int main(int argc,char **argv)
{
Mat A; /* operator matrix */
EPS eps; /* eigenproblem solver context */
EPSType type;
PetscMPIInt nproc, myproc;
PetscInt nev;
PetscErrorCode ierr;
SlepcInitialize(&argc, &argv, (char*)0, 0);
ierr = MPI_Comm_size(PETSC_COMM_WORLD,&nproc); CHKERRQ(ierr);
ierr = MPI_Comm_rank(PETSC_COMM_WORLD,&myproc); CHKERRQ(ierr);
int L = 8;
ierr = PetscOptionsGetInt(NULL,"-L", &L, NULL); CHKERRQ(ierr);
PetscInt N_global = 1 << L;
PetscInt N_local = N_global / nproc;
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Compute the operator matrix that defines the eigensystem, Ax=kx
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
model m;
m.comm = PETSC_COMM_WORLD;
m.L = L;
m.buffer = new double[N_local];
if (m.buffer == 0) {
MPI_Abort(MPI_COMM_WORLD, 4);
}
for (int i=0; i<L; ++i) {
m.lattice.push_back(std::make_pair(i, (i+1)%L));
}
ierr = MatCreateShell(PETSC_COMM_WORLD, N_local, N_local, N_global, N_global, &m, &A); CHKERRQ(ierr);
ierr = MatSetFromOptions(A); CHKERRQ(ierr);
ierr = MatShellSetOperation(A,MATOP_MULT,(void(*)())MatMult_myMat); CHKERRQ(ierr);
ierr = MatShellSetOperation(A,MATOP_MULT_TRANSPOSE,(void(*)())MatMult_myMat); CHKERRQ(ierr);
ierr = MatShellSetOperation(A,MATOP_GET_DIAGONAL,(void(*)())MatGetDiagonal_myMat); CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Create the eigensolver and set various options
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
/*
Create eigensolver context
*/
ierr = EPSCreate(PETSC_COMM_WORLD,&eps); CHKERRQ(ierr);
/*
Set operators. In this case, it is a standard eigenvalue problem
*/
ierr = EPSSetOperators(eps,A,NULL); CHKERRQ(ierr);
ierr = EPSSetProblemType(eps,EPS_HEP); CHKERRQ(ierr);
ierr = EPSSetDimensions(eps, 5, 100, 100); CHKERRQ(ierr);
ierr = EPSSetTolerances(eps, (PetscScalar) 1e-1, (PetscInt) 100); CHKERRQ(ierr);
//Vec v0;
//MatGetVecs(A, &v0, NULL);
//VecSet(v0,1.0);
//EPSSetInitialSpace(eps,1,&v0);
/*
Set solver parameters at runtime
*/
ierr = EPSSetFromOptions(eps); CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Solve the eigensystem
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = EPSSolve(eps);CHKERRQ(ierr);
/*
Optional: Get some information from the solver and display it
*/
ierr = EPSGetType(eps,&type); CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Solution method: %s\n\n",type); CHKERRQ(ierr);
ierr = EPSGetDimensions(eps,&nev,NULL,NULL); CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of requested eigenvalues: %D\n",nev); CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Display solution and clean up
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = EPSPrintSolution(eps,NULL); CHKERRQ(ierr);
ierr = EPSDestroy(&eps); CHKERRQ(ierr);
ierr = MatDestroy(&A); CHKERRQ(ierr);
ierr = SlepcFinalize();
return 0;
}
int main(int argc,char **args)
{
Mat A;
PetscInt i;
PetscErrorCode ierr;
char file[PETSC_MAX_PATH_LEN];
PetscLogDouble numberOfFlops, tsolve1, tsolve2;
EPS eps; /* eigenproblem solver context */
const EPSType type;
PetscReal error,tol,re,im;
PetscScalar kr,ki;
Vec xr=0,xi=0;
PetscInt nev,maxit,its,nconv;
EPSWhich which;
EPSProblemType problemType;
PetscMPIInt rank;
PetscMPIInt numberOfProcessors;
PetscBool flg;
PetscBool isComplex;
PetscViewer fd;
SlepcInitialize(&argc,&args,(char*)0,help);
ierr = MPI_Comm_rank(PETSC_COMM_WORLD,&rank);CHKERRQ(ierr);
ierr = MPI_Comm_size(PETSC_COMM_WORLD,&numberOfProcessors);CHKERRQ(ierr);
ierr = PetscOptionsGetString(PETSC_NULL,"-fin",file,PETSC_MAX_PATH_LEN,&flg);CHKERRQ(ierr);
if (!flg) {
SETERRQ(PETSC_COMM_WORLD,1,"Must indicate matrix file with the -fin option");
}
/* Read file */
ierr = PetscViewerBinaryOpen(PETSC_COMM_WORLD,file,FILE_MODE_READ,&fd);CHKERRQ(ierr);
// Create matrix
ierr = MatCreate(PETSC_COMM_WORLD,&A);CHKERRQ(ierr);
ierr = MatSetFromOptions(A);CHKERRQ(ierr);
// Load matrix from file
ierr = MatLoad(A,fd);CHKERRQ(ierr);
// Destroy viewer
ierr = PetscViewerDestroy(&fd);CHKERRQ(ierr);
// Assemble matrix
ierr = MatAssemblyBegin(A,MAT_FINAL_ASSEMBLY);CHKERRQ(ierr);
ierr = MatAssemblyEnd(A,MAT_FINAL_ASSEMBLY);CHKERRQ(ierr);
//ierr = PetscPrintf(PETSC_COMM_SELF,"Reading matrix completes.\n");CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Create the eigensolver and set various options
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
/*
Create eigensolver context
*/
ierr = EPSCreate(PETSC_COMM_WORLD,&eps);CHKERRQ(ierr);
/*
Set operators. In this case, it is a standard eigenvalue problem
*/
ierr = EPSSetOperators(eps,A,PETSC_NULL);CHKERRQ(ierr);
//ierr = EPSSetProblemType(eps,EPS_HEP);CHKERRQ(ierr);
/*
Set solver parameters at runtime
*/
ierr = EPSSetFromOptions(eps);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Solve the eigensystem
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
PetscTime(tsolve1);
ierr = EPSSolve(eps);CHKERRQ(ierr);
PetscTime(tsolve2);
/*
Optional: Get some information from the solver and display it
*/
ierr = EPSGetProblemType(eps, &problemType);CHKERRQ(ierr);
ierr = EPSGetWhichEigenpairs(eps, &which);CHKERRQ(ierr);
ierr = EPSGetDimensions(eps,&nev,PETSC_NULL,PETSC_NULL);CHKERRQ(ierr);
ierr = EPSGetType(eps,&type);CHKERRQ(ierr);
ierr = EPSGetTolerances(eps,&tol,&maxit);CHKERRQ(ierr);
ierr = EPSGetConverged(eps,&nconv);CHKERRQ(ierr);
ierr = EPSGetIterationNumber(eps,&its);CHKERRQ(ierr);
ierr = PetscGetFlops(&numberOfFlops);CHKERRQ(ierr);
#if defined(PETSC_USE_COMPLEX)
isComplex = 1;
#else
isComplex = 0;
#endif
//Print output:
ierr = PetscPrintf(PETSC_COMM_WORLD,"%D\t %D\t %D\t %D\t %D\t %.4G\t %s\t %D\t %D\t %F\t %2.1e\t",isComplex, numberOfProcessors, problemType, which, nev, tol, type, nconv, its, numberOfFlops, (tsolve2-tsolve1));CHKERRQ(ierr);
if (nconv>0) {
for (i=0;i<nconv;i++) {
/*
Get converged eigenpairs: i-th eigenvalue is stored in kr (real part) and
ki (imaginary part)
*/
ierr = EPSGetEigenpair(eps,i,&kr,&ki,xr,xi);CHKERRQ(ierr);
/*
Compute the relative error associated to each eigenpair
*/
ierr = EPSComputeRelativeError(eps,i,&error);CHKERRQ(ierr);
#if defined(PETSC_USE_COMPLEX)
re = PetscRealPart(kr);
im = PetscImaginaryPart(kr);
#else
re = kr;
im = ki;
#endif
if (im!=0.0) {
// ierr = PetscPrintf(PETSC_COMM_WORLD," %9F%+9F j %12G\n",re,im,error);CHKERRQ(ierr);
} else {
// ierr = PetscPrintf(PETSC_COMM_WORLD," %12F %12G\n",re,error);CHKERRQ(ierr);
}
ierr = PetscPrintf(PETSC_COMM_WORLD,"%12G\t", error);CHKERRQ(ierr);
}
}
ierr = PetscPrintf(PETSC_COMM_WORLD,"\n");CHKERRQ(ierr);
//Destructors
ierr = MatDestroy(&A);CHKERRQ(ierr);
//ierr = PetscFinalize();
ierr = SlepcFinalize();CHKERRQ(ierr);
return 0;
}
bool eigenSolver::solve(int numEigenValues, std::string which)
{
if(!_A) return false;
Mat A = _A->getMatrix();
Mat B = _B ? _B->getMatrix() : PETSC_NULL;
PetscInt N, M;
_try(MatAssemblyBegin(A, MAT_FINAL_ASSEMBLY));
_try(MatAssemblyEnd(A, MAT_FINAL_ASSEMBLY));
_try(MatGetSize(A, &N, &M));
PetscInt N2, M2;
if (_B) {
_try(MatAssemblyBegin(B, MAT_FINAL_ASSEMBLY));
_try(MatAssemblyEnd(B, MAT_FINAL_ASSEMBLY));
_try(MatGetSize(B, &N2, &M2));
}
// generalized eigenvalue problem A x - \lambda B x = 0
EPS eps;
_try(EPSCreate(PETSC_COMM_WORLD, &eps));
_try(EPSSetOperators(eps, A, B));
if(_hermitian)
_try(EPSSetProblemType(eps, _B ? EPS_GHEP : EPS_HEP));
else
_try(EPSSetProblemType(eps, _B ? EPS_GNHEP : EPS_NHEP));
// set some default options
_try(EPSSetDimensions(eps, numEigenValues, PETSC_DECIDE, PETSC_DECIDE));
_try(EPSSetTolerances(eps, 1.e-7, 20));//1.e-7 20
_try(EPSSetType(eps, EPSKRYLOVSCHUR)); //default
//_try(EPSSetType(eps, EPSARNOLDI));
//_try(EPSSetType(eps, EPSARPACK));
//_try(EPSSetType(eps, EPSPOWER));
// override these options at runtime, petsc-style
_try(EPSSetFromOptions(eps));
// force options specified directly as arguments
if(numEigenValues)
_try(EPSSetDimensions(eps, numEigenValues, PETSC_DECIDE, PETSC_DECIDE));
if(which == "smallest")
_try(EPSSetWhichEigenpairs(eps, EPS_SMALLEST_MAGNITUDE));
else if(which == "smallestReal")
_try(EPSSetWhichEigenpairs(eps, EPS_SMALLEST_REAL));
else if(which == "largest")
_try(EPSSetWhichEigenpairs(eps, EPS_LARGEST_MAGNITUDE));
// print info
#if (SLEPC_VERSION_RELEASE == 0 || (SLEPC_VERSION_MAJOR > 3 || (SLEPC_VERSION_MAJOR == 3 && SLEPC_VERSION_MINOR >= 4)))
EPSType type;
#else
const EPSType type;
#endif
_try(EPSGetType(eps, &type));
Msg::Debug("SLEPc solution method: %s", type);
PetscInt nev;
_try(EPSGetDimensions(eps, &nev, PETSC_NULL, PETSC_NULL));
Msg::Debug("SLEPc number of requested eigenvalues: %d", nev);
PetscReal tol;
PetscInt maxit;
_try(EPSGetTolerances(eps, &tol, &maxit));
Msg::Debug("SLEPc stopping condition: tol=%g, maxit=%d", tol, maxit);
// solve
Msg::Info("SLEPc solving...");
double t1 = Cpu();
_try(EPSSolve(eps));
// check convergence
int its;
_try(EPSGetIterationNumber(eps, &its));
EPSConvergedReason reason;
_try(EPSGetConvergedReason(eps, &reason));
if(reason == EPS_CONVERGED_TOL){
double t2 = Cpu();
Msg::Debug("SLEPc converged in %d iterations (%g s)", its, t2-t1);
}
else if(reason == EPS_DIVERGED_ITS)
Msg::Error("SLEPc diverged after %d iterations", its);
else if(reason == EPS_DIVERGED_BREAKDOWN)
Msg::Error("SLEPc generic breakdown in method");
#if (SLEPC_VERSION_MAJOR < 3 || (SLEPC_VERSION_MAJOR == 3 && SLEPC_VERSION_MINOR < 2))
else if(reason == EPS_DIVERGED_NONSYMMETRIC)
Msg::Error("The operator is nonsymmetric");
#endif
// get number of converged approximate eigenpairs
PetscInt nconv;
_try(EPSGetConverged(eps, &nconv));
Msg::Debug("SLEPc number of converged eigenpairs: %d", nconv);
// ignore additional eigenvalues if we get more than what we asked
if(nconv > nev) nconv = nev;
if (nconv > 0) {
Vec xr, xi;
_try(MatGetVecs(A, PETSC_NULL, &xr));
_try(MatGetVecs(A, PETSC_NULL, &xi));
Msg::Debug(" Re[EigenValue] Im[EigenValue]"
" Relative error");
for (int i = 0; i < nconv; i++){
PetscScalar kr, ki;
_try(EPSGetEigenpair(eps, i, &kr, &ki, xr, xi));
PetscReal error;
_try(EPSComputeRelativeError(eps, i, &error));
#if defined(PETSC_USE_COMPLEX)
PetscReal re = PetscRealPart(kr);
PetscReal im = PetscImaginaryPart(kr);
#else
PetscReal re = kr;
PetscReal im = ki;
#endif
Msg::Debug("EIG %03d %s%.16e %s%.16e %3.6e",
i, (re < 0) ? "" : " ", re, (im < 0) ? "" : " ", im, error);
// store eigenvalues and eigenvectors
_eigenValues.push_back(std::complex<double>(re, im));
PetscScalar *tmpr, *tmpi;
_try(VecGetArray(xr, &tmpr));
_try(VecGetArray(xi, &tmpi));
std::vector<std::complex<double> > ev(N);
for(int i = 0; i < N; i++){
#if defined(PETSC_USE_COMPLEX)
ev[i] = tmpr[i];
#else
ev[i] = std::complex<double>(tmpr[i], tmpi[i]);
#endif
}
_eigenVectors.push_back(ev);
}
_try(VecDestroy(&xr));
_try(VecDestroy(&xi));
}
_try(EPSDestroy(&eps));
if(reason == EPS_CONVERGED_TOL){
Msg::Debug("SLEPc done");
return true;
}
else{
Msg::Warning("SLEPc failed");
return false;
}
}
int main( int argc, char **argv )
{
Mat A; /* operator matrix */
Vec x;
EPS eps; /* eigenproblem solver context */
const EPSType type;
PetscReal error, tol, re, im;
PetscScalar kr, ki;
PetscErrorCode ierr;
PetscInt N, n=10, m, i, j, II, Istart, Iend, nev, maxit, its, nconv;
PetscScalar w;
PetscBool flag;
SlepcInitialize(&argc,&argv,(char*)0,help);
ierr = PetscOptionsGetInt(PETSC_NULL,"-n",&n,PETSC_NULL);CHKERRQ(ierr);
ierr = PetscOptionsGetInt(PETSC_NULL,"-m",&m,&flag);CHKERRQ(ierr);
if(!flag) m=n;
N = n*m;
ierr = PetscPrintf(PETSC_COMM_WORLD,"\nFiedler vector of a 2-D regular mesh, N=%d (%dx%d grid)\n\n",N,n,m);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Compute the operator matrix that defines the eigensystem, Ax=kx
In this example, A = L(G), where L is the Laplacian of graph G, i.e.
Lii = degree of node i, Lij = -1 if edge (i,j) exists in G
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = MatCreate(PETSC_COMM_WORLD,&A);CHKERRQ(ierr);
ierr = MatSetSizes(A,PETSC_DECIDE,PETSC_DECIDE,N,N);CHKERRQ(ierr);
ierr = MatSetFromOptions(A);CHKERRQ(ierr);
ierr = MatGetOwnershipRange(A,&Istart,&Iend);CHKERRQ(ierr);
for( II=Istart; II<Iend; II++ ) {
i = II/n; j = II-i*n;
w = 0.0;
if(i>0) { ierr = MatSetValue(A,II,II-n,-1.0,INSERT_VALUES);CHKERRQ(ierr); w=w+1.0; }
if(i<m-1) { ierr = MatSetValue(A,II,II+n,-1.0,INSERT_VALUES);CHKERRQ(ierr); w=w+1.0; }
if(j>0) { ierr = MatSetValue(A,II,II-1,-1.0,INSERT_VALUES);CHKERRQ(ierr); w=w+1.0; }
if(j<n-1) { ierr = MatSetValue(A,II,II+1,-1.0,INSERT_VALUES);CHKERRQ(ierr); w=w+1.0; }
ierr = MatSetValue(A,II,II,w,INSERT_VALUES);CHKERRQ(ierr);
}
ierr = MatAssemblyBegin(A,MAT_FINAL_ASSEMBLY);CHKERRQ(ierr);
ierr = MatAssemblyEnd(A,MAT_FINAL_ASSEMBLY);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Create the eigensolver and set various options
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
/*
Create eigensolver context
*/
ierr = EPSCreate(PETSC_COMM_WORLD,&eps);CHKERRQ(ierr);
/*
Set operators. In this case, it is a standard eigenvalue problem
*/
ierr = EPSSetOperators(eps,A,PETSC_NULL);CHKERRQ(ierr);
ierr = EPSSetProblemType(eps,EPS_HEP);CHKERRQ(ierr);
/*
Select portion of spectrum
*/
ierr = EPSSetWhichEigenpairs(eps,EPS_SMALLEST_REAL);CHKERRQ(ierr);
/*
Set solver parameters at runtime
*/
ierr = EPSSetFromOptions(eps);CHKERRQ(ierr);
/*
Attach deflation space: in this case, the matrix has a constant
nullspace, [1 1 ... 1]^T is the eigenvector of the zero eigenvalue
*/
ierr = MatGetVecs(A,&x,PETSC_NULL);CHKERRQ(ierr);
ierr = VecSet(x,1.0);CHKERRQ(ierr);
ierr = EPSSetDeflationSpace(eps,1,&x);CHKERRQ(ierr);
ierr = VecDestroy(x);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Solve the eigensystem
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = EPSSolve(eps);CHKERRQ(ierr);
ierr = EPSGetIterationNumber(eps, &its);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of iterations of the method: %d\n",its);CHKERRQ(ierr);
/*
Optional: Get some information from the solver and display it
*/
ierr = EPSGetType(eps,&type);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Solution method: %s\n\n",type);CHKERRQ(ierr);
ierr = EPSGetDimensions(eps,&nev,PETSC_NULL,PETSC_NULL);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of requested eigenvalues: %d\n",nev);CHKERRQ(ierr);
ierr = EPSGetTolerances(eps,&tol,&maxit);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Stopping condition: tol=%.4g, maxit=%d\n",tol,maxit);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Display solution and clean up
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
/*
Get number of converged approximate eigenpairs
*/
ierr = EPSGetConverged(eps,&nconv);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of converged approximate eigenpairs: %d\n\n",nconv);
CHKERRQ(ierr);
if (nconv>0) {
/*
Display eigenvalues and relative errors
*/
ierr = PetscPrintf(PETSC_COMM_WORLD,
" k ||Ax-kx||/||kx||\n"
" ----------------- ------------------\n" );CHKERRQ(ierr);
for( i=0; i<nconv; i++ ) {
/*
Get converged eigenpairs: i-th eigenvalue is stored in kr (real part) and
ki (imaginary part)
*/
ierr = EPSGetEigenpair(eps,i,&kr,&ki,PETSC_NULL,PETSC_NULL);CHKERRQ(ierr);
/*
Compute the relative error associated to each eigenpair
*/
ierr = EPSComputeRelativeError(eps,i,&error);CHKERRQ(ierr);
#ifdef PETSC_USE_COMPLEX
re = PetscRealPart(kr);
im = PetscImaginaryPart(kr);
#else
re = kr;
im = ki;
#endif
if (im!=0.0) {
ierr = PetscPrintf(PETSC_COMM_WORLD," %9f%+9f j %12g\n",re,im,error);CHKERRQ(ierr);
} else {
ierr = PetscPrintf(PETSC_COMM_WORLD," %12f %12g\n",re,error);CHKERRQ(ierr);
}
}
ierr = PetscPrintf(PETSC_COMM_WORLD,"\n" );CHKERRQ(ierr);
}
/*
Free work space
*/
ierr = EPSDestroy(eps);CHKERRQ(ierr);
ierr = MatDestroy(A);CHKERRQ(ierr);
ierr = SlepcFinalize();CHKERRQ(ierr);
return 0;
}
int eigen_solver(ndr_data_t *arg)
{
EPS eps;
EPSType type;
PetscReal error,tol,re,im;
PetscScalar kr,ki;
Vec xr,xi;
PetscInt i,nev,maxit,its,nconv;
PetscErrorCode ierr;
ierr = MatGetVecs(arg->A,NULL,&xr);CHKERRQ(ierr);
ierr = MatGetVecs(arg->A,NULL,&xi);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Create the eigensolver and set various options
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
/*
Create eigensolver context
*/
ierr = EPSCreate(PETSC_COMM_WORLD,&eps);CHKERRQ(ierr);
/*
Set operators. In this case, it is a standard eigenvalue problem
*/
ierr = EPSSetOperators(eps,arg->A,NULL);CHKERRQ(ierr);
ierr = EPSSetProblemType(eps,EPS_NHEP);CHKERRQ(ierr);
/*
Set solver parameters at runtime
*/
ierr = EPSSetFromOptions(eps);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Solve the eigensystem
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = EPSSolve(eps);CHKERRQ(ierr);
/*
Optional: Get some information from the solver and display it
*/
ierr = EPSGetIterationNumber(eps,&its);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of iterations of the method: %D\n",its);CHKERRQ(ierr);
ierr = EPSGetType(eps,&type);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Solution method: %s\n\n",type);CHKERRQ(ierr);
ierr = EPSGetDimensions(eps,&nev,NULL,NULL);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of requested eigenvalues: %D\n",nev);CHKERRQ(ierr);
ierr = EPSGetTolerances(eps,&tol,&maxit);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Stopping condition: tol=%.4g, maxit=%D\n",(double)tol,maxit);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Display solution and clean up
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
/*
Get number of converged approximate eigenpairs
*/
ierr = EPSGetConverged(eps,&nconv);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of converged eigenpairs: %D\n\n",nconv);CHKERRQ(ierr);
if (nconv>0) {
/*
Display eigenvalues and relative errors
*/
ierr = PetscPrintf(PETSC_COMM_WORLD,
" k ||Ax-kx||/||kx||\n"
" ----------------- ------------------\n");CHKERRQ(ierr);
for (i=0;i<nconv;i++) {
/*
Get converged eigenpairs: i-th eigenvalue is stored in kr (real part) and
ki (imaginary part)
*/
ierr = EPSGetEigenpair(eps,i,&kr,&ki,xr,xi);CHKERRQ(ierr);
// VecView(xr,PETSC_VIEWER_STDOUT_WORLD);
/*
Compute the relative error associated to each eigenpair
*/
ierr = EPSComputeRelativeError(eps,i,&error);CHKERRQ(ierr);
#if defined(PETSC_USE_COMPLEX)
re = PetscRealPart(kr);
im = PetscImaginaryPart(kr);
#else
re = kr;
im = ki;
#endif
if (im!=0.0) {
ierr = PetscPrintf(PETSC_COMM_WORLD," %9f%+9f j %12g\n",(double)re,(double)im,(double)error);CHKERRQ(ierr);
} else {
ierr = PetscPrintf(PETSC_COMM_WORLD," %12f %12g\n",(double)re,(double)error);CHKERRQ(ierr);
}
}
ierr = PetscPrintf(PETSC_COMM_WORLD,"\n");CHKERRQ(ierr);
}
/*
Free work space
*/
ierr = EPSDestroy(&eps);CHKERRQ(ierr);
ierr = VecDestroy(&xr);CHKERRQ(ierr);
ierr = VecDestroy(&xi);CHKERRQ(ierr);
return 0;
}
PetscErrorCode PEPSetUp_Linear(PEP pep)
{
PetscErrorCode ierr;
PEP_LINEAR *ctx = (PEP_LINEAR*)pep->data;
PetscInt i=0;
EPSWhich which;
PetscBool trackall,istrivial,flg;
PetscScalar sigma;
/* function tables */
PetscErrorCode (*fcreate[][2])(MPI_Comm,PEP_LINEAR*,Mat*) = {
{ MatCreateExplicit_Linear_N1A, MatCreateExplicit_Linear_N1B }, /* N1 */
{ MatCreateExplicit_Linear_N2A, MatCreateExplicit_Linear_N2B }, /* N2 */
{ MatCreateExplicit_Linear_S1A, MatCreateExplicit_Linear_S1B }, /* S1 */
{ MatCreateExplicit_Linear_S2A, MatCreateExplicit_Linear_S2B }, /* S2 */
{ MatCreateExplicit_Linear_H1A, MatCreateExplicit_Linear_H1B }, /* H1 */
{ MatCreateExplicit_Linear_H2A, MatCreateExplicit_Linear_H2B } /* H2 */
};
PetscErrorCode (*fmult[][2])(Mat,Vec,Vec) = {
{ MatMult_Linear_N1A, MatMult_Linear_N1B },
{ MatMult_Linear_N2A, MatMult_Linear_N2B },
{ MatMult_Linear_S1A, MatMult_Linear_S1B },
{ MatMult_Linear_S2A, MatMult_Linear_S2B },
{ MatMult_Linear_H1A, MatMult_Linear_H1B },
{ MatMult_Linear_H2A, MatMult_Linear_H2B }
};
PetscErrorCode (*fgetdiagonal[][2])(Mat,Vec) = {
{ MatGetDiagonal_Linear_N1A, MatGetDiagonal_Linear_N1B },
{ MatGetDiagonal_Linear_N2A, MatGetDiagonal_Linear_N2B },
{ MatGetDiagonal_Linear_S1A, MatGetDiagonal_Linear_S1B },
{ MatGetDiagonal_Linear_S2A, MatGetDiagonal_Linear_S2B },
{ MatGetDiagonal_Linear_H1A, MatGetDiagonal_Linear_H1B },
{ MatGetDiagonal_Linear_H2A, MatGetDiagonal_Linear_H2B }
};
PetscFunctionBegin;
if (!ctx->cform) ctx->cform = 1;
if (!pep->which) pep->which = PEP_LARGEST_MAGNITUDE;
if (pep->basis!=PEP_BASIS_MONOMIAL) SETERRQ(PetscObjectComm((PetscObject)pep),PETSC_ERR_SUP,"Solver not implemented for non-monomial bases");
if (pep->nmat!=3) SETERRQ(PetscObjectComm((PetscObject)pep),PETSC_ERR_SUP,"Solver only available for quadratic problems");
if (pep->scale==PEP_SCALE_DIAGONAL || pep->scale==PEP_SCALE_BOTH) SETERRQ(PetscObjectComm((PetscObject)pep),PETSC_ERR_SUP,"Diagonal scaling not allowed in PEP linear solver");
ierr = STGetTransform(pep->st,&flg);CHKERRQ(ierr);
if (flg) SETERRQ(PetscObjectComm((PetscObject)pep),PETSC_ERR_SUP,"ST transformation flag not allowed for PEP linear solver");
/* compute scale factor if no set by user */
ierr = PEPComputeScaleFactor(pep);CHKERRQ(ierr);
ierr = STGetOperators(pep->st,0,&ctx->K);CHKERRQ(ierr);
ierr = STGetOperators(pep->st,1,&ctx->C);CHKERRQ(ierr);
ierr = STGetOperators(pep->st,2,&ctx->M);CHKERRQ(ierr);
ctx->sfactor = pep->sfactor;
ierr = MatDestroy(&ctx->A);CHKERRQ(ierr);
ierr = MatDestroy(&ctx->B);CHKERRQ(ierr);
ierr = VecDestroy(&ctx->x1);CHKERRQ(ierr);
ierr = VecDestroy(&ctx->x2);CHKERRQ(ierr);
ierr = VecDestroy(&ctx->y1);CHKERRQ(ierr);
ierr = VecDestroy(&ctx->y2);CHKERRQ(ierr);
switch (pep->problem_type) {
case PEP_GENERAL: i = 0; break;
case PEP_HERMITIAN: i = 2; break;
case PEP_GYROSCOPIC: i = 4; break;
default: SETERRQ(PetscObjectComm((PetscObject)pep),1,"Wrong value of pep->problem_type");
}
i += ctx->cform-1;
if (ctx->explicitmatrix) {
ctx->x1 = ctx->x2 = ctx->y1 = ctx->y2 = NULL;
ierr = (*fcreate[i][0])(PetscObjectComm((PetscObject)pep),ctx,&ctx->A);CHKERRQ(ierr);
ierr = (*fcreate[i][1])(PetscObjectComm((PetscObject)pep),ctx,&ctx->B);CHKERRQ(ierr);
} else {
ierr = VecCreateMPIWithArray(PetscObjectComm((PetscObject)pep),1,pep->nloc,pep->n,NULL,&ctx->x1);CHKERRQ(ierr);
ierr = VecCreateMPIWithArray(PetscObjectComm((PetscObject)pep),1,pep->nloc,pep->n,NULL,&ctx->x2);CHKERRQ(ierr);
ierr = VecCreateMPIWithArray(PetscObjectComm((PetscObject)pep),1,pep->nloc,pep->n,NULL,&ctx->y1);CHKERRQ(ierr);
ierr = VecCreateMPIWithArray(PetscObjectComm((PetscObject)pep),1,pep->nloc,pep->n,NULL,&ctx->y2);CHKERRQ(ierr);
ierr = PetscLogObjectParent((PetscObject)pep,(PetscObject)ctx->x1);CHKERRQ(ierr);
ierr = PetscLogObjectParent((PetscObject)pep,(PetscObject)ctx->x2);CHKERRQ(ierr);
ierr = PetscLogObjectParent((PetscObject)pep,(PetscObject)ctx->y1);CHKERRQ(ierr);
ierr = PetscLogObjectParent((PetscObject)pep,(PetscObject)ctx->y2);CHKERRQ(ierr);
ierr = MatCreateShell(PetscObjectComm((PetscObject)pep),2*pep->nloc,2*pep->nloc,2*pep->n,2*pep->n,ctx,&ctx->A);CHKERRQ(ierr);
ierr = MatShellSetOperation(ctx->A,MATOP_MULT,(void(*)(void))fmult[i][0]);CHKERRQ(ierr);
ierr = MatShellSetOperation(ctx->A,MATOP_GET_DIAGONAL,(void(*)(void))fgetdiagonal[i][0]);CHKERRQ(ierr);
ierr = MatCreateShell(PetscObjectComm((PetscObject)pep),2*pep->nloc,2*pep->nloc,2*pep->n,2*pep->n,ctx,&ctx->B);CHKERRQ(ierr);
ierr = MatShellSetOperation(ctx->B,MATOP_MULT,(void(*)(void))fmult[i][1]);CHKERRQ(ierr);
ierr = MatShellSetOperation(ctx->B,MATOP_GET_DIAGONAL,(void(*)(void))fgetdiagonal[i][1]);CHKERRQ(ierr);
}
ierr = PetscLogObjectParent((PetscObject)pep,(PetscObject)ctx->A);CHKERRQ(ierr);
ierr = PetscLogObjectParent((PetscObject)pep,(PetscObject)ctx->B);CHKERRQ(ierr);
if (!ctx->eps) { ierr = PEPLinearGetEPS(pep,&ctx->eps);CHKERRQ(ierr); }
ierr = EPSSetOperators(ctx->eps,ctx->A,ctx->B);CHKERRQ(ierr);
if (pep->problem_type==PEP_HERMITIAN) {
ierr = EPSSetProblemType(ctx->eps,EPS_GHIEP);CHKERRQ(ierr);
} else {
ierr = EPSSetProblemType(ctx->eps,EPS_GNHEP);CHKERRQ(ierr);
}
switch (pep->which) {
case PEP_LARGEST_MAGNITUDE: which = EPS_LARGEST_MAGNITUDE; break;
case PEP_SMALLEST_MAGNITUDE: which = EPS_SMALLEST_MAGNITUDE; break;
case PEP_LARGEST_REAL: which = EPS_LARGEST_REAL; break;
case PEP_SMALLEST_REAL: which = EPS_SMALLEST_REAL; break;
case PEP_LARGEST_IMAGINARY: which = EPS_LARGEST_IMAGINARY; break;
case PEP_SMALLEST_IMAGINARY: which = EPS_SMALLEST_IMAGINARY; break;
case PEP_TARGET_MAGNITUDE: which = EPS_TARGET_MAGNITUDE; break;
case PEP_TARGET_REAL: which = EPS_TARGET_REAL; break;
case PEP_TARGET_IMAGINARY: which = EPS_TARGET_IMAGINARY; break;
default: SETERRQ(PetscObjectComm((PetscObject)pep),1,"Wrong value of which");
}
ierr = EPSSetWhichEigenpairs(ctx->eps,which);CHKERRQ(ierr);
ierr = EPSSetDimensions(ctx->eps,pep->nev,pep->ncv?pep->ncv:PETSC_DEFAULT,pep->mpd?pep->mpd:PETSC_DEFAULT);CHKERRQ(ierr);
ierr = EPSSetTolerances(ctx->eps,pep->tol==PETSC_DEFAULT?SLEPC_DEFAULT_TOL/10.0:pep->tol/10.0,pep->max_it?pep->max_it:PETSC_DEFAULT);CHKERRQ(ierr);
ierr = RGIsTrivial(pep->rg,&istrivial);CHKERRQ(ierr);
if (!istrivial) { ierr = EPSSetRG(ctx->eps,pep->rg);CHKERRQ(ierr); }
/* Transfer the trackall option from pep to eps */
ierr = PEPGetTrackAll(pep,&trackall);CHKERRQ(ierr);
ierr = EPSSetTrackAll(ctx->eps,trackall);CHKERRQ(ierr);
/* temporary change of target */
if (pep->sfactor!=1.0) {
ierr = EPSGetTarget(ctx->eps,&sigma);CHKERRQ(ierr);
ierr = EPSSetTarget(ctx->eps,sigma/pep->sfactor);CHKERRQ(ierr);
}
ierr = EPSSetUp(ctx->eps);CHKERRQ(ierr);
ierr = EPSGetDimensions(ctx->eps,NULL,&pep->ncv,&pep->mpd);CHKERRQ(ierr);
ierr = EPSGetTolerances(ctx->eps,NULL,&pep->max_it);CHKERRQ(ierr);
if (pep->nini>0) { ierr = PetscInfo(pep,"Ignoring initial vectors\n");CHKERRQ(ierr); }
ierr = PEPAllocateSolution(pep,0);CHKERRQ(ierr);
PetscFunctionReturn(0);
}
int main(int argc,char **argv)
{
Vec v0; /* initial vector */
Mat A; /* operator matrix */
EPS eps; /* eigenproblem solver context */
EPSType type;
PetscReal tol=1000*PETSC_MACHINE_EPSILON;
PetscInt N,m=15,nev;
PetscScalar origin=0.0;
PetscErrorCode ierr;
SlepcInitialize(&argc,&argv,(char*)0,help);
ierr = PetscOptionsGetInt(NULL,"-m",&m,NULL);CHKERRQ(ierr);
N = m*(m+1)/2;
ierr = PetscPrintf(PETSC_COMM_WORLD,"\nMarkov Model, N=%D (m=%D)\n\n",N,m);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Compute the operator matrix that defines the eigensystem, Ax=kx
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = MatCreate(PETSC_COMM_WORLD,&A);CHKERRQ(ierr);
ierr = MatSetSizes(A,PETSC_DECIDE,PETSC_DECIDE,N,N);CHKERRQ(ierr);
ierr = MatSetFromOptions(A);CHKERRQ(ierr);
ierr = MatSetUp(A);CHKERRQ(ierr);
ierr = MatMarkovModel(m,A);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Create the eigensolver and set various options
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
/*
Create eigensolver context
*/
ierr = EPSCreate(PETSC_COMM_WORLD,&eps);CHKERRQ(ierr);
/*
Set operators. In this case, it is a standard eigenvalue problem
*/
ierr = EPSSetOperators(eps,A,NULL);CHKERRQ(ierr);
ierr = EPSSetProblemType(eps,EPS_NHEP);CHKERRQ(ierr);
ierr = EPSSetTolerances(eps,tol,PETSC_DEFAULT);CHKERRQ(ierr);
/*
Set the custom comparing routine in order to obtain the eigenvalues
closest to the target on the right only
*/
ierr = EPSSetEigenvalueComparison(eps,MyEigenSort,&origin);CHKERRQ(ierr);
/*
Set solver parameters at runtime
*/
ierr = EPSSetFromOptions(eps);CHKERRQ(ierr);
/*
Set the initial vector. This is optional, if not done the initial
vector is set to random values
*/
ierr = MatGetVecs(A,&v0,NULL);CHKERRQ(ierr);
ierr = VecSet(v0,1.0);CHKERRQ(ierr);
ierr = EPSSetInitialSpace(eps,1,&v0);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Solve the eigensystem
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = EPSSolve(eps);CHKERRQ(ierr);
/*
Optional: Get some information from the solver and display it
*/
ierr = EPSGetType(eps,&type);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Solution method: %s\n\n",type);CHKERRQ(ierr);
ierr = EPSGetDimensions(eps,&nev,NULL,NULL);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of requested eigenvalues: %D\n",nev);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Display solution and clean up
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = EPSPrintSolution(eps,NULL);CHKERRQ(ierr);
ierr = EPSDestroy(&eps);CHKERRQ(ierr);
ierr = MatDestroy(&A);CHKERRQ(ierr);
ierr = VecDestroy(&v0);CHKERRQ(ierr);
ierr = SlepcFinalize();
return 0;
}
int main(int argc,char **argv)
{
Mat A; /* operator matrix */
EPS eps; /* eigenproblem solver context */
EPSType type;
DM da;
Vec v0;
PetscReal error,tol,re,im,*exact;
PetscScalar kr,ki;
PetscInt M,N,P,m,n,p,nev,maxit,i,its,nconv,seed;
PetscLogDouble t1,t2,t3;
PetscBool flg;
PetscRandom rctx;
PetscErrorCode ierr;
SlepcInitialize(&argc,&argv,(char*)0,help);
ierr = PetscPrintf(PETSC_COMM_WORLD,"\n3-D Laplacian Eigenproblem\n\n");CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Compute the operator matrix that defines the eigensystem, Ax=kx
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = DMDACreate3d(PETSC_COMM_WORLD,DM_BOUNDARY_NONE,DM_BOUNDARY_NONE,
DM_BOUNDARY_NONE,DMDA_STENCIL_STAR,-10,-10,-10,
PETSC_DECIDE,PETSC_DECIDE,PETSC_DECIDE,
1,1,NULL,NULL,NULL,&da);CHKERRQ(ierr);
/* print DM information */
ierr = DMDAGetInfo(da,NULL,&M,&N,&P,&m,&n,&p,NULL,NULL,NULL,NULL,NULL,NULL);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Grid partitioning: %D %D %D\n",m,n,p);CHKERRQ(ierr);
/* create and fill the matrix */
ierr = DMCreateMatrix(da,&A);CHKERRQ(ierr);
ierr = FillMatrix(da,A);CHKERRQ(ierr);
/* create random initial vector */
seed = 1;
ierr = PetscOptionsGetInt(NULL,"-seed",&seed,NULL);CHKERRQ(ierr);
if (seed<0) SETERRQ(PETSC_COMM_WORLD,1,"Seed must be >=0");
ierr = MatGetVecs(A,&v0,NULL);CHKERRQ(ierr);
ierr = PetscRandomCreate(PETSC_COMM_WORLD,&rctx);CHKERRQ(ierr);
ierr = PetscRandomSetFromOptions(rctx);CHKERRQ(ierr);
for (i=0;i<seed;i++) { /* simulate different seeds in the random generator */
ierr = VecSetRandom(v0,rctx);CHKERRQ(ierr);
}
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Create the eigensolver and set various options
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
/*
Create eigensolver context
*/
ierr = EPSCreate(PETSC_COMM_WORLD,&eps);CHKERRQ(ierr);
/*
Set operators. In this case, it is a standard eigenvalue problem
*/
ierr = EPSSetOperators(eps,A,NULL);CHKERRQ(ierr);
ierr = EPSSetProblemType(eps,EPS_HEP);CHKERRQ(ierr);
/*
Set specific solver options
*/
ierr = EPSSetWhichEigenpairs(eps,EPS_SMALLEST_REAL);CHKERRQ(ierr);
ierr = EPSSetTolerances(eps,1e-8,PETSC_DEFAULT);CHKERRQ(ierr);
ierr = EPSSetInitialSpace(eps,1,&v0);CHKERRQ(ierr);
/*
Set solver parameters at runtime
*/
ierr = EPSSetFromOptions(eps);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Solve the eigensystem
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = PetscTime(&t1);CHKERRQ(ierr);
ierr = EPSSetUp(eps);CHKERRQ(ierr);
ierr = PetscTime(&t2);CHKERRQ(ierr);
ierr = EPSSolve(eps);CHKERRQ(ierr);
ierr = PetscTime(&t3);CHKERRQ(ierr);
ierr = EPSGetIterationNumber(eps,&its);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of iterations of the method: %D\n",its);CHKERRQ(ierr);
/*
Optional: Get some information from the solver and display it
*/
ierr = EPSGetType(eps,&type);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Solution method: %s\n\n",type);CHKERRQ(ierr);
ierr = EPSGetDimensions(eps,&nev,NULL,NULL);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of requested eigenvalues: %D\n",nev);CHKERRQ(ierr);
ierr = EPSGetTolerances(eps,&tol,&maxit);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Stopping condition: tol=%.4g, maxit=%D\n",(double)tol,maxit);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Display solution and clean up
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
/*
Get number of converged approximate eigenpairs
*/
ierr = EPSGetConverged(eps,&nconv);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of converged approximate eigenpairs: %D\n\n",nconv);CHKERRQ(ierr);
if (nconv>0) {
ierr = PetscMalloc1(nconv,&exact);CHKERRQ(ierr);
ierr = GetExactEigenvalues(M,N,P,nconv,exact);CHKERRQ(ierr);
/*
Display eigenvalues and relative errors
*/
ierr = PetscPrintf(PETSC_COMM_WORLD,
" k ||Ax-kx||/||kx|| Eigenvalue Error \n"
" ----------------- ------------------ ------------------\n");CHKERRQ(ierr);
for (i=0;i<nconv;i++) {
/*
Get converged eigenpairs: i-th eigenvalue is stored in kr (real part) and
ki (imaginary part)
*/
ierr = EPSGetEigenpair(eps,i,&kr,&ki,NULL,NULL);CHKERRQ(ierr);
/*
Compute the relative error associated to each eigenpair
*/
ierr = EPSComputeRelativeError(eps,i,&error);CHKERRQ(ierr);
#if defined(PETSC_USE_COMPLEX)
re = PetscRealPart(kr);
im = PetscImaginaryPart(kr);
#else
re = kr;
im = ki;
#endif
if (im!=0.0) SETERRQ(PETSC_COMM_WORLD,1,"Eigenvalue should be real");
else {
ierr = PetscPrintf(PETSC_COMM_WORLD," %12g %12g %12g\n",(double)re,(double)error,(double)PetscAbsReal(re-exact[i]));CHKERRQ(ierr);
}
}
ierr = PetscFree(exact);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD,"\n");CHKERRQ(ierr);
}
/*
Show computing times
*/
ierr = PetscOptionsHasName(NULL,"-showtimes",&flg);CHKERRQ(ierr);
if (flg) {
ierr = PetscPrintf(PETSC_COMM_WORLD," Elapsed time: %g (setup), %g (solve)\n",(double)(t2-t1),(double)(t3-t2));CHKERRQ(ierr);
}
/*
Free work space
*/
ierr = EPSDestroy(&eps);CHKERRQ(ierr);
ierr = MatDestroy(&A);CHKERRQ(ierr);
ierr = VecDestroy(&v0);CHKERRQ(ierr);
ierr = PetscRandomDestroy(&rctx);CHKERRQ(ierr);
ierr = DMDestroy(&da);CHKERRQ(ierr);
ierr = SlepcFinalize();
return 0;
}
int main(int argc,char **argv)
{
Mat A; /* eigenvalue problem matrix */
EPS eps; /* eigenproblem solver context */
EPSType type;
PetscScalar delta1,delta2,L,h,value[3];
PetscInt N=30,n,i,col[3],Istart,Iend,nev;
PetscBool FirstBlock=PETSC_FALSE,LastBlock=PETSC_FALSE;
CTX_BRUSSEL *ctx;
PetscErrorCode ierr;
SlepcInitialize(&argc,&argv,(char*)0,help);
ierr = PetscOptionsGetInt(NULL,"-n",&N,NULL);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD,"\nBrusselator wave model, n=%D\n\n",N);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Generate the matrix
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
/*
Create shell matrix context and set default parameters
*/
ierr = PetscNew(&ctx);CHKERRQ(ierr);
ctx->alpha = 2.0;
ctx->beta = 5.45;
delta1 = 0.008;
delta2 = 0.004;
L = 0.51302;
/*
Look the command line for user-provided parameters
*/
ierr = PetscOptionsGetScalar(NULL,"-L",&L,NULL);CHKERRQ(ierr);
ierr = PetscOptionsGetScalar(NULL,"-alpha",&ctx->alpha,NULL);CHKERRQ(ierr);
ierr = PetscOptionsGetScalar(NULL,"-beta",&ctx->beta,NULL);CHKERRQ(ierr);
ierr = PetscOptionsGetScalar(NULL,"-delta1",&delta1,NULL);CHKERRQ(ierr);
ierr = PetscOptionsGetScalar(NULL,"-delta2",&delta2,NULL);CHKERRQ(ierr);
/*
Create matrix T
*/
ierr = MatCreate(PETSC_COMM_WORLD,&ctx->T);CHKERRQ(ierr);
ierr = MatSetSizes(ctx->T,PETSC_DECIDE,PETSC_DECIDE,N,N);CHKERRQ(ierr);
ierr = MatSetFromOptions(ctx->T);CHKERRQ(ierr);
ierr = MatSetUp(ctx->T);CHKERRQ(ierr);
ierr = MatGetOwnershipRange(ctx->T,&Istart,&Iend);CHKERRQ(ierr);
if (Istart==0) FirstBlock=PETSC_TRUE;
if (Iend==N) LastBlock=PETSC_TRUE;
value[0]=1.0; value[1]=-2.0; value[2]=1.0;
for (i=(FirstBlock? Istart+1: Istart); i<(LastBlock? Iend-1: Iend); i++) {
col[0]=i-1; col[1]=i; col[2]=i+1;
ierr = MatSetValues(ctx->T,1,&i,3,col,value,INSERT_VALUES);CHKERRQ(ierr);
}
if (LastBlock) {
i=N-1; col[0]=N-2; col[1]=N-1;
ierr = MatSetValues(ctx->T,1,&i,2,col,value,INSERT_VALUES);CHKERRQ(ierr);
}
if (FirstBlock) {
i=0; col[0]=0; col[1]=1; value[0]=-2.0; value[1]=1.0;
ierr = MatSetValues(ctx->T,1,&i,2,col,value,INSERT_VALUES);CHKERRQ(ierr);
}
ierr = MatAssemblyBegin(ctx->T,MAT_FINAL_ASSEMBLY);CHKERRQ(ierr);
ierr = MatAssemblyEnd(ctx->T,MAT_FINAL_ASSEMBLY);CHKERRQ(ierr);
ierr = MatGetLocalSize(ctx->T,&n,NULL);CHKERRQ(ierr);
/*
Fill the remaining information in the shell matrix context
and create auxiliary vectors
*/
h = 1.0 / (PetscReal)(N+1);
ctx->tau1 = delta1 / ((h*L)*(h*L));
ctx->tau2 = delta2 / ((h*L)*(h*L));
ctx->sigma = 0.0;
ierr = VecCreateMPIWithArray(PETSC_COMM_WORLD,1,n,PETSC_DECIDE,NULL,&ctx->x1);CHKERRQ(ierr);
ierr = VecCreateMPIWithArray(PETSC_COMM_WORLD,1,n,PETSC_DECIDE,NULL,&ctx->x2);CHKERRQ(ierr);
ierr = VecCreateMPIWithArray(PETSC_COMM_WORLD,1,n,PETSC_DECIDE,NULL,&ctx->y1);CHKERRQ(ierr);
ierr = VecCreateMPIWithArray(PETSC_COMM_WORLD,1,n,PETSC_DECIDE,NULL,&ctx->y2);CHKERRQ(ierr);
/*
Create the shell matrix
*/
ierr = MatCreateShell(PETSC_COMM_WORLD,2*n,2*n,2*N,2*N,(void*)ctx,&A);CHKERRQ(ierr);
ierr = MatShellSetOperation(A,MATOP_MULT,(void(*)())MatMult_Brussel);CHKERRQ(ierr);
ierr = MatShellSetOperation(A,MATOP_SHIFT,(void(*)())MatShift_Brussel);CHKERRQ(ierr);
ierr = MatShellSetOperation(A,MATOP_GET_DIAGONAL,(void(*)())MatGetDiagonal_Brussel);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Create the eigensolver and set various options
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
/*
Create eigensolver context
*/
ierr = EPSCreate(PETSC_COMM_WORLD,&eps);CHKERRQ(ierr);
/*
Set operators. In this case, it is a standard eigenvalue problem
*/
ierr = EPSSetOperators(eps,A,NULL);CHKERRQ(ierr);
ierr = EPSSetProblemType(eps,EPS_NHEP);CHKERRQ(ierr);
/*
Ask for the rightmost eigenvalues
*/
ierr = EPSSetWhichEigenpairs(eps,EPS_LARGEST_REAL);CHKERRQ(ierr);
/*
Set other solver options at runtime
*/
ierr = EPSSetFromOptions(eps);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Solve the eigensystem
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = EPSSolve(eps);CHKERRQ(ierr);
/*
Optional: Get some information from the solver and display it
*/
ierr = EPSGetType(eps,&type);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Solution method: %s\n\n",type);CHKERRQ(ierr);
ierr = EPSGetDimensions(eps,&nev,NULL,NULL);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of requested eigenvalues: %D\n",nev);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Display solution and clean up
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = EPSPrintSolution(eps,NULL);CHKERRQ(ierr);
ierr = EPSDestroy(&eps);CHKERRQ(ierr);
ierr = MatDestroy(&A);CHKERRQ(ierr);
ierr = MatDestroy(&ctx->T);CHKERRQ(ierr);
ierr = VecDestroy(&ctx->x1);CHKERRQ(ierr);
ierr = VecDestroy(&ctx->x2);CHKERRQ(ierr);
ierr = VecDestroy(&ctx->y1);CHKERRQ(ierr);
ierr = VecDestroy(&ctx->y2);CHKERRQ(ierr);
ierr = PetscFree(ctx);CHKERRQ(ierr);
ierr = SlepcFinalize();
return 0;
}
int main(int argc,char **argv)
{
Mat A; /* problem matrix */
EPS eps; /* eigenproblem solver context */
EPSType type;
PetscReal error,tol,re,im;
PetscScalar kr,ki,value[3];
Vec xr,xi;
PetscInt n=30,i,Istart,Iend,col[3],nev,maxit,its,nconv;
PetscBool FirstBlock=PETSC_FALSE,LastBlock=PETSC_FALSE;
PetscErrorCode ierr;
SlepcInitialize(&argc,&argv,(char*)0,help);
ierr = PetscOptionsGetInt(NULL,"-n",&n,NULL);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD,"\n1-D Laplacian Eigenproblem, n=%D\n\n",n);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Compute the operator matrix that defines the eigensystem, Ax=kx
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = MatCreate(PETSC_COMM_WORLD,&A);CHKERRQ(ierr);
ierr = MatSetSizes(A,PETSC_DECIDE,PETSC_DECIDE,n,n);CHKERRQ(ierr);
ierr = MatSetFromOptions(A);CHKERRQ(ierr);
ierr = MatSetUp(A);CHKERRQ(ierr);
ierr = MatGetOwnershipRange(A,&Istart,&Iend);CHKERRQ(ierr);
if (Istart==0) FirstBlock=PETSC_TRUE;
if (Iend==n) LastBlock=PETSC_TRUE;
value[0]=-1.0; value[1]=2.0; value[2]=-1.0;
for (i=(FirstBlock? Istart+1: Istart); i<(LastBlock? Iend-1: Iend); i++) {
col[0]=i-1; col[1]=i; col[2]=i+1;
ierr = MatSetValues(A,1,&i,3,col,value,INSERT_VALUES);CHKERRQ(ierr);
}
if (LastBlock) {
i=n-1; col[0]=n-2; col[1]=n-1;
ierr = MatSetValues(A,1,&i,2,col,value,INSERT_VALUES);CHKERRQ(ierr);
}
if (FirstBlock) {
i=0; col[0]=0; col[1]=1; value[0]=2.0; value[1]=-1.0;
ierr = MatSetValues(A,1,&i,2,col,value,INSERT_VALUES);CHKERRQ(ierr);
}
ierr = MatAssemblyBegin(A,MAT_FINAL_ASSEMBLY);CHKERRQ(ierr);
ierr = MatAssemblyEnd(A,MAT_FINAL_ASSEMBLY);CHKERRQ(ierr);
ierr = MatGetVecs(A,NULL,&xr);CHKERRQ(ierr);
ierr = MatGetVecs(A,NULL,&xi);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Create the eigensolver and set various options
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
/*
Create eigensolver context
*/
ierr = EPSCreate(PETSC_COMM_WORLD,&eps);CHKERRQ(ierr);
/*
Set operators. In this case, it is a standard eigenvalue problem
*/
ierr = EPSSetOperators(eps,A,NULL);CHKERRQ(ierr);
ierr = EPSSetProblemType(eps,EPS_HEP);CHKERRQ(ierr);
/*
Set solver parameters at runtime
*/
ierr = EPSSetFromOptions(eps);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Solve the eigensystem
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = EPSSolve(eps);CHKERRQ(ierr);
/*
Optional: Get some information from the solver and display it
*/
ierr = EPSGetIterationNumber(eps,&its);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of iterations of the method: %D\n",its);CHKERRQ(ierr);
ierr = EPSGetType(eps,&type);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Solution method: %s\n\n",type);CHKERRQ(ierr);
ierr = EPSGetDimensions(eps,&nev,NULL,NULL);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of requested eigenvalues: %D\n",nev);CHKERRQ(ierr);
ierr = EPSGetTolerances(eps,&tol,&maxit);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Stopping condition: tol=%.4g, maxit=%D\n",(double)tol,maxit);CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Display solution and clean up
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
/*
Get number of converged approximate eigenpairs
*/
ierr = EPSGetConverged(eps,&nconv);CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of converged eigenpairs: %D\n\n",nconv);CHKERRQ(ierr);
if (nconv>0) {
/*
Display eigenvalues and relative errors
*/
ierr = PetscPrintf(PETSC_COMM_WORLD,
" k ||Ax-kx||/||kx||\n"
" ----------------- ------------------\n");CHKERRQ(ierr);
for (i=0;i<nconv;i++) {
/*
Get converged eigenpairs: i-th eigenvalue is stored in kr (real part) and
ki (imaginary part)
*/
ierr = EPSGetEigenpair(eps,i,&kr,&ki,xr,xi);CHKERRQ(ierr);
/*
Compute the relative error associated to each eigenpair
*/
ierr = EPSComputeRelativeError(eps,i,&error);CHKERRQ(ierr);
#if defined(PETSC_USE_COMPLEX)
re = PetscRealPart(kr);
im = PetscImaginaryPart(kr);
#else
re = kr;
im = ki;
#endif
if (im!=0.0) {
ierr = PetscPrintf(PETSC_COMM_WORLD," %9f%+9f j %12g\n",(double)re,(double)im,(double)error);CHKERRQ(ierr);
} else {
ierr = PetscPrintf(PETSC_COMM_WORLD," %12f %12g\n",(double)re,(double)error);CHKERRQ(ierr);
}
}
ierr = PetscPrintf(PETSC_COMM_WORLD,"\n");CHKERRQ(ierr);
}
/*
Free work space
*/
ierr = EPSDestroy(&eps);CHKERRQ(ierr);
ierr = MatDestroy(&A);CHKERRQ(ierr);
ierr = VecDestroy(&xr);CHKERRQ(ierr);
ierr = VecDestroy(&xi);CHKERRQ(ierr);
ierr = SlepcFinalize();
return 0;
}
int main(int argc,char **argv)
{
Mat A; /* operator matrix */
EPS eps; /* eigenproblem solver context */
EPSType type;
PetscReal tol;
PetscInt nev,maxit,its;
char filename[PETSC_MAX_PATH_LEN];
PetscViewer viewer;
PetscBool flg;
PetscErrorCode ierr;
SlepcInitialize(&argc,&argv,(char*)0,help);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Load the operator matrix that defines the eigensystem, Ax=kx
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = PetscPrintf(PETSC_COMM_WORLD,"\nEigenproblem stored in file.\n\n");
CHKERRQ(ierr);
ierr = PetscOptionsGetString(NULL,"-file",filename,PETSC_MAX_PATH_LEN,&flg);
CHKERRQ(ierr);
if (!flg) SETERRQ(PETSC_COMM_WORLD,1,"Must indicate a file name with the -file option");
#if defined(PETSC_USE_COMPLEX)
ierr = PetscPrintf(PETSC_COMM_WORLD," Reading COMPLEX matrix from a binary file...\n");
CHKERRQ(ierr);
#else
ierr = PetscPrintf(PETSC_COMM_WORLD," Reading REAL matrix from a binary file...\n");
CHKERRQ(ierr);
#endif
ierr = PetscViewerBinaryOpen(PETSC_COMM_WORLD,filename,FILE_MODE_READ,&viewer);
CHKERRQ(ierr);
ierr = MatCreate(PETSC_COMM_WORLD,&A);
CHKERRQ(ierr);
ierr = MatSetFromOptions(A);
CHKERRQ(ierr);
ierr = MatLoad(A,viewer);
CHKERRQ(ierr);
ierr = PetscViewerDestroy(&viewer);
CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Create the eigensolver and set various options
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
/*
Create eigensolver context
*/
ierr = EPSCreate(PETSC_COMM_WORLD,&eps);
CHKERRQ(ierr);
/*
Set operators. In this case, it is a standard eigenvalue problem
*/
ierr = EPSSetOperators(eps,A,NULL);
CHKERRQ(ierr);
/*
Set solver parameters at runtime
*/
ierr = EPSSetFromOptions(eps);
CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Solve the eigensystem
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = EPSSolve(eps);
CHKERRQ(ierr);
ierr = EPSGetIterationNumber(eps,&its);
CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of iterations of the method: %D\n",its);
CHKERRQ(ierr);
/*
Optional: Get some information from the solver and display it
*/
ierr = EPSGetType(eps,&type);
CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Solution method: %s\n\n",type);
CHKERRQ(ierr);
ierr = EPSGetDimensions(eps,&nev,NULL,NULL);
CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Number of requested eigenvalues: %D\n",nev);
CHKERRQ(ierr);
ierr = EPSGetTolerances(eps,&tol,&maxit);
CHKERRQ(ierr);
ierr = PetscPrintf(PETSC_COMM_WORLD," Stopping condition: tol=%.4g, maxit=%D\n",(double)tol,maxit);
CHKERRQ(ierr);
/* - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
Display solution and clean up
- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - */
ierr = EPSPrintSolution(eps,NULL);
CHKERRQ(ierr);
ierr = EPSDestroy(&eps);
CHKERRQ(ierr);
ierr = MatDestroy(&A);
CHKERRQ(ierr);
ierr = SlepcFinalize();
return 0;
}
