown /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 198c4762a1bSJed Brown Create matrix data structure; set matrix evaluation routine. 199c4762a1bSJed Brown - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 200c4762a1bSJed Brown ierr = DMSetMatrixPreallocateOnly(appctx.da, PETSC_TRUE);CHKERRQ(ierr); 201c4762a1bSJed Brown ierr = DMCreateMatrix(appctx.da,&appctx.SEMop.stiff);CHKERRQ(ierr); 202c4762a1bSJed Brown ierr = DMCreateMatrix(appctx.da,&appctx.SEMop.grad);CHKERRQ(ierr); 203c4762a1bSJed Brown /* 204c4762a1bSJed Brown For linear problems with a time-dependent f(u,t) in the equation 205c4762a1bSJed Brown u_t = f(u,t), the user provides the discretized right-hand-side 206c4762a1bSJed Brown as a time-dependent matrix. 207c4762a1bSJed Brown */ 208c4762a1bSJed Brown ierr = RHSMatrixLaplaciangllDM(appctx.ts,0.0,u,appctx.SEMop.stiff,appctx.SEMop.stiff,&appctx);CHKERRQ(ierr); 209c4762a1bSJed Brown ierr = RHSMatrixAdvectiongllDM(appctx.ts,0.0,u,appctx.SEMop.grad,appctx.SEMop.grad,&appctx);CHKERRQ(ierr); 210c4762a1bSJed Brown /* 211c4762a1bSJed Brown For linear problems with a time-dependent f(u,t) in the equation 212c4762a1bSJed Brown u_t = f(u,t), the user provides the discretized right-hand-side 213c4762a1bSJed Brown as a time-dependent matrix. 214c4762a1bSJed Brown */ 215c4762a1bSJed Brown 216c4762a1bSJed Brown ierr = MatDuplicate(appctx.SEMop.stiff,MAT_COPY_VALUES,&appctx.SEMop.keptstiff);CHKERRQ(ierr); 217c4762a1bSJed Brown 218c4762a1bSJed Brown /* attach the null space to the matrix, this probably is not needed but does no harm */ 219c4762a1bSJed Brown ierr = MatNullSpaceCreate(PETSC_COMM_WORLD,PETSC_TRUE,0,NULL,&nsp);CHKERRQ(ierr); 220c4762a1bSJed Brown ierr = MatSetNullSpace(appctx.SEMop.stiff,nsp);CHKERRQ(ierr); 221c4762a1bSJed Brown ierr = MatSetNullSpace(appctx.SEMop.keptstiff,nsp);CHKERRQ(ierr); 222c4762a1bSJed Brown ierr = MatNullSpaceTest(nsp,appctx.SEMop.stiff,NULL);CHKERRQ(ierr); 223c4762a1bSJed Brown ierr = MatNullSpaceDestroy(&nsp);CHKERRQ(ierr); 224c4762a1bSJed Brown /* attach the null space to the matrix, this probably is not needed but does no harm */ 225c4762a1bSJed Brown ierr = MatNullSpaceCreate(PETSC_COMM_WORLD,PETSC_TRUE,0,NULL,&nsp);CHKERRQ(ierr); 226c4762a1bSJed Brown ierr = MatSetNullSpace(appctx.SEMop.grad,nsp);CHKERRQ(ierr); 227c4762a1bSJed Brown ierr = MatNullSpaceTest(nsp,appctx.SEMop.grad,NULL);CHKERRQ(ierr); 228c4762a1bSJed Brown ierr = MatNullSpaceDestroy(&nsp);CHKERRQ(ierr); 229c4762a1bSJed Brown 230c4762a1bSJed Brown /* Create the TS solver that solves the ODE and its adjoint; set its options */ 231c4762a1bSJed Brown ierr = TSCreate(PETSC_COMM_WORLD,&appctx.ts);CHKERRQ(ierr); 232c4762a1bSJed Brown ierr = TSSetProblemType(appctx.ts,TS_NONLINEAR);CHKERRQ(ierr); 233c4762a1bSJed Brown ierr = TSSetType(appctx.ts,TSRK);CHKERRQ(ierr); 234c4762a1bSJed Brown ierr = TSSetDM(appctx.ts,appctx.da);CHKERRQ(ierr); 235c4762a1bSJed Brown ierr = TSSetTime(appctx.ts,0.0);CHKERRQ(ierr); 236c4762a1bSJed Brown ierr = TSSetTimeStep(appctx.ts,appctx.initial_dt);CHKERRQ(ierr); 237c4762a1bSJed Brown ierr = TSSetMaxSteps(appctx.ts,appctx.param.steps);CHKERRQ(ierr); 238c4762a1bSJed Brown ierr = TSSetMaxTime(appctx.ts,appctx.param.Tend);CHKERRQ(ierr); 239c4762a1bSJed Brown ierr = TSSetExactFinalTime(appctx.ts,TS_EXACTFINALTIME_MATCHSTEP);CHKERRQ(ierr); 240c4762a1bSJed Brown ierr = TSSetTolerances(appctx.ts,1e-7,NULL,1e-7,NULL);CHKERRQ(ierr); 241c4762a1bSJed Brown ierr = TSSetFromOptions(appctx.ts);CHKERRQ(ierr); 242c4762a1bSJed Brown /* Need to save initial timestep user may have set with -ts_dt so it can be reset for each new TSSolve() */ 243c4762a1bSJed Brown ierr = TSGetTimeStep(appctx.ts,&appctx.initial_dt);CHKERRQ(ierr); 244c4762a1bSJed Brown ierr = TSSetRHSFunction(appctx.ts,NULL,RHSFunction,&appctx);CHKERRQ(ierr); 245c4762a1bSJed Brown ierr = TSSetRHSJacobian(appctx.ts,appctx.SEMop.stiff,appctx.SEMop.stiff,RHSJacobian,&appctx);CHKERRQ(ierr); 246c4762a1bSJed Brown 247c4762a1bSJed Brown /* Set Objective and Initial conditions for the problem and compute Objective function (evolution of true_solution to final time */ 248c4762a1bSJed Brown ierr = InitialConditions(appctx.dat.ic,&appctx);CHKERRQ(ierr); 249c4762a1bSJed Brown ierr = TrueSolution(appctx.dat.true_solution,&appctx);CHKERRQ(ierr); 250c4762a1bSJed Brown ierr = ComputeObjective(appctx.param.Tend,appctx.dat.obj,&appctx);CHKERRQ(ierr); 251c4762a1bSJed Brown 252f32d6360SSatish Balay ierr = TSSetSaveTrajectory(appctx.ts);CHKERRQ(ierr); 253f32d6360SSatish Balay ierr = TSSetFromOptions(appctx.ts);CHKERRQ(ierr); 254f32d6360SSatish Balay 255c4762a1bSJed Brown /* Create TAO solver and set desired solution method */ 256c4762a1bSJed Brown ierr = TaoCreate(PETSC_COMM_WORLD,&tao);CHKERRQ(ierr); 257c4762a1bSJed Brown ierr = TaoSetMonitor(tao,MonitorError,&appctx,NULL);CHKERRQ(ierr); 258c4762a1bSJed Brown ierr = TaoSetType(tao,TAOBQNLS);CHKERRQ(ierr); 259c4762a1bSJed Brown ierr = TaoSetInitialVector(tao,appctx.dat.ic);CHKERRQ(ierr); 260c4762a1bSJed Brown /* Set routine for function and gradient evaluation */ 261c4762a1bSJed Brown ierr = TaoSetObjectiveAndGradientRoutine(tao,FormFunctionGradient,(void *)&appctx);CHKERRQ(ierr); 262c4762a1bSJed Brown /* Check for any TAO command line options */ 263c4762a1bSJed Brown ierr = TaoSetTolerances(tao,1e-8,PETSC_DEFAULT,PETSC_DEFAULT);CHKERRQ(ierr); 264c4762a1bSJed Brown ierr = TaoSetFromOptions(tao);CHKERRQ(ierr); 265c4762a1bSJed Brown ierr = TaoSolve(tao);CHKERRQ(ierr); 266c4762a1bSJed Brown 267c4762a1bSJed Brown ierr = TaoDestroy(&tao);CHKERRQ(ierr); 268c4762a1bSJed Brown ierr = MatDestroy(&appctx.SEMop.stiff);CHKERRQ(ierr); 269c4762a1bSJed Brown ierr = MatDestroy(&appctx.SEMop.keptstiff);CHKERRQ(ierr); 270c4762a1bSJed Brown ierr = MatDestroy(&appctx.SEMop.grad);CHKERRQ(ierr); 271c4762a1bSJed Brown ierr = VecDestroy(&u);CHKERRQ(ierr); 272c4762a1bSJed Brown ierr = VecDestroy(&appctx.dat.ic);CHKERRQ(ierr); 273c4762a1bSJed Brown ierr = VecDestroy(&appctx.dat.true_solution);CHKERRQ(ierr); 274c4762a1bSJed Brown ierr = VecDestroy(&appctx.dat.obj);CHKERRQ(ierr); 275c4762a1bSJed Brown ierr = VecDestroy(&appctx.SEMop.grid);CHKERRQ(ierr); 276c4762a1bSJed Brown ierr = VecDestroy(&appctx.SEMop.mass);CHKERRQ(ierr); 277c4762a1bSJed Brown ierr = VecDestroy(&appctx.dat.curr_sol);CHKERRQ(ierr); 278c4762a1bSJed Brown ierr = PetscFree2(appctx.SEMop.gll.nodes,appctx.SEMop.gll.weights);CHKERRQ(ierr); 279c4762a1bSJed Brown ierr = DMDestroy(&appctx.da);CHKERRQ(ierr); 280c4762a1bSJed Brown ierr = TSDestroy(&appctx.ts);CHKERRQ(ierr); 281c4762a1bSJed Brown 282c4762a1bSJed Brown /* 283c4762a1bSJed Brown Always call PetscFinalize() before exiting a program. This routine 284c4762a1bSJed Brown - finalizes the PETSc libraries as well as MPI 285c4762a1bSJed Brown - provides summary and diagnostic information if certain runtime 286c4762a1bSJed Brown options are chosen (e.g., -log_summary). 287c4762a1bSJed Brown */ 288c4762a1bSJed Brown ierr = PetscFinalize(); 289c4762a1bSJed Brown return ierr; 290c4762a1bSJed Brown } 291c4762a1bSJed Brown 292c4762a1bSJed Brown /* --------------------------------------------------------------------- */ 293c4762a1bSJed Brown /* 294c4762a1bSJed Brown InitialConditions - Computes the initial conditions for the Tao optimization solve (these are also initial conditions for the first TSSolve() 295c4762a1bSJed Brown 296c4762a1bSJed Brown The routine TrueSolution() computes the true solution for the Tao optimization solve which means they are the initial conditions for the objective function 297c4762a1bSJed Brown 298c4762a1bSJed Brown Input Parameter: 299c4762a1bSJed Brown u - uninitialized solution vector (global) 300c4762a1bSJed Brown appctx - user-defined application context 301c4762a1bSJed Brown 302c4762a1bSJed Brown Output Parameter: 303c4762a1bSJed Brown u - vector with solution at initial time (global) 304c4762a1bSJed Brown */ 305c4762a1bSJed Brown PetscErrorCode InitialConditions(Vec u,AppCtx *appctx) 306c4762a1bSJed Brown { 307c4762a1bSJed Brown PetscScalar *s; 308c4762a1bSJed Brown const PetscScalar *xg; 309c4762a1bSJed Brown PetscErrorCode ierr; 310c4762a1bSJed Brown PetscInt i,xs,xn; 311c4762a1bSJed Brown 312c4762a1bSJed Brown PetscFunctionBegin; 313c4762a1bSJed Brown ierr = DMDAVecGetArray(appctx->da,u,&s);CHKERRQ(ierr); 314c4762a1bSJed Brown ierr = DMDAVecGetArrayRead(appctx->da,appctx->SEMop.grid,(void*)&xg);CHKERRQ(ierr); 315c4762a1bSJed Brown ierr = DMDAGetCorners(appctx->da,&xs,NULL,NULL,&xn,NULL,NULL);CHKERRQ(ierr); 316c4762a1bSJed Brown for (i=xs; i<xs+xn; i++) { 317c4762a1bSJed Brown s[i]=2.0*appctx->param.mu*PETSC_PI*PetscSinScalar(PETSC_PI*xg[i])/(2.0+PetscCosScalar(PETSC_PI*xg[i]))+0.25*PetscExpReal(-4.0*PetscPowReal(xg[i]-2.0,2.0)); 318c4762a1bSJed Brown } 319c4762a1bSJed Brown ierr = DMDAVecRestoreArray(appctx->da,u,&s);CHKERRQ(ierr); 320c4762a1bSJed Brown ierr = DMDAVecRestoreArrayRead(appctx->da,appctx->SEMop.grid,(void*)&xg);CHKERRQ(ierr); 321c4762a1bSJed Brown PetscFunctionReturn(0); 322c4762a1bSJed Brown } 323c4762a1bSJed Brown 324c4762a1bSJed Brown /* 325c4762a1bSJed Brown TrueSolution() computes the true solution for the Tao optimization solve which means they are the initial conditions for the objective function. 326c4762a1bSJed Brown 327c4762a1bSJed Brown InitialConditions() computes the initial conditions for the begining of the Tao iterations 328c4762a1bSJed Brown 329c4762a1bSJed Brown Input Parameter: 330c4762a1bSJed Brown u - uninitialized solution vector (global) 331c4762a1bSJed Brown appctx - user-defined application context 332c4762a1bSJed Brown 333c4762a1bSJed Brown Output Parameter: 334c4762a1bSJed Brown u - vector with solution at initial time (global) 335c4762a1bSJed Brown */ 336c4762a1bSJed Brown PetscErrorCode TrueSolution(Vec u,AppCtx *appctx) 337c4762a1bSJed Brown { 338c4762a1bSJed Brown PetscScalar *s; 339c4762a1bSJed Brown const PetscScalar *xg; 340c4762a1bSJed Brown PetscErrorCode ierr; 341c4762a1bSJed Brown PetscInt i,xs,xn; 342c4762a1bSJed Brown 343c4762a1bSJed Brown PetscFunctionBegin; 344c4762a1bSJed Brown ierr = DMDAVecGetArray(appctx->da,u,&s);CHKERRQ(ierr); 345c4762a1bSJed Brown ierr = DMDAVecGetArrayRead(appctx->da,appctx->SEMop.grid,(void*)&xg);CHKERRQ(ierr); 346c4762a1bSJed Brown ierr = DMDAGetCorners(appctx->da,&xs,NULL,NULL,&xn,NULL,NULL);CHKERRQ(ierr); 347c4762a1bSJed Brown for (i=xs; i<xs+xn; i++) { 348c4762a1bSJed Brown s[i]=2.0*appctx->param.mu*PETSC_PI*PetscSinScalar(PETSC_PI*xg[i])/(2.0+PetscCosScalar(PETSC_PI*xg[i])); 349c4762a1bSJed Brown } 350c4762a1bSJed Brown ierr = DMDAVecRestoreArray(appctx->da,u,&s);CHKERRQ(ierr); 351c4762a1bSJed Brown ierr = DMDAVecRestoreArrayRead(appctx->da,appctx->SEMop.grid,(void*)&xg);CHKERRQ(ierr); 352c4762a1bSJed Brown PetscFunctionReturn(0); 353c4762a1bSJed Brown } 354c4762a1bSJed Brown /* --------------------------------------------------------------------- */ 355c4762a1bSJed Brown /* 356c4762a1bSJed Brown Sets the desired profile for the final end time 357c4762a1bSJed Brown 358c4762a1bSJed Brown Input Parameters: 359c4762a1bSJed Brown t - final time 360c4762a1bSJed Brown obj - vector storing the desired profile 361c4762a1bSJed Brown appctx - user-defined application context 362c4762a1bSJed Brown 363c4762a1bSJed Brown */ 364c4762a1bSJed Brown PetscErrorCode ComputeObjective(PetscReal t,Vec obj,AppCtx *appctx) 365c4762a1bSJed Brown { 366c4762a1bSJed Brown PetscScalar *s; 367c4762a1bSJed Brown const PetscScalar *xg; 368c4762a1bSJed Brown PetscErrorCode ierr; 369c4762a1bSJed Brown PetscInt i, xs,xn; 370c4762a1bSJed Brown 371c4762a1bSJed Brown PetscFunctionBegin; 372c4762a1bSJed Brown ierr = DMDAVecGetArray(appctx->da,obj,&s);CHKERRQ(ierr); 373c4762a1bSJed Brown ierr = DMDAVecGetArrayRead(appctx->da,appctx->SEMop.grid,(void*)&xg);CHKERRQ(ierr); 374c4762a1bSJed Brown ierr = DMDAGetCorners(appctx->da,&xs,NULL,NULL,&xn,NULL,NULL);CHKERRQ(ierr); 375c4762a1bSJed Brown for (i=xs; i<xs+xn; i++) { 376c4762a1bSJed Brown s[i]=2.0*appctx->param.mu*PETSC_PI*PetscSinScalar(PETSC_PI*xg[i])*PetscExpScalar(-PETSC_PI*PETSC_PI*t*appctx->param.mu)\ 377c4762a1bSJed Brown /(2.0+PetscExpScalar(-PETSC_PI*PETSC_PI*t*appctx->param.mu)*PetscCosScalar(PETSC_PI*xg[i])); 378c4762a1bSJed Brown } 379c4762a1bSJed Brown ierr = DMDAVecRestoreArray(appctx->da,obj,&s);CHKERRQ(ierr); 380c4762a1bSJed Brown ierr = DMDAVecRestoreArrayRead(appctx->da,appctx->SEMop.grid,(void*)&xg);CHKERRQ(ierr); 381c4762a1bSJed Brown PetscFunctionReturn(0); 382c4762a1bSJed Brown } 383c4762a1bSJed Brown 384c4762a1bSJed Brown PetscErrorCode RHSFunction(TS ts,PetscReal t,Vec globalin,Vec globalout,void *ctx) 385c4762a1bSJed Brown { 386c4762a1bSJed Brown PetscErrorCode ierr; 387c4762a1bSJed Brown AppCtx *appctx = (AppCtx*)ctx; 388c4762a1bSJed Brown 389c4762a1bSJed Brown PetscFunctionBegin; 390c4762a1bSJed Brown ierr = MatMult(appctx->SEMop.grad,globalin,globalout);CHKERRQ(ierr); /* grad u */ 391c4762a1bSJed Brown ierr = VecPointwiseMult(globalout,globalin,globalout);CHKERRQ(ierr); /* u grad u */ 392c4762a1bSJed Brown ierr = VecScale(globalout, -1.0);CHKERRQ(ierr); 393c4762a1bSJed Brown ierr = MatMultAdd(appctx->SEMop.keptstiff,globalin,globalout,globalout);CHKERRQ(ierr); 394c4762a1bSJed Brown PetscFunctionReturn(0); 395c4762a1bSJed Brown } 396c4762a1bSJed Brown 397c4762a1bSJed Brown /* 398c4762a1bSJed Brown 399c4762a1bSJed Brown K is the discretiziation of the Laplacian 400c4762a1bSJed Brown G is the discretization of the gradient 401c4762a1bSJed Brown 402c4762a1bSJed Brown Computes Jacobian of K u + diag(u) G u which is given by 403c4762a1bSJed Brown K + diag(u)G + diag(Gu) 404c4762a1bSJed Brown */ 405c4762a1bSJed Brown PetscErrorCode RHSJacobian(TS ts,PetscReal t,Vec globalin,Mat A, Mat B,void *ctx) 406c4762a1bSJed Brown { 407c4762a1bSJed Brown PetscErrorCode ierr; 408c4762a1bSJed Brown AppCtx *appctx = (AppCtx*)ctx; 409c4762a1bSJed Brown Vec Gglobalin; 410c4762a1bSJed Brown 411c4762a1bSJed Brown PetscFunctionBegin; 412c4762a1bSJed Brown /* A = diag(u) G */ 413c4762a1bSJed Brown 414c4762a1bSJed Brown ierr = MatCopy(appctx->SEMop.grad,A,SAME_NONZERO_PATTERN);CHKERRQ(ierr); 415c4762a1bSJed Brown ierr = MatDiagonalScale(A,globalin,NULL);CHKERRQ(ierr); 416c4762a1bSJed Brown 417c4762a1bSJed Brown /* A = A + diag(Gu) */ 418c4762a1bSJed Brown ierr = VecDuplicate(globalin,&Gglobalin);CHKERRQ(ierr); 419c4762a1bSJed Brown ierr = MatMult(appctx->SEMop.grad,globalin,Gglobalin);CHKERRQ(ierr); 420c4762a1bSJed Brown ierr = MatDiagonalSet(A,Gglobalin,ADD_VALUES);CHKERRQ(ierr); 421c4762a1bSJed Brown ierr = VecDestroy(&Gglobalin);CHKERRQ(ierr); 422c4762a1bSJed Brown 423c4762a1bSJed Brown /* A = K - A */ 424c4762a1bSJed Brown ierr = MatScale(A,-1.0);CHKERRQ(ierr); 425c4762a1bSJed Brown ierr = MatAXPY(A,1.0,appctx->SEMop.keptstiff,SAME_NONZERO_PATTERN);CHKERRQ(ierr); 426c4762a1bSJed Brown PetscFunctionReturn(0); 427c4762a1bSJed Brown } 428c4762a1bSJed Brown 429c4762a1bSJed Brown /* --------------------------------------------------------------------- */ 430c4762a1bSJed Brown 431c4762a1bSJed Brown /* 432c4762a1bSJed Brown RHSMatrixLaplacian - User-provided routine to compute the right-hand-side 433c4762a1bSJed Brown matrix for the heat equation. 434c4762a1bSJed Brown 435c4762a1bSJed Brown Input Parameters: 436c4762a1bSJed Brown ts - the TS context 437c4762a1bSJed Brown t - current time (ignored) 438c4762a1bSJed Brown X - current solution (ignored) 439c4762a1bSJed Brown dummy - optional user-defined context, as set by TSetRHSJacobian() 440c4762a1bSJed Brown 441c4762a1bSJed Brown Output Parameters: 442c4762a1bSJed Brown AA - Jacobian matrix 443c4762a1bSJed Brown BB - optionally different matrix from which the preconditioner is built 444c4762a1bSJed Brown str - flag indicating matrix structure 445c4762a1bSJed Brown 446c4762a1bSJed Brown */ 447c4762a1bSJed Brown PetscErrorCode RHSMatrixLaplaciangllDM(TS ts,PetscReal t,Vec X,Mat A,Mat BB,void *ctx) 448c4762a1bSJed Brown { 449c4762a1bSJed Brown PetscReal **temp; 450c4762a1bSJed Brown PetscReal vv; 451c4762a1bSJed Brown AppCtx *appctx = (AppCtx*)ctx; /* user-defined application context */ 452c4762a1bSJed Brown PetscErrorCode ierr; 453c4762a1bSJed Brown PetscInt i,xs,xn,l,j; 454c4762a1bSJed Brown PetscInt *rowsDM; 455c4762a1bSJed Brown 456c4762a1bSJed Brown PetscFunctionBegin; 457c4762a1bSJed Brown /* 458c4762a1bSJed Brown Creates the element stiffness matrix for the given gll 459c4762a1bSJed Brown */ 460c4762a1bSJed Brown ierr = PetscGaussLobattoLegendreElementLaplacianCreate(appctx->SEMop.gll.n,appctx->SEMop.gll.nodes,appctx->SEMop.gll.weights,&temp);CHKERRQ(ierr); 461c4762a1bSJed Brown /* workarround for clang analyzer warning: Division by zero */ 462c4762a1bSJed Brown if (appctx->param.N <= 1) SETERRQ(PETSC_COMM_WORLD,PETSC_ERR_ARG_WRONG,"Spectral element order should be > 1"); 463c4762a1bSJed Brown 464c4762a1bSJed Brown /* scale by the size of the element */ 465c4762a1bSJed Brown for (i=0; i<appctx->param.N; i++) { 466c4762a1bSJed Brown vv=-appctx->param.mu*2.0/appctx->param.Le; 467c4762a1bSJed Brown for (j=0; j<appctx->param.N; j++) temp[i][j]=temp[i][j]*vv; 468c4762a1bSJed Brown } 469c4762a1bSJed Brown 470c4762a1bSJed Brown ierr = MatSetOption(A,MAT_NEW_NONZERO_ALLOCATION_ERR,PETSC_FALSE);CHKERRQ(ierr); 471c4762a1bSJed Brown ierr = DMDAGetCorners(appctx->da,&xs,NULL,NULL,&xn,NULL,NULL);CHKERRQ(ierr); 472c4762a1bSJed Brown 473c4762a1bSJed Brown xs = xs/(appctx->param.N-1); 474c4762a1bSJed Brown xn = xn/(appctx->param.N-1); 475c4762a1bSJed Brown 476c4762a1bSJed Brown ierr = PetscMalloc1(appctx->param.N,&rowsDM);CHKERRQ(ierr); 477c4762a1bSJed Brown /* 478c4762a1bSJed Brown loop over local elements 479c4762a1bSJed Brown */ 480c4762a1bSJed Brown for (j=xs; j<xs+xn; j++) { 481c4762a1bSJed Brown for (l=0; l<appctx->param.N; l++) { 482c4762a1bSJed Brown rowsDM[l] = 1+(j-xs)*(appctx->param.N-1)+l; 483c4762a1bSJed Brown } 484c4762a1bSJed Brown ierr = MatSetValuesLocal(A,appctx->param.N,rowsDM,appctx->param.N,rowsDM,&temp[0][0],ADD_VALUES);CHKERRQ(ierr); 485c4762a1bSJed Brown } 486c4762a1bSJed Brown ierr = PetscFree(rowsDM);CHKERRQ(ierr); 487c4762a1bSJed Brown ierr = MatAssemblyBegin(A,MAT_FINAL_ASSEMBLY);CHKERRQ(ierr); 488c4762a1bSJed Brown ierr = MatAssemblyEnd(A,MAT_FINAL_ASSEMBLY);CHKERRQ(ierr); 489c4762a1bSJed Brown ierr = VecReciprocal(appctx->SEMop.mass);CHKERRQ(ierr); 490c4762a1bSJed Brown ierr = MatDiagonalScale(A,appctx->SEMop.mass,0);CHKERRQ(ierr); 491c4762a1bSJed Brown ierr = VecReciprocal(appctx->SEMop.mass);CHKERRQ(ierr); 492c4762a1bSJed Brown 493c4762a1bSJed Brown ierr = PetscGaussLobattoLegendreElementLaplacianDestroy(appctx->SEMop.gll.n,appctx->SEMop.gll.nodes,appctx->SEMop.gll.weights,&temp);CHKERRQ(ierr); 494c4762a1bSJed Brown PetscFunctionReturn(0); 495c4762a1bSJed Brown } 496c4762a1bSJed Brown 497c4762a1bSJed Brown /* 498c4762a1bSJed Brown RHSMatrixAdvection - User-provided routine to compute the right-hand-side 499c4762a1bSJed Brown matrix for the Advection equation. 500c4762a1bSJed Brown 501c4762a1bSJed Brown Input Parameters: 502c4762a1bSJed Brown ts - the TS context 503c4762a1bSJed Brown t - current time 504c4762a1bSJed Brown global_in - global input vector 505c4762a1bSJed Brown dummy - optional user-defined context, as set by TSetRHSJacobian() 506c4762a1bSJed Brown 507c4762a1bSJed Brown Output Parameters: 508c4762a1bSJed Brown AA - Jacobian matrix 509c4762a1bSJed Brown BB - optionally different preconditioning matrix 510c4762a1bSJed Brown str - flag indicating matrix structure 511c4762a1bSJed Brown 512c4762a1bSJed Brown */ 513c4762a1bSJed Brown PetscErrorCode RHSMatrixAdvectiongllDM(TS ts,PetscReal t,Vec X,Mat A,Mat BB,void *ctx) 514c4762a1bSJed Brown { 515c4762a1bSJed Brown PetscReal **temp; 516c4762a1bSJed Brown AppCtx *appctx = (AppCtx*)ctx; /* user-defined application context */ 517c4762a1bSJed Brown PetscErrorCode ierr; 518c4762a1bSJed Brown PetscInt xs,xn,l,j; 519c4762a1bSJed Brown PetscInt *rowsDM; 520c4762a1bSJed Brown 521c4762a1bSJed Brown PetscFunctionBegin; 522c4762a1bSJed Brown /* 523c4762a1bSJed Brown Creates the advection matrix for the given gll 524c4762a1bSJed Brown */ 525c4762a1bSJed Brown ierr = PetscGaussLobattoLegendreElementAdvectionCreate(appctx->SEMop.gll.n,appctx->SEMop.gll.nodes,appctx->SEMop.gll.weights,&temp);CHKERRQ(ierr); 526c4762a1bSJed Brown ierr = MatSetOption(A,MAT_NEW_NONZERO_ALLOCATION_ERR,PETSC_FALSE);CHKERRQ(ierr); 527c4762a1bSJed Brown 528c4762a1bSJed Brown ierr = DMDAGetCorners(appctx->da,&xs,NULL,NULL,&xn,NULL,NULL);CHKERRQ(ierr); 529c4762a1bSJed Brown 530c4762a1bSJed Brown xs = xs/(appctx->param.N-1); 531c4762a1bSJed Brown xn = xn/(appctx->param.N-1); 532c4762a1bSJed Brown 533c4762a1bSJed Brown ierr = PetscMalloc1(appctx->param.N,&rowsDM);CHKERRQ(ierr); 534c4762a1bSJed Brown for (j=xs; j<xs+xn; j++) { 535c4762a1bSJed Brown for (l=0; l<appctx->param.N; l++) { 536c4762a1bSJed Brown rowsDM[l] = 1+(j-xs)*(appctx->param.N-1)+l; 537c4762a1bSJed Brown } 538c4762a1bSJed Brown ierr = MatSetValuesLocal(A,appctx->param.N,rowsDM,appctx->param.N,rowsDM,&temp[0][0],ADD_VALUES);CHKERRQ(ierr); 539c4762a1bSJed Brown } 540c4762a1bSJed Brown ierr = PetscFree(rowsDM);CHKERRQ(ierr); 541c4762a1bSJed Brown ierr = MatAssemblyBegin(A,MAT_FINAL_ASSEMBLY);CHKERRQ(ierr); 542c4762a1bSJed Brown ierr = MatAssemblyEnd(A,MAT_FINAL_ASSEMBLY);CHKERRQ(ierr); 543c4762a1bSJed Brown 544c4762a1bSJed Brown ierr = VecReciprocal(appctx->SEMop.mass);CHKERRQ(ierr); 545c4762a1bSJed Brown ierr = MatDiagonalScale(A,appctx->SEMop.mass,0);CHKERRQ(ierr); 546c4762a1bSJed Brown ierr = VecReciprocal(appctx->SEMop.mass);CHKERRQ(ierr); 547c4762a1bSJed Brown ierr = PetscGaussLobattoLegendreElementAdvectionDestroy(appctx->SEMop.gll.n,appctx->SEMop.gll.nodes,appctx->SEMop.gll.weights,&temp);CHKERRQ(ierr); 548c4762a1bSJed Brown PetscFunctionReturn(0); 549c4762a1bSJed Brown } 550c4762a1bSJed Brown /* ------------------------------------------------------------------ */ 551c4762a1bSJed Brown /* 552c4762a1bSJed Brown FormFunctionGradient - Evaluates the function and corresponding gradient. 553c4762a1bSJed Brown 554c4762a1bSJed Brown Input Parameters: 555c4762a1bSJed Brown tao - the Tao context 556c4762a1bSJed Brown IC - the input vector 557c4762a1bSJed Brown ctx - optional user-defined context, as set when calling TaoSetObjectiveAndGradientRoutine() 558c4762a1bSJed Brown 559c4762a1bSJed Brown Output Parameters: 560c4762a1bSJed Brown f - the newly evaluated function 561c4762a1bSJed Brown G - the newly evaluated gradient 562c4762a1bSJed Brown 563c4762a1bSJed Brown Notes: 564c4762a1bSJed Brown 565c4762a1bSJed Brown The forward equation is 566c4762a1bSJed Brown M u_t = F(U) 567c4762a1bSJed Brown which is converted to 568c4762a1bSJed Brown u_t = M^{-1} F(u) 569c4762a1bSJed Brown in the user code since TS has no direct way of providing a mass matrix. The Jacobian of this is 570c4762a1bSJed Brown M^{-1} J 571c4762a1bSJed Brown where J is the Jacobian of F. Now the adjoint equation is 572c4762a1bSJed Brown M v_t = J^T v 573c4762a1bSJed Brown but TSAdjoint does not solve this since it can only solve the transposed system for the 574c4762a1bSJed Brown Jacobian the user provided. Hence TSAdjoint solves 575c4762a1bSJed Brown w_t = J^T M^{-1} w (where w = M v) 576c4762a1bSJed Brown since there is no way to indicate the mass matrix as a separate entitity to TS. Thus one 577c4762a1bSJed Brown must be careful in initializing the "adjoint equation" and using the result. This is 578c4762a1bSJed Brown why 579c4762a1bSJed Brown G = -2 M(u(T) - u_d) 580c4762a1bSJed Brown below (instead of -2(u(T) - u_d) and why the result is 581c4762a1bSJed Brown G = G/appctx->SEMop.mass (that is G = M^{-1}w) 582c4762a1bSJed Brown below (instead of just the result of the "adjoint solve"). 583c4762a1bSJed Brown 584c4762a1bSJed Brown 585c4762a1bSJed Brown */ 586c4762a1bSJed Brown PetscErrorCode FormFunctionGradient(Tao tao,Vec IC,PetscReal *f,Vec G,void *ctx) 587c4762a1bSJed Brown { 588c4762a1bSJed Brown AppCtx *appctx = (AppCtx*)ctx; /* user-defined application context */ 589c4762a1bSJed Brown PetscErrorCode ierr; 590c4762a1bSJed Brown Vec temp; 591c4762a1bSJed Brown PetscInt its; 592c4762a1bSJed Brown PetscReal ff, gnorm, cnorm, xdiff,errex; 593c4762a1bSJed Brown TaoConvergedReason reason; 594c4762a1bSJed Brown 595c4762a1bSJed Brown PetscFunctionBegin; 596c4762a1bSJed Brown ierr = TSSetTime(appctx->ts,0.0);CHKERRQ(ierr); 597c4762a1bSJed Brown ierr = TSSetStepNumber(appctx->ts,0);CHKERRQ(ierr); 598c4762a1bSJed Brown ierr = TSSetTimeStep(appctx->ts,appctx->initial_dt);CHKERRQ(ierr); 599c4762a1bSJed Brown ierr = VecCopy(IC,appctx->dat.curr_sol);CHKERRQ(ierr); 600c4762a1bSJed Brown 601c4762a1bSJed Brown ierr = TSSolve(appctx->ts,appctx->dat.curr_sol);CHKERRQ(ierr); 602c4762a1bSJed Brown 603c4762a1bSJed Brown ierr = VecWAXPY(G,-1.0,appctx->dat.curr_sol,appctx->dat.obj);CHKERRQ(ierr); 604c4762a1bSJed Brown 605c4762a1bSJed Brown /* 606c4762a1bSJed Brown Compute the L2-norm of the objective function, cost function is f 607c4762a1bSJed Brown */ 608c4762a1bSJed Brown ierr = VecDuplicate(G,&temp);CHKERRQ(ierr); 609c4762a1bSJed Brown ierr = VecPointwiseMult(temp,G,G);CHKERRQ(ierr); 610c4762a1bSJed Brown ierr = VecDot(temp,appctx->SEMop.mass,f);CHKERRQ(ierr); 611c4762a1bSJed Brown 612c4762a1bSJed Brown /* local error evaluation */ 613c4762a1bSJed Brown ierr = VecWAXPY(temp,-1.0,appctx->dat.ic,appctx->dat.true_solution);CHKERRQ(ierr); 614c4762a1bSJed Brown ierr = VecPointwiseMult(temp,temp,temp);CHKERRQ(ierr); 615c4762a1bSJed Brown /* for error evaluation */ 616c4762a1bSJed Brown ierr = VecDot(temp,appctx->SEMop.mass,&errex);CHKERRQ(ierr); 617c4762a1bSJed Brown ierr = VecDestroy(&temp);CHKERRQ(ierr); 618c4762a1bSJed Brown errex = PetscSqrtReal(errex); 619c4762a1bSJed Brown 620c4762a1bSJed Brown /* 621c4762a1bSJed Brown Compute initial conditions for the adjoint integration. See Notes above 622c4762a1bSJed Brown */ 623c4762a1bSJed Brown 624c4762a1bSJed Brown ierr = VecScale(G, -2.0);CHKERRQ(ierr); 625c4762a1bSJed Brown ierr = VecPointwiseMult(G,G,appctx->SEMop.mass);CHKERRQ(ierr); 626c4762a1bSJed Brown ierr = TSSetCostGradients(appctx->ts,1,&G,NULL);CHKERRQ(ierr); 627c4762a1bSJed Brown ierr = TSAdjointSolve(appctx->ts);CHKERRQ(ierr); 628c4762a1bSJed Brown ierr = VecPointwiseDivide(G,G,appctx->SEMop.mass);CHKERRQ(ierr); 629c4762a1bSJed Brown 630c4762a1bSJed Brown ierr = TaoGetSolutionStatus(tao, &its, &ff, &gnorm, &cnorm, &xdiff, &reason);CHKERRQ(ierr); 631c4762a1bSJed Brown PetscFunctionReturn(0); 632c4762a1bSJed Brown } 633c4762a1bSJed Brown 634c4762a1bSJed Brown PetscErrorCode MonitorError(Tao tao,void *ctx) 635c4762a1bSJed Brown { 636c4762a1bSJed Brown AppCtx *appctx = (AppCtx*)ctx; 637c4762a1bSJed Brown Vec temp; 638c4762a1bSJed Brown PetscReal nrm; 639c4762a1bSJed Brown PetscErrorCode ierr; 640c4762a1bSJed Brown 641c4762a1bSJed Brown PetscFunctionBegin; 642c4762a1bSJed Brown ierr = VecDuplicate(appctx->dat.ic,&temp);CHKERRQ(ierr); 643c4762a1bSJed Brown ierr = VecWAXPY(temp,-1.0,appctx->dat.ic,appctx->dat.true_solution);CHKERRQ(ierr); 644c4762a1bSJed Brown ierr = VecPointwiseMult(temp,temp,temp);CHKERRQ(ierr); 645c4762a1bSJed Brown ierr = VecDot(temp,appctx->SEMop.mass,&nrm);CHKERRQ(ierr); 646c4762a1bSJed Brown ierr = VecDestroy(&temp);CHKERRQ(ierr); 647c4762a1bSJed Brown nrm = PetscSqrtReal(nrm); 648c4762a1bSJed Brown ierr = PetscPrintf(PETSC_COMM_WORLD,"Error for initial conditions %g\n",(double)nrm);CHKERRQ(ierr); 649c4762a1bSJed Brown PetscFunctionReturn(0); 650c4762a1bSJed Brown } 651c4762a1bSJed Brown 652c4762a1bSJed Brown 653c4762a1bSJed Brown /*TEST 654c4762a1bSJed Brown 655c4762a1bSJed Brown build: 656c4762a1bSJed Brown requires: !complex 657c4762a1bSJed Brown 658c4762a1bSJed Brown test: 659c4762a1bSJed Brown args: -tao_max_it 5 -tao_gatol 1.e-4 660c4762a1bSJed Brown requires: !single 661c4762a1bSJed Brown 662c4762a1bSJed Brown test: 663c4762a1bSJed Brown suffix: 2 664c4762a1bSJed Brown nsize: 2 665c4762a1bSJed Brown args: -tao_max_it 5 -tao_gatol 1.e-4 666c4762a1bSJed Brown requires: !single 667c4762a1bSJed Brown 668c4762a1bSJed Brown TEST*/ 669