1 static char help[] = "Solves one dimensional Burger's equation compares with exact solution\n\n"; 2 3 /* 4 Not yet tested in parallel 5 */ 6 7 /* ------------------------------------------------------------------------ 8 9 This program uses the one-dimensional Burger's equation 10 u_t = mu*u_xx - u u_x, 11 on the domain 0 <= x <= 1, with periodic boundary conditions 12 13 The operators are discretized with the spectral element method 14 15 See the paper PDE-CONSTRAINED OPTIMIZATION WITH SPECTRAL ELEMENTS USING PETSC AND TAO 16 by OANA MARIN, EMIL CONSTANTINESCU, AND BARRY SMITH for details on the exact solution 17 used 18 19 See src/tao/unconstrained/tutorials/burgers_spectral.c 20 21 ------------------------------------------------------------------------- */ 22 23 #include <petscts.h> 24 #include <petscdt.h> 25 #include <petscdraw.h> 26 #include <petscdmda.h> 27 28 /* 29 User-defined application context - contains data needed by the 30 application-provided call-back routines. 31 */ 32 33 typedef struct { 34 PetscInt n; /* number of nodes */ 35 PetscReal *nodes; /* GLL nodes */ 36 PetscReal *weights; /* GLL weights */ 37 } PetscGLL; 38 39 typedef struct { 40 PetscInt N; /* grid points per elements*/ 41 PetscInt E; /* number of elements */ 42 PetscReal tol_L2, tol_max; /* error norms */ 43 PetscInt steps; /* number of timesteps */ 44 PetscReal Tend; /* endtime */ 45 PetscReal mu; /* viscosity */ 46 PetscReal L; /* total length of domain */ 47 PetscReal Le; 48 PetscReal Tadj; 49 } PetscParam; 50 51 typedef struct { 52 Vec grid; /* total grid */ 53 Vec curr_sol; 54 } PetscData; 55 56 typedef struct { 57 Vec grid; /* total grid */ 58 Vec mass; /* mass matrix for total integration */ 59 Mat stiff; /* stifness matrix */ 60 Mat keptstiff; 61 Mat grad; 62 PetscGLL gll; 63 } PetscSEMOperators; 64 65 typedef struct { 66 DM da; /* distributed array data structure */ 67 PetscSEMOperators SEMop; 68 PetscParam param; 69 PetscData dat; 70 TS ts; 71 PetscReal initial_dt; 72 } AppCtx; 73 74 /* 75 User-defined routines 76 */ 77 extern PetscErrorCode RHSMatrixLaplaciangllDM(TS, PetscReal, Vec, Mat, Mat, void *); 78 extern PetscErrorCode RHSMatrixAdvectiongllDM(TS, PetscReal, Vec, Mat, Mat, void *); 79 extern PetscErrorCode TrueSolution(TS, PetscReal, Vec, AppCtx *); 80 extern PetscErrorCode RHSFunction(TS, PetscReal, Vec, Vec, void *); 81 extern PetscErrorCode RHSJacobian(TS, PetscReal, Vec, Mat, Mat, void *); 82 83 int main(int argc, char **argv) 84 { 85 AppCtx appctx; /* user-defined application context */ 86 PetscInt i, xs, xm, ind, j, lenglob; 87 PetscReal x, *wrk_ptr1, *wrk_ptr2; 88 MatNullSpace nsp; 89 PetscMPIInt size; 90 91 /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 92 Initialize program and set problem parameters 93 - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 94 PetscFunctionBeginUser; 95 PetscCall(PetscInitialize(&argc, &argv, NULL, help)); 96 97 /*initialize parameters */ 98 appctx.param.N = 10; /* order of the spectral element */ 99 appctx.param.E = 10; /* number of elements */ 100 appctx.param.L = 4.0; /* length of the domain */ 101 appctx.param.mu = 0.01; /* diffusion coefficient */ 102 appctx.initial_dt = 5e-3; 103 appctx.param.steps = PETSC_INT_MAX; 104 appctx.param.Tend = 4; 105 106 PetscCall(PetscOptionsGetInt(NULL, NULL, "-N", &appctx.param.N, NULL)); 107 PetscCall(PetscOptionsGetInt(NULL, NULL, "-E", &appctx.param.E, NULL)); 108 PetscCall(PetscOptionsGetReal(NULL, NULL, "-Tend", &appctx.param.Tend, NULL)); 109 PetscCall(PetscOptionsGetReal(NULL, NULL, "-mu", &appctx.param.mu, NULL)); 110 appctx.param.Le = appctx.param.L / appctx.param.E; 111 112 PetscCallMPI(MPI_Comm_size(PETSC_COMM_WORLD, &size)); 113 PetscCheck((appctx.param.E % size) == 0, PETSC_COMM_WORLD, PETSC_ERR_ARG_WRONG, "Number of elements must be divisible by number of processes"); 114 115 /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 116 Create GLL data structures 117 - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 118 PetscCall(PetscMalloc2(appctx.param.N, &appctx.SEMop.gll.nodes, appctx.param.N, &appctx.SEMop.gll.weights)); 119 PetscCall(PetscDTGaussLobattoLegendreQuadrature(appctx.param.N, PETSCGAUSSLOBATTOLEGENDRE_VIA_LINEAR_ALGEBRA, appctx.SEMop.gll.nodes, appctx.SEMop.gll.weights)); 120 appctx.SEMop.gll.n = appctx.param.N; 121 lenglob = appctx.param.E * (appctx.param.N - 1); 122 123 /* 124 Create distributed array (DMDA) to manage parallel grid and vectors 125 and to set up the ghost point communication pattern. There are E*(Nl-1)+1 126 total grid values spread equally among all the processors, except first and last 127 */ 128 129 PetscCall(DMDACreate1d(PETSC_COMM_WORLD, DM_BOUNDARY_PERIODIC, lenglob, 1, 1, NULL, &appctx.da)); 130 PetscCall(DMSetFromOptions(appctx.da)); 131 PetscCall(DMSetUp(appctx.da)); 132 133 /* 134 Extract global and local vectors from DMDA; we use these to store the 135 approximate solution. Then duplicate these for remaining vectors that 136 have the same types. 137 */ 138 139 PetscCall(DMCreateGlobalVector(appctx.da, &appctx.dat.curr_sol)); 140 PetscCall(VecDuplicate(appctx.dat.curr_sol, &appctx.SEMop.grid)); 141 PetscCall(VecDuplicate(appctx.dat.curr_sol, &appctx.SEMop.mass)); 142 143 PetscCall(DMDAGetCorners(appctx.da, &xs, NULL, NULL, &xm, NULL, NULL)); 144 PetscCall(DMDAVecGetArray(appctx.da, appctx.SEMop.grid, &wrk_ptr1)); 145 PetscCall(DMDAVecGetArray(appctx.da, appctx.SEMop.mass, &wrk_ptr2)); 146 147 /* Compute function over the locally owned part of the grid */ 148 149 xs = xs / (appctx.param.N - 1); 150 xm = xm / (appctx.param.N - 1); 151 152 /* 153 Build total grid and mass over entire mesh (multi-elemental) 154 */ 155 156 for (i = xs; i < xs + xm; i++) { 157 for (j = 0; j < appctx.param.N - 1; j++) { 158 x = (appctx.param.Le / 2.0) * (appctx.SEMop.gll.nodes[j] + 1.0) + appctx.param.Le * i; 159 ind = i * (appctx.param.N - 1) + j; 160 wrk_ptr1[ind] = x; 161 wrk_ptr2[ind] = .5 * appctx.param.Le * appctx.SEMop.gll.weights[j]; 162 if (j == 0) wrk_ptr2[ind] += .5 * appctx.param.Le * appctx.SEMop.gll.weights[j]; 163 } 164 } 165 PetscCall(DMDAVecRestoreArray(appctx.da, appctx.SEMop.grid, &wrk_ptr1)); 166 PetscCall(DMDAVecRestoreArray(appctx.da, appctx.SEMop.mass, &wrk_ptr2)); 167 168 /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 169 Create matrix data structure; set matrix evaluation routine. 170 - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 171 PetscCall(DMSetMatrixPreallocateOnly(appctx.da, PETSC_TRUE)); 172 PetscCall(DMCreateMatrix(appctx.da, &appctx.SEMop.stiff)); 173 PetscCall(DMCreateMatrix(appctx.da, &appctx.SEMop.grad)); 174 /* 175 For linear problems with a time-dependent f(u,t) in the equation 176 u_t = f(u,t), the user provides the discretized right-hand side 177 as a time-dependent matrix. 178 */ 179 PetscCall(RHSMatrixLaplaciangllDM(appctx.ts, 0.0, appctx.dat.curr_sol, appctx.SEMop.stiff, appctx.SEMop.stiff, &appctx)); 180 PetscCall(RHSMatrixAdvectiongllDM(appctx.ts, 0.0, appctx.dat.curr_sol, appctx.SEMop.grad, appctx.SEMop.grad, &appctx)); 181 /* 182 For linear problems with a time-dependent f(u,t) in the equation 183 u_t = f(u,t), the user provides the discretized right-hand side 184 as a time-dependent matrix. 185 */ 186 187 PetscCall(MatDuplicate(appctx.SEMop.stiff, MAT_COPY_VALUES, &appctx.SEMop.keptstiff)); 188 189 /* attach the null space to the matrix, this probably is not needed but does no harm */ 190 PetscCall(MatNullSpaceCreate(PETSC_COMM_WORLD, PETSC_TRUE, 0, NULL, &nsp)); 191 PetscCall(MatSetNullSpace(appctx.SEMop.stiff, nsp)); 192 PetscCall(MatSetNullSpace(appctx.SEMop.keptstiff, nsp)); 193 PetscCall(MatNullSpaceTest(nsp, appctx.SEMop.stiff, NULL)); 194 PetscCall(MatNullSpaceDestroy(&nsp)); 195 /* attach the null space to the matrix, this probably is not needed but does no harm */ 196 PetscCall(MatNullSpaceCreate(PETSC_COMM_WORLD, PETSC_TRUE, 0, NULL, &nsp)); 197 PetscCall(MatSetNullSpace(appctx.SEMop.grad, nsp)); 198 PetscCall(MatNullSpaceTest(nsp, appctx.SEMop.grad, NULL)); 199 PetscCall(MatNullSpaceDestroy(&nsp)); 200 201 /* Create the TS solver that solves the ODE and its adjoint; set its options */ 202 PetscCall(TSCreate(PETSC_COMM_WORLD, &appctx.ts)); 203 PetscCall(TSSetProblemType(appctx.ts, TS_NONLINEAR)); 204 PetscCall(TSSetType(appctx.ts, TSRK)); 205 PetscCall(TSSetDM(appctx.ts, appctx.da)); 206 PetscCall(TSSetTime(appctx.ts, 0.0)); 207 PetscCall(TSSetTimeStep(appctx.ts, appctx.initial_dt)); 208 PetscCall(TSSetMaxSteps(appctx.ts, appctx.param.steps)); 209 PetscCall(TSSetMaxTime(appctx.ts, appctx.param.Tend)); 210 PetscCall(TSSetExactFinalTime(appctx.ts, TS_EXACTFINALTIME_MATCHSTEP)); 211 PetscCall(TSSetTolerances(appctx.ts, 1e-7, NULL, 1e-7, NULL)); 212 PetscCall(TSSetSaveTrajectory(appctx.ts)); 213 PetscCall(TSSetFromOptions(appctx.ts)); 214 PetscCall(TSSetRHSFunction(appctx.ts, NULL, RHSFunction, &appctx)); 215 PetscCall(TSSetRHSJacobian(appctx.ts, appctx.SEMop.stiff, appctx.SEMop.stiff, RHSJacobian, &appctx)); 216 217 /* Set Initial conditions for the problem */ 218 PetscCall(TrueSolution(appctx.ts, 0, appctx.dat.curr_sol, &appctx)); 219 220 PetscCall(TSSetSolutionFunction(appctx.ts, (PetscErrorCode (*)(TS, PetscReal, Vec, void *))TrueSolution, &appctx)); 221 PetscCall(TSSetTime(appctx.ts, 0.0)); 222 PetscCall(TSSetStepNumber(appctx.ts, 0)); 223 224 PetscCall(TSSolve(appctx.ts, appctx.dat.curr_sol)); 225 226 PetscCall(MatDestroy(&appctx.SEMop.stiff)); 227 PetscCall(MatDestroy(&appctx.SEMop.keptstiff)); 228 PetscCall(MatDestroy(&appctx.SEMop.grad)); 229 PetscCall(VecDestroy(&appctx.SEMop.grid)); 230 PetscCall(VecDestroy(&appctx.SEMop.mass)); 231 PetscCall(VecDestroy(&appctx.dat.curr_sol)); 232 PetscCall(PetscFree2(appctx.SEMop.gll.nodes, appctx.SEMop.gll.weights)); 233 PetscCall(DMDestroy(&appctx.da)); 234 PetscCall(TSDestroy(&appctx.ts)); 235 236 /* 237 Always call PetscFinalize() before exiting a program. This routine 238 - finalizes the PETSc libraries as well as MPI 239 - provides summary and diagnostic information if certain runtime 240 options are chosen (e.g., -log_view). 241 */ 242 PetscCall(PetscFinalize()); 243 return 0; 244 } 245 246 /* 247 TrueSolution() computes the true solution for the PDE 248 249 Input Parameter: 250 u - uninitialized solution vector (global) 251 appctx - user-defined application context 252 253 Output Parameter: 254 u - vector with solution at initial time (global) 255 */ 256 PetscErrorCode TrueSolution(TS ts, PetscReal t, Vec u, AppCtx *appctx) 257 { 258 PetscScalar *s; 259 const PetscScalar *xg; 260 PetscInt i, xs, xn; 261 262 PetscFunctionBeginUser; 263 PetscCall(DMDAVecGetArray(appctx->da, u, &s)); 264 PetscCall(DMDAVecGetArrayRead(appctx->da, appctx->SEMop.grid, (void *)&xg)); 265 PetscCall(DMDAGetCorners(appctx->da, &xs, NULL, NULL, &xn, NULL, NULL)); 266 for (i = xs; i < xs + xn; i++) { 267 s[i] = 2.0 * appctx->param.mu * PETSC_PI * PetscSinScalar(PETSC_PI * xg[i]) * PetscExpReal(-appctx->param.mu * PETSC_PI * PETSC_PI * t) / (2.0 + PetscCosScalar(PETSC_PI * xg[i]) * PetscExpReal(-appctx->param.mu * PETSC_PI * PETSC_PI * t)); 268 } 269 PetscCall(DMDAVecRestoreArray(appctx->da, u, &s)); 270 PetscCall(DMDAVecRestoreArrayRead(appctx->da, appctx->SEMop.grid, (void *)&xg)); 271 PetscFunctionReturn(PETSC_SUCCESS); 272 } 273 274 PetscErrorCode RHSFunction(TS ts, PetscReal t, Vec globalin, Vec globalout, void *ctx) 275 { 276 AppCtx *appctx = (AppCtx *)ctx; 277 278 PetscFunctionBeginUser; 279 PetscCall(MatMult(appctx->SEMop.grad, globalin, globalout)); /* grad u */ 280 PetscCall(VecPointwiseMult(globalout, globalin, globalout)); /* u grad u */ 281 PetscCall(VecScale(globalout, -1.0)); 282 PetscCall(MatMultAdd(appctx->SEMop.keptstiff, globalin, globalout, globalout)); 283 PetscFunctionReturn(PETSC_SUCCESS); 284 } 285 286 /* 287 288 K is the discretiziation of the Laplacian 289 G is the discretization of the gradient 290 291 Computes Jacobian of K u + diag(u) G u which is given by 292 K + diag(u)G + diag(Gu) 293 */ 294 PetscErrorCode RHSJacobian(TS ts, PetscReal t, Vec globalin, Mat A, Mat B, void *ctx) 295 { 296 AppCtx *appctx = (AppCtx *)ctx; 297 Vec Gglobalin; 298 299 PetscFunctionBeginUser; 300 /* A = diag(u) G */ 301 302 PetscCall(MatCopy(appctx->SEMop.grad, A, SAME_NONZERO_PATTERN)); 303 PetscCall(MatDiagonalScale(A, globalin, NULL)); 304 305 /* A = A + diag(Gu) */ 306 PetscCall(VecDuplicate(globalin, &Gglobalin)); 307 PetscCall(MatMult(appctx->SEMop.grad, globalin, Gglobalin)); 308 PetscCall(MatDiagonalSet(A, Gglobalin, ADD_VALUES)); 309 PetscCall(VecDestroy(&Gglobalin)); 310 311 /* A = K - A */ 312 PetscCall(MatScale(A, -1.0)); 313 PetscCall(MatAXPY(A, 0.0, appctx->SEMop.keptstiff, SAME_NONZERO_PATTERN)); 314 PetscFunctionReturn(PETSC_SUCCESS); 315 } 316 317 #include <petscblaslapack.h> 318 /* 319 Matrix free operation of 1d Laplacian and Grad for GLL spectral elements 320 */ 321 PetscErrorCode MatMult_Laplacian(Mat A, Vec x, Vec y) 322 { 323 AppCtx *appctx; 324 PetscReal **temp, vv; 325 PetscInt i, j, xs, xn; 326 Vec xlocal, ylocal; 327 const PetscScalar *xl; 328 PetscScalar *yl; 329 PetscBLASInt _One = 1, n; 330 PetscScalar _DOne = 1; 331 332 PetscFunctionBeginUser; 333 PetscCall(MatShellGetContext(A, &appctx)); 334 PetscCall(DMGetLocalVector(appctx->da, &xlocal)); 335 PetscCall(DMGlobalToLocalBegin(appctx->da, x, INSERT_VALUES, xlocal)); 336 PetscCall(DMGlobalToLocalEnd(appctx->da, x, INSERT_VALUES, xlocal)); 337 PetscCall(DMGetLocalVector(appctx->da, &ylocal)); 338 PetscCall(VecSet(ylocal, 0.0)); 339 PetscCall(PetscGaussLobattoLegendreElementLaplacianCreate(appctx->SEMop.gll.n, appctx->SEMop.gll.nodes, appctx->SEMop.gll.weights, &temp)); 340 for (i = 0; i < appctx->param.N; i++) { 341 vv = -appctx->param.mu * 2.0 / appctx->param.Le; 342 for (j = 0; j < appctx->param.N; j++) temp[i][j] = temp[i][j] * vv; 343 } 344 PetscCall(DMDAVecGetArrayRead(appctx->da, xlocal, (void *)&xl)); 345 PetscCall(DMDAVecGetArray(appctx->da, ylocal, &yl)); 346 PetscCall(DMDAGetCorners(appctx->da, &xs, NULL, NULL, &xn, NULL, NULL)); 347 PetscCall(PetscBLASIntCast(appctx->param.N, &n)); 348 for (j = xs; j < xs + xn; j += appctx->param.N - 1) PetscCallBLAS("BLASgemv", BLASgemv_("N", &n, &n, &_DOne, &temp[0][0], &n, &xl[j], &_One, &_DOne, &yl[j], &_One)); 349 PetscCall(DMDAVecRestoreArrayRead(appctx->da, xlocal, (void *)&xl)); 350 PetscCall(DMDAVecRestoreArray(appctx->da, ylocal, &yl)); 351 PetscCall(PetscGaussLobattoLegendreElementLaplacianDestroy(appctx->SEMop.gll.n, appctx->SEMop.gll.nodes, appctx->SEMop.gll.weights, &temp)); 352 PetscCall(VecSet(y, 0.0)); 353 PetscCall(DMLocalToGlobalBegin(appctx->da, ylocal, ADD_VALUES, y)); 354 PetscCall(DMLocalToGlobalEnd(appctx->da, ylocal, ADD_VALUES, y)); 355 PetscCall(DMRestoreLocalVector(appctx->da, &xlocal)); 356 PetscCall(DMRestoreLocalVector(appctx->da, &ylocal)); 357 PetscCall(VecPointwiseDivide(y, y, appctx->SEMop.mass)); 358 PetscFunctionReturn(PETSC_SUCCESS); 359 } 360 361 PetscErrorCode MatMult_Advection(Mat A, Vec x, Vec y) 362 { 363 AppCtx *appctx; 364 PetscReal **temp; 365 PetscInt j, xs, xn; 366 Vec xlocal, ylocal; 367 const PetscScalar *xl; 368 PetscScalar *yl; 369 PetscBLASInt _One = 1, n; 370 PetscScalar _DOne = 1; 371 372 PetscFunctionBeginUser; 373 PetscCall(MatShellGetContext(A, &appctx)); 374 PetscCall(DMGetLocalVector(appctx->da, &xlocal)); 375 PetscCall(DMGlobalToLocalBegin(appctx->da, x, INSERT_VALUES, xlocal)); 376 PetscCall(DMGlobalToLocalEnd(appctx->da, x, INSERT_VALUES, xlocal)); 377 PetscCall(DMGetLocalVector(appctx->da, &ylocal)); 378 PetscCall(VecSet(ylocal, 0.0)); 379 PetscCall(PetscGaussLobattoLegendreElementAdvectionCreate(appctx->SEMop.gll.n, appctx->SEMop.gll.nodes, appctx->SEMop.gll.weights, &temp)); 380 PetscCall(DMDAVecGetArrayRead(appctx->da, xlocal, (void *)&xl)); 381 PetscCall(DMDAVecGetArray(appctx->da, ylocal, &yl)); 382 PetscCall(DMDAGetCorners(appctx->da, &xs, NULL, NULL, &xn, NULL, NULL)); 383 PetscCall(PetscBLASIntCast(appctx->param.N, &n)); 384 for (j = xs; j < xs + xn; j += appctx->param.N - 1) PetscCallBLAS("BLASgemv", BLASgemv_("N", &n, &n, &_DOne, &temp[0][0], &n, &xl[j], &_One, &_DOne, &yl[j], &_One)); 385 PetscCall(DMDAVecRestoreArrayRead(appctx->da, xlocal, (void *)&xl)); 386 PetscCall(DMDAVecRestoreArray(appctx->da, ylocal, &yl)); 387 PetscCall(PetscGaussLobattoLegendreElementAdvectionDestroy(appctx->SEMop.gll.n, appctx->SEMop.gll.nodes, appctx->SEMop.gll.weights, &temp)); 388 PetscCall(VecSet(y, 0.0)); 389 PetscCall(DMLocalToGlobalBegin(appctx->da, ylocal, ADD_VALUES, y)); 390 PetscCall(DMLocalToGlobalEnd(appctx->da, ylocal, ADD_VALUES, y)); 391 PetscCall(DMRestoreLocalVector(appctx->da, &xlocal)); 392 PetscCall(DMRestoreLocalVector(appctx->da, &ylocal)); 393 PetscCall(VecPointwiseDivide(y, y, appctx->SEMop.mass)); 394 PetscCall(VecScale(y, -1.0)); 395 PetscFunctionReturn(PETSC_SUCCESS); 396 } 397 398 /* 399 RHSMatrixLaplacian - User-provided routine to compute the right-hand-side 400 matrix for the Laplacian operator 401 402 Input Parameters: 403 ts - the TS context 404 t - current time (ignored) 405 X - current solution (ignored) 406 dummy - optional user-defined context, as set by TSetRHSJacobian() 407 408 Output Parameters: 409 AA - Jacobian matrix 410 BB - optionally different matrix from which the preconditioner is built 411 412 */ 413 PetscErrorCode RHSMatrixLaplaciangllDM(TS ts, PetscReal t, Vec X, Mat A, Mat BB, void *ctx) 414 { 415 PetscReal **temp; 416 PetscReal vv; 417 AppCtx *appctx = (AppCtx *)ctx; /* user-defined application context */ 418 PetscInt i, xs, xn, l, j; 419 PetscInt *rowsDM; 420 PetscBool flg = PETSC_FALSE; 421 422 PetscFunctionBeginUser; 423 PetscCall(PetscOptionsGetBool(NULL, NULL, "-gll_mf", &flg, NULL)); 424 425 if (!flg) { 426 /* 427 Creates the element stiffness matrix for the given gll 428 */ 429 PetscCall(PetscGaussLobattoLegendreElementLaplacianCreate(appctx->SEMop.gll.n, appctx->SEMop.gll.nodes, appctx->SEMop.gll.weights, &temp)); 430 /* workaround for clang analyzer warning: Division by zero */ 431 PetscCheck(appctx->param.N > 1, PETSC_COMM_WORLD, PETSC_ERR_ARG_WRONG, "Spectral element order should be > 1"); 432 433 /* scale by the size of the element */ 434 for (i = 0; i < appctx->param.N; i++) { 435 vv = -appctx->param.mu * 2.0 / appctx->param.Le; 436 for (j = 0; j < appctx->param.N; j++) temp[i][j] = temp[i][j] * vv; 437 } 438 439 PetscCall(MatSetOption(A, MAT_NEW_NONZERO_ALLOCATION_ERR, PETSC_FALSE)); 440 PetscCall(DMDAGetCorners(appctx->da, &xs, NULL, NULL, &xn, NULL, NULL)); 441 442 xs = xs / (appctx->param.N - 1); 443 xn = xn / (appctx->param.N - 1); 444 445 PetscCall(PetscMalloc1(appctx->param.N, &rowsDM)); 446 /* 447 loop over local elements 448 */ 449 for (j = xs; j < xs + xn; j++) { 450 for (l = 0; l < appctx->param.N; l++) rowsDM[l] = 1 + (j - xs) * (appctx->param.N - 1) + l; 451 PetscCall(MatSetValuesLocal(A, appctx->param.N, rowsDM, appctx->param.N, rowsDM, &temp[0][0], ADD_VALUES)); 452 } 453 PetscCall(PetscFree(rowsDM)); 454 PetscCall(MatAssemblyBegin(A, MAT_FINAL_ASSEMBLY)); 455 PetscCall(MatAssemblyEnd(A, MAT_FINAL_ASSEMBLY)); 456 PetscCall(VecReciprocal(appctx->SEMop.mass)); 457 PetscCall(MatDiagonalScale(A, appctx->SEMop.mass, 0)); 458 PetscCall(VecReciprocal(appctx->SEMop.mass)); 459 460 PetscCall(PetscGaussLobattoLegendreElementLaplacianDestroy(appctx->SEMop.gll.n, appctx->SEMop.gll.nodes, appctx->SEMop.gll.weights, &temp)); 461 } else { 462 PetscCall(MatSetType(A, MATSHELL)); 463 PetscCall(MatSetUp(A)); 464 PetscCall(MatShellSetContext(A, appctx)); 465 PetscCall(MatShellSetOperation(A, MATOP_MULT, (void (*)(void))MatMult_Laplacian)); 466 } 467 PetscFunctionReturn(PETSC_SUCCESS); 468 } 469 470 /* 471 RHSMatrixAdvection - User-provided routine to compute the right-hand-side 472 matrix for the Advection (gradient) operator. 473 474 Input Parameters: 475 ts - the TS context 476 t - current time 477 global_in - global input vector 478 dummy - optional user-defined context, as set by TSetRHSJacobian() 479 480 Output Parameters: 481 AA - Jacobian matrix 482 BB - optionally different preconditioning matrix 483 484 */ 485 PetscErrorCode RHSMatrixAdvectiongllDM(TS ts, PetscReal t, Vec X, Mat A, Mat BB, void *ctx) 486 { 487 PetscReal **temp; 488 AppCtx *appctx = (AppCtx *)ctx; /* user-defined application context */ 489 PetscInt xs, xn, l, j; 490 PetscInt *rowsDM; 491 PetscBool flg = PETSC_FALSE; 492 493 PetscFunctionBeginUser; 494 PetscCall(PetscOptionsGetBool(NULL, NULL, "-gll_mf", &flg, NULL)); 495 496 if (!flg) { 497 /* 498 Creates the advection matrix for the given gll 499 */ 500 PetscCall(PetscGaussLobattoLegendreElementAdvectionCreate(appctx->SEMop.gll.n, appctx->SEMop.gll.nodes, appctx->SEMop.gll.weights, &temp)); 501 PetscCall(MatSetOption(A, MAT_NEW_NONZERO_ALLOCATION_ERR, PETSC_FALSE)); 502 PetscCall(DMDAGetCorners(appctx->da, &xs, NULL, NULL, &xn, NULL, NULL)); 503 xs = xs / (appctx->param.N - 1); 504 xn = xn / (appctx->param.N - 1); 505 506 PetscCall(PetscMalloc1(appctx->param.N, &rowsDM)); 507 for (j = xs; j < xs + xn; j++) { 508 for (l = 0; l < appctx->param.N; l++) rowsDM[l] = 1 + (j - xs) * (appctx->param.N - 1) + l; 509 PetscCall(MatSetValuesLocal(A, appctx->param.N, rowsDM, appctx->param.N, rowsDM, &temp[0][0], ADD_VALUES)); 510 } 511 PetscCall(PetscFree(rowsDM)); 512 PetscCall(MatAssemblyBegin(A, MAT_FINAL_ASSEMBLY)); 513 PetscCall(MatAssemblyEnd(A, MAT_FINAL_ASSEMBLY)); 514 515 PetscCall(VecReciprocal(appctx->SEMop.mass)); 516 PetscCall(MatDiagonalScale(A, appctx->SEMop.mass, 0)); 517 PetscCall(VecReciprocal(appctx->SEMop.mass)); 518 519 PetscCall(PetscGaussLobattoLegendreElementAdvectionDestroy(appctx->SEMop.gll.n, appctx->SEMop.gll.nodes, appctx->SEMop.gll.weights, &temp)); 520 } else { 521 PetscCall(MatSetType(A, MATSHELL)); 522 PetscCall(MatSetUp(A)); 523 PetscCall(MatShellSetContext(A, appctx)); 524 PetscCall(MatShellSetOperation(A, MATOP_MULT, (void (*)(void))MatMult_Advection)); 525 } 526 PetscFunctionReturn(PETSC_SUCCESS); 527 } 528 529 /*TEST 530 531 build: 532 requires: !complex 533 534 test: 535 suffix: 1 536 requires: !single 537 538 test: 539 suffix: 2 540 nsize: 5 541 requires: !single 542 543 test: 544 suffix: 3 545 requires: !single 546 args: -ts_view -ts_type beuler -gll_mf -pc_type none -ts_max_steps 5 -ts_monitor_error 547 548 test: 549 suffix: 4 550 requires: !single 551 args: -ts_view -ts_type beuler -pc_type none -ts_max_steps 5 -ts_monitor_error 552 553 TEST*/ 554