static const char help[] = "An elastic wave equation driven by Dieterich-Ruina friction\n"; /* This whole derivation comes from Erickson, Birnir, and Lavallee [2010]. The model comes from the continuum limit in Carlson and Langer [1989], u_{tt} = c^2 u_{xx} - \tilde\gamma^2 u - (\gamma^2 / \xi) (\theta + \ln(u_t + 1)) \theta_t = -(u_t + 1) (\theta + (1 + \epsilon) \ln(u_t +1)) which can be reduced to a first order system, u_t = v v_t = c^2 u_{xx} - \tilde\gamma^2 u - (\gamma^2 / \xi)(\theta + ln(v + 1))) \theta_t = -(v + 1) (\theta + (1 + \epsilon) \ln(v+1)) */ #include #include #include typedef struct { PetscScalar u,v, th; } Field; typedef struct _User *User; struct _User { PetscReal epsilon; /* inverse of seismic ratio, B-A / A */ PetscReal gamma; /* wave frequency for interblock coupling */ PetscReal gammaTilde; /* wave frequency for coupling to plate */ PetscReal xi; /* interblock spring constant */ PetscReal c; /* wavespeed */ }; static PetscErrorCode FormRHSFunction(TS ts, PetscReal t, Vec U, Vec F, void *ctx) { User user = (User) ctx; DM dm, cdm; DMDALocalInfo info; Vec C; Field *f; const Field *u; const PetscScalar *x; PetscInt i; PetscFunctionBeginUser; CHKERRQ(TSGetDM(ts, &dm)); CHKERRQ(DMGetCoordinateDM(dm, &cdm)); CHKERRQ(DMGetCoordinatesLocal(dm, &C)); CHKERRQ(DMDAGetLocalInfo(dm, &info)); CHKERRQ(DMDAVecGetArrayRead(dm, U, (void*)&u)); CHKERRQ(DMDAVecGetArray(dm, F, &f)); CHKERRQ(DMDAVecGetArrayRead(cdm, C, (void*)&x)); for (i = info.xs; i < info.xs+info.xm; ++i) { const PetscScalar hx = i+1 == info.xs+info.xm ? x[i] - x[i-1] : x[i+1] - x[i]; f[i].u = hx*(u[i].v); f[i].v = -hx*(PetscSqr(user->gammaTilde)*u[i].u + (PetscSqr(user->gamma) / user->xi)*(u[i].th + PetscLogScalar(u[i].v + 1))); f[i].th = -hx*(u[i].v + 1)*(u[i].th + (1 + user->epsilon)*PetscLogScalar(u[i].v + 1)); } CHKERRQ(DMDAVecRestoreArrayRead(dm, U, (void*)&u)); CHKERRQ(DMDAVecRestoreArray(dm, F, &f)); CHKERRQ(DMDAVecRestoreArrayRead(cdm, C, (void*)&x)); PetscFunctionReturn(0); } static PetscErrorCode FormIFunction(TS ts, PetscReal t, Vec U, Vec Udot, Vec F, void *ctx) { User user = (User) ctx; DM dm, cdm; DMDALocalInfo info; Vec Uloc, C; Field *u, *udot, *f; PetscScalar *x; PetscInt i; PetscFunctionBeginUser; CHKERRQ(TSGetDM(ts, &dm)); CHKERRQ(DMDAGetLocalInfo(dm, &info)); CHKERRQ(DMGetCoordinateDM(dm, &cdm)); CHKERRQ(DMGetCoordinatesLocal(dm, &C)); CHKERRQ(DMGetLocalVector(dm, &Uloc)); CHKERRQ(DMGlobalToLocalBegin(dm, U, INSERT_VALUES, Uloc)); CHKERRQ(DMGlobalToLocalEnd(dm, U, INSERT_VALUES, Uloc)); CHKERRQ(DMDAVecGetArrayRead(dm, Uloc, &u)); CHKERRQ(DMDAVecGetArrayRead(dm, Udot, &udot)); CHKERRQ(DMDAVecGetArray(dm, F, &f)); CHKERRQ(DMDAVecGetArrayRead(cdm, C, &x)); for (i = info.xs; i < info.xs+info.xm; ++i) { if (i == 0) { const PetscScalar hx = x[i+1] - x[i]; f[i].u = hx * udot[i].u; f[i].v = hx * udot[i].v - PetscSqr(user->c) * (u[i+1].u - u[i].u) / hx; f[i].th = hx * udot[i].th; } else if (i == info.mx-1) { const PetscScalar hx = x[i] - x[i-1]; f[i].u = hx * udot[i].u; f[i].v = hx * udot[i].v - PetscSqr(user->c) * (u[i-1].u - u[i].u) / hx; f[i].th = hx * udot[i].th; } else { const PetscScalar hx = x[i+1] - x[i]; f[i].u = hx * udot[i].u; f[i].v = hx * udot[i].v - PetscSqr(user->c) * (u[i-1].u - 2.*u[i].u + u[i+1].u) / hx; f[i].th = hx * udot[i].th; } } CHKERRQ(DMDAVecRestoreArrayRead(dm, Uloc, &u)); CHKERRQ(DMDAVecRestoreArrayRead(dm, Udot, &udot)); CHKERRQ(DMDAVecRestoreArray(dm, F, &f)); CHKERRQ(DMDAVecRestoreArrayRead(cdm, C, &x)); CHKERRQ(DMRestoreLocalVector(dm, &Uloc)); PetscFunctionReturn(0); } /* IJacobian - Compute IJacobian = dF/dU + a dF/dUdot */ PetscErrorCode FormIJacobian(TS ts, PetscReal t, Vec U, Vec Udot, PetscReal a, Mat J, Mat Jpre, void *ctx) { User user = (User) ctx; DM dm, cdm; DMDALocalInfo info; Vec C; Field *u, *udot; PetscScalar *x; PetscInt i; PetscFunctionBeginUser; CHKERRQ(TSGetDM(ts, &dm)); CHKERRQ(DMDAGetLocalInfo(dm, &info)); CHKERRQ(DMGetCoordinateDM(dm, &cdm)); CHKERRQ(DMGetCoordinatesLocal(dm, &C)); CHKERRQ(DMDAVecGetArrayRead(dm, U, &u)); CHKERRQ(DMDAVecGetArrayRead(dm, Udot, &udot)); CHKERRQ(DMDAVecGetArrayRead(cdm, C, &x)); for (i = info.xs; i < info.xs+info.xm; ++i) { if (i == 0) { const PetscScalar hx = x[i+1] - x[i]; const PetscInt row = i, col[] = {i,i+1}; const PetscScalar dxx0 = PetscSqr(user->c)/hx,dxxR = -PetscSqr(user->c)/hx; const PetscScalar vals[3][2][3] = {{{a*hx, 0,0},{0,0, 0}}, {{0,a*hx+dxx0,0},{0,dxxR,0}}, {{0,0, a*hx},{0,0, 0}}}; CHKERRQ(MatSetValuesBlocked(Jpre, 1, &row, 2, col, &vals[0][0][0], INSERT_VALUES)); } else if (i == info.mx-1) { const PetscScalar hx = x[i+1] - x[i]; const PetscInt row = i, col[] = {i-1,i}; const PetscScalar dxxL = -PetscSqr(user->c)/hx, dxx0 = PetscSqr(user->c)/hx; const PetscScalar vals[3][2][3] = {{{0,0, 0},{a*hx, 0,0}}, {{0,dxxL,0},{0,a*hx+dxx0,0}}, {{0,0, 0},{0,0, a*hx}}}; CHKERRQ(MatSetValuesBlocked(Jpre, 1, &row, 2, col, &vals[0][0][0], INSERT_VALUES)); } else { const PetscScalar hx = x[i+1] - x[i]; const PetscInt row = i, col[] = {i-1,i,i+1}; const PetscScalar dxxL = -PetscSqr(user->c)/hx, dxx0 = 2.*PetscSqr(user->c)/hx,dxxR = -PetscSqr(user->c)/hx; const PetscScalar vals[3][3][3] = {{{0,0, 0},{a*hx, 0,0},{0,0, 0}}, {{0,dxxL,0},{0,a*hx+dxx0,0},{0,dxxR,0}}, {{0,0, 0},{0,0, a*hx},{0,0, 0}}}; CHKERRQ(MatSetValuesBlocked(Jpre, 1, &row, 3, col, &vals[0][0][0], INSERT_VALUES)); } } CHKERRQ(DMDAVecRestoreArrayRead(dm, U, &u)); CHKERRQ(DMDAVecRestoreArrayRead(dm, Udot, &udot)); CHKERRQ(DMDAVecRestoreArrayRead(cdm, C, &x)); CHKERRQ(MatAssemblyBegin(Jpre, MAT_FINAL_ASSEMBLY)); CHKERRQ(MatAssemblyEnd(Jpre, MAT_FINAL_ASSEMBLY)); if (J != Jpre) { CHKERRQ(MatAssemblyBegin(J, MAT_FINAL_ASSEMBLY)); CHKERRQ(MatAssemblyEnd(J, MAT_FINAL_ASSEMBLY)); } PetscFunctionReturn(0); } PetscErrorCode FormInitialSolution(TS ts, Vec U, void *ctx) { /* User user = (User) ctx; */ DM dm, cdm; DMDALocalInfo info; Vec C; Field *u; PetscScalar *x; const PetscReal sigma = 1.0; PetscInt i; PetscFunctionBeginUser; CHKERRQ(TSGetDM(ts, &dm)); CHKERRQ(DMGetCoordinateDM(dm, &cdm)); CHKERRQ(DMGetCoordinatesLocal(dm, &C)); CHKERRQ(DMDAGetLocalInfo(dm, &info)); CHKERRQ(DMDAVecGetArray(dm, U, &u)); CHKERRQ(DMDAVecGetArrayRead(cdm, C, &x)); for (i = info.xs; i < info.xs+info.xm; ++i) { u[i].u = 1.5 * PetscExpScalar(-PetscSqr(x[i] - 10)/PetscSqr(sigma)); u[i].v = 0.0; u[i].th = 0.0; } CHKERRQ(DMDAVecRestoreArray(dm, U, &u)); CHKERRQ(DMDAVecRestoreArrayRead(cdm, C, &x)); PetscFunctionReturn(0); } int main(int argc, char **argv) { DM dm; TS ts; Vec X; Mat J; PetscInt steps, mx; PetscReal ftime, hx, dt; TSConvergedReason reason; struct _User user; PetscErrorCode ierr; ierr = PetscInitialize(&argc, &argv, NULL,help);if (ierr) return ierr; CHKERRQ(DMDACreate1d(PETSC_COMM_WORLD, DM_BOUNDARY_NONE, 11, 3, 1, NULL, &dm)); CHKERRQ(DMSetFromOptions(dm)); CHKERRQ(DMSetUp(dm)); CHKERRQ(DMDASetUniformCoordinates(dm, 0.0, 20.0, 0.0, 0.0, 0.0, 0.0)); CHKERRQ(DMCreateGlobalVector(dm, &X)); ierr = PetscOptionsBegin(PETSC_COMM_WORLD, NULL, "Dynamic Friction Options", "");CHKERRQ(ierr); { user.epsilon = 0.1; user.gamma = 0.5; user.gammaTilde = 0.5; user.xi = 0.5; user.c = 0.5; CHKERRQ(PetscOptionsReal("-epsilon", "Inverse of seismic ratio", "", user.epsilon, &user.epsilon, NULL)); CHKERRQ(PetscOptionsReal("-gamma", "Wave frequency for interblock coupling", "", user.gamma, &user.gamma, NULL)); CHKERRQ(PetscOptionsReal("-gamma_tilde", "Wave frequency for plate coupling", "", user.gammaTilde, &user.gammaTilde, NULL)); CHKERRQ(PetscOptionsReal("-xi", "Interblock spring constant", "", user.xi, &user.xi, NULL)); CHKERRQ(PetscOptionsReal("-c", "Wavespeed", "", user.c, &user.c, NULL)); } ierr = PetscOptionsEnd();CHKERRQ(ierr); CHKERRQ(TSCreate(PETSC_COMM_WORLD, &ts)); CHKERRQ(TSSetDM(ts, dm)); CHKERRQ(TSSetRHSFunction(ts, NULL, FormRHSFunction, &user)); CHKERRQ(TSSetIFunction(ts, NULL, FormIFunction, &user)); CHKERRQ(DMSetMatType(dm, MATAIJ)); CHKERRQ(DMCreateMatrix(dm, &J)); CHKERRQ(TSSetIJacobian(ts, J, J, FormIJacobian, &user)); ftime = 800.0; CHKERRQ(TSSetMaxTime(ts,ftime)); CHKERRQ(TSSetExactFinalTime(ts,TS_EXACTFINALTIME_STEPOVER)); CHKERRQ(FormInitialSolution(ts, X, &user)); CHKERRQ(TSSetSolution(ts, X)); CHKERRQ(VecGetSize(X, &mx)); hx = 20.0/(PetscReal)(mx-1); dt = 0.4 * PetscSqr(hx) / PetscSqr(user.c); /* Diffusive stability limit */ CHKERRQ(TSSetTimeStep(ts,dt)); CHKERRQ(TSSetFromOptions(ts)); CHKERRQ(TSSolve(ts, X)); CHKERRQ(TSGetSolveTime(ts, &ftime)); CHKERRQ(TSGetStepNumber(ts, &steps)); CHKERRQ(TSGetConvergedReason(ts, &reason)); CHKERRQ(PetscPrintf(PETSC_COMM_WORLD, "%s at time %g after %D steps\n", TSConvergedReasons[reason], (double)ftime, steps)); CHKERRQ(MatDestroy(&J)); CHKERRQ(VecDestroy(&X)); CHKERRQ(TSDestroy(&ts)); CHKERRQ(DMDestroy(&dm)); ierr = PetscFinalize(); return ierr; } /*TEST build: requires: !single !complex test: TODO: broken, was not nightly tested, SNES solve eventually fails, -snes_test_jacobian indicates Jacobian is wrong, but even -snes_mf_operator fails TEST*/