/* Defines the multigrid preconditioner interface. */ #include /*I "petscksp.h" I*/ #include #include PETSC_INTERN PetscErrorCode PCPreSolveChangeRHS(PC, PetscBool *); /* Contains the list of registered coarse space construction routines */ PetscFunctionList PCMGCoarseList = NULL; PetscErrorCode PCMGMCycle_Private(PC pc, PC_MG_Levels **mglevelsin, PetscBool transpose, PetscBool matapp, PCRichardsonConvergedReason *reason) { PC_MG *mg = (PC_MG *)pc->data; PC_MG_Levels *mgc, *mglevels = *mglevelsin; PetscInt cycles = (mglevels->level == 1) ? 1 : mglevels->cycles; PetscFunctionBegin; if (mglevels->eventsmoothsolve) PetscCall(PetscLogEventBegin(mglevels->eventsmoothsolve, 0, 0, 0, 0)); if (!transpose) { if (matapp) { PetscCall(KSPMatSolve(mglevels->smoothd, mglevels->B, mglevels->X)); /* pre-smooth */ PetscCall(KSPCheckSolve(mglevels->smoothd, pc, NULL)); } else { PetscCall(KSPSolve(mglevels->smoothd, mglevels->b, mglevels->x)); /* pre-smooth */ PetscCall(KSPCheckSolve(mglevels->smoothd, pc, mglevels->x)); } } else { PetscCheck(!matapp, PetscObjectComm((PetscObject)pc), PETSC_ERR_SUP, "Not supported"); PetscCall(KSPSolveTranspose(mglevels->smoothu, mglevels->b, mglevels->x)); /* transpose of post-smooth */ PetscCall(KSPCheckSolve(mglevels->smoothu, pc, mglevels->x)); } if (mglevels->eventsmoothsolve) PetscCall(PetscLogEventEnd(mglevels->eventsmoothsolve, 0, 0, 0, 0)); if (mglevels->level) { /* not the coarsest grid */ if (mglevels->eventresidual) PetscCall(PetscLogEventBegin(mglevels->eventresidual, 0, 0, 0, 0)); if (matapp && !mglevels->R) PetscCall(MatDuplicate(mglevels->B, MAT_DO_NOT_COPY_VALUES, &mglevels->R)); if (!transpose) { if (matapp) PetscCall((*mglevels->matresidual)(mglevels->A, mglevels->B, mglevels->X, mglevels->R)); else PetscCall((*mglevels->residual)(mglevels->A, mglevels->b, mglevels->x, mglevels->r)); } else { if (matapp) PetscCall((*mglevels->matresidualtranspose)(mglevels->A, mglevels->B, mglevels->X, mglevels->R)); else PetscCall((*mglevels->residualtranspose)(mglevels->A, mglevels->b, mglevels->x, mglevels->r)); } if (mglevels->eventresidual) PetscCall(PetscLogEventEnd(mglevels->eventresidual, 0, 0, 0, 0)); /* if on finest level and have convergence criteria set */ if (mglevels->level == mglevels->levels - 1 && mg->ttol && reason) { PetscReal rnorm; PetscCall(VecNorm(mglevels->r, NORM_2, &rnorm)); if (rnorm <= mg->ttol) { if (rnorm < mg->abstol) { *reason = PCRICHARDSON_CONVERGED_ATOL; PetscCall(PetscInfo(pc, "Linear solver has converged. Residual norm %g is less than absolute tolerance %g\n", (double)rnorm, (double)mg->abstol)); } else { *reason = PCRICHARDSON_CONVERGED_RTOL; PetscCall(PetscInfo(pc, "Linear solver has converged. Residual norm %g is less than relative tolerance times initial residual norm %g\n", (double)rnorm, (double)mg->ttol)); } PetscFunctionReturn(PETSC_SUCCESS); } } mgc = *(mglevelsin - 1); if (mglevels->eventinterprestrict) PetscCall(PetscLogEventBegin(mglevels->eventinterprestrict, 0, 0, 0, 0)); if (!transpose) { if (matapp) PetscCall(MatMatRestrict(mglevels->restrct, mglevels->R, &mgc->B)); else PetscCall(MatRestrict(mglevels->restrct, mglevels->r, mgc->b)); } else { if (matapp) PetscCall(MatMatRestrict(mglevels->interpolate, mglevels->R, &mgc->B)); else PetscCall(MatRestrict(mglevels->interpolate, mglevels->r, mgc->b)); } if (mglevels->eventinterprestrict) PetscCall(PetscLogEventEnd(mglevels->eventinterprestrict, 0, 0, 0, 0)); if (matapp) { if (!mgc->X) { PetscCall(MatDuplicate(mgc->B, MAT_DO_NOT_COPY_VALUES, &mgc->X)); } else { PetscCall(MatZeroEntries(mgc->X)); } } else { PetscCall(VecZeroEntries(mgc->x)); } while (cycles--) PetscCall(PCMGMCycle_Private(pc, mglevelsin - 1, transpose, matapp, reason)); if (mglevels->eventinterprestrict) PetscCall(PetscLogEventBegin(mglevels->eventinterprestrict, 0, 0, 0, 0)); if (!transpose) { if (matapp) PetscCall(MatMatInterpolateAdd(mglevels->interpolate, mgc->X, mglevels->X, &mglevels->X)); else PetscCall(MatInterpolateAdd(mglevels->interpolate, mgc->x, mglevels->x, mglevels->x)); } else { PetscCall(MatInterpolateAdd(mglevels->restrct, mgc->x, mglevels->x, mglevels->x)); } if (mglevels->eventinterprestrict) PetscCall(PetscLogEventEnd(mglevels->eventinterprestrict, 0, 0, 0, 0)); if (mglevels->eventsmoothsolve) PetscCall(PetscLogEventBegin(mglevels->eventsmoothsolve, 0, 0, 0, 0)); if (!transpose) { if (matapp) { PetscCall(KSPMatSolve(mglevels->smoothu, mglevels->B, mglevels->X)); /* post smooth */ PetscCall(KSPCheckSolve(mglevels->smoothu, pc, NULL)); } else { PetscCall(KSPSolve(mglevels->smoothu, mglevels->b, mglevels->x)); /* post smooth */ PetscCall(KSPCheckSolve(mglevels->smoothu, pc, mglevels->x)); } } else { PetscCheck(!matapp, PetscObjectComm((PetscObject)pc), PETSC_ERR_SUP, "Not supported"); PetscCall(KSPSolveTranspose(mglevels->smoothd, mglevels->b, mglevels->x)); /* post smooth */ PetscCall(KSPCheckSolve(mglevels->smoothd, pc, mglevels->x)); } if (mglevels->cr) { Mat crA; PetscCheck(!matapp, PetscObjectComm((PetscObject)pc), PETSC_ERR_SUP, "Not supported"); /* TODO Turn on copy and turn off noisy if we have an exact solution PetscCall(VecCopy(mglevels->x, mglevels->crx)); PetscCall(VecCopy(mglevels->b, mglevels->crb)); */ PetscCall(KSPGetOperators(mglevels->cr, &crA, NULL)); PetscCall(KSPSetNoisy_Private(crA, mglevels->crx)); PetscCall(KSPSolve(mglevels->cr, mglevels->crb, mglevels->crx)); /* compatible relaxation */ PetscCall(KSPCheckSolve(mglevels->cr, pc, mglevels->crx)); } if (mglevels->eventsmoothsolve) PetscCall(PetscLogEventEnd(mglevels->eventsmoothsolve, 0, 0, 0, 0)); } PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode PCApplyRichardson_MG(PC pc, Vec b, Vec x, Vec w, PetscReal rtol, PetscReal abstol, PetscReal dtol, PetscInt its, PetscBool zeroguess, PetscInt *outits, PCRichardsonConvergedReason *reason) { PC_MG *mg = (PC_MG *)pc->data; PC_MG_Levels **mglevels = mg->levels; PC tpc; PetscBool changeu, changed; PetscInt levels = mglevels[0]->levels, i; PetscFunctionBegin; /* When the DM is supplying the matrix then it will not exist until here */ for (i = 0; i < levels; i++) { if (!mglevels[i]->A) { PetscCall(KSPGetOperators(mglevels[i]->smoothu, &mglevels[i]->A, NULL)); PetscCall(PetscObjectReference((PetscObject)mglevels[i]->A)); } } PetscCall(KSPGetPC(mglevels[levels - 1]->smoothd, &tpc)); PetscCall(PCPreSolveChangeRHS(tpc, &changed)); PetscCall(KSPGetPC(mglevels[levels - 1]->smoothu, &tpc)); PetscCall(PCPreSolveChangeRHS(tpc, &changeu)); if (!changed && !changeu) { PetscCall(VecDestroy(&mglevels[levels - 1]->b)); mglevels[levels - 1]->b = b; } else { /* if the smoother changes the rhs during PreSolve, we cannot use the input vector */ if (!mglevels[levels - 1]->b) { Vec *vec; PetscCall(KSPCreateVecs(mglevels[levels - 1]->smoothd, 1, &vec, 0, NULL)); mglevels[levels - 1]->b = *vec; PetscCall(PetscFree(vec)); } PetscCall(VecCopy(b, mglevels[levels - 1]->b)); } mglevels[levels - 1]->x = x; mg->rtol = rtol; mg->abstol = abstol; mg->dtol = dtol; if (rtol) { /* compute initial residual norm for relative convergence test */ PetscReal rnorm; if (zeroguess) { PetscCall(VecNorm(b, NORM_2, &rnorm)); } else { PetscCall((*mglevels[levels - 1]->residual)(mglevels[levels - 1]->A, b, x, w)); PetscCall(VecNorm(w, NORM_2, &rnorm)); } mg->ttol = PetscMax(rtol * rnorm, abstol); } else if (abstol) mg->ttol = abstol; else mg->ttol = 0.0; /* since smoother is applied to full system, not just residual we need to make sure that smoothers don't stop prematurely due to small residual */ for (i = 1; i < levels; i++) { PetscCall(KSPSetTolerances(mglevels[i]->smoothu, 0, PETSC_CURRENT, PETSC_CURRENT, PETSC_CURRENT)); if (mglevels[i]->smoothu != mglevels[i]->smoothd) { /* For Richardson the initial guess is nonzero since it is solving in each cycle the original system not just applying as a preconditioner */ PetscCall(KSPSetInitialGuessNonzero(mglevels[i]->smoothd, PETSC_TRUE)); PetscCall(KSPSetTolerances(mglevels[i]->smoothd, 0, PETSC_CURRENT, PETSC_CURRENT, PETSC_CURRENT)); } } *reason = PCRICHARDSON_NOT_SET; for (i = 0; i < its; i++) { PetscCall(PCMGMCycle_Private(pc, mglevels + levels - 1, PETSC_FALSE, PETSC_FALSE, reason)); if (*reason) break; } if (*reason == PCRICHARDSON_NOT_SET) *reason = PCRICHARDSON_CONVERGED_ITS; *outits = i; if (!changed && !changeu) mglevels[levels - 1]->b = NULL; PetscFunctionReturn(PETSC_SUCCESS); } PetscErrorCode PCReset_MG(PC pc) { PC_MG *mg = (PC_MG *)pc->data; PC_MG_Levels **mglevels = mg->levels; PetscInt i, n; PetscFunctionBegin; if (mglevels) { n = mglevels[0]->levels; for (i = 0; i < n - 1; i++) { PetscCall(VecDestroy(&mglevels[i + 1]->r)); PetscCall(VecDestroy(&mglevels[i]->b)); PetscCall(VecDestroy(&mglevels[i]->x)); PetscCall(MatDestroy(&mglevels[i + 1]->R)); PetscCall(MatDestroy(&mglevels[i]->B)); PetscCall(MatDestroy(&mglevels[i]->X)); PetscCall(VecDestroy(&mglevels[i]->crx)); PetscCall(VecDestroy(&mglevels[i]->crb)); PetscCall(MatDestroy(&mglevels[i + 1]->restrct)); PetscCall(MatDestroy(&mglevels[i + 1]->interpolate)); PetscCall(MatDestroy(&mglevels[i + 1]->inject)); PetscCall(VecDestroy(&mglevels[i + 1]->rscale)); } PetscCall(VecDestroy(&mglevels[n - 1]->crx)); PetscCall(VecDestroy(&mglevels[n - 1]->crb)); /* this is not null only if the smoother on the finest level changes the rhs during PreSolve */ PetscCall(VecDestroy(&mglevels[n - 1]->b)); PetscCall(MatDestroy(&mglevels[n - 1]->B)); for (i = 0; i < n; i++) { PetscCall(MatDestroy(&mglevels[i]->coarseSpace)); PetscCall(MatDestroy(&mglevels[i]->A)); if (mglevels[i]->smoothd != mglevels[i]->smoothu) PetscCall(KSPReset(mglevels[i]->smoothd)); PetscCall(KSPReset(mglevels[i]->smoothu)); if (mglevels[i]->cr) PetscCall(KSPReset(mglevels[i]->cr)); } mg->Nc = 0; } PetscFunctionReturn(PETSC_SUCCESS); } /* Implementing CR We only want to make corrections that ``do not change'' the coarse solution. What we mean by not changing is that if I prolong my coarse solution to the fine grid and then inject that fine solution back to the coarse grid, I get the same answer. Injection is what Brannick calls R. We want the complementary projector to Inj, which we will call S, after Brannick, so that Inj S = 0. Now the orthogonal projector onto the range of Inj^T is Inj^T (Inj Inj^T)^{-1} Inj and if Inj is a VecScatter, as it is now in PETSc, we have Inj^T Inj and S = I - Inj^T Inj since Inj S = Inj - (Inj Inj^T) Inj = 0. Brannick suggests A \to S^T A S \qquad\mathrm{and}\qquad M \to S^T M S but I do not think his :math:`S^T S = I` is correct. Our S is an orthogonal projector, so :math:`S^T S = S^2 = S`. We will use M^{-1} A \to S M^{-1} A S In fact, since it is somewhat hard in PETSc to do the symmetric application, we will just apply S on the left. Check: || Inj P - I ||_F < tol Check: In general, Inj Inj^T = I */ typedef struct { PC mg; /* The PCMG object */ PetscInt l; /* The multigrid level for this solver */ Mat Inj; /* The injection matrix */ Mat S; /* I - Inj^T Inj */ } CRContext; static PetscErrorCode CRSetup_Private(PC pc) { CRContext *ctx; Mat It; PetscFunctionBeginUser; PetscCall(PCShellGetContext(pc, &ctx)); PetscCall(PCMGGetInjection(ctx->mg, ctx->l, &It)); PetscCheck(It, PetscObjectComm((PetscObject)pc), PETSC_ERR_ARG_WRONGSTATE, "CR requires that injection be defined for this PCMG"); PetscCall(MatCreateTranspose(It, &ctx->Inj)); PetscCall(MatCreateNormal(ctx->Inj, &ctx->S)); PetscCall(MatScale(ctx->S, -1.0)); PetscCall(MatShift(ctx->S, 1.0)); PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode CRApply_Private(PC pc, Vec x, Vec y) { CRContext *ctx; PetscFunctionBeginUser; PetscCall(PCShellGetContext(pc, &ctx)); PetscCall(MatMult(ctx->S, x, y)); PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode CRDestroy_Private(PC pc) { CRContext *ctx; PetscFunctionBeginUser; PetscCall(PCShellGetContext(pc, &ctx)); PetscCall(MatDestroy(&ctx->Inj)); PetscCall(MatDestroy(&ctx->S)); PetscCall(PetscFree(ctx)); PetscCall(PCShellSetContext(pc, NULL)); PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode CreateCR_Private(PC pc, PetscInt l, PC *cr) { CRContext *ctx; PetscFunctionBeginUser; PetscCall(PCCreate(PetscObjectComm((PetscObject)pc), cr)); PetscCall(PetscObjectSetName((PetscObject)*cr, "S (complementary projector to injection)")); PetscCall(PetscCalloc1(1, &ctx)); ctx->mg = pc; ctx->l = l; PetscCall(PCSetType(*cr, PCSHELL)); PetscCall(PCShellSetContext(*cr, ctx)); PetscCall(PCShellSetApply(*cr, CRApply_Private)); PetscCall(PCShellSetSetUp(*cr, CRSetup_Private)); PetscCall(PCShellSetDestroy(*cr, CRDestroy_Private)); PetscFunctionReturn(PETSC_SUCCESS); } PETSC_EXTERN PetscErrorCode PetscOptionsFindPairPrefix_Private(PetscOptions, const char[], const char[], const char *[], const char *[], PetscBool *); PetscErrorCode PCMGSetLevels_MG(PC pc, PetscInt levels, MPI_Comm *comms) { PC_MG *mg = (PC_MG *)pc->data; MPI_Comm comm; PC_MG_Levels **mglevels = mg->levels; PCMGType mgtype = mg->am; PetscInt mgctype = (PetscInt)PC_MG_CYCLE_V; PetscInt i; PetscMPIInt size; const char *prefix; PC ipc; PetscInt n; PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); PetscValidLogicalCollectiveInt(pc, levels, 2); if (mg->nlevels == levels) PetscFunctionReturn(PETSC_SUCCESS); PetscCall(PetscObjectGetComm((PetscObject)pc, &comm)); if (mglevels) { mgctype = mglevels[0]->cycles; /* changing the number of levels so free up the previous stuff */ PetscCall(PCReset_MG(pc)); n = mglevels[0]->levels; for (i = 0; i < n; i++) { if (mglevels[i]->smoothd != mglevels[i]->smoothu) PetscCall(KSPDestroy(&mglevels[i]->smoothd)); PetscCall(KSPDestroy(&mglevels[i]->smoothu)); PetscCall(KSPDestroy(&mglevels[i]->cr)); PetscCall(PetscFree(mglevels[i])); } PetscCall(PetscFree(mg->levels)); } mg->nlevels = levels; PetscCall(PetscMalloc1(levels, &mglevels)); PetscCall(PCGetOptionsPrefix(pc, &prefix)); mg->stageApply = 0; for (i = 0; i < levels; i++) { PetscCall(PetscNew(&mglevels[i])); mglevels[i]->level = i; mglevels[i]->levels = levels; mglevels[i]->cycles = mgctype; mg->default_smoothu = 2; mg->default_smoothd = 2; mglevels[i]->eventsmoothsetup = 0; mglevels[i]->eventsmoothsolve = 0; mglevels[i]->eventresidual = 0; mglevels[i]->eventinterprestrict = 0; if (comms) comm = comms[i]; if (comm != MPI_COMM_NULL) { PetscCall(KSPCreate(comm, &mglevels[i]->smoothd)); PetscCall(KSPSetNestLevel(mglevels[i]->smoothd, pc->kspnestlevel)); PetscCall(KSPSetErrorIfNotConverged(mglevels[i]->smoothd, pc->erroriffailure)); PetscCall(PetscObjectIncrementTabLevel((PetscObject)mglevels[i]->smoothd, (PetscObject)pc, levels - i)); PetscCall(KSPSetOptionsPrefix(mglevels[i]->smoothd, prefix)); PetscCall(PetscObjectComposedDataSetInt((PetscObject)mglevels[i]->smoothd, PetscMGLevelId, mglevels[i]->level)); if (i == 0 && levels > 1) { // coarse grid PetscCall(KSPAppendOptionsPrefix(mglevels[0]->smoothd, "mg_coarse_")); /* coarse solve is (redundant) LU by default; set shifttype NONZERO to avoid annoying zero-pivot in LU preconditioner */ PetscCall(KSPSetType(mglevels[0]->smoothd, KSPPREONLY)); PetscCall(KSPGetPC(mglevels[0]->smoothd, &ipc)); PetscCallMPI(MPI_Comm_size(comm, &size)); if (size > 1) { PetscCall(PCSetType(ipc, PCREDUNDANT)); } else { PetscCall(PCSetType(ipc, PCLU)); } PetscCall(PCFactorSetShiftType(ipc, MAT_SHIFT_INBLOCKS)); } else { char tprefix[128]; PetscCall(KSPSetType(mglevels[i]->smoothd, KSPCHEBYSHEV)); PetscCall(KSPSetConvergenceTest(mglevels[i]->smoothd, KSPConvergedSkip, NULL, NULL)); PetscCall(KSPSetNormType(mglevels[i]->smoothd, KSP_NORM_NONE)); PetscCall(KSPGetPC(mglevels[i]->smoothd, &ipc)); PetscCall(PCSetType(ipc, PCSOR)); PetscCall(KSPSetTolerances(mglevels[i]->smoothd, PETSC_CURRENT, PETSC_CURRENT, PETSC_CURRENT, mg->default_smoothd)); if (i == levels - 1 && levels > 1) { // replace 'mg_finegrid_' with 'mg_levels_X_' PetscBool set; PetscCall(PetscOptionsFindPairPrefix_Private(((PetscObject)mglevels[i]->smoothd)->options, ((PetscObject)mglevels[i]->smoothd)->prefix, "-mg_fine_", NULL, NULL, &set)); if (set) { if (prefix) PetscCall(PetscSNPrintf(tprefix, 128, "%smg_fine_", prefix)); else PetscCall(PetscSNPrintf(tprefix, 128, "mg_fine_")); PetscCall(KSPSetOptionsPrefix(mglevels[i]->smoothd, tprefix)); } else { PetscCall(PetscSNPrintf(tprefix, 128, "mg_levels_%" PetscInt_FMT "_", i)); PetscCall(KSPAppendOptionsPrefix(mglevels[i]->smoothd, tprefix)); } } else { PetscCall(PetscSNPrintf(tprefix, 128, "mg_levels_%" PetscInt_FMT "_", i)); PetscCall(KSPAppendOptionsPrefix(mglevels[i]->smoothd, tprefix)); } } } mglevels[i]->smoothu = mglevels[i]->smoothd; mg->rtol = 0.0; mg->abstol = 0.0; mg->dtol = 0.0; mg->ttol = 0.0; mg->cyclesperpcapply = 1; } mg->levels = mglevels; PetscCall(PCMGSetType(pc, mgtype)); PetscFunctionReturn(PETSC_SUCCESS); } /*@C PCMGSetLevels - Sets the number of levels to use with `PCMG`. Must be called before any other `PCMG` routine. Logically Collective Input Parameters: + pc - the preconditioner context . levels - the number of levels - comms - optional communicators for each level; this is to allow solving the coarser problems on smaller sets of processes. For processes that are not included in the computation you must pass `MPI_COMM_NULL`. Use comms = `NULL` to specify that all processes should participate in each level of problem. Options Database Key: . -pc_mg_levels - set the number of levels to use Level: intermediate Notes: If the number of levels is one then the multigrid uses the `-mg_levels` prefix for setting the level options rather than the `-mg_coarse` or `-mg_fine` prefix. You can free the information in comms after this routine is called. The array of MPI communicators must contain `MPI_COMM_NULL` for those ranks that at each level are not participating in the coarser solve. For example, with 2 levels and 1 and 2 ranks on the two levels, rank 0 in the original communicator will pass in an array of 2 communicators of size 2 and 1, while rank 1 in the original communicator will pass in array of 2 communicators the first of size 2 and the second of value `MPI_COMM_NULL` since the rank 1 does not participate in the coarse grid solve. Since each coarser level may have a new `MPI_Comm` with fewer ranks than the previous, one must take special care in providing the restriction and interpolation operation. We recommend providing these as two step operations; first perform a standard restriction or interpolation on the full number of ranks for that level and then use an MPI call to copy the resulting vector array entries (after calls to VecGetArray()) to the smaller or larger number of ranks, note in both cases the MPI calls must be made on the larger of the two communicators. Traditional MPI send and receives or `MPI_AlltoAllv()` could be used to do the reshuffling of the vector entries. Fortran Notes: Use comms = `PETSC_NULL_MPI_COMM` as the equivalent of `NULL` in the C interface. Note `PETSC_NULL_MPI_COMM` is not `MPI_COMM_NULL`. It is more like `PETSC_NULL_INTEGER`, `PETSC_NULL_REAL` etc. .seealso: [](ch_ksp), `PCMGSetType()`, `PCMGGetLevels()` @*/ PetscErrorCode PCMGSetLevels(PC pc, PetscInt levels, MPI_Comm *comms) { PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); if (comms) PetscAssertPointer(comms, 3); PetscTryMethod(pc, "PCMGSetLevels_C", (PC, PetscInt, MPI_Comm *), (pc, levels, comms)); PetscFunctionReturn(PETSC_SUCCESS); } PetscErrorCode PCDestroy_MG(PC pc) { PC_MG *mg = (PC_MG *)pc->data; PC_MG_Levels **mglevels = mg->levels; PetscInt i, n; PetscFunctionBegin; PetscCall(PCReset_MG(pc)); if (mglevels) { n = mglevels[0]->levels; for (i = 0; i < n; i++) { if (mglevels[i]->smoothd != mglevels[i]->smoothu) PetscCall(KSPDestroy(&mglevels[i]->smoothd)); PetscCall(KSPDestroy(&mglevels[i]->smoothu)); PetscCall(KSPDestroy(&mglevels[i]->cr)); PetscCall(PetscFree(mglevels[i])); } PetscCall(PetscFree(mg->levels)); } PetscCall(PetscFree(pc->data)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCGetInterpolations_C", NULL)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCGetCoarseOperators_C", NULL)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGSetGalerkin_C", NULL)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCSetReusePreconditioner_C", NULL)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGGetLevels_C", NULL)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGSetLevels_C", NULL)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCGetInterpolations_C", NULL)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCGetCoarseOperators_C", NULL)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGSetAdaptInterpolation_C", NULL)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGGetAdaptInterpolation_C", NULL)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGSetAdaptCR_C", NULL)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGGetAdaptCR_C", NULL)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGSetAdaptCoarseSpaceType_C", NULL)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGGetAdaptCoarseSpaceType_C", NULL)); PetscFunctionReturn(PETSC_SUCCESS); } /* PCApply_MG - Runs either an additive, multiplicative, Kaskadic or full cycle of multigrid. Note: A simple wrapper which calls PCMGMCycle(),PCMGACycle(), or PCMGFCycle(). */ static PetscErrorCode PCApply_MG_Internal(PC pc, Vec b, Vec x, Mat B, Mat X, PetscBool transpose) { PC_MG *mg = (PC_MG *)pc->data; PC_MG_Levels **mglevels = mg->levels; PC tpc; PetscInt levels = mglevels[0]->levels, i; PetscBool changeu, changed, matapp; PetscFunctionBegin; matapp = (PetscBool)(B && X); if (mg->stageApply) PetscCall(PetscLogStagePush(mg->stageApply)); /* When the DM is supplying the matrix then it will not exist until here */ for (i = 0; i < levels; i++) { if (!mglevels[i]->A) { PetscCall(KSPGetOperators(mglevels[i]->smoothu, &mglevels[i]->A, NULL)); PetscCall(PetscObjectReference((PetscObject)mglevels[i]->A)); } } PetscCall(KSPGetPC(mglevels[levels - 1]->smoothd, &tpc)); PetscCall(PCPreSolveChangeRHS(tpc, &changed)); PetscCall(KSPGetPC(mglevels[levels - 1]->smoothu, &tpc)); PetscCall(PCPreSolveChangeRHS(tpc, &changeu)); if (!changeu && !changed) { if (matapp) { PetscCall(MatDestroy(&mglevels[levels - 1]->B)); mglevels[levels - 1]->B = B; } else { PetscCall(VecDestroy(&mglevels[levels - 1]->b)); mglevels[levels - 1]->b = b; } } else { /* if the smoother changes the rhs during PreSolve, we cannot use the input vector */ if (matapp) { if (mglevels[levels - 1]->B) { PetscInt N1, N2; PetscBool flg; PetscCall(MatGetSize(mglevels[levels - 1]->B, NULL, &N1)); PetscCall(MatGetSize(B, NULL, &N2)); PetscCall(PetscObjectTypeCompare((PetscObject)mglevels[levels - 1]->B, ((PetscObject)B)->type_name, &flg)); if (N1 != N2 || !flg) PetscCall(MatDestroy(&mglevels[levels - 1]->B)); } if (!mglevels[levels - 1]->B) { PetscCall(MatDuplicate(B, MAT_COPY_VALUES, &mglevels[levels - 1]->B)); } else { PetscCall(MatCopy(B, mglevels[levels - 1]->B, SAME_NONZERO_PATTERN)); } } else { if (!mglevels[levels - 1]->b) { Vec *vec; PetscCall(KSPCreateVecs(mglevels[levels - 1]->smoothd, 1, &vec, 0, NULL)); mglevels[levels - 1]->b = *vec; PetscCall(PetscFree(vec)); } PetscCall(VecCopy(b, mglevels[levels - 1]->b)); } } if (matapp) { mglevels[levels - 1]->X = X; } else { mglevels[levels - 1]->x = x; } /* If coarser Xs are present, it means we have already block applied the PC at least once Reset operators if sizes/type do no match */ if (matapp && levels > 1 && mglevels[levels - 2]->X) { PetscInt Xc, Bc; PetscBool flg; PetscCall(MatGetSize(mglevels[levels - 2]->X, NULL, &Xc)); PetscCall(MatGetSize(mglevels[levels - 1]->B, NULL, &Bc)); PetscCall(PetscObjectTypeCompare((PetscObject)mglevels[levels - 2]->X, ((PetscObject)mglevels[levels - 1]->X)->type_name, &flg)); if (Xc != Bc || !flg) { PetscCall(MatDestroy(&mglevels[levels - 1]->R)); for (i = 0; i < levels - 1; i++) { PetscCall(MatDestroy(&mglevels[i]->R)); PetscCall(MatDestroy(&mglevels[i]->B)); PetscCall(MatDestroy(&mglevels[i]->X)); } } } if (mg->am == PC_MG_MULTIPLICATIVE) { if (matapp) PetscCall(MatZeroEntries(X)); else PetscCall(VecZeroEntries(x)); for (i = 0; i < mg->cyclesperpcapply; i++) PetscCall(PCMGMCycle_Private(pc, mglevels + levels - 1, transpose, matapp, NULL)); } else if (mg->am == PC_MG_ADDITIVE) { PetscCall(PCMGACycle_Private(pc, mglevels, transpose, matapp)); } else if (mg->am == PC_MG_KASKADE) { PetscCall(PCMGKCycle_Private(pc, mglevels, transpose, matapp)); } else { PetscCall(PCMGFCycle_Private(pc, mglevels, transpose, matapp)); } if (mg->stageApply) PetscCall(PetscLogStagePop()); if (!changeu && !changed) { if (matapp) { mglevels[levels - 1]->B = NULL; } else { mglevels[levels - 1]->b = NULL; } } PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode PCApply_MG(PC pc, Vec b, Vec x) { PetscFunctionBegin; PetscCall(PCApply_MG_Internal(pc, b, x, NULL, NULL, PETSC_FALSE)); PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode PCApplyTranspose_MG(PC pc, Vec b, Vec x) { PetscFunctionBegin; PetscCall(PCApply_MG_Internal(pc, b, x, NULL, NULL, PETSC_TRUE)); PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode PCMatApply_MG(PC pc, Mat b, Mat x) { PetscFunctionBegin; PetscCall(PCApply_MG_Internal(pc, NULL, NULL, b, x, PETSC_FALSE)); PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode PCMatApplyTranspose_MG(PC pc, Mat b, Mat x) { PetscFunctionBegin; PetscCall(PCApply_MG_Internal(pc, NULL, NULL, b, x, PETSC_TRUE)); PetscFunctionReturn(PETSC_SUCCESS); } PetscErrorCode PCSetFromOptions_MG(PC pc, PetscOptionItems PetscOptionsObject) { PetscInt levels, cycles; PetscBool flg, flg2; PC_MG *mg = (PC_MG *)pc->data; PC_MG_Levels **mglevels; PCMGType mgtype; PCMGCycleType mgctype; PCMGGalerkinType gtype; PCMGCoarseSpaceType coarseSpaceType; PetscFunctionBegin; levels = PetscMax(mg->nlevels, 1); PetscOptionsHeadBegin(PetscOptionsObject, "Multigrid options"); PetscCall(PetscOptionsInt("-pc_mg_levels", "Number of Levels", "PCMGSetLevels", levels, &levels, &flg)); if (!flg && !mg->levels && pc->dm) { PetscCall(DMGetRefineLevel(pc->dm, &levels)); levels++; mg->usedmfornumberoflevels = PETSC_TRUE; } PetscCall(PCMGSetLevels(pc, levels, NULL)); mglevels = mg->levels; mgctype = (PCMGCycleType)mglevels[0]->cycles; PetscCall(PetscOptionsEnum("-pc_mg_cycle_type", "V cycle or for W-cycle", "PCMGSetCycleType", PCMGCycleTypes, (PetscEnum)mgctype, (PetscEnum *)&mgctype, &flg)); if (flg) PetscCall(PCMGSetCycleType(pc, mgctype)); coarseSpaceType = mg->coarseSpaceType; PetscCall(PetscOptionsEnum("-pc_mg_adapt_interp_coarse_space", "Type of adaptive coarse space: none, polynomial, harmonic, eigenvector, generalized_eigenvector, gdsw", "PCMGSetAdaptCoarseSpaceType", PCMGCoarseSpaceTypes, (PetscEnum)coarseSpaceType, (PetscEnum *)&coarseSpaceType, &flg)); if (flg) PetscCall(PCMGSetAdaptCoarseSpaceType(pc, coarseSpaceType)); PetscCall(PetscOptionsInt("-pc_mg_adapt_interp_n", "Size of the coarse space for adaptive interpolation", "PCMGSetCoarseSpace", mg->Nc, &mg->Nc, &flg)); PetscCall(PetscOptionsBool("-pc_mg_mesp_monitor", "Monitor the multilevel eigensolver", "PCMGSetAdaptInterpolation", PETSC_FALSE, &mg->mespMonitor, &flg)); flg2 = PETSC_FALSE; PetscCall(PetscOptionsBool("-pc_mg_adapt_cr", "Monitor coarse space quality using Compatible Relaxation (CR)", "PCMGSetAdaptCR", PETSC_FALSE, &flg2, &flg)); if (flg) PetscCall(PCMGSetAdaptCR(pc, flg2)); flg = PETSC_FALSE; PetscCall(PetscOptionsBool("-pc_mg_distinct_smoothup", "Create separate smoothup KSP and append the prefix _up", "PCMGSetDistinctSmoothUp", PETSC_FALSE, &flg, NULL)); if (flg) PetscCall(PCMGSetDistinctSmoothUp(pc)); PetscCall(PetscOptionsEnum("-pc_mg_galerkin", "Use Galerkin process to compute coarser operators", "PCMGSetGalerkin", PCMGGalerkinTypes, (PetscEnum)mg->galerkin, (PetscEnum *)>ype, &flg)); if (flg) PetscCall(PCMGSetGalerkin(pc, gtype)); mgtype = mg->am; PetscCall(PetscOptionsEnum("-pc_mg_type", "Multigrid type", "PCMGSetType", PCMGTypes, (PetscEnum)mgtype, (PetscEnum *)&mgtype, &flg)); if (flg) PetscCall(PCMGSetType(pc, mgtype)); if (mg->am == PC_MG_MULTIPLICATIVE) { PetscCall(PetscOptionsInt("-pc_mg_multiplicative_cycles", "Number of cycles for each preconditioner step", "PCMGMultiplicativeSetCycles", mg->cyclesperpcapply, &cycles, &flg)); if (flg) PetscCall(PCMGMultiplicativeSetCycles(pc, cycles)); } flg = PETSC_FALSE; PetscCall(PetscOptionsBool("-pc_mg_log", "Log times for each multigrid level", "None", flg, &flg, NULL)); if (flg) { PetscInt i; char eventname[128]; levels = mglevels[0]->levels; for (i = 0; i < levels; i++) { PetscCall(PetscSNPrintf(eventname, PETSC_STATIC_ARRAY_LENGTH(eventname), "MGSetup Level %" PetscInt_FMT, i)); PetscCall(PetscLogEventRegister(eventname, ((PetscObject)pc)->classid, &mglevels[i]->eventsmoothsetup)); PetscCall(PetscSNPrintf(eventname, PETSC_STATIC_ARRAY_LENGTH(eventname), "MGSmooth Level %" PetscInt_FMT, i)); PetscCall(PetscLogEventRegister(eventname, ((PetscObject)pc)->classid, &mglevels[i]->eventsmoothsolve)); if (i) { PetscCall(PetscSNPrintf(eventname, PETSC_STATIC_ARRAY_LENGTH(eventname), "MGResid Level %" PetscInt_FMT, i)); PetscCall(PetscLogEventRegister(eventname, ((PetscObject)pc)->classid, &mglevels[i]->eventresidual)); PetscCall(PetscSNPrintf(eventname, PETSC_STATIC_ARRAY_LENGTH(eventname), "MGInterp Level %" PetscInt_FMT, i)); PetscCall(PetscLogEventRegister(eventname, ((PetscObject)pc)->classid, &mglevels[i]->eventinterprestrict)); } } if (PetscDefined(USE_LOG)) { const char sname[] = "MG Apply"; PetscCall(PetscLogStageGetId(sname, &mg->stageApply)); if (mg->stageApply < 0) PetscCall(PetscLogStageRegister(sname, &mg->stageApply)); } } PetscOptionsHeadEnd(); /* Check option consistency */ PetscCall(PCMGGetGalerkin(pc, >ype)); PetscCall(PCMGGetAdaptInterpolation(pc, &flg)); PetscCheck(!flg || !(gtype >= PC_MG_GALERKIN_NONE), PetscObjectComm((PetscObject)pc), PETSC_ERR_ARG_INCOMP, "Must use Galerkin coarse operators when adapting the interpolator"); PetscFunctionReturn(PETSC_SUCCESS); } const char *const PCMGTypes[] = {"MULTIPLICATIVE", "ADDITIVE", "FULL", "KASKADE", "PCMGType", "PC_MG", NULL}; const char *const PCMGCycleTypes[] = {"invalid", "v", "w", "PCMGCycleType", "PC_MG_CYCLE", NULL}; const char *const PCMGGalerkinTypes[] = {"both", "pmat", "mat", "none", "external", "PCMGGalerkinType", "PC_MG_GALERKIN", NULL}; const char *const PCMGCoarseSpaceTypes[] = {"none", "polynomial", "harmonic", "eigenvector", "generalized_eigenvector", "gdsw", "PCMGCoarseSpaceType", "PCMG_ADAPT_NONE", NULL}; #include PetscErrorCode PCView_MG(PC pc, PetscViewer viewer) { PC_MG *mg = (PC_MG *)pc->data; PC_MG_Levels **mglevels = mg->levels; PetscInt levels = mglevels ? mglevels[0]->levels : 0, i; PetscBool isascii, isbinary, isdraw; PetscFunctionBegin; PetscCall(PetscObjectTypeCompare((PetscObject)viewer, PETSCVIEWERASCII, &isascii)); PetscCall(PetscObjectTypeCompare((PetscObject)viewer, PETSCVIEWERBINARY, &isbinary)); PetscCall(PetscObjectTypeCompare((PetscObject)viewer, PETSCVIEWERDRAW, &isdraw)); if (isascii) { const char *cyclename = levels ? (mglevels[0]->cycles == PC_MG_CYCLE_V ? "v" : "w") : "unknown"; if (levels == 1) PetscCall(PetscViewerASCIIPrintf(viewer, " WARNING: Multigrid is being run with only a single level!\n")); PetscCall(PetscViewerASCIIPrintf(viewer, " type is %s, levels=%" PetscInt_FMT " cycles=%s\n", PCMGTypes[mg->am], levels, cyclename)); if (mg->am == PC_MG_MULTIPLICATIVE) PetscCall(PetscViewerASCIIPrintf(viewer, " Cycles per PCApply=%" PetscInt_FMT "\n", mg->cyclesperpcapply)); if (mg->galerkin == PC_MG_GALERKIN_BOTH) { PetscCall(PetscViewerASCIIPrintf(viewer, " Using Galerkin computed coarse grid matrices\n")); } else if (mg->galerkin == PC_MG_GALERKIN_PMAT) { PetscCall(PetscViewerASCIIPrintf(viewer, " Using Galerkin computed coarse grid matrices for pmat\n")); } else if (mg->galerkin == PC_MG_GALERKIN_MAT) { PetscCall(PetscViewerASCIIPrintf(viewer, " Using Galerkin computed coarse grid matrices for mat\n")); } else if (mg->galerkin == PC_MG_GALERKIN_EXTERNAL) { PetscCall(PetscViewerASCIIPrintf(viewer, " Using externally compute Galerkin coarse grid matrices\n")); } else { PetscCall(PetscViewerASCIIPrintf(viewer, " Not using Galerkin computed coarse grid matrices\n")); } if (mg->view) PetscCall((*mg->view)(pc, viewer)); for (i = 0; i < levels; i++) { if (i) { PetscCall(PetscViewerASCIIPrintf(viewer, "Down solver (pre-smoother) on level %" PetscInt_FMT " -------------------------------\n", i)); } else { PetscCall(PetscViewerASCIIPrintf(viewer, "Coarse grid solver -- level %" PetscInt_FMT " -------------------------------\n", i)); } PetscCall(PetscViewerASCIIPushTab(viewer)); PetscCall(KSPView(mglevels[i]->smoothd, viewer)); PetscCall(PetscViewerASCIIPopTab(viewer)); if (i && mglevels[i]->smoothd == mglevels[i]->smoothu) { PetscCall(PetscViewerASCIIPrintf(viewer, "Up solver (post-smoother) same as down solver (pre-smoother)\n")); } else if (i) { PetscCall(PetscViewerASCIIPrintf(viewer, "Up solver (post-smoother) on level %" PetscInt_FMT " -------------------------------\n", i)); PetscCall(PetscViewerASCIIPushTab(viewer)); PetscCall(KSPView(mglevels[i]->smoothu, viewer)); PetscCall(PetscViewerASCIIPopTab(viewer)); } if (i && mglevels[i]->cr) { PetscCall(PetscViewerASCIIPrintf(viewer, "CR solver on level %" PetscInt_FMT " -------------------------------\n", i)); PetscCall(PetscViewerASCIIPushTab(viewer)); PetscCall(KSPView(mglevels[i]->cr, viewer)); PetscCall(PetscViewerASCIIPopTab(viewer)); } } } else if (isbinary) { for (i = levels - 1; i >= 0; i--) { PetscCall(KSPView(mglevels[i]->smoothd, viewer)); if (i && mglevels[i]->smoothd != mglevels[i]->smoothu) PetscCall(KSPView(mglevels[i]->smoothu, viewer)); } } else if (isdraw) { PetscDraw draw; PetscReal x, w, y, bottom, th; PetscCall(PetscViewerDrawGetDraw(viewer, 0, &draw)); PetscCall(PetscDrawGetCurrentPoint(draw, &x, &y)); PetscCall(PetscDrawStringGetSize(draw, NULL, &th)); bottom = y - th; for (i = levels - 1; i >= 0; i--) { if (!mglevels[i]->smoothu || (mglevels[i]->smoothu == mglevels[i]->smoothd)) { PetscCall(PetscDrawPushCurrentPoint(draw, x, bottom)); PetscCall(KSPView(mglevels[i]->smoothd, viewer)); PetscCall(PetscDrawPopCurrentPoint(draw)); } else { w = 0.5 * PetscMin(1.0 - x, x); PetscCall(PetscDrawPushCurrentPoint(draw, x + w, bottom)); PetscCall(KSPView(mglevels[i]->smoothd, viewer)); PetscCall(PetscDrawPopCurrentPoint(draw)); PetscCall(PetscDrawPushCurrentPoint(draw, x - w, bottom)); PetscCall(KSPView(mglevels[i]->smoothu, viewer)); PetscCall(PetscDrawPopCurrentPoint(draw)); } PetscCall(PetscDrawGetBoundingBox(draw, NULL, &bottom, NULL, NULL)); bottom -= th; } } PetscFunctionReturn(PETSC_SUCCESS); } #include /* Calls setup for the KSP on each level */ PetscErrorCode PCSetUp_MG(PC pc) { PC_MG *mg = (PC_MG *)pc->data; PC_MG_Levels **mglevels = mg->levels; PetscInt i, n; PC cpc; PetscBool dump = PETSC_FALSE, opsset, use_amat, missinginterpolate = PETSC_FALSE; Mat dA, dB; Vec tvec; DM *dms; PetscViewer viewer = NULL; PetscBool dAeqdB = PETSC_FALSE, needRestricts = PETSC_FALSE, doCR = PETSC_FALSE; PetscBool adaptInterpolation = mg->adaptInterpolation; PetscFunctionBegin; PetscCheck(mglevels, PetscObjectComm((PetscObject)pc), PETSC_ERR_ARG_WRONGSTATE, "Must set MG levels with PCMGSetLevels() before setting up"); n = mglevels[0]->levels; /* FIX: Move this to PCSetFromOptions_MG? */ if (mg->usedmfornumberoflevels) { PetscInt levels; PetscCall(DMGetRefineLevel(pc->dm, &levels)); levels++; if (levels > n) { /* the problem is now being solved on a finer grid */ PetscCall(PCMGSetLevels(pc, levels, NULL)); n = levels; PetscCall(PCSetFromOptions(pc)); /* it is bad to call this here, but otherwise will never be called for the new hierarchy */ mglevels = mg->levels; } } /* If user did not provide fine grid operators OR operator was not updated since last global KSPSetOperators() */ /* so use those from global PC */ /* Is this what we always want? What if user wants to keep old one? */ PetscCall(KSPGetOperatorsSet(mglevels[n - 1]->smoothd, NULL, &opsset)); if (opsset) { Mat mmat; PetscCall(KSPGetOperators(mglevels[n - 1]->smoothd, NULL, &mmat)); if (mmat == pc->pmat) opsset = PETSC_FALSE; } /* fine grid smoother inherits the reuse-pc flag */ PetscCall(KSPGetPC(mglevels[n - 1]->smoothd, &cpc)); cpc->reusepreconditioner = pc->reusepreconditioner; PetscCall(KSPGetPC(mglevels[n - 1]->smoothu, &cpc)); cpc->reusepreconditioner = pc->reusepreconditioner; /* Create CR solvers */ PetscCall(PCMGGetAdaptCR(pc, &doCR)); if (doCR) { const char *prefix; PetscCall(PCGetOptionsPrefix(pc, &prefix)); for (i = 1; i < n; ++i) { PC ipc, cr; char crprefix[128]; PetscCall(KSPCreate(PetscObjectComm((PetscObject)pc), &mglevels[i]->cr)); PetscCall(KSPSetNestLevel(mglevels[i]->cr, pc->kspnestlevel)); PetscCall(KSPSetErrorIfNotConverged(mglevels[i]->cr, PETSC_FALSE)); PetscCall(PetscObjectIncrementTabLevel((PetscObject)mglevels[i]->cr, (PetscObject)pc, n - i)); PetscCall(KSPSetOptionsPrefix(mglevels[i]->cr, prefix)); PetscCall(PetscObjectComposedDataSetInt((PetscObject)mglevels[i]->cr, PetscMGLevelId, mglevels[i]->level)); PetscCall(KSPSetType(mglevels[i]->cr, KSPCHEBYSHEV)); PetscCall(KSPSetConvergenceTest(mglevels[i]->cr, KSPConvergedSkip, NULL, NULL)); PetscCall(KSPSetNormType(mglevels[i]->cr, KSP_NORM_PRECONDITIONED)); PetscCall(KSPGetPC(mglevels[i]->cr, &ipc)); PetscCall(PCSetType(ipc, PCCOMPOSITE)); PetscCall(PCCompositeSetType(ipc, PC_COMPOSITE_MULTIPLICATIVE)); PetscCall(PCCompositeAddPCType(ipc, PCSOR)); PetscCall(CreateCR_Private(pc, i, &cr)); PetscCall(PCCompositeAddPC(ipc, cr)); PetscCall(PCDestroy(&cr)); PetscCall(KSPSetTolerances(mglevels[i]->cr, PETSC_CURRENT, PETSC_CURRENT, PETSC_CURRENT, mg->default_smoothd)); PetscCall(KSPSetInitialGuessNonzero(mglevels[i]->cr, PETSC_TRUE)); PetscCall(PetscSNPrintf(crprefix, 128, "mg_levels_%" PetscInt_FMT "_cr_", i)); PetscCall(KSPAppendOptionsPrefix(mglevels[i]->cr, crprefix)); } } if (!opsset) { PetscCall(PCGetUseAmat(pc, &use_amat)); if (use_amat) { PetscCall(PetscInfo(pc, "Using outer operators to define finest grid operator \n because PCMGGetSmoother(pc,nlevels-1,&ksp);KSPSetOperators(ksp,...); was not called.\n")); PetscCall(KSPSetOperators(mglevels[n - 1]->smoothd, pc->mat, pc->pmat)); } else { PetscCall(PetscInfo(pc, "Using matrix (pmat) operators to define finest grid operator \n because PCMGGetSmoother(pc,nlevels-1,&ksp);KSPSetOperators(ksp,...); was not called.\n")); PetscCall(KSPSetOperators(mglevels[n - 1]->smoothd, pc->pmat, pc->pmat)); } } for (i = n - 1; i > 0; i--) { if (!(mglevels[i]->interpolate || mglevels[i]->restrct)) { missinginterpolate = PETSC_TRUE; break; } } PetscCall(KSPGetOperators(mglevels[n - 1]->smoothd, &dA, &dB)); if (dA == dB) dAeqdB = PETSC_TRUE; if (mg->galerkin == PC_MG_GALERKIN_NONE || ((mg->galerkin == PC_MG_GALERKIN_PMAT || mg->galerkin == PC_MG_GALERKIN_MAT) && !dAeqdB)) needRestricts = PETSC_TRUE; /* user must compute either mat, pmat, or both so must restrict x to coarser levels */ if (pc->dm && !pc->setupcalled) { /* finest smoother also gets DM but it is not active, independent of whether galerkin==PC_MG_GALERKIN_EXTERNAL */ PetscCall(KSPSetDM(mglevels[n - 1]->smoothd, pc->dm)); PetscCall(KSPSetDMActive(mglevels[n - 1]->smoothd, KSP_DMACTIVE_ALL, PETSC_FALSE)); if (mglevels[n - 1]->smoothd != mglevels[n - 1]->smoothu) { PetscCall(KSPSetDM(mglevels[n - 1]->smoothu, pc->dm)); PetscCall(KSPSetDMActive(mglevels[n - 1]->smoothu, KSP_DMACTIVE_ALL, PETSC_FALSE)); } if (mglevels[n - 1]->cr) { PetscCall(KSPSetDM(mglevels[n - 1]->cr, pc->dm)); PetscCall(KSPSetDMActive(mglevels[n - 1]->cr, KSP_DMACTIVE_ALL, PETSC_FALSE)); } } /* Skipping if user has provided all interpolation/restriction needed (since DM might not be able to produce them (when coming from SNES/TS) Skipping for externally managed hierarchy (such as ML and GAMG). Cleaner logic here would be great. Wrap ML/GAMG as DMs? */ if (missinginterpolate && mg->galerkin != PC_MG_GALERKIN_EXTERNAL && !pc->setupcalled) { /* first see if we can compute a coarse space */ if (mg->coarseSpaceType == PCMG_ADAPT_GDSW) { for (i = n - 2; i > -1; i--) { if (!mglevels[i + 1]->restrct && !mglevels[i + 1]->interpolate) { PetscCall(PCMGComputeCoarseSpace_Internal(pc, i + 1, mg->coarseSpaceType, mg->Nc, NULL, &mglevels[i + 1]->coarseSpace)); PetscCall(PCMGSetInterpolation(pc, i + 1, mglevels[i + 1]->coarseSpace)); } } } else { /* construct the interpolation from the DMs */ Mat p; Vec rscale; PetscCheck(n == 1 || pc->dm, PetscObjectComm((PetscObject)pc), PETSC_ERR_SUP, "PC lacks a DM so cannot automatically construct a multigrid hierarchy. Number of levels requested %" PetscInt_FMT, n); PetscCall(PetscMalloc1(n, &dms)); dms[n - 1] = pc->dm; /* Separately create them so we do not get DMKSP interference between levels */ for (i = n - 2; i > -1; i--) PetscCall(DMCoarsen(dms[i + 1], MPI_COMM_NULL, &dms[i])); for (i = n - 2; i > -1; i--) { PetscBool dmhasrestrict, dmhasinject; PetscCall(KSPSetDM(mglevels[i]->smoothd, dms[i])); if (!needRestricts) PetscCall(KSPSetDMActive(mglevels[i]->smoothd, KSP_DMACTIVE_ALL, PETSC_FALSE)); PetscCall(KSPSetDMActive(mglevels[i]->smoothd, KSP_DMACTIVE_RHS, PETSC_FALSE)); if (mglevels[i]->smoothd != mglevels[i]->smoothu) { PetscCall(KSPSetDM(mglevels[i]->smoothu, dms[i])); if (!needRestricts) PetscCall(KSPSetDMActive(mglevels[i]->smoothu, KSP_DMACTIVE_ALL, PETSC_FALSE)); PetscCall(KSPSetDMActive(mglevels[i]->smoothu, KSP_DMACTIVE_RHS, PETSC_FALSE)); } if (mglevels[i]->cr) { PetscCall(KSPSetDM(mglevels[i]->cr, dms[i])); if (!needRestricts) PetscCall(KSPSetDMActive(mglevels[i]->cr, KSP_DMACTIVE_ALL, PETSC_FALSE)); PetscCall(KSPSetDMActive(mglevels[i]->cr, KSP_DMACTIVE_RHS, PETSC_FALSE)); } if (!mglevels[i + 1]->interpolate) { PetscCall(DMCreateInterpolation(dms[i], dms[i + 1], &p, &rscale)); PetscCall(PCMGSetInterpolation(pc, i + 1, p)); if (rscale) PetscCall(PCMGSetRScale(pc, i + 1, rscale)); PetscCall(VecDestroy(&rscale)); PetscCall(MatDestroy(&p)); } PetscCall(DMHasCreateRestriction(dms[i], &dmhasrestrict)); if (dmhasrestrict && !mglevels[i + 1]->restrct) { PetscCall(DMCreateRestriction(dms[i], dms[i + 1], &p)); PetscCall(PCMGSetRestriction(pc, i + 1, p)); PetscCall(MatDestroy(&p)); } PetscCall(DMHasCreateInjection(dms[i], &dmhasinject)); if (dmhasinject && !mglevels[i + 1]->inject) { PetscCall(DMCreateInjection(dms[i], dms[i + 1], &p)); PetscCall(PCMGSetInjection(pc, i + 1, p)); PetscCall(MatDestroy(&p)); } } for (i = n - 2; i > -1; i--) PetscCall(DMDestroy(&dms[i])); PetscCall(PetscFree(dms)); } } if (mg->galerkin < PC_MG_GALERKIN_NONE) { Mat A, B; PetscBool doA = PETSC_FALSE, doB = PETSC_FALSE; MatReuse reuse = MAT_INITIAL_MATRIX; if (mg->galerkin == PC_MG_GALERKIN_PMAT || mg->galerkin == PC_MG_GALERKIN_BOTH) doB = PETSC_TRUE; if (mg->galerkin == PC_MG_GALERKIN_MAT || (mg->galerkin == PC_MG_GALERKIN_BOTH && dA != dB)) doA = PETSC_TRUE; if (pc->setupcalled) reuse = MAT_REUSE_MATRIX; for (i = n - 2; i > -1; i--) { PetscCheck(mglevels[i + 1]->restrct || mglevels[i + 1]->interpolate, PetscObjectComm((PetscObject)pc), PETSC_ERR_ARG_WRONGSTATE, "Must provide interpolation or restriction for each MG level except level 0"); if (!mglevels[i + 1]->interpolate) PetscCall(PCMGSetInterpolation(pc, i + 1, mglevels[i + 1]->restrct)); if (!mglevels[i + 1]->restrct) PetscCall(PCMGSetRestriction(pc, i + 1, mglevels[i + 1]->interpolate)); if (reuse == MAT_REUSE_MATRIX) PetscCall(KSPGetOperators(mglevels[i]->smoothd, &A, &B)); if (doA) PetscCall(MatGalerkin(mglevels[i + 1]->restrct, dA, mglevels[i + 1]->interpolate, reuse, 1.0, &A)); if (doB) PetscCall(MatGalerkin(mglevels[i + 1]->restrct, dB, mglevels[i + 1]->interpolate, reuse, 1.0, &B)); /* the management of the PetscObjectReference() and PetscObjecDereference() below is rather delicate */ if (!doA && dAeqdB) { if (reuse == MAT_INITIAL_MATRIX) PetscCall(PetscObjectReference((PetscObject)B)); A = B; } else if (!doA && reuse == MAT_INITIAL_MATRIX) { PetscCall(KSPGetOperators(mglevels[i]->smoothd, &A, NULL)); PetscCall(PetscObjectReference((PetscObject)A)); } if (!doB && dAeqdB) { if (reuse == MAT_INITIAL_MATRIX) PetscCall(PetscObjectReference((PetscObject)A)); B = A; } else if (!doB && reuse == MAT_INITIAL_MATRIX) { PetscCall(KSPGetOperators(mglevels[i]->smoothd, NULL, &B)); PetscCall(PetscObjectReference((PetscObject)B)); } if (reuse == MAT_INITIAL_MATRIX) { PetscCall(KSPSetOperators(mglevels[i]->smoothd, A, B)); PetscCall(PetscObjectDereference((PetscObject)A)); PetscCall(PetscObjectDereference((PetscObject)B)); } dA = A; dB = B; } } /* Adapt interpolation matrices */ if (adaptInterpolation) { for (i = 0; i < n; ++i) { if (!mglevels[i]->coarseSpace) PetscCall(PCMGComputeCoarseSpace_Internal(pc, i, mg->coarseSpaceType, mg->Nc, !i ? NULL : mglevels[i - 1]->coarseSpace, &mglevels[i]->coarseSpace)); if (i) PetscCall(PCMGAdaptInterpolator_Internal(pc, i, mglevels[i - 1]->smoothu, mglevels[i]->smoothu, mglevels[i - 1]->coarseSpace, mglevels[i]->coarseSpace)); } for (i = n - 2; i > -1; --i) PetscCall(PCMGRecomputeLevelOperators_Internal(pc, i)); } if (needRestricts && pc->dm) { for (i = n - 2; i >= 0; i--) { DM dmfine, dmcoarse; Mat Restrict, Inject; Vec rscale; PetscCall(KSPGetDM(mglevels[i + 1]->smoothd, &dmfine)); PetscCall(KSPGetDM(mglevels[i]->smoothd, &dmcoarse)); PetscCall(PCMGGetRestriction(pc, i + 1, &Restrict)); PetscCall(PCMGGetRScale(pc, i + 1, &rscale)); PetscCall(PCMGGetInjection(pc, i + 1, &Inject)); PetscCall(DMRestrict(dmfine, Restrict, rscale, Inject, dmcoarse)); } } if (!pc->setupcalled) { for (i = 0; i < n; i++) PetscCall(KSPSetFromOptions(mglevels[i]->smoothd)); for (i = 1; i < n; i++) { if (mglevels[i]->smoothu && (mglevels[i]->smoothu != mglevels[i]->smoothd)) PetscCall(KSPSetFromOptions(mglevels[i]->smoothu)); if (mglevels[i]->cr) PetscCall(KSPSetFromOptions(mglevels[i]->cr)); } /* insure that if either interpolation or restriction is set the other one is set */ for (i = 1; i < n; i++) { PetscCall(PCMGGetInterpolation(pc, i, NULL)); PetscCall(PCMGGetRestriction(pc, i, NULL)); } for (i = 0; i < n - 1; i++) { if (!mglevels[i]->b) { Vec *vec; PetscCall(KSPCreateVecs(mglevels[i]->smoothd, 1, &vec, 0, NULL)); PetscCall(PCMGSetRhs(pc, i, *vec)); PetscCall(VecDestroy(vec)); PetscCall(PetscFree(vec)); } if (!mglevels[i]->r && i) { PetscCall(VecDuplicate(mglevels[i]->b, &tvec)); PetscCall(PCMGSetR(pc, i, tvec)); PetscCall(VecDestroy(&tvec)); } if (!mglevels[i]->x) { PetscCall(VecDuplicate(mglevels[i]->b, &tvec)); PetscCall(PCMGSetX(pc, i, tvec)); PetscCall(VecDestroy(&tvec)); } if (doCR) { PetscCall(VecDuplicate(mglevels[i]->b, &mglevels[i]->crx)); PetscCall(VecDuplicate(mglevels[i]->b, &mglevels[i]->crb)); PetscCall(VecZeroEntries(mglevels[i]->crb)); } } if (n != 1 && !mglevels[n - 1]->r) { /* PCMGSetR() on the finest level if user did not supply it */ Vec *vec; PetscCall(KSPCreateVecs(mglevels[n - 1]->smoothd, 1, &vec, 0, NULL)); PetscCall(PCMGSetR(pc, n - 1, *vec)); PetscCall(VecDestroy(vec)); PetscCall(PetscFree(vec)); } if (doCR) { PetscCall(VecDuplicate(mglevels[n - 1]->r, &mglevels[n - 1]->crx)); PetscCall(VecDuplicate(mglevels[n - 1]->r, &mglevels[n - 1]->crb)); PetscCall(VecZeroEntries(mglevels[n - 1]->crb)); } } if (pc->dm) { /* need to tell all the coarser levels to rebuild the matrix using the DM for that level */ for (i = 0; i < n - 1; i++) { if (mglevels[i]->smoothd->setupstage != KSP_SETUP_NEW) mglevels[i]->smoothd->setupstage = KSP_SETUP_NEWMATRIX; } } // We got here (PCSetUp_MG) because the matrix has changed, which means the smoother needs to be set up again (e.g., // new diagonal for Jacobi). Setting it here allows it to be logged under PCSetUp rather than deep inside a PCApply. if (mglevels[n - 1]->smoothd->setupstage != KSP_SETUP_NEW) mglevels[n - 1]->smoothd->setupstage = KSP_SETUP_NEWMATRIX; for (i = 1; i < n; i++) { if (mglevels[i]->smoothu == mglevels[i]->smoothd || mg->am == PC_MG_FULL || mg->am == PC_MG_KASKADE || mg->cyclesperpcapply > 1) { /* if doing only down then initial guess is zero */ PetscCall(KSPSetInitialGuessNonzero(mglevels[i]->smoothd, PETSC_TRUE)); } if (mglevels[i]->cr) PetscCall(KSPSetInitialGuessNonzero(mglevels[i]->cr, PETSC_TRUE)); if (mglevels[i]->eventsmoothsetup) PetscCall(PetscLogEventBegin(mglevels[i]->eventsmoothsetup, 0, 0, 0, 0)); PetscCall(KSPSetUp(mglevels[i]->smoothd)); if (mglevels[i]->smoothd->reason) pc->failedreason = PC_SUBPC_ERROR; if (mglevels[i]->eventsmoothsetup) PetscCall(PetscLogEventEnd(mglevels[i]->eventsmoothsetup, 0, 0, 0, 0)); if (!mglevels[i]->residual) { Mat mat; PetscCall(KSPGetOperators(mglevels[i]->smoothd, &mat, NULL)); PetscCall(PCMGSetResidual(pc, i, PCMGResidualDefault, mat)); } if (!mglevels[i]->residualtranspose) { Mat mat; PetscCall(KSPGetOperators(mglevels[i]->smoothd, &mat, NULL)); PetscCall(PCMGSetResidualTranspose(pc, i, PCMGResidualTransposeDefault, mat)); } } for (i = 1; i < n; i++) { if (mglevels[i]->smoothu && mglevels[i]->smoothu != mglevels[i]->smoothd) { Mat downmat, downpmat; /* check if operators have been set for up, if not use down operators to set them */ PetscCall(KSPGetOperatorsSet(mglevels[i]->smoothu, &opsset, NULL)); if (!opsset) { PetscCall(KSPGetOperators(mglevels[i]->smoothd, &downmat, &downpmat)); PetscCall(KSPSetOperators(mglevels[i]->smoothu, downmat, downpmat)); } PetscCall(KSPSetInitialGuessNonzero(mglevels[i]->smoothu, PETSC_TRUE)); if (mglevels[i]->eventsmoothsetup) PetscCall(PetscLogEventBegin(mglevels[i]->eventsmoothsetup, 0, 0, 0, 0)); PetscCall(KSPSetUp(mglevels[i]->smoothu)); if (mglevels[i]->smoothu->reason) pc->failedreason = PC_SUBPC_ERROR; if (mglevels[i]->eventsmoothsetup) PetscCall(PetscLogEventEnd(mglevels[i]->eventsmoothsetup, 0, 0, 0, 0)); } if (mglevels[i]->cr) { Mat downmat, downpmat; /* check if operators have been set for up, if not use down operators to set them */ PetscCall(KSPGetOperatorsSet(mglevels[i]->cr, &opsset, NULL)); if (!opsset) { PetscCall(KSPGetOperators(mglevels[i]->smoothd, &downmat, &downpmat)); PetscCall(KSPSetOperators(mglevels[i]->cr, downmat, downpmat)); } PetscCall(KSPSetInitialGuessNonzero(mglevels[i]->cr, PETSC_TRUE)); if (mglevels[i]->eventsmoothsetup) PetscCall(PetscLogEventBegin(mglevels[i]->eventsmoothsetup, 0, 0, 0, 0)); PetscCall(KSPSetUp(mglevels[i]->cr)); if (mglevels[i]->cr->reason) pc->failedreason = PC_SUBPC_ERROR; if (mglevels[i]->eventsmoothsetup) PetscCall(PetscLogEventEnd(mglevels[i]->eventsmoothsetup, 0, 0, 0, 0)); } } if (mglevels[0]->eventsmoothsetup) PetscCall(PetscLogEventBegin(mglevels[0]->eventsmoothsetup, 0, 0, 0, 0)); PetscCall(KSPSetUp(mglevels[0]->smoothd)); if (mglevels[0]->smoothd->reason) pc->failedreason = PC_SUBPC_ERROR; if (mglevels[0]->eventsmoothsetup) PetscCall(PetscLogEventEnd(mglevels[0]->eventsmoothsetup, 0, 0, 0, 0)); /* Dump the interpolation/restriction matrices plus the Jacobian/stiffness on each level. This allows MATLAB users to easily check if the Galerkin condition A_c = R A_f R^T is satisfied. Only support one or the other at the same time. */ #if defined(PETSC_USE_SOCKET_VIEWER) PetscCall(PetscOptionsGetBool(((PetscObject)pc)->options, ((PetscObject)pc)->prefix, "-pc_mg_dump_matlab", &dump, NULL)); if (dump) viewer = PETSC_VIEWER_SOCKET_(PetscObjectComm((PetscObject)pc)); dump = PETSC_FALSE; #endif PetscCall(PetscOptionsGetBool(((PetscObject)pc)->options, ((PetscObject)pc)->prefix, "-pc_mg_dump_binary", &dump, NULL)); if (dump) viewer = PETSC_VIEWER_BINARY_(PetscObjectComm((PetscObject)pc)); if (viewer) { for (i = 1; i < n; i++) PetscCall(MatView(mglevels[i]->restrct, viewer)); for (i = 0; i < n; i++) { PetscCall(KSPGetPC(mglevels[i]->smoothd, &pc)); PetscCall(MatView(pc->mat, viewer)); } } PetscFunctionReturn(PETSC_SUCCESS); } PetscErrorCode PCMGGetLevels_MG(PC pc, PetscInt *levels) { PC_MG *mg = (PC_MG *)pc->data; PetscFunctionBegin; *levels = mg->nlevels; PetscFunctionReturn(PETSC_SUCCESS); } /*@ PCMGGetLevels - Gets the number of levels to use with `PCMG`. Not Collective Input Parameter: . pc - the preconditioner context Output Parameter: . levels - the number of levels Level: advanced .seealso: [](ch_ksp), `PCMG`, `PCMGSetLevels()` @*/ PetscErrorCode PCMGGetLevels(PC pc, PetscInt *levels) { PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); PetscAssertPointer(levels, 2); *levels = 0; PetscTryMethod(pc, "PCMGGetLevels_C", (PC, PetscInt *), (pc, levels)); PetscFunctionReturn(PETSC_SUCCESS); } /*@ PCMGGetGridComplexity - compute operator and grid complexity of the `PCMG` hierarchy Input Parameter: . pc - the preconditioner context Output Parameters: + gc - grid complexity = sum_i(n_i) / n_0 - oc - operator complexity = sum_i(nnz_i) / nnz_0 Level: advanced Note: This is often call the operator complexity in multigrid literature .seealso: [](ch_ksp), `PCMG`, `PCMGGetLevels()`, `PCMGSetLevels()` @*/ PetscErrorCode PCMGGetGridComplexity(PC pc, PetscReal *gc, PetscReal *oc) { PC_MG *mg = (PC_MG *)pc->data; PC_MG_Levels **mglevels = mg->levels; PetscInt lev, N; PetscLogDouble nnz0 = 0, sgc = 0, soc = 0, n0 = 0; MatInfo info; PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); if (gc) PetscAssertPointer(gc, 2); if (oc) PetscAssertPointer(oc, 3); if (!pc->setupcalled) { if (gc) *gc = 0; if (oc) *oc = 0; PetscFunctionReturn(PETSC_SUCCESS); } PetscCheck(mg->nlevels > 0, PETSC_COMM_SELF, PETSC_ERR_PLIB, "MG has no levels"); for (lev = 0; lev < mg->nlevels; lev++) { Mat dB; PetscCall(KSPGetOperators(mglevels[lev]->smoothd, NULL, &dB)); PetscCall(MatGetInfo(dB, MAT_GLOBAL_SUM, &info)); /* global reduction */ PetscCall(MatGetSize(dB, &N, NULL)); sgc += N; soc += info.nz_used; if (lev == mg->nlevels - 1) { nnz0 = info.nz_used; n0 = N; } } PetscCheck(n0 > 0 && gc, PETSC_COMM_SELF, PETSC_ERR_PLIB, "Number for grid points on finest level is not available"); *gc = (PetscReal)(sgc / n0); if (nnz0 > 0 && oc) *oc = (PetscReal)(soc / nnz0); PetscFunctionReturn(PETSC_SUCCESS); } /*@ PCMGSetType - Determines the form of multigrid to use, either multiplicative, additive, full, or the Kaskade algorithm. Logically Collective Input Parameters: + pc - the preconditioner context - form - multigrid form, one of `PC_MG_MULTIPLICATIVE`, `PC_MG_ADDITIVE`, `PC_MG_FULL`, `PC_MG_KASKADE` Options Database Key: . -pc_mg_type
- Sets , one of multiplicative, additive, full, kaskade Level: advanced .seealso: [](ch_ksp), `PCMGType`, `PCMG`, `PCMGGetLevels()`, `PCMGSetLevels()`, `PCMGGetType()`, `PCMGCycleType` @*/ PetscErrorCode PCMGSetType(PC pc, PCMGType form) { PC_MG *mg = (PC_MG *)pc->data; PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); PetscValidLogicalCollectiveEnum(pc, form, 2); mg->am = form; if (form == PC_MG_MULTIPLICATIVE) pc->ops->applyrichardson = PCApplyRichardson_MG; else pc->ops->applyrichardson = NULL; PetscFunctionReturn(PETSC_SUCCESS); } /*@ PCMGGetType - Finds the form of multigrid the `PCMG` is using multiplicative, additive, full, or the Kaskade algorithm. Logically Collective Input Parameter: . pc - the preconditioner context Output Parameter: . type - one of `PC_MG_MULTIPLICATIVE`, `PC_MG_ADDITIVE`, `PC_MG_FULL`, `PC_MG_KASKADE`, `PCMGCycleType` Level: advanced .seealso: [](ch_ksp), `PCMGType`, `PCMG`, `PCMGGetLevels()`, `PCMGSetLevels()`, `PCMGSetType()` @*/ PetscErrorCode PCMGGetType(PC pc, PCMGType *type) { PC_MG *mg = (PC_MG *)pc->data; PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); *type = mg->am; PetscFunctionReturn(PETSC_SUCCESS); } /*@ PCMGSetCycleType - Sets the type cycles to use. Use `PCMGSetCycleTypeOnLevel()` for more complicated cycling. Logically Collective Input Parameters: + pc - the multigrid context - n - either `PC_MG_CYCLE_V` or `PC_MG_CYCLE_W` Options Database Key: . -pc_mg_cycle_type - provide the cycle desired Level: advanced .seealso: [](ch_ksp), `PCMG`, `PCMGSetCycleTypeOnLevel()`, `PCMGType`, `PCMGCycleType` @*/ PetscErrorCode PCMGSetCycleType(PC pc, PCMGCycleType n) { PC_MG *mg = (PC_MG *)pc->data; PC_MG_Levels **mglevels = mg->levels; PetscInt i, levels; PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); PetscValidLogicalCollectiveEnum(pc, n, 2); PetscCheck(mglevels, PetscObjectComm((PetscObject)pc), PETSC_ERR_ORDER, "Must set MG levels with PCMGSetLevels() before calling"); levels = mglevels[0]->levels; for (i = 0; i < levels; i++) mglevels[i]->cycles = n; PetscFunctionReturn(PETSC_SUCCESS); } /*@ PCMGMultiplicativeSetCycles - Sets the number of cycles to use for each preconditioner step of multigrid when `PCMGType` is `PC_MG_MULTIPLICATIVE` Logically Collective Input Parameters: + pc - the multigrid context - n - number of cycles (default is 1) Options Database Key: . -pc_mg_multiplicative_cycles n - set the number of cycles Level: advanced Note: This is not associated with setting a v or w cycle, that is set with `PCMGSetCycleType()` .seealso: [](ch_ksp), `PCMGSetCycleTypeOnLevel()`, `PCMGSetCycleType()`, `PCMGCycleType`, `PCMGType` @*/ PetscErrorCode PCMGMultiplicativeSetCycles(PC pc, PetscInt n) { PC_MG *mg = (PC_MG *)pc->data; PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); PetscValidLogicalCollectiveInt(pc, n, 2); mg->cyclesperpcapply = n; PetscFunctionReturn(PETSC_SUCCESS); } /* Since the finest level KSP shares the original matrix (of the entire system), it's preconditioner should not be updated if the whole PC is supposed to reuse the preconditioner */ static PetscErrorCode PCSetReusePreconditioner_MG(PC pc, PetscBool flag) { PC_MG *mg = (PC_MG *)pc->data; PC_MG_Levels **mglevels = mg->levels; PetscInt levels; PC tpc; PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); PetscValidLogicalCollectiveBool(pc, flag, 2); if (mglevels) { levels = mglevels[0]->levels; PetscCall(KSPGetPC(mglevels[levels - 1]->smoothd, &tpc)); tpc->reusepreconditioner = flag; PetscCall(KSPGetPC(mglevels[levels - 1]->smoothu, &tpc)); tpc->reusepreconditioner = flag; } PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode PCMGSetGalerkin_MG(PC pc, PCMGGalerkinType use) { PC_MG *mg = (PC_MG *)pc->data; PetscFunctionBegin; mg->galerkin = use; PetscFunctionReturn(PETSC_SUCCESS); } /*@ PCMGSetGalerkin - Causes the coarser grid matrices to be computed from the finest grid via the Galerkin process: A_i-1 = r_i * A_i * p_i Logically Collective Input Parameters: + pc - the multigrid context - use - one of `PC_MG_GALERKIN_BOTH`, `PC_MG_GALERKIN_PMAT`, `PC_MG_GALERKIN_MAT`, or `PC_MG_GALERKIN_NONE` Options Database Key: . -pc_mg_galerkin - set the matrices to form via the Galerkin process Level: intermediate Note: Some codes that use `PCMG` such as `PCGAMG` use Galerkin internally while constructing the hierarchy and thus do not use the `PCMG` construction of the coarser grids. .seealso: [](ch_ksp), `PCMG`, `PCMGGetGalerkin()`, `PCMGGalerkinType` @*/ PetscErrorCode PCMGSetGalerkin(PC pc, PCMGGalerkinType use) { PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); PetscTryMethod(pc, "PCMGSetGalerkin_C", (PC, PCMGGalerkinType), (pc, use)); PetscFunctionReturn(PETSC_SUCCESS); } /*@ PCMGGetGalerkin - Checks if Galerkin multigrid is being used, i.e. A_i-1 = r_i * A_i * p_i Not Collective Input Parameter: . pc - the multigrid context Output Parameter: . galerkin - one of `PC_MG_GALERKIN_BOTH`,`PC_MG_GALERKIN_PMAT`,`PC_MG_GALERKIN_MAT`, `PC_MG_GALERKIN_NONE`, or `PC_MG_GALERKIN_EXTERNAL` Level: intermediate .seealso: [](ch_ksp), `PCMG`, `PCMGSetGalerkin()`, `PCMGGalerkinType` @*/ PetscErrorCode PCMGGetGalerkin(PC pc, PCMGGalerkinType *galerkin) { PC_MG *mg = (PC_MG *)pc->data; PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); *galerkin = mg->galerkin; PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode PCMGSetAdaptInterpolation_MG(PC pc, PetscBool adapt) { PC_MG *mg = (PC_MG *)pc->data; PetscFunctionBegin; mg->adaptInterpolation = adapt; PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode PCMGGetAdaptInterpolation_MG(PC pc, PetscBool *adapt) { PC_MG *mg = (PC_MG *)pc->data; PetscFunctionBegin; *adapt = mg->adaptInterpolation; PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode PCMGSetAdaptCoarseSpaceType_MG(PC pc, PCMGCoarseSpaceType ctype) { PC_MG *mg = (PC_MG *)pc->data; PetscFunctionBegin; mg->adaptInterpolation = ctype != PCMG_ADAPT_NONE ? PETSC_TRUE : PETSC_FALSE; mg->coarseSpaceType = ctype; PetscCall(PCMGSetGalerkin(pc, PC_MG_GALERKIN_BOTH)); PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode PCMGGetAdaptCoarseSpaceType_MG(PC pc, PCMGCoarseSpaceType *ctype) { PC_MG *mg = (PC_MG *)pc->data; PetscFunctionBegin; *ctype = mg->coarseSpaceType; PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode PCMGSetAdaptCR_MG(PC pc, PetscBool cr) { PC_MG *mg = (PC_MG *)pc->data; PetscFunctionBegin; mg->compatibleRelaxation = cr; PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode PCMGGetAdaptCR_MG(PC pc, PetscBool *cr) { PC_MG *mg = (PC_MG *)pc->data; PetscFunctionBegin; *cr = mg->compatibleRelaxation; PetscFunctionReturn(PETSC_SUCCESS); } /*@ PCMGSetAdaptCoarseSpaceType - Set the type of adaptive coarse space. Adapts or creates the interpolator based upon a vector space which should be accurately captured by the next coarser mesh, and thus accurately interpolated. Logically Collective Input Parameters: + pc - the multigrid context - ctype - the type of coarse space Options Database Keys: + -pc_mg_adapt_interp_n - The number of modes to use - -pc_mg_adapt_interp_coarse_space - The type of coarse space: none, `polynomial`, `harmonic`, `eigenvector`, `generalized_eigenvector`, `gdsw` Level: intermediate Note: Requires a `DM` with specific functionality be attached to the `PC`. .seealso: [](ch_ksp), `PCMG`, `PCMGCoarseSpaceType`, `PCMGGetAdaptCoarseSpaceType()`, `PCMGSetGalerkin()`, `PCMGSetAdaptInterpolation()`, `DM` @*/ PetscErrorCode PCMGSetAdaptCoarseSpaceType(PC pc, PCMGCoarseSpaceType ctype) { PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); PetscValidLogicalCollectiveEnum(pc, ctype, 2); PetscTryMethod(pc, "PCMGSetAdaptCoarseSpaceType_C", (PC, PCMGCoarseSpaceType), (pc, ctype)); PetscFunctionReturn(PETSC_SUCCESS); } /*@ PCMGGetAdaptCoarseSpaceType - Get the type of adaptive coarse space. Not Collective Input Parameter: . pc - the multigrid context Output Parameter: . ctype - the type of coarse space Level: intermediate .seealso: [](ch_ksp), `PCMG`, `PCMGCoarseSpaceType`, `PCMGSetAdaptCoarseSpaceType()`, `PCMGSetGalerkin()`, `PCMGSetAdaptInterpolation()` @*/ PetscErrorCode PCMGGetAdaptCoarseSpaceType(PC pc, PCMGCoarseSpaceType *ctype) { PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); PetscAssertPointer(ctype, 2); PetscUseMethod(pc, "PCMGGetAdaptCoarseSpaceType_C", (PC, PCMGCoarseSpaceType *), (pc, ctype)); PetscFunctionReturn(PETSC_SUCCESS); } /* MATT: REMOVE? */ /*@ PCMGSetAdaptInterpolation - Adapt the interpolator based upon a vector space which should be accurately captured by the next coarser mesh, and thus accurately interpolated. Logically Collective Input Parameters: + pc - the multigrid context - adapt - flag for adaptation of the interpolator Options Database Keys: + -pc_mg_adapt_interp - Turn on adaptation . -pc_mg_adapt_interp_n - The number of modes to use, should be divisible by dimension - -pc_mg_adapt_interp_coarse_space - The type of coarse space: polynomial, harmonic, eigenvector, generalized_eigenvector Level: intermediate .seealso: [](ch_ksp), `PCMG`, `PCMGGetAdaptInterpolation()`, `PCMGSetGalerkin()`, `PCMGGetAdaptCoarseSpaceType()`, `PCMGSetAdaptCoarseSpaceType()` @*/ PetscErrorCode PCMGSetAdaptInterpolation(PC pc, PetscBool adapt) { PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); PetscTryMethod(pc, "PCMGSetAdaptInterpolation_C", (PC, PetscBool), (pc, adapt)); PetscFunctionReturn(PETSC_SUCCESS); } /*@ PCMGGetAdaptInterpolation - Get the flag to adapt the interpolator based upon a vector space which should be accurately captured by the next coarser mesh, and thus accurately interpolated. Not Collective Input Parameter: . pc - the multigrid context Output Parameter: . adapt - flag for adaptation of the interpolator Level: intermediate .seealso: [](ch_ksp), `PCMG`, `PCMGSetAdaptInterpolation()`, `PCMGSetGalerkin()`, `PCMGGetAdaptCoarseSpaceType()`, `PCMGSetAdaptCoarseSpaceType()` @*/ PetscErrorCode PCMGGetAdaptInterpolation(PC pc, PetscBool *adapt) { PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); PetscAssertPointer(adapt, 2); PetscUseMethod(pc, "PCMGGetAdaptInterpolation_C", (PC, PetscBool *), (pc, adapt)); PetscFunctionReturn(PETSC_SUCCESS); } /*@ PCMGSetAdaptCR - Monitor the coarse space quality using an auxiliary solve with compatible relaxation. Logically Collective Input Parameters: + pc - the multigrid context - cr - flag for compatible relaxation Options Database Key: . -pc_mg_adapt_cr - Turn on compatible relaxation Level: intermediate .seealso: [](ch_ksp), `PCMG`, `PCMGGetAdaptCR()`, `PCMGSetAdaptInterpolation()`, `PCMGSetGalerkin()`, `PCMGGetAdaptCoarseSpaceType()`, `PCMGSetAdaptCoarseSpaceType()` @*/ PetscErrorCode PCMGSetAdaptCR(PC pc, PetscBool cr) { PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); PetscTryMethod(pc, "PCMGSetAdaptCR_C", (PC, PetscBool), (pc, cr)); PetscFunctionReturn(PETSC_SUCCESS); } /*@ PCMGGetAdaptCR - Get the flag to monitor coarse space quality using an auxiliary solve with compatible relaxation. Not Collective Input Parameter: . pc - the multigrid context Output Parameter: . cr - flag for compatible relaxaion Level: intermediate .seealso: [](ch_ksp), `PCMGSetAdaptCR()`, `PCMGGetAdaptInterpolation()`, `PCMGSetGalerkin()`, `PCMGGetAdaptCoarseSpaceType()`, `PCMGSetAdaptCoarseSpaceType()` @*/ PetscErrorCode PCMGGetAdaptCR(PC pc, PetscBool *cr) { PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); PetscAssertPointer(cr, 2); PetscUseMethod(pc, "PCMGGetAdaptCR_C", (PC, PetscBool *), (pc, cr)); PetscFunctionReturn(PETSC_SUCCESS); } /*@ PCMGSetNumberSmooth - Sets the number of pre and post-smoothing steps to use on all levels. Use `PCMGDistinctSmoothUp()` to create separate up and down smoothers if you want different numbers of pre- and post-smoothing steps. Logically Collective Input Parameters: + pc - the multigrid context - n - the number of smoothing steps Options Database Key: . -mg_levels_ksp_max_it - Sets number of pre and post-smoothing steps Level: advanced Note: This does not set a value on the coarsest grid, since we assume that there is no separate smooth up on the coarsest grid. .seealso: [](ch_ksp), `PCMG`, `PCMGSetDistinctSmoothUp()` @*/ PetscErrorCode PCMGSetNumberSmooth(PC pc, PetscInt n) { PC_MG *mg = (PC_MG *)pc->data; PC_MG_Levels **mglevels = mg->levels; PetscInt i, levels; PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); PetscValidLogicalCollectiveInt(pc, n, 2); PetscCheck(mglevels, PetscObjectComm((PetscObject)pc), PETSC_ERR_ORDER, "Must set MG levels with PCMGSetLevels() before calling"); levels = mglevels[0]->levels; for (i = 1; i < levels; i++) { PetscCall(KSPSetTolerances(mglevels[i]->smoothu, PETSC_CURRENT, PETSC_CURRENT, PETSC_CURRENT, n)); PetscCall(KSPSetTolerances(mglevels[i]->smoothd, PETSC_CURRENT, PETSC_CURRENT, PETSC_CURRENT, n)); mg->default_smoothu = n; mg->default_smoothd = n; } PetscFunctionReturn(PETSC_SUCCESS); } /*@ PCMGSetDistinctSmoothUp - sets the up (post) smoother to be a separate `KSP` from the down (pre) smoother on all levels and adds the suffix _up to the options name Logically Collective Input Parameter: . pc - the preconditioner context Options Database Key: . -pc_mg_distinct_smoothup - use distinct smoothing objects Level: advanced Note: This does not set a value on the coarsest grid, since we assume that there is no separate smooth up on the coarsest grid. .seealso: [](ch_ksp), `PCMG`, `PCMGSetNumberSmooth()` @*/ PetscErrorCode PCMGSetDistinctSmoothUp(PC pc) { PC_MG *mg = (PC_MG *)pc->data; PC_MG_Levels **mglevels = mg->levels; PetscInt i, levels; KSP subksp; PetscFunctionBegin; PetscValidHeaderSpecific(pc, PC_CLASSID, 1); PetscCheck(mglevels, PetscObjectComm((PetscObject)pc), PETSC_ERR_ORDER, "Must set MG levels with PCMGSetLevels() before calling"); levels = mglevels[0]->levels; for (i = 1; i < levels; i++) { const char *prefix = NULL; /* make sure smoother up and down are different */ PetscCall(PCMGGetSmootherUp(pc, i, &subksp)); PetscCall(KSPGetOptionsPrefix(mglevels[i]->smoothd, &prefix)); PetscCall(KSPSetOptionsPrefix(subksp, prefix)); PetscCall(KSPAppendOptionsPrefix(subksp, "up_")); } PetscFunctionReturn(PETSC_SUCCESS); } /* No new matrices are created, and the coarse operator matrices are the references to the original ones */ static PetscErrorCode PCGetInterpolations_MG(PC pc, PetscInt *num_levels, Mat *interpolations[]) { PC_MG *mg = (PC_MG *)pc->data; PC_MG_Levels **mglevels = mg->levels; Mat *mat; PetscInt l; PetscFunctionBegin; PetscCheck(mglevels, PetscObjectComm((PetscObject)pc), PETSC_ERR_ARG_WRONGSTATE, "Must set MG levels before calling"); PetscCall(PetscMalloc1(mg->nlevels, &mat)); for (l = 1; l < mg->nlevels; l++) { mat[l - 1] = mglevels[l]->interpolate; PetscCall(PetscObjectReference((PetscObject)mat[l - 1])); } *num_levels = mg->nlevels; *interpolations = mat; PetscFunctionReturn(PETSC_SUCCESS); } /* No new matrices are created, and the coarse operator matrices are the references to the original ones */ static PetscErrorCode PCGetCoarseOperators_MG(PC pc, PetscInt *num_levels, Mat *coarseOperators[]) { PC_MG *mg = (PC_MG *)pc->data; PC_MG_Levels **mglevels = mg->levels; PetscInt l; Mat *mat; PetscFunctionBegin; PetscCheck(mglevels, PetscObjectComm((PetscObject)pc), PETSC_ERR_ARG_WRONGSTATE, "Must set MG levels before calling"); PetscCall(PetscMalloc1(mg->nlevels, &mat)); for (l = 0; l < mg->nlevels - 1; l++) { PetscCall(KSPGetOperators(mglevels[l]->smoothd, NULL, &mat[l])); PetscCall(PetscObjectReference((PetscObject)mat[l])); } *num_levels = mg->nlevels; *coarseOperators = mat; PetscFunctionReturn(PETSC_SUCCESS); } /*@C PCMGRegisterCoarseSpaceConstructor - Adds a method to the `PCMG` package for coarse space construction. Not Collective, No Fortran Support Input Parameters: + name - name of the constructor - function - constructor routine, see `PCMGCoarseSpaceConstructorFn` Level: advanced Developer Notes: This does not appear to be used anywhere .seealso: [](ch_ksp), `PCMGCoarseSpaceConstructorFn`, `PCMG`, `PCMGGetCoarseSpaceConstructor()`, `PCRegister()` @*/ PetscErrorCode PCMGRegisterCoarseSpaceConstructor(const char name[], PCMGCoarseSpaceConstructorFn *function) { PetscFunctionBegin; PetscCall(PCInitializePackage()); PetscCall(PetscFunctionListAdd(&PCMGCoarseList, name, function)); PetscFunctionReturn(PETSC_SUCCESS); } /*@C PCMGGetCoarseSpaceConstructor - Returns the given coarse space construction method. Not Collective, No Fortran Support Input Parameter: . name - name of the constructor Output Parameter: . function - constructor routine Level: advanced .seealso: [](ch_ksp), `PCMGCoarseSpaceConstructorFn`, `PCMG`, `PCMGRegisterCoarseSpaceConstructor()`, `PCRegister()` @*/ PetscErrorCode PCMGGetCoarseSpaceConstructor(const char name[], PCMGCoarseSpaceConstructorFn **function) { PetscFunctionBegin; PetscCall(PetscFunctionListFind(PCMGCoarseList, name, function)); PetscFunctionReturn(PETSC_SUCCESS); } /*MC PCMG - Use multigrid preconditioning. This preconditioner requires you provide additional information about the restriction/interpolation operators using `PCMGSetInterpolation()` and/or `PCMGSetRestriction()`(and possibly the coarser grid matrices) or a `DM` that can provide such information. Options Database Keys: + -pc_mg_levels - number of levels including finest . -pc_mg_cycle_type - provide the cycle desired . -pc_mg_type - multiplicative is the default . -pc_mg_log - log information about time spent on each level of the solver . -pc_mg_distinct_smoothup - configure up (after interpolation) and down (before restriction) smoothers separately (with different options prefixes) . -pc_mg_galerkin - use the Galerkin process to compute coarser operators, i.e., $A_{coarse} = R A_{fine} R^T$ . -pc_mg_multiplicative_cycles - number of cycles to use as the preconditioner (defaults to 1) . -pc_mg_dump_matlab - dumps the matrices for each level and the restriction/interpolation matrices to a `PETSCVIEWERSOCKET` for reading from MATLAB. - -pc_mg_dump_binary -dumps the matrices for each level and the restriction/interpolation matrices to the binary output file called binaryoutput Level: intermediate Notes: `PCMG` provides a general framework for implementing multigrid methods. Use `PCGAMG` for PETSc's algebraic multigrid preconditioner, `PCHYPRE` for hypre's BoomerAMG algebraic multigrid, and `PCML` for Trilinos's ML preconditioner. `PCAMGX` provides access to NVIDIA's AmgX algebraic multigrid. If you use `KSPSetDM()` (or `SNESSetDM()` or `TSSetDM()`) with an appropriate `DM`, such as `DMDA`, then `PCMG` will use the geometric information from the `DM` to generate appropriate restriction and interpolation information and construct a geometric multigrid. If you do not provide an appropriate `DM` and do not provide restriction or interpolation operators with `PCMGSetInterpolation()` and/or `PCMGSetRestriction()`, then `PCMG` will run multigrid with only a single level (so not really multigrid). The Krylov solver (if any) and preconditioner (smoother) and their parameters are controlled from the options database with the standard options database keywords prefixed with `-mg_levels_` to affect all the levels but the coarsest, which is controlled with `-mg_coarse_`, and the finest where `-mg_fine_` can override `-mg_levels_`. One can set different preconditioners etc on specific levels with the prefix `-mg_levels_n_` where `n` is the level number (zero being the coarse level. For example .vb -mg_levels_ksp_type gmres -mg_levels_pc_type bjacobi -mg_coarse_pc_type svd -mg_levels_2_pc_type sor .ve These options also work for controlling the smoothers etc inside `PCGAMG` If one uses a Krylov method such `KSPGMRES` or `KSPCG` as the smoother than one must use `KSPFGMRES`, `KSPGCR`, or `KSPRICHARDSON` as the outer Krylov method When run with a single level the smoother options are used on that level NOT the coarse grid solver options When run with `KSPRICHARDSON` the convergence test changes slightly if monitor is turned on. The iteration count may change slightly. This is because without monitoring the residual norm is computed WITHIN each multigrid cycle on the finest level after the pre-smoothing (because the residual has just been computed for the multigrid algorithm and is hence available for free) while with monitoring the residual is computed at the end of each cycle. .seealso: [](sec_mg), `PCCreate()`, `PCSetType()`, `PCType`, `PC`, `PCMGType`, `PCEXOTIC`, `PCGAMG`, `PCML`, `PCHYPRE` `PCMGSetLevels()`, `PCMGGetLevels()`, `PCMGSetType()`, `PCMGSetCycleType()`, `PCMGSetDistinctSmoothUp()`, `PCMGGetCoarseSolve()`, `PCMGSetResidual()`, `PCMGSetInterpolation()`, `PCMGSetRestriction()`, `PCMGGetSmoother()`, `PCMGGetSmootherUp()`, `PCMGGetSmootherDown()`, `PCMGSetCycleTypeOnLevel()`, `PCMGSetRhs()`, `PCMGSetX()`, `PCMGSetR()`, `PCMGSetAdaptCR()`, `PCMGGetAdaptInterpolation()`, `PCMGSetGalerkin()`, `PCMGGetAdaptCoarseSpaceType()`, `PCMGSetAdaptCoarseSpaceType()` M*/ PETSC_EXTERN PetscErrorCode PCCreate_MG(PC pc) { PC_MG *mg; PetscFunctionBegin; PetscCall(PetscNew(&mg)); pc->data = mg; mg->nlevels = -1; mg->am = PC_MG_MULTIPLICATIVE; mg->galerkin = PC_MG_GALERKIN_NONE; mg->adaptInterpolation = PETSC_FALSE; mg->Nc = -1; mg->eigenvalue = -1; pc->useAmat = PETSC_TRUE; pc->ops->apply = PCApply_MG; pc->ops->applytranspose = PCApplyTranspose_MG; pc->ops->matapply = PCMatApply_MG; pc->ops->matapplytranspose = PCMatApplyTranspose_MG; pc->ops->setup = PCSetUp_MG; pc->ops->reset = PCReset_MG; pc->ops->destroy = PCDestroy_MG; pc->ops->setfromoptions = PCSetFromOptions_MG; pc->ops->view = PCView_MG; PetscCall(PetscObjectComposedDataRegister(&mg->eigenvalue)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGSetGalerkin_C", PCMGSetGalerkin_MG)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCSetReusePreconditioner_C", PCSetReusePreconditioner_MG)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGGetLevels_C", PCMGGetLevels_MG)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGSetLevels_C", PCMGSetLevels_MG)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCGetInterpolations_C", PCGetInterpolations_MG)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCGetCoarseOperators_C", PCGetCoarseOperators_MG)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGSetAdaptInterpolation_C", PCMGSetAdaptInterpolation_MG)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGGetAdaptInterpolation_C", PCMGGetAdaptInterpolation_MG)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGSetAdaptCR_C", PCMGSetAdaptCR_MG)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGGetAdaptCR_C", PCMGGetAdaptCR_MG)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGSetAdaptCoarseSpaceType_C", PCMGSetAdaptCoarseSpaceType_MG)); PetscCall(PetscObjectComposeFunction((PetscObject)pc, "PCMGGetAdaptCoarseSpaceType_C", PCMGGetAdaptCoarseSpaceType_MG)); PetscFunctionReturn(PETSC_SUCCESS); }