forked from mfem/mfem
-
Notifications
You must be signed in to change notification settings - Fork 0
/
ex21.cpp
310 lines (278 loc) · 11.8 KB
/
ex21.cpp
1
2
3
4
5
6
7
8
9
10
11
12
13
14
15
16
17
18
19
20
21
22
23
24
25
26
27
28
29
30
31
32
33
34
35
36
37
38
39
40
41
42
43
44
45
46
47
48
49
50
51
52
53
54
55
56
57
58
59
60
61
62
63
64
65
66
67
68
69
70
71
72
73
74
75
76
77
78
79
80
81
82
83
84
85
86
87
88
89
90
91
92
93
94
95
96
97
98
99
100
101
102
103
104
105
106
107
108
109
110
111
112
113
114
115
116
117
118
119
120
121
122
123
124
125
126
127
128
129
130
131
132
133
134
135
136
137
138
139
140
141
142
143
144
145
146
147
148
149
150
151
152
153
154
155
156
157
158
159
160
161
162
163
164
165
166
167
168
169
170
171
172
173
174
175
176
177
178
179
180
181
182
183
184
185
186
187
188
189
190
191
192
193
194
195
196
197
198
199
200
201
202
203
204
205
206
207
208
209
210
211
212
213
214
215
216
217
218
219
220
221
222
223
224
225
226
227
228
229
230
231
232
233
234
235
236
237
238
239
240
241
242
243
244
245
246
247
248
249
250
251
252
253
254
255
256
257
258
259
260
261
262
263
264
265
266
267
268
269
270
271
272
273
274
275
276
277
278
279
280
281
282
283
284
285
286
287
288
289
290
291
292
293
294
295
296
297
298
299
300
301
302
303
304
305
306
307
308
309
310
// MFEM Example 21
//
// Compile with: make ex21
//
// Sample runs: ex21
// ex21 -o 3
// ex21 -m ../data/beam-quad.mesh
// ex21 -m ../data/beam-quad.mesh -o 3
// ex21 -m ../data/beam-quad.mesh -o 3 -f 1
// ex21 -m ../data/beam-tet.mesh
// ex21 -m ../data/beam-tet.mesh -o 2
// ex21 -m ../data/beam-hex.mesh
// ex21 -m ../data/beam-hex.mesh -o 2
//
// Description: This is a version of Example 2 with a simple adaptive mesh
// refinement loop. The problem being solved is again the linear
// elasticity describing a multi-material cantilever beam.
// The problem is solved on a sequence of meshes which
// are locally refined in a conforming (triangles, tetrahedrons)
// or non-conforming (quadrilaterals, hexahedra) manner according
// to a simple ZZ error estimator.
//
// The example demonstrates MFEM's capability to work with both
// conforming and nonconforming refinements, in 2D and 3D, on
// linear and curved meshes. Interpolation of functions from
// coarse to fine meshes, as well as persistent GLVis
// visualization are also illustrated.
//
// We recommend viewing Examples 2 and 6 before viewing this
// example.
#include "mfem.hpp"
#include <fstream>
#include <iostream>
using namespace std;
using namespace mfem;
int main(int argc, char *argv[])
{
// 1. Parse command-line options.
const char *mesh_file = "../data/beam-tri.mesh";
int order = 1;
bool static_cond = false;
int flux_averaging = 0;
bool visualization = 1;
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(&static_cond, "-sc", "--static-condensation", "-no-sc",
"--no-static-condensation", "Enable static condensation.");
args.AddOption(&flux_averaging, "-f", "--flux-averaging",
"Flux averaging: 0 - global, 1 - by mesh attribute.");
args.AddOption(&visualization, "-vis", "--visualization", "-no-vis",
"--no-visualization",
"Enable or disable GLVis visualization.");
args.Parse();
if (!args.Good())
{
args.PrintUsage(cout);
return 1;
}
args.PrintOptions(cout);
// 2. Read the mesh from the given mesh file. We can handle triangular,
// quadrilateral, tetrahedral, and hexahedral meshes with the same code.
Mesh mesh(mesh_file, 1, 1);
int dim = mesh.Dimension();
MFEM_VERIFY(mesh.SpaceDimension() == dim, "invalid mesh");
if (mesh.attributes.Max() < 2 || mesh.bdr_attributes.Max() < 2)
{
cerr << "\nInput mesh should have at least two materials and "
<< "two boundary attributes! (See schematic in ex2.cpp)\n"
<< endl;
return 3;
}
// 3. Since a NURBS mesh can currently only be refined uniformly, we need to
// convert it to a piecewise-polynomial curved mesh. First we refine the
// NURBS mesh a bit more and then project the curvature to quadratic Nodes.
if (mesh.NURBSext)
{
for (int i = 0; i < 2; i++)
{
mesh.UniformRefinement();
}
mesh.SetCurvature(2);
}
// 4. Define a finite element space on the mesh. The polynomial order is
// one (linear) by default, but this can be changed on the command line.
H1_FECollection fec(order, dim);
FiniteElementSpace fespace(&mesh, &fec, dim);
// 5. As in Example 2, we set up the linear form b(.) which corresponds to
// the right-hand side of the FEM linear system. In this case, b_i equals
// the boundary integral of f*phi_i where f represents a "pull down"
// force on the Neumann part of the boundary and phi_i are the basis
// functions in the finite element fespace. The force is defined by the
// VectorArrayCoefficient object f, which is a vector of Coefficient
// objects. The fact that f is non-zero on boundary attribute 2 is
// indicated by the use of piece-wise constants coefficient for its last
// component. We don't assemble the discrete problem yet, this will be
// done in the main loop.
VectorArrayCoefficient f(dim);
for (int i = 0; i < dim-1; i++)
{
f.Set(i, new ConstantCoefficient(0.0));
}
{
Vector pull_force(mesh.bdr_attributes.Max());
pull_force = 0.0;
pull_force(1) = -1.0e-2;
f.Set(dim-1, new PWConstCoefficient(pull_force));
}
LinearForm b(&fespace);
b.AddDomainIntegrator(new VectorBoundaryLFIntegrator(f));
// 6. Set up the bilinear form a(.,.) on the finite element space
// corresponding to the linear elasticity integrator with piece-wise
// constants coefficient lambda and mu.
Vector lambda(mesh.attributes.Max());
lambda = 1.0;
lambda(0) = lambda(1)*50;
PWConstCoefficient lambda_func(lambda);
Vector mu(mesh.attributes.Max());
mu = 1.0;
mu(0) = mu(1)*50;
PWConstCoefficient mu_func(mu);
BilinearForm a(&fespace);
BilinearFormIntegrator *integ =
new ElasticityIntegrator(lambda_func,mu_func);
a.AddDomainIntegrator(integ);
if (static_cond) { a.EnableStaticCondensation(); }
// 7. The solution vector x and the associated finite element grid function
// will be maintained over the AMR iterations. We initialize it to zero.
Vector zero_vec(dim);
zero_vec = 0.0;
VectorConstantCoefficient zero_vec_coeff(zero_vec);
GridFunction x(&fespace);
x = 0.0;
// 8. Determine the list of true (i.e. conforming) essential boundary dofs.
// In this example, the boundary conditions are defined by marking only
// boundary attribute 1 from the mesh as essential and converting it to a
// list of true dofs. The conversion to true dofs will be done in the
// main loop.
Array<int> ess_bdr(mesh.bdr_attributes.Max());
ess_bdr = 0;
ess_bdr[0] = 1;
// 9. Connect to GLVis.
char vishost[] = "localhost";
int visport = 19916;
socketstream sol_sock;
if (visualization)
{
sol_sock.open(vishost, visport);
sol_sock.precision(8);
}
// 10. Set up an error estimator. Here we use the Zienkiewicz-Zhu estimator
// that uses the ComputeElementFlux method of the ElasticityIntegrator to
// recover a smoothed flux (stress) that is subtracted from the element
// flux to get an error indicator. We need to supply the space for the
// smoothed flux: an (H1)^tdim (i.e., vector-valued) space is used here.
// Here, tdim represents the number of components for a symmetric (dim x
// dim) tensor.
const int tdim = dim*(dim+1)/2;
FiniteElementSpace flux_fespace(&mesh, &fec, tdim);
ZienkiewiczZhuEstimator estimator(*integ, x, flux_fespace);
estimator.SetFluxAveraging(flux_averaging);
// 11. A refiner selects and refines elements based on a refinement strategy.
// The strategy here is to refine elements with errors larger than a
// fraction of the maximum element error. Other strategies are possible.
// The refiner will call the given error estimator.
ThresholdRefiner refiner(estimator);
refiner.SetTotalErrorFraction(0.7);
// 12. The main AMR loop. In each iteration we solve the problem on the
// current mesh, visualize the solution, and refine the mesh.
const int max_dofs = 50000;
const int max_amr_itr = 20;
for (int it = 0; it <= max_amr_itr; it++)
{
int cdofs = fespace.GetTrueVSize();
cout << "\nAMR iteration " << it << endl;
cout << "Number of unknowns: " << cdofs << endl;
// 13. Assemble the stiffness matrix and the right-hand side.
a.Assemble();
b.Assemble();
// 14. Set Dirichlet boundary values in the GridFunction x.
// Determine the list of Dirichlet true DOFs in the linear system.
Array<int> ess_tdof_list;
x.ProjectBdrCoefficient(zero_vec_coeff, ess_bdr);
fespace.GetEssentialTrueDofs(ess_bdr, ess_tdof_list);
// 15. Create the linear system: eliminate boundary conditions, constrain
// hanging nodes and possibly apply other transformations. The system
// will be solved for true (unconstrained) DOFs only.
SparseMatrix A;
Vector B, X;
const int copy_interior = 1;
a.FormLinearSystem(ess_tdof_list, x, b, A, X, B, copy_interior);
#ifndef MFEM_USE_SUITESPARSE
// 16. Define a simple symmetric Gauss-Seidel preconditioner and use it to
// solve the linear system with PCG.
GSSmoother M(A);
PCG(A, M, B, X, 3, 2000, 1e-12, 0.0);
#else
// 16. If MFEM was compiled with SuiteSparse, use UMFPACK to solve the
// the linear system.
UMFPackSolver umf_solver;
umf_solver.Control[UMFPACK_ORDERING] = UMFPACK_ORDERING_METIS;
umf_solver.SetOperator(A);
umf_solver.Mult(B, X);
#endif
// 17. After solving the linear system, reconstruct the solution as a
// finite element GridFunction. Constrained nodes are interpolated
// from true DOFs (it may therefore happen that x.Size() >= X.Size()).
a.RecoverFEMSolution(X, b, x);
// 18. Send solution by socket to the GLVis server.
if (visualization && sol_sock.good())
{
GridFunction nodes(&fespace), *nodes_p = &nodes;
mesh.GetNodes(nodes);
nodes += x;
int own_nodes = 0;
mesh.SwapNodes(nodes_p, own_nodes);
x.Neg(); // visualize the backward displacement
sol_sock << "solution\n" << mesh << x << flush;
x.Neg();
mesh.SwapNodes(nodes_p, own_nodes);
if (it == 0)
{
sol_sock << "keys '" << ((dim == 2) ? "Rjl" : "") << "m'" << endl;
}
sol_sock << "window_title 'AMR iteration: " << it << "'\n"
<< "pause" << endl;
cout << "Visualization paused. "
"Press <space> in the GLVis window to continue." << endl;
}
if (cdofs > max_dofs)
{
cout << "Reached the maximum number of dofs. Stop." << endl;
break;
}
// 19. Call the refiner to modify the mesh. The refiner calls the error
// estimator to obtain element errors, then it selects elements to be
// refined and finally it modifies the mesh. The Stop() method can be
// used to determine if a stopping criterion was met.
refiner.Apply(mesh);
if (refiner.Stop())
{
cout << "Stopping criterion satisfied. Stop." << endl;
break;
}
// 20. Update the space to reflect the new state of the mesh. Also,
// interpolate the solution x so that it lies in the new space but
// represents the same function. This saves solver iterations later
// since we'll have a good initial guess of x in the next step.
// Internally, FiniteElementSpace::Update() calculates an
// interpolation matrix which is then used by GridFunction::Update().
fespace.Update();
x.Update();
// 21. Inform also the bilinear and linear forms that the space has
// changed.
a.Update();
b.Update();
}
{
ofstream mesh_ref_out("ex21_reference.mesh");
mesh_ref_out.precision(16);
mesh.Print(mesh_ref_out);
ofstream mesh_out("ex21_deformed.mesh");
mesh_out.precision(16);
GridFunction nodes(&fespace), *nodes_p = &nodes;
mesh.GetNodes(nodes);
nodes += x;
int own_nodes = 0;
mesh.SwapNodes(nodes_p, own_nodes);
mesh.Print(mesh_out);
mesh.SwapNodes(nodes_p, own_nodes);
ofstream x_out("ex21_displacement.sol");
x_out.precision(16);
x.Save(x_out);
}
return 0;
}