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ex3p.cpp
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ex3p.cpp
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// MFEM Example 3 - Parallel Version
//
// Compile with: make ex3p
//
// Sample runs: mpirun -np 4 ex3p -m ../data/star.mesh
// mpirun -np 4 ex3p -m ../data/square-disc.mesh -o 2
// mpirun -np 4 ex3p -m ../data/beam-tet.mesh
// mpirun -np 4 ex3p -m ../data/beam-hex.mesh
// mpirun -np 4 ex3p -m ../data/beam-hex.mesh -o 2 -pa
// mpirun -np 4 ex3p -m ../data/escher.mesh
// mpirun -np 4 ex3p -m ../data/escher.mesh -o 2
// mpirun -np 4 ex3p -m ../data/fichera.mesh
// mpirun -np 4 ex3p -m ../data/fichera-q2.vtk
// mpirun -np 4 ex3p -m ../data/fichera-q3.mesh
// mpirun -np 4 ex3p -m ../data/square-disc-nurbs.mesh
// mpirun -np 4 ex3p -m ../data/beam-hex-nurbs.mesh
// mpirun -np 4 ex3p -m ../data/amr-quad.mesh -o 2
// mpirun -np 4 ex3p -m ../data/amr-hex.mesh
// mpirun -np 4 ex3p -m ../data/ref-prism.mesh -o 1
// mpirun -np 4 ex3p -m ../data/octahedron.mesh -o 1
// mpirun -np 4 ex3p -m ../data/star-surf.mesh -o 2
// mpirun -np 4 ex3p -m ../data/mobius-strip.mesh -o 2 -f 0.1
// mpirun -np 4 ex3p -m ../data/klein-bottle.mesh -o 2 -f 0.1
//
// Device sample runs:
// mpirun -np 4 ex3p -m ../data/star.mesh -pa -d cuda
// mpirun -np 4 ex3p -m ../data/star.mesh -no-pa -d cuda
// mpirun -np 4 ex3p -m ../data/star.mesh -pa -d raja-cuda
// mpirun -np 4 ex3p -m ../data/star.mesh -pa -d raja-omp
// mpirun -np 4 ex3p -m ../data/beam-hex.mesh -pa -d cuda
//
// Description: This example code solves a simple electromagnetic diffusion
// problem corresponding to the second order definite Maxwell
// equation curl curl E + E = f with boundary condition
// E x n = <given tangential field>. Here, we use a given exact
// solution E and compute the corresponding r.h.s. f.
// We discretize with Nedelec finite elements in 2D or 3D.
//
// The example demonstrates the use of H(curl) finite element
// spaces with the curl-curl and the (vector finite element) mass
// bilinear form, as well as the computation of discretization
// error when the exact solution is known. Static condensation is
// also illustrated.
//
// We recommend viewing examples 1-2 before viewing this example.
#include "mfem.hpp"
#include <fstream>
#include <iostream>
using namespace std;
using namespace mfem;
// Exact solution, E, and r.h.s., f. See below for implementation.
void E_exact(const Vector &, Vector &);
void f_exact(const Vector &, Vector &);
double freq = 1.0, kappa;
int dim;
int main(int argc, char *argv[])
{
// 1. Initialize MPI and HYPRE.
Mpi::Init(argc, argv);
int num_procs = Mpi::WorldSize();
int myid = Mpi::WorldRank();
Hypre::Init();
// 2. Parse command-line options.
const char *mesh_file = "../data/beam-tet.mesh";
int order = 1;
bool static_cond = false;
bool pa = false;
const char *device_config = "cpu";
bool visualization = true;
#ifdef MFEM_USE_AMGX
bool useAmgX = false;
#endif
OptionsParser args(argc, argv);
args.AddOption(&mesh_file, "-m", "--mesh",
"Mesh file to use.");
args.AddOption(&order, "-o", "--order",
"Finite element order (polynomial degree).");
args.AddOption(&freq, "-f", "--frequency", "Set the frequency for the exact"
" solution.");
args.AddOption(&static_cond, "-sc", "--static-condensation", "-no-sc",
"--no-static-condensation", "Enable static condensation.");
args.AddOption(&pa, "-pa", "--partial-assembly", "-no-pa",
"--no-partial-assembly", "Enable Partial Assembly.");
args.AddOption(&device_config, "-d", "--device",
"Device configuration string, see Device::Configure().");
args.AddOption(&visualization, "-vis", "--visualization", "-no-vis",
"--no-visualization",
"Enable or disable GLVis visualization.");
#ifdef MFEM_USE_AMGX
args.AddOption(&useAmgX, "-amgx", "--useAmgX", "-no-amgx",
"--no-useAmgX",
"Enable or disable AmgX in MatrixFreeAMS.");
#endif
args.Parse();
if (!args.Good())
{
if (myid == 0)
{
args.PrintUsage(cout);
}
return 1;
}
if (myid == 0)
{
args.PrintOptions(cout);
}
kappa = freq * M_PI;
// 3. Enable hardware devices such as GPUs, and programming models such as
// CUDA, OCCA, RAJA and OpenMP based on command line options.
Device device(device_config);
if (myid == 0) { device.Print(); }
// 4. Read the (serial) mesh from the given mesh file on all processors. We
// can handle triangular, quadrilateral, tetrahedral, hexahedral, surface
// and volume meshes with the same code.
Mesh *mesh = new Mesh(mesh_file, 1, 1);
dim = mesh->Dimension();
int sdim = mesh->SpaceDimension();
// 5. Refine the serial mesh on all processors to increase the resolution. In
// this example we do 'ref_levels' of uniform refinement. We choose
// 'ref_levels' to be the largest number that gives a final mesh with no
// more than 1,000 elements.
{
int ref_levels = (int)floor(log(1000./mesh->GetNE())/log(2.)/dim);
for (int l = 0; l < ref_levels; l++)
{
mesh->UniformRefinement();
}
}
// 6. Define a parallel mesh by a partitioning of the serial mesh. Refine
// this mesh further in parallel to increase the resolution. Once the
// parallel mesh is defined, the serial mesh can be deleted.
ParMesh *pmesh = new ParMesh(MPI_COMM_WORLD, *mesh);
delete mesh;
{
int par_ref_levels = 2;
for (int l = 0; l < par_ref_levels; l++)
{
pmesh->UniformRefinement();
}
}
// 7. Define a parallel finite element space on the parallel mesh. Here we
// use the Nedelec finite elements of the specified order.
FiniteElementCollection *fec = new ND_FECollection(order, dim);
ParFiniteElementSpace *fespace = new ParFiniteElementSpace(pmesh, fec);
HYPRE_BigInt size = fespace->GlobalTrueVSize();
if (myid == 0)
{
cout << "Number of finite element unknowns: " << size << endl;
}
// 8. Determine the list of true (i.e. parallel conforming) essential
// boundary dofs. In this example, the boundary conditions are defined
// by marking all the boundary attributes from the mesh as essential
// (Dirichlet) and converting them to a list of true dofs.
Array<int> ess_tdof_list;
Array<int> ess_bdr;
if (pmesh->bdr_attributes.Size())
{
ess_bdr.SetSize(pmesh->bdr_attributes.Max());
ess_bdr = 1;
fespace->GetEssentialTrueDofs(ess_bdr, ess_tdof_list);
}
// 9. Set up the parallel linear form b(.) which corresponds to the
// right-hand side of the FEM linear system, which in this case is
// (f,phi_i) where f is given by the function f_exact and phi_i are the
// basis functions in the finite element fespace.
VectorFunctionCoefficient f(sdim, f_exact);
ParLinearForm *b = new ParLinearForm(fespace);
b->AddDomainIntegrator(new VectorFEDomainLFIntegrator(f));
b->Assemble();
// 10. Define the solution vector x as a parallel finite element grid function
// corresponding to fespace. Initialize x by projecting the exact
// solution. Note that only values from the boundary edges will be used
// when eliminating the non-homogeneous boundary condition to modify the
// r.h.s. vector b.
ParGridFunction x(fespace);
VectorFunctionCoefficient E(sdim, E_exact);
x.ProjectCoefficient(E);
// 11. Set up the parallel bilinear form corresponding to the EM diffusion
// operator curl muinv curl + sigma I, by adding the curl-curl and the
// mass domain integrators.
Coefficient *muinv = new ConstantCoefficient(1.0);
Coefficient *sigma = new ConstantCoefficient(1.0);
ParBilinearForm *a = new ParBilinearForm(fespace);
if (pa) { a->SetAssemblyLevel(AssemblyLevel::PARTIAL); }
a->AddDomainIntegrator(new CurlCurlIntegrator(*muinv));
a->AddDomainIntegrator(new VectorFEMassIntegrator(*sigma));
// 12. Assemble the parallel bilinear form and the corresponding linear
// system, applying any necessary transformations such as: parallel
// assembly, eliminating boundary conditions, applying conforming
// constraints for non-conforming AMR, static condensation, etc.
if (static_cond) { a->EnableStaticCondensation(); }
a->Assemble();
OperatorPtr A;
Vector B, X;
a->FormLinearSystem(ess_tdof_list, x, *b, A, X, B);
// 13. Solve the system AX=B using PCG with an AMS preconditioner.
if (pa)
{
#ifdef MFEM_USE_AMGX
MatrixFreeAMS ams(*a, *A, *fespace, muinv, sigma, NULL, ess_bdr, useAmgX);
#else
MatrixFreeAMS ams(*a, *A, *fespace, muinv, sigma, NULL, ess_bdr);
#endif
CGSolver cg(MPI_COMM_WORLD);
cg.SetRelTol(1e-12);
cg.SetMaxIter(1000);
cg.SetPrintLevel(1);
cg.SetOperator(*A);
cg.SetPreconditioner(ams);
cg.Mult(B, X);
}
else
{
if (myid == 0)
{
cout << "Size of linear system: "
<< A.As<HypreParMatrix>()->GetGlobalNumRows() << endl;
}
ParFiniteElementSpace *prec_fespace =
(a->StaticCondensationIsEnabled() ? a->SCParFESpace() : fespace);
HypreAMS ams(*A.As<HypreParMatrix>(), prec_fespace);
HyprePCG pcg(*A.As<HypreParMatrix>());
pcg.SetTol(1e-12);
pcg.SetMaxIter(500);
pcg.SetPrintLevel(2);
pcg.SetPreconditioner(ams);
pcg.Mult(B, X);
}
// 14. Recover the parallel grid function corresponding to X. This is the
// local finite element solution on each processor.
a->RecoverFEMSolution(X, *b, x);
// 15. Compute and print the L^2 norm of the error.
{
double error = x.ComputeL2Error(E);
if (myid == 0)
{
cout << "\n|| E_h - E ||_{L^2} = " << error << '\n' << endl;
}
}
// 16. Save the refined mesh and the solution in parallel. This output can
// be viewed later using GLVis: "glvis -np <np> -m mesh -g sol".
{
ostringstream mesh_name, sol_name;
mesh_name << "mesh." << setfill('0') << setw(6) << myid;
sol_name << "sol." << setfill('0') << setw(6) << myid;
ofstream mesh_ofs(mesh_name.str().c_str());
mesh_ofs.precision(8);
pmesh->Print(mesh_ofs);
ofstream sol_ofs(sol_name.str().c_str());
sol_ofs.precision(8);
x.Save(sol_ofs);
}
// 17. Send the solution by socket to a GLVis server.
if (visualization)
{
char vishost[] = "localhost";
int visport = 19916;
socketstream sol_sock(vishost, visport);
sol_sock << "parallel " << num_procs << " " << myid << "\n";
sol_sock.precision(8);
sol_sock << "solution\n" << *pmesh << x << flush;
}
// 18. Free the used memory.
delete a;
delete sigma;
delete muinv;
delete b;
delete fespace;
delete fec;
delete pmesh;
return 0;
}
void E_exact(const Vector &x, Vector &E)
{
if (dim == 3)
{
E(0) = sin(kappa * x(1));
E(1) = sin(kappa * x(2));
E(2) = sin(kappa * x(0));
}
else
{
E(0) = sin(kappa * x(1));
E(1) = sin(kappa * x(0));
if (x.Size() == 3) { E(2) = 0.0; }
}
}
void f_exact(const Vector &x, Vector &f)
{
if (dim == 3)
{
f(0) = (1. + kappa * kappa) * sin(kappa * x(1));
f(1) = (1. + kappa * kappa) * sin(kappa * x(2));
f(2) = (1. + kappa * kappa) * sin(kappa * x(0));
}
else
{
f(0) = (1. + kappa * kappa) * sin(kappa * x(1));
f(1) = (1. + kappa * kappa) * sin(kappa * x(0));
if (x.Size() == 3) { f(2) = 0.0; }
}
}