// SPDX-FileCopyrightText: Copyright (c) 2017-2024, HONEE contributors. // SPDX-License-Identifier: Apache-2.0 OR BSD-2-Clause /// @file /// Utility functions for setting up Blasius Boundary Layer #include "../qfunctions/blasius.h" #include #include #include #include #include #include "stg_shur14.h" PetscErrorCode CompressibleBlasiusResidual(SNES snes, Vec X, Vec R, void *ctx) { const BlasiusContext blasius = (BlasiusContext)ctx; const PetscScalar *Tf, *Th; // Chebyshev coefficients PetscScalar *r, f[4], h[4]; PetscInt N = blasius->n_cheb; State S_infty = blasius->S_infty; CeedScalar U_infty = Norm3(S_infty.Y.velocity); NewtonianIGProperties gas = blasius->newt_ctx.gas; PetscFunctionBeginUser; PetscScalar Ma = Mach(gas, S_infty.Y.temperature, U_infty), Pr = Prandtl(gas), gamma = HeatCapacityRatio(gas); PetscCall(VecGetArrayRead(X, &Tf)); Th = Tf + N; PetscCall(VecGetArray(R, &r)); // Left boundary conditions f = f' = 0 ChebyshevEval(N, Tf, -1., blasius->eta_max, f); r[0] = f[0]; r[1] = f[1]; // f - right end boundary condition ChebyshevEval(N, Tf, 1., blasius->eta_max, f); r[2] = f[1] - 1.; for (int i = 0; i < N - 3; i++) { ChebyshevEval(N, Tf, blasius->X[i], blasius->eta_max, f); ChebyshevEval(N - 1, Th, blasius->X[i], blasius->eta_max, h); // mu and rho generally depend on h. // We naively assume constant mu. // For an ideal gas at constant pressure, density is inversely proportional to enthalpy. // The *_tilde values are *relative* to their freestream values, and we proved first derivatives here. const PetscScalar mu_tilde[2] = {1, 0}; const PetscScalar rho_tilde[2] = {1 / h[0], -h[1] / PetscSqr(h[0])}; const PetscScalar mu_rho_tilde[2] = { mu_tilde[0] * rho_tilde[0], mu_tilde[1] * rho_tilde[0] + mu_tilde[0] * rho_tilde[1], }; r[3 + i] = 2 * (mu_rho_tilde[0] * f[3] + mu_rho_tilde[1] * f[2]) + f[2] * f[0]; r[N + 2 + i] = (mu_rho_tilde[0] * h[2] + mu_rho_tilde[1] * h[1]) + Pr * f[0] * h[1] + Pr * (gamma - 1) * mu_rho_tilde[0] * PetscSqr(Ma * f[2]); } // h - left end boundary condition ChebyshevEval(N - 1, Th, -1., blasius->eta_max, h); r[N] = h[0] - blasius->T_wall / S_infty.Y.temperature; // h - right end boundary condition ChebyshevEval(N - 1, Th, 1., blasius->eta_max, h); r[N + 1] = h[0] - 1.; // Restore vectors PetscCall(VecRestoreArrayRead(X, &Tf)); PetscCall(VecRestoreArray(R, &r)); PetscFunctionReturn(PETSC_SUCCESS); } PetscErrorCode ComputeChebyshevCoefficients(BlasiusContext blasius) { SNES snes; Vec sol, res; PetscReal *w; PetscInt N = blasius->n_cheb; SNESConvergedReason reason; const PetscScalar *cheb_coefs; PetscFunctionBeginUser; // Allocate memory PetscCall(PetscMalloc2(N - 3, &blasius->X, N - 3, &w)); PetscCall(PetscDTGaussQuadrature(N - 3, -1., 1., blasius->X, w)); // Snes solve PetscCall(SNESCreate(PETSC_COMM_SELF, &snes)); PetscCall(VecCreate(PETSC_COMM_SELF, &sol)); PetscCall(VecSetSizes(sol, PETSC_DECIDE, 2 * N - 1)); PetscCall(VecSetFromOptions(sol)); // Constant relative enthalpy 1 as initial guess PetscCall(VecSetValue(sol, N, 1., INSERT_VALUES)); PetscCall(VecDuplicate(sol, &res)); PetscCall(SNESSetFunction(snes, res, CompressibleBlasiusResidual, blasius)); PetscCall(SNESSetOptionsPrefix(snes, "chebyshev_")); PetscCall(SNESSetFromOptions(snes)); PetscCall(SNESSolve(snes, NULL, sol)); PetscCall(SNESGetConvergedReason(snes, &reason)); PetscCheck(reason >= 0, PETSC_COMM_WORLD, PETSC_ERR_CONV_FAILED, "The Chebyshev solve failed."); // Assign Chebyshev coefficients PetscCall(VecGetArrayRead(sol, &cheb_coefs)); for (int i = 0; i < N; i++) blasius->Tf_cheb[i] = cheb_coefs[i]; for (int i = 0; i < N - 1; i++) blasius->Th_cheb[i] = cheb_coefs[i + N]; // Destroy objects PetscCall(PetscFree2(blasius->X, w)); PetscCall(VecDestroy(&sol)); PetscCall(VecDestroy(&res)); PetscCall(SNESDestroy(&snes)); PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode BlasiusInflowBCSetup_CreateIFunctionQF(BCDefinition bc_def, CeedQFunction *qf) { HoneeBCStruct honee_bc; PetscFunctionBeginUser; PetscCall(BCDefinitionGetContext(bc_def, &honee_bc)); PetscCall(HoneeBCCreateIFunctionQF(bc_def, Blasius_Inflow, Blasius_Inflow_loc, honee_bc->qfctx, qf)); PetscFunctionReturn(PETSC_SUCCESS); } static PetscErrorCode BlasiusInflowBCSetup_CreateIJacobianQF(BCDefinition bc_def, CeedQFunction *qf) { HoneeBCStruct honee_bc; PetscFunctionBeginUser; PetscCall(BCDefinitionGetContext(bc_def, &honee_bc)); PetscCall(HoneeBCCreateIJacobianQF(bc_def, Blasius_Inflow_Jacobian, Blasius_Inflow_Jacobian_loc, honee_bc->qfctx, qf)); PetscFunctionReturn(PETSC_SUCCESS); } PetscErrorCode NS_BLASIUS(ProblemData problem, DM dm, void *ctx) { Honee honee = *(Honee *)ctx; MPI_Comm comm = honee->comm; Ceed ceed = honee->ceed; PetscBool use_stg = PETSC_FALSE; BlasiusContext blasius_ctx; NewtonianIdealGasContext newtonian_ig_ctx; CeedQFunctionContext blasius_qfctx; PetscFunctionBeginUser; PetscCall(NS_NEWTONIAN_IG(problem, dm, ctx)); // ------------------------------------------------------ // SET UP Blasius // ------------------------------------------------------ problem->ics = (HoneeQFSpec){.qf_func_ptr = ICsBlasius, .qf_loc = ICsBlasius_loc, .qfctx = problem->ics.qfctx}; CeedScalar U_inf = 40; // m/s CeedScalar T_inf = 288.; // K CeedScalar T_wall = 288.; // K CeedScalar delta0 = 4.2e-3; // m CeedScalar P_inf = 1.01e5; // Pa PetscInt N = 20; // Number of Chebyshev terms PetscBool weakT = PETSC_FALSE; // weak density or temperature PetscBool P0_set; PetscOptionsBegin(comm, NULL, "Options for BLASIUS problem", NULL); PetscCall(PetscOptionsBool("-weakT", "Change from rho weak to T weak at inflow", NULL, weakT, &weakT, NULL)); PetscCall(PetscOptionsScalar("-velocity_infinity", "Velocity at boundary layer edge", NULL, U_inf, &U_inf, NULL)); PetscCall(PetscOptionsScalar("-temperature_infinity", "Temperature at boundary layer edge", NULL, T_inf, &T_inf, NULL)); PetscCall(PetscOptionsHasName(NULL, NULL, "-P0", &P0_set)); // For maintaining behavior of -P0 flag (which is deprecated) PetscCall(PetscOptionsDeprecated("-P0", "-pressure_infinity", "libCEED 0.12.0", "Use -pressure_infinity to set pressure at boundary layer edge and -idl_pressure to set the IDL reference " "pressure")); PetscCall(PetscOptionsScalar("-pressure_infinity", "Pressure at boundary layer edge", NULL, P_inf, &P_inf, NULL)); PetscCall(PetscOptionsScalar("-temperature_wall", "Temperature at wall", NULL, T_wall, &T_wall, NULL)); PetscCall(PetscOptionsScalar("-delta0", "Boundary layer height at inflow", NULL, delta0, &delta0, NULL)); PetscCall(PetscOptionsInt("-n_chebyshev", "Number of Chebyshev terms", NULL, N, &N, NULL)); PetscCheck(3 <= N && N <= BLASIUS_MAX_N_CHEBYSHEV, comm, PETSC_ERR_ARG_OUTOFRANGE, "-n_chebyshev %" PetscInt_FMT " must be in range [3, %d]", N, BLASIUS_MAX_N_CHEBYSHEV); PetscCall(PetscOptionsBool("-stg_use", "Use STG inflow boundary condition", NULL, use_stg, &use_stg, NULL)); PetscOptionsEnd(); Units units = honee->units; T_inf *= units->Kelvin; T_wall *= units->Kelvin; P_inf *= units->Pascal; U_inf *= units->meter / units->second; delta0 *= units->meter; // Some properties depend on parameters from NewtonianIdealGas PetscCallCeed(ceed, CeedQFunctionContextGetData(problem->apply_vol_rhs.qfctx, CEED_MEM_HOST, &newtonian_ig_ctx)); StatePrimitive Y_inf = { .pressure = P_inf, .velocity = {U_inf, 0, 0}, .temperature = T_inf }; State S_infty = StateFromPrimitive(newtonian_ig_ctx->gas, Y_inf); PetscCall(PetscNew(&blasius_ctx)); blasius_ctx->weakT = weakT; blasius_ctx->T_wall = T_wall; blasius_ctx->delta0 = delta0; blasius_ctx->S_infty = S_infty; blasius_ctx->n_cheb = N; blasius_ctx->implicit = honee->phys->implicit; if (P0_set) newtonian_ig_ctx->idl_pressure = P_inf; // For maintaining behavior of -P0 flag (which is deprecated) blasius_ctx->newt_ctx = *newtonian_ig_ctx; { PetscReal domain_min[3], domain_max[3]; PetscCall(DMGetBoundingBox(dm, domain_min, domain_max)); blasius_ctx->x_inflow = domain_min[0]; blasius_ctx->eta_max = 5 * domain_max[1] / blasius_ctx->delta0; } PetscBool diff_filter_mms = PETSC_FALSE; PetscCall(PetscOptionsGetBool(NULL, NULL, "-diff_filter_mms", &diff_filter_mms, NULL)); if (!use_stg && !diff_filter_mms) PetscCall(ComputeChebyshevCoefficients(blasius_ctx)); PetscCallCeed(ceed, CeedQFunctionContextRestoreData(problem->apply_vol_rhs.qfctx, &newtonian_ig_ctx)); PetscCallCeed(ceed, CeedQFunctionContextCreate(honee->ceed, &blasius_qfctx)); PetscCallCeed(ceed, CeedQFunctionContextSetData(blasius_qfctx, CEED_MEM_HOST, CEED_USE_POINTER, sizeof(*blasius_ctx), blasius_ctx)); PetscCallCeed(ceed, CeedQFunctionContextSetDataDestroy(blasius_qfctx, CEED_MEM_HOST, FreeContextPetsc)); PetscCallCeed(ceed, CeedQFunctionContextDestroy(&problem->ics.qfctx)); problem->ics.qfctx = blasius_qfctx; if (use_stg) { PetscCall(SetupStg(comm, dm, problem, honee, weakT, S_infty.Y.temperature, S_infty.Y.pressure)); } else if (diff_filter_mms) { PetscCall(DifferentialFilterMmsICSetup(honee)); } else { PetscCheck((honee->phys->state_var == STATEVAR_CONSERVATIVE) || (honee->app_ctx->test_type == TESTTYPE_DIFF_FILTER), honee->comm, PETSC_ERR_ARG_INCOMP, "Can only use conservative variables with Blasius and weak inflow"); for (PetscCount b = 0; b < problem->num_bc_defs; b++) { BCDefinition bc_def = problem->bc_defs[b]; const char *name; PetscCall(BCDefinitionGetInfo(bc_def, &name, NULL, NULL)); if (!strcmp(name, "inflow")) { HoneeBCStruct honee_bc; PetscCall(PetscNew(&honee_bc)); PetscCallCeed(ceed, CeedQFunctionContextReferenceCopy(blasius_qfctx, &honee_bc->qfctx)); honee_bc->honee = honee; honee_bc->num_comps_jac_data = 0; PetscCall(BCDefinitionSetContext(bc_def, HoneeBCDestroy, honee_bc)); PetscCall(BCDefinitionSetIFunction(bc_def, BlasiusInflowBCSetup_CreateIFunctionQF, HoneeBCAddIFunctionOp)); PetscCall(BCDefinitionSetIJacobian(bc_def, BlasiusInflowBCSetup_CreateIJacobianQF, HoneeBCAddIJacobianOp)); } } } PetscFunctionReturn(PETSC_SUCCESS); }