1c4762a1bSJed Brown 2c4762a1bSJed Brown static char help[] = "Tests MatNorm(), MatLUFactor(), MatSolve() and MatSolveAdd().\n\n"; 3c4762a1bSJed Brown 4c4762a1bSJed Brown #include <petscmat.h> 5c4762a1bSJed Brown 6c4762a1bSJed Brown int main(int argc,char **args) 7c4762a1bSJed Brown { 8c4762a1bSJed Brown Mat C; 9c4762a1bSJed Brown PetscInt i,j,m = 3,n = 3,Ii,J; 10c4762a1bSJed Brown PetscBool flg; 11c4762a1bSJed Brown PetscScalar v; 12c4762a1bSJed Brown IS perm,iperm; 13c4762a1bSJed Brown Vec x,u,b,y; 14c4762a1bSJed Brown PetscReal norm,tol=PETSC_SMALL; 15c4762a1bSJed Brown MatFactorInfo info; 16c4762a1bSJed Brown PetscMPIInt size; 17c4762a1bSJed Brown 18*b122ec5aSJacob Faibussowitsch CHKERRQ(PetscInitialize(&argc,&args,(char*)0,help)); 195f80ce2aSJacob Faibussowitsch CHKERRMPI(MPI_Comm_size(PETSC_COMM_WORLD,&size)); 202c71b3e2SJacob Faibussowitsch PetscCheckFalse(size != 1,PETSC_COMM_WORLD,PETSC_ERR_WRONG_MPI_SIZE,"This is a uniprocessor example only!"); 215f80ce2aSJacob Faibussowitsch CHKERRQ(MatCreate(PETSC_COMM_WORLD,&C)); 225f80ce2aSJacob Faibussowitsch CHKERRQ(MatSetSizes(C,PETSC_DECIDE,PETSC_DECIDE,m*n,m*n)); 235f80ce2aSJacob Faibussowitsch CHKERRQ(MatSetFromOptions(C)); 245f80ce2aSJacob Faibussowitsch CHKERRQ(MatSetUp(C)); 255f80ce2aSJacob Faibussowitsch CHKERRQ(PetscOptionsHasName(NULL,NULL,"-symmetric",&flg)); 26c4762a1bSJed Brown if (flg) { /* Treat matrix as symmetric only if we set this flag */ 275f80ce2aSJacob Faibussowitsch CHKERRQ(MatSetOption(C,MAT_SYMMETRIC,PETSC_TRUE)); 285f80ce2aSJacob Faibussowitsch CHKERRQ(MatSetOption(C,MAT_SYMMETRY_ETERNAL,PETSC_TRUE)); 29c4762a1bSJed Brown } 30c4762a1bSJed Brown 31c4762a1bSJed Brown /* Create the matrix for the five point stencil, YET AGAIN */ 32c4762a1bSJed Brown for (i=0; i<m; i++) { 33c4762a1bSJed Brown for (j=0; j<n; j++) { 34c4762a1bSJed Brown v = -1.0; Ii = j + n*i; 355f80ce2aSJacob Faibussowitsch if (i>0) {J = Ii - n; CHKERRQ(MatSetValues(C,1,&Ii,1,&J,&v,INSERT_VALUES));} 365f80ce2aSJacob Faibussowitsch if (i<m-1) {J = Ii + n; CHKERRQ(MatSetValues(C,1,&Ii,1,&J,&v,INSERT_VALUES));} 375f80ce2aSJacob Faibussowitsch if (j>0) {J = Ii - 1; CHKERRQ(MatSetValues(C,1,&Ii,1,&J,&v,INSERT_VALUES));} 385f80ce2aSJacob Faibussowitsch if (j<n-1) {J = Ii + 1; CHKERRQ(MatSetValues(C,1,&Ii,1,&J,&v,INSERT_VALUES));} 395f80ce2aSJacob Faibussowitsch v = 4.0; CHKERRQ(MatSetValues(C,1,&Ii,1,&Ii,&v,INSERT_VALUES)); 40c4762a1bSJed Brown } 41c4762a1bSJed Brown } 425f80ce2aSJacob Faibussowitsch CHKERRQ(MatAssemblyBegin(C,MAT_FINAL_ASSEMBLY)); 435f80ce2aSJacob Faibussowitsch CHKERRQ(MatAssemblyEnd(C,MAT_FINAL_ASSEMBLY)); 445f80ce2aSJacob Faibussowitsch CHKERRQ(MatGetOrdering(C,MATORDERINGRCM,&perm,&iperm)); 455f80ce2aSJacob Faibussowitsch CHKERRQ(MatView(C,PETSC_VIEWER_STDOUT_WORLD)); 465f80ce2aSJacob Faibussowitsch CHKERRQ(ISView(perm,PETSC_VIEWER_STDOUT_SELF)); 475f80ce2aSJacob Faibussowitsch CHKERRQ(VecCreateSeq(PETSC_COMM_SELF,m*n,&u)); 485f80ce2aSJacob Faibussowitsch CHKERRQ(VecSet(u,1.0)); 495f80ce2aSJacob Faibussowitsch CHKERRQ(VecDuplicate(u,&x)); 505f80ce2aSJacob Faibussowitsch CHKERRQ(VecDuplicate(u,&b)); 515f80ce2aSJacob Faibussowitsch CHKERRQ(VecDuplicate(u,&y)); 525f80ce2aSJacob Faibussowitsch CHKERRQ(MatMult(C,u,b)); 535f80ce2aSJacob Faibussowitsch CHKERRQ(VecCopy(b,y)); 545f80ce2aSJacob Faibussowitsch CHKERRQ(VecScale(y,2.0)); 55c4762a1bSJed Brown 565f80ce2aSJacob Faibussowitsch CHKERRQ(MatNorm(C,NORM_FROBENIUS,&norm)); 575f80ce2aSJacob Faibussowitsch CHKERRQ(PetscPrintf(PETSC_COMM_SELF,"Frobenius norm of matrix %g\n",(double)norm)); 585f80ce2aSJacob Faibussowitsch CHKERRQ(MatNorm(C,NORM_1,&norm)); 595f80ce2aSJacob Faibussowitsch CHKERRQ(PetscPrintf(PETSC_COMM_SELF,"One norm of matrix %g\n",(double)norm)); 605f80ce2aSJacob Faibussowitsch CHKERRQ(MatNorm(C,NORM_INFINITY,&norm)); 615f80ce2aSJacob Faibussowitsch CHKERRQ(PetscPrintf(PETSC_COMM_SELF,"Infinity norm of matrix %g\n",(double)norm)); 62c4762a1bSJed Brown 635f80ce2aSJacob Faibussowitsch CHKERRQ(MatFactorInfoInitialize(&info)); 64c4762a1bSJed Brown info.fill = 2.0; 65c4762a1bSJed Brown info.dtcol = 0.0; 66c4762a1bSJed Brown info.zeropivot = 1.e-14; 67c4762a1bSJed Brown info.pivotinblocks = 1.0; 68c4762a1bSJed Brown 695f80ce2aSJacob Faibussowitsch CHKERRQ(MatLUFactor(C,perm,iperm,&info)); 70c4762a1bSJed Brown 71c4762a1bSJed Brown /* Test MatSolve */ 725f80ce2aSJacob Faibussowitsch CHKERRQ(MatSolve(C,b,x)); 735f80ce2aSJacob Faibussowitsch CHKERRQ(VecView(b,PETSC_VIEWER_STDOUT_SELF)); 745f80ce2aSJacob Faibussowitsch CHKERRQ(VecView(x,PETSC_VIEWER_STDOUT_SELF)); 755f80ce2aSJacob Faibussowitsch CHKERRQ(VecAXPY(x,-1.0,u)); 765f80ce2aSJacob Faibussowitsch CHKERRQ(VecNorm(x,NORM_2,&norm)); 77c4762a1bSJed Brown if (norm > tol) { 785f80ce2aSJacob Faibussowitsch CHKERRQ(PetscPrintf(PETSC_COMM_SELF,"MatSolve: Norm of error %g\n",(double)norm)); 79c4762a1bSJed Brown } 80c4762a1bSJed Brown 81c4762a1bSJed Brown /* Test MatSolveAdd */ 825f80ce2aSJacob Faibussowitsch CHKERRQ(MatSolveAdd(C,b,y,x)); 835f80ce2aSJacob Faibussowitsch CHKERRQ(VecAXPY(x,-1.0,y)); 845f80ce2aSJacob Faibussowitsch CHKERRQ(VecAXPY(x,-1.0,u)); 855f80ce2aSJacob Faibussowitsch CHKERRQ(VecNorm(x,NORM_2,&norm)); 86c4762a1bSJed Brown if (norm > tol) { 875f80ce2aSJacob Faibussowitsch CHKERRQ(PetscPrintf(PETSC_COMM_SELF,"MatSolveAdd(): Norm of error %g\n",(double)norm)); 88c4762a1bSJed Brown } 89c4762a1bSJed Brown 905f80ce2aSJacob Faibussowitsch CHKERRQ(ISDestroy(&perm)); 915f80ce2aSJacob Faibussowitsch CHKERRQ(ISDestroy(&iperm)); 925f80ce2aSJacob Faibussowitsch CHKERRQ(VecDestroy(&u)); 935f80ce2aSJacob Faibussowitsch CHKERRQ(VecDestroy(&y)); 945f80ce2aSJacob Faibussowitsch CHKERRQ(VecDestroy(&b)); 955f80ce2aSJacob Faibussowitsch CHKERRQ(VecDestroy(&x)); 965f80ce2aSJacob Faibussowitsch CHKERRQ(MatDestroy(&C)); 97*b122ec5aSJacob Faibussowitsch CHKERRQ(PetscFinalize()); 98*b122ec5aSJacob Faibussowitsch return 0; 99c4762a1bSJed Brown } 100c4762a1bSJed Brown 101c4762a1bSJed Brown /*TEST 102c4762a1bSJed Brown 103c4762a1bSJed Brown test: 104c4762a1bSJed Brown 105c4762a1bSJed Brown TEST*/ 106