static const char help[] = "Minimum surface problem in 2D.\n\ Uses 2-dimensional distributed arrays.\n\ \n\ Solves the linear systems via multilevel methods \n\ \n\n"; /* This example models the partial differential equation - Div((1 + ||GRAD T||^2)^(1/2) (GRAD T)) = 0. in the unit square, which is uniformly discretized in each of x and y in this simple encoding. The degrees of freedom are vertex centered A finite difference approximation with the usual 5-point stencil is used to discretize the boundary value problem to obtain a nonlinear system of equations. */ #include #include #include extern PetscErrorCode FormFunctionLocal(DMDALocalInfo *, PetscScalar **, PetscScalar **, void *); int main(int argc, char **argv) { SNES snes; PetscInt its, lits; PetscReal litspit; DM da; PetscFunctionBeginUser; PetscCall(PetscInitialize(&argc, &argv, NULL, help)); /* Set the DMDA (grid structure) for the grids. */ PetscCall(DMDACreate2d(PETSC_COMM_WORLD, DM_BOUNDARY_NONE, DM_BOUNDARY_NONE, DMDA_STENCIL_STAR, 5, 5, PETSC_DECIDE, PETSC_DECIDE, 1, 1, 0, 0, &da)); PetscCall(DMSetFromOptions(da)); PetscCall(DMSetUp(da)); PetscCall(DMDASNESSetFunctionLocal(da, INSERT_VALUES, (PetscErrorCode(*)(DMDALocalInfo *, void *, void *, void *))FormFunctionLocal, NULL)); PetscCall(SNESCreate(PETSC_COMM_WORLD, &snes)); PetscCall(SNESSetDM(snes, da)); PetscCall(DMDestroy(&da)); PetscCall(SNESSetFromOptions(snes)); PetscCall(SNESSolve(snes, 0, 0)); PetscCall(SNESGetIterationNumber(snes, &its)); PetscCall(SNESGetLinearSolveIterations(snes, &lits)); litspit = ((PetscReal)lits) / ((PetscReal)its); PetscCall(PetscPrintf(PETSC_COMM_WORLD, "Number of SNES iterations = %" PetscInt_FMT "\n", its)); PetscCall(PetscPrintf(PETSC_COMM_WORLD, "Number of Linear iterations = %" PetscInt_FMT "\n", lits)); PetscCall(PetscPrintf(PETSC_COMM_WORLD, "Average Linear its / SNES = %e\n", (double)litspit)); PetscCall(SNESDestroy(&snes)); PetscCall(PetscFinalize()); return 0; } PetscErrorCode FormFunctionLocal(DMDALocalInfo *info, PetscScalar **t, PetscScalar **f, void *ptr) { PetscInt i, j; PetscScalar hx, hy; PetscScalar gradup, graddown, gradleft, gradright, gradx, grady; PetscScalar coeffup, coeffdown, coeffleft, coeffright; PetscFunctionBeginUser; hx = 1.0 / (PetscReal)(info->mx - 1); hy = 1.0 / (PetscReal)(info->my - 1); /* Evaluate function */ for (j = info->ys; j < info->ys + info->ym; j++) { for (i = info->xs; i < info->xs + info->xm; i++) { if (i == 0 || i == info->mx - 1 || j == 0 || j == info->my - 1) { f[j][i] = t[j][i] - (1.0 - (2.0 * hx * (PetscReal)i - 1.0) * (2.0 * hx * (PetscReal)i - 1.0)); } else { gradup = (t[j + 1][i] - t[j][i]) / hy; graddown = (t[j][i] - t[j - 1][i]) / hy; gradright = (t[j][i + 1] - t[j][i]) / hx; gradleft = (t[j][i] - t[j][i - 1]) / hx; gradx = .5 * (t[j][i + 1] - t[j][i - 1]) / hx; grady = .5 * (t[j + 1][i] - t[j - 1][i]) / hy; coeffup = 1.0 / PetscSqrtScalar(1.0 + gradup * gradup + gradx * gradx); coeffdown = 1.0 / PetscSqrtScalar(1.0 + graddown * graddown + gradx * gradx); coeffleft = 1.0 / PetscSqrtScalar(1.0 + gradleft * gradleft + grady * grady); coeffright = 1.0 / PetscSqrtScalar(1.0 + gradright * gradright + grady * grady); f[j][i] = (coeffup * gradup - coeffdown * graddown) * hx + (coeffright * gradright - coeffleft * gradleft) * hy; } } } PetscFunctionReturn(PETSC_SUCCESS); } /*TEST test: args: -pc_type mg -da_refine 1 -ksp_type fgmres test: suffix: 2 nsize: 2 args: -pc_type mg -da_refine 1 -ksp_type fgmres test: suffix: 3 nsize: 2 args: -pc_type mg -da_refine 1 -ksp_type fgmres -snes_type newtontrdc -snes_trdc_use_cauchy false test: suffix: 4 nsize: 2 args: -pc_type mg -da_refine 1 -ksp_type fgmres -snes_type newtontrdc filter: sed -e "s/SNES iterations = 1[0-3]/SNES iterations = 13/g" |sed -e "s/Linear iterations = 2[7-9]/Linear iterations = 29/g" |sed -e "s/Linear iterations = 3[0-1]/Linear iterations = 29/g" TEST*/