1 2 static char help[] = "Solves a simple time-dependent linear PDE (the heat equation).\n\ 3 Input parameters include:\n\ 4 -m <points>, where <points> = number of grid points\n\ 5 -time_dependent_rhs : Treat the problem as having a time-dependent right-hand side\n\ 6 -debug : Activate debugging printouts\n\ 7 -nox : Deactivate x-window graphics\n\n"; 8 9 /* ------------------------------------------------------------------------ 10 11 This program solves the one-dimensional heat equation (also called the 12 diffusion equation), 13 u_t = u_xx, 14 on the domain 0 <= x <= 1, with the boundary conditions 15 u(t,0) = 1, u(t,1) = 1, 16 and the initial condition 17 u(0,x) = cos(6*pi*x) + 3*cos(2*pi*x). 18 This is a linear, second-order, parabolic equation. 19 20 We discretize the right-hand side using finite differences with 21 uniform grid spacing h: 22 u_xx = (u_{i+1} - 2u_{i} + u_{i-1})/(h^2) 23 We then demonstrate time evolution using the various TS methods by 24 running the program via 25 ex3 -ts_type <timestepping solver> 26 27 We compare the approximate solution with the exact solution, given by 28 u_exact(x,t) = exp(-36*pi*pi*t) * cos(6*pi*x) + 29 3*exp(-4*pi*pi*t) * cos(2*pi*x) 30 31 Notes: 32 This code demonstrates the TS solver interface to two variants of 33 linear problems, u_t = f(u,t), namely 34 - time-dependent f: f(u,t) is a function of t 35 - time-independent f: f(u,t) is simply just f(u) 36 37 The parallel version of this code is ts/tutorials/ex4.c 38 39 ------------------------------------------------------------------------- */ 40 41 /* 42 Include "petscts.h" so that we can use TS solvers. Note that this file 43 automatically includes: 44 petscsys.h - base PETSc routines petscvec.h - vectors 45 petscmat.h - matrices 46 petscis.h - index sets petscksp.h - Krylov subspace methods 47 petscviewer.h - viewers petscpc.h - preconditioners 48 petscksp.h - linear solvers petscsnes.h - nonlinear solvers 49 */ 50 #include <petscts.h> 51 #include <petscdraw.h> 52 53 /* 54 User-defined application context - contains data needed by the 55 application-provided call-back routines. 56 */ 57 typedef struct { 58 Vec solution; /* global exact solution vector */ 59 PetscInt m; /* total number of grid points */ 60 PetscReal h; /* mesh width h = 1/(m-1) */ 61 PetscBool debug; /* flag (1 indicates activation of debugging printouts) */ 62 PetscViewer viewer1, viewer2; /* viewers for the solution and error */ 63 PetscReal norm_2, norm_max; /* error norms */ 64 } AppCtx; 65 66 /* 67 User-defined routines 68 */ 69 extern PetscErrorCode InitialConditions(Vec, AppCtx *); 70 extern PetscErrorCode RHSMatrixHeat(TS, PetscReal, Vec, Mat, Mat, void *); 71 extern PetscErrorCode Monitor(TS, PetscInt, PetscReal, Vec, void *); 72 extern PetscErrorCode ExactSolution(PetscReal, Vec, AppCtx *); 73 74 int main(int argc, char **argv) 75 { 76 AppCtx appctx; /* user-defined application context */ 77 TS ts; /* timestepping context */ 78 Mat A; /* matrix data structure */ 79 Vec u; /* approximate solution vector */ 80 PetscReal time_total_max = 100.0; /* default max total time */ 81 PetscInt time_steps_max = 100; /* default max timesteps */ 82 PetscDraw draw; /* drawing context */ 83 PetscInt steps, m; 84 PetscMPIInt size; 85 PetscBool flg; 86 PetscReal dt, ftime; 87 88 /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 89 Initialize program and set problem parameters 90 - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 91 92 PetscFunctionBeginUser; 93 PetscCall(PetscInitialize(&argc, &argv, (char *)0, help)); 94 PetscCallMPI(MPI_Comm_size(PETSC_COMM_WORLD, &size)); 95 PetscCheck(size == 1, PETSC_COMM_WORLD, PETSC_ERR_WRONG_MPI_SIZE, "This is a uniprocessor example only!"); 96 97 m = 60; 98 PetscCall(PetscOptionsGetInt(NULL, NULL, "-m", &m, NULL)); 99 PetscCall(PetscOptionsHasName(NULL, NULL, "-debug", &appctx.debug)); 100 appctx.m = m; 101 appctx.h = 1.0 / (m - 1.0); 102 appctx.norm_2 = 0.0; 103 appctx.norm_max = 0.0; 104 105 PetscCall(PetscPrintf(PETSC_COMM_SELF, "Solving a linear TS problem on 1 processor\n")); 106 107 /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 108 Create vector data structures 109 - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 110 111 /* 112 Create vector data structures for approximate and exact solutions 113 */ 114 PetscCall(VecCreateSeq(PETSC_COMM_SELF, m, &u)); 115 PetscCall(VecDuplicate(u, &appctx.solution)); 116 117 /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 118 Set up displays to show graphs of the solution and error 119 - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 120 121 PetscCall(PetscViewerDrawOpen(PETSC_COMM_SELF, 0, "", 80, 380, 400, 160, &appctx.viewer1)); 122 PetscCall(PetscViewerDrawGetDraw(appctx.viewer1, 0, &draw)); 123 PetscCall(PetscDrawSetDoubleBuffer(draw)); 124 PetscCall(PetscViewerDrawOpen(PETSC_COMM_SELF, 0, "", 80, 0, 400, 160, &appctx.viewer2)); 125 PetscCall(PetscViewerDrawGetDraw(appctx.viewer2, 0, &draw)); 126 PetscCall(PetscDrawSetDoubleBuffer(draw)); 127 128 /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 129 Create timestepping solver context 130 - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 131 132 PetscCall(TSCreate(PETSC_COMM_SELF, &ts)); 133 PetscCall(TSSetProblemType(ts, TS_LINEAR)); 134 135 /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 136 Set optional user-defined monitoring routine 137 - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 138 139 PetscCall(TSMonitorSet(ts, Monitor, &appctx, NULL)); 140 141 /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 142 143 Create matrix data structure; set matrix evaluation routine. 144 - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 145 146 PetscCall(MatCreate(PETSC_COMM_SELF, &A)); 147 PetscCall(MatSetSizes(A, PETSC_DECIDE, PETSC_DECIDE, m, m)); 148 PetscCall(MatSetFromOptions(A)); 149 PetscCall(MatSetUp(A)); 150 151 PetscCall(PetscOptionsHasName(NULL, NULL, "-time_dependent_rhs", &flg)); 152 if (flg) { 153 /* 154 For linear problems with a time-dependent f(u,t) in the equation 155 u_t = f(u,t), the user provides the discretized right-hand-side 156 as a time-dependent matrix. 157 */ 158 PetscCall(TSSetRHSFunction(ts, NULL, TSComputeRHSFunctionLinear, &appctx)); 159 PetscCall(TSSetRHSJacobian(ts, A, A, RHSMatrixHeat, &appctx)); 160 } else { 161 /* 162 For linear problems with a time-independent f(u) in the equation 163 u_t = f(u), the user provides the discretized right-hand-side 164 as a matrix only once, and then sets a null matrix evaluation 165 routine. 166 */ 167 PetscCall(RHSMatrixHeat(ts, 0.0, u, A, A, &appctx)); 168 PetscCall(TSSetRHSFunction(ts, NULL, TSComputeRHSFunctionLinear, &appctx)); 169 PetscCall(TSSetRHSJacobian(ts, A, A, TSComputeRHSJacobianConstant, &appctx)); 170 } 171 172 /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 173 Set solution vector and initial timestep 174 - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 175 176 dt = appctx.h * appctx.h / 2.0; 177 PetscCall(TSSetTimeStep(ts, dt)); 178 PetscCall(TSSetSolution(ts, u)); 179 180 /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 181 Customize timestepping solver: 182 - Set the solution method to be the Backward Euler method. 183 - Set timestepping duration info 184 Then set runtime options, which can override these defaults. 185 For example, 186 -ts_max_steps <maxsteps> -ts_max_time <maxtime> 187 to override the defaults set by TSSetMaxSteps()/TSSetMaxTime(). 188 - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 189 190 PetscCall(TSSetMaxSteps(ts, time_steps_max)); 191 PetscCall(TSSetMaxTime(ts, time_total_max)); 192 PetscCall(TSSetExactFinalTime(ts, TS_EXACTFINALTIME_STEPOVER)); 193 PetscCall(TSSetFromOptions(ts)); 194 195 /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 196 Solve the problem 197 - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 198 199 /* 200 Evaluate initial conditions 201 */ 202 PetscCall(InitialConditions(u, &appctx)); 203 204 /* 205 Run the timestepping solver 206 */ 207 PetscCall(TSSolve(ts, u)); 208 PetscCall(TSGetSolveTime(ts, &ftime)); 209 PetscCall(TSGetStepNumber(ts, &steps)); 210 211 /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 212 View timestepping solver info 213 - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 214 215 PetscCall(PetscPrintf(PETSC_COMM_SELF, "avg. error (2 norm) = %g, avg. error (max norm) = %g\n", (double)(appctx.norm_2 / steps), (double)(appctx.norm_max / steps))); 216 PetscCall(TSView(ts, PETSC_VIEWER_STDOUT_SELF)); 217 218 /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 219 Free work space. All PETSc objects should be destroyed when they 220 are no longer needed. 221 - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 222 223 PetscCall(TSDestroy(&ts)); 224 PetscCall(MatDestroy(&A)); 225 PetscCall(VecDestroy(&u)); 226 PetscCall(PetscViewerDestroy(&appctx.viewer1)); 227 PetscCall(PetscViewerDestroy(&appctx.viewer2)); 228 PetscCall(VecDestroy(&appctx.solution)); 229 230 /* 231 Always call PetscFinalize() before exiting a program. This routine 232 - finalizes the PETSc libraries as well as MPI 233 - provides summary and diagnostic information if certain runtime 234 options are chosen (e.g., -log_view). 235 */ 236 PetscCall(PetscFinalize()); 237 return 0; 238 } 239 /* --------------------------------------------------------------------- */ 240 /* 241 InitialConditions - Computes the solution at the initial time. 242 243 Input Parameter: 244 u - uninitialized solution vector (global) 245 appctx - user-defined application context 246 247 Output Parameter: 248 u - vector with solution at initial time (global) 249 */ 250 PetscErrorCode InitialConditions(Vec u, AppCtx *appctx) 251 { 252 PetscScalar *u_localptr, h = appctx->h; 253 PetscInt i; 254 255 /* 256 Get a pointer to vector data. 257 - For default PETSc vectors, VecGetArray() returns a pointer to 258 the data array. Otherwise, the routine is implementation dependent. 259 - You MUST call VecRestoreArray() when you no longer need access to 260 the array. 261 - Note that the Fortran interface to VecGetArray() differs from the 262 C version. See the users manual for details. 263 */ 264 PetscCall(VecGetArray(u, &u_localptr)); 265 266 /* 267 We initialize the solution array by simply writing the solution 268 directly into the array locations. Alternatively, we could use 269 VecSetValues() or VecSetValuesLocal(). 270 */ 271 for (i = 0; i < appctx->m; i++) u_localptr[i] = PetscCosScalar(PETSC_PI * i * 6. * h) + 3. * PetscCosScalar(PETSC_PI * i * 2. * h); 272 273 /* 274 Restore vector 275 */ 276 PetscCall(VecRestoreArray(u, &u_localptr)); 277 278 /* 279 Print debugging information if desired 280 */ 281 if (appctx->debug) { 282 printf("initial guess vector\n"); 283 PetscCall(VecView(u, PETSC_VIEWER_STDOUT_SELF)); 284 } 285 286 return 0; 287 } 288 /* --------------------------------------------------------------------- */ 289 /* 290 ExactSolution - Computes the exact solution at a given time. 291 292 Input Parameters: 293 t - current time 294 solution - vector in which exact solution will be computed 295 appctx - user-defined application context 296 297 Output Parameter: 298 solution - vector with the newly computed exact solution 299 */ 300 PetscErrorCode ExactSolution(PetscReal t, Vec solution, AppCtx *appctx) 301 { 302 PetscScalar *s_localptr, h = appctx->h, ex1, ex2, sc1, sc2, tc = t; 303 PetscInt i; 304 305 /* 306 Get a pointer to vector data. 307 */ 308 PetscCall(VecGetArray(solution, &s_localptr)); 309 310 /* 311 Simply write the solution directly into the array locations. 312 Alternatively, we culd use VecSetValues() or VecSetValuesLocal(). 313 */ 314 ex1 = PetscExpScalar(-36. * PETSC_PI * PETSC_PI * tc); 315 ex2 = PetscExpScalar(-4. * PETSC_PI * PETSC_PI * tc); 316 sc1 = PETSC_PI * 6. * h; 317 sc2 = PETSC_PI * 2. * h; 318 for (i = 0; i < appctx->m; i++) s_localptr[i] = PetscCosScalar(sc1 * (PetscReal)i) * ex1 + 3. * PetscCosScalar(sc2 * (PetscReal)i) * ex2; 319 320 /* 321 Restore vector 322 */ 323 PetscCall(VecRestoreArray(solution, &s_localptr)); 324 return 0; 325 } 326 /* --------------------------------------------------------------------- */ 327 /* 328 Monitor - User-provided routine to monitor the solution computed at 329 each timestep. This example plots the solution and computes the 330 error in two different norms. 331 332 Input Parameters: 333 ts - the timestep context 334 step - the count of the current step (with 0 meaning the 335 initial condition) 336 time - the current time 337 u - the solution at this timestep 338 ctx - the user-provided context for this monitoring routine. 339 In this case we use the application context which contains 340 information about the problem size, workspace and the exact 341 solution. 342 */ 343 PetscErrorCode Monitor(TS ts, PetscInt step, PetscReal time, Vec u, void *ctx) 344 { 345 AppCtx *appctx = (AppCtx *)ctx; /* user-defined application context */ 346 PetscReal norm_2, norm_max; 347 348 /* 349 View a graph of the current iterate 350 */ 351 PetscCall(VecView(u, appctx->viewer2)); 352 353 /* 354 Compute the exact solution 355 */ 356 PetscCall(ExactSolution(time, appctx->solution, appctx)); 357 358 /* 359 Print debugging information if desired 360 */ 361 if (appctx->debug) { 362 printf("Computed solution vector\n"); 363 PetscCall(VecView(u, PETSC_VIEWER_STDOUT_SELF)); 364 printf("Exact solution vector\n"); 365 PetscCall(VecView(appctx->solution, PETSC_VIEWER_STDOUT_SELF)); 366 } 367 368 /* 369 Compute the 2-norm and max-norm of the error 370 */ 371 PetscCall(VecAXPY(appctx->solution, -1.0, u)); 372 PetscCall(VecNorm(appctx->solution, NORM_2, &norm_2)); 373 norm_2 = PetscSqrtReal(appctx->h) * norm_2; 374 PetscCall(VecNorm(appctx->solution, NORM_MAX, &norm_max)); 375 if (norm_2 < 1e-14) norm_2 = 0; 376 if (norm_max < 1e-14) norm_max = 0; 377 378 PetscCall(PetscPrintf(PETSC_COMM_WORLD, "Timestep %" PetscInt_FMT ": time = %g, 2-norm error = %g, max norm error = %g\n", step, (double)time, (double)norm_2, (double)norm_max)); 379 appctx->norm_2 += norm_2; 380 appctx->norm_max += norm_max; 381 382 /* 383 View a graph of the error 384 */ 385 PetscCall(VecView(appctx->solution, appctx->viewer1)); 386 387 /* 388 Print debugging information if desired 389 */ 390 if (appctx->debug) { 391 printf("Error vector\n"); 392 PetscCall(VecView(appctx->solution, PETSC_VIEWER_STDOUT_SELF)); 393 } 394 395 return 0; 396 } 397 /* --------------------------------------------------------------------- */ 398 /* 399 RHSMatrixHeat - User-provided routine to compute the right-hand-side 400 matrix for the heat equation. 401 402 Input Parameters: 403 ts - the TS context 404 t - current time 405 global_in - global input vector 406 dummy - optional user-defined context, as set by TSetRHSJacobian() 407 408 Output Parameters: 409 AA - Jacobian matrix 410 BB - optionally different preconditioning matrix 411 str - flag indicating matrix structure 412 413 Notes: 414 Recall that MatSetValues() uses 0-based row and column numbers 415 in Fortran as well as in C. 416 */ 417 PetscErrorCode RHSMatrixHeat(TS ts, PetscReal t, Vec X, Mat AA, Mat BB, void *ctx) 418 { 419 Mat A = AA; /* Jacobian matrix */ 420 AppCtx *appctx = (AppCtx *)ctx; /* user-defined application context */ 421 PetscInt mstart = 0; 422 PetscInt mend = appctx->m; 423 PetscInt i, idx[3]; 424 PetscScalar v[3], stwo = -2. / (appctx->h * appctx->h), sone = -.5 * stwo; 425 426 /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 427 Compute entries for the locally owned part of the matrix 428 - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 429 /* 430 Set matrix rows corresponding to boundary data 431 */ 432 433 mstart = 0; 434 v[0] = 1.0; 435 PetscCall(MatSetValues(A, 1, &mstart, 1, &mstart, v, INSERT_VALUES)); 436 mstart++; 437 438 mend--; 439 v[0] = 1.0; 440 PetscCall(MatSetValues(A, 1, &mend, 1, &mend, v, INSERT_VALUES)); 441 442 /* 443 Set matrix rows corresponding to interior data. We construct the 444 matrix one row at a time. 445 */ 446 v[0] = sone; 447 v[1] = stwo; 448 v[2] = sone; 449 for (i = mstart; i < mend; i++) { 450 idx[0] = i - 1; 451 idx[1] = i; 452 idx[2] = i + 1; 453 PetscCall(MatSetValues(A, 1, &i, 3, idx, v, INSERT_VALUES)); 454 } 455 456 /* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - 457 Complete the matrix assembly process and set some options 458 - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */ 459 /* 460 Assemble matrix, using the 2-step process: 461 MatAssemblyBegin(), MatAssemblyEnd() 462 Computations can be done while messages are in transition 463 by placing code between these two statements. 464 */ 465 PetscCall(MatAssemblyBegin(A, MAT_FINAL_ASSEMBLY)); 466 PetscCall(MatAssemblyEnd(A, MAT_FINAL_ASSEMBLY)); 467 468 /* 469 Set and option to indicate that we will never add a new nonzero location 470 to the matrix. If we do, it will generate an error. 471 */ 472 PetscCall(MatSetOption(A, MAT_NEW_NONZERO_LOCATION_ERR, PETSC_TRUE)); 473 474 return 0; 475 } 476 477 /*TEST 478 479 test: 480 requires: x 481 482 test: 483 suffix: nox 484 args: -nox 485 486 TEST*/ 487