14a221d59SStefano ZampiniSNES Object: 1 MPI process 24a221d59SStefano Zampini type: newtontr 34a221d59SStefano Zampini Trust region tolerance 1e-12 44a221d59SStefano Zampini eta1=0.001, eta2=0.25, eta3=0.75 524fb275aSStefano Zampini delta0=0.2, t1=0.25, t2=2., deltaM=1e+10 624fb275aSStefano Zampini kmdc=0. 74a221d59SStefano Zampini fallback=DOGLEG 84a221d59SStefano Zampini maximum iterations=50, maximum function evaluations=10000 924fb275aSStefano Zampini tolerances: relative=1e-08, absolute=1e-50, solution=0. 1024fb275aSStefano Zampini total number of linear solver iterations=23 114a221d59SStefano Zampini total number of function evaluations=10 124a221d59SStefano Zampini norm schedule ALWAYS 134a221d59SStefano Zampini KSP Object: 1 MPI process 144a221d59SStefano Zampini type: fgmres 154a221d59SStefano Zampini restart=30, using Classical (unmodified) Gram-Schmidt Orthogonalization with no iterative refinement 164a221d59SStefano Zampini happy breakdown tolerance 1e-30 174a221d59SStefano Zampini maximum iterations=10000, initial guess is zero 184a221d59SStefano Zampini tolerances: relative=1e-05, absolute=1e-50, divergence=10000. 194a221d59SStefano Zampini right preconditioning 204a221d59SStefano Zampini using UNPRECONDITIONED norm type for convergence test 214a221d59SStefano Zampini PC Object: 1 MPI process 224a221d59SStefano Zampini type: mg 234a221d59SStefano Zampini type is MULTIPLICATIVE, levels=3 cycles=v 244a221d59SStefano Zampini Cycles per PCApply=1 254a221d59SStefano Zampini Using Galerkin computed coarse grid matrices for pmat 264a221d59SStefano Zampini Coarse grid solver -- level 0 ------------------------------- 274a221d59SStefano Zampini KSP Object: (mg_coarse_) 1 MPI process 284a221d59SStefano Zampini type: preonly 294a221d59SStefano Zampini maximum iterations=10000, initial guess is zero 304a221d59SStefano Zampini tolerances: relative=1e-05, absolute=1e-50, divergence=10000. 314a221d59SStefano Zampini left preconditioning 324a221d59SStefano Zampini using NONE norm type for convergence test 334a221d59SStefano Zampini PC Object: (mg_coarse_) 1 MPI process 344a221d59SStefano Zampini type: lu 354a221d59SStefano Zampini out-of-place factorization 364a221d59SStefano Zampini tolerance for zero pivot 2.22045e-14 374a221d59SStefano Zampini using diagonal shift on blocks to prevent zero pivot [INBLOCKS] 384a221d59SStefano Zampini matrix ordering: nd 394a221d59SStefano Zampini factor fill ratio given 5., needed 1.59172 404a221d59SStefano Zampini Factored matrix follows: 414a221d59SStefano Zampini Mat Object: (mg_coarse_) 1 MPI process 424a221d59SStefano Zampini type: seqaij 434a221d59SStefano Zampini rows=25, cols=25 444a221d59SStefano Zampini package used to perform factorization: petsc 454a221d59SStefano Zampini total: nonzeros=269, allocated nonzeros=269 464a221d59SStefano Zampini using I-node routines: found 17 nodes, limit used is 5 474a221d59SStefano Zampini linear system matrix = precond matrix: 484a221d59SStefano Zampini Mat Object: 1 MPI process 494a221d59SStefano Zampini type: seqaij 504a221d59SStefano Zampini rows=25, cols=25 514a221d59SStefano Zampini total: nonzeros=169, allocated nonzeros=169 524a221d59SStefano Zampini total number of mallocs used during MatSetValues calls=0 534a221d59SStefano Zampini not using I-node routines 544a221d59SStefano Zampini Down solver (pre-smoother) on level 1 ------------------------------- 554a221d59SStefano Zampini KSP Object: (mg_levels_1_) 1 MPI process 564a221d59SStefano Zampini type: chebyshev 57f2edd1f0SMalachi Phillips Chebyshev polynomial of first kind 584a221d59SStefano Zampini eigenvalue targets used: min 0.0996438, max 1.09608 594a221d59SStefano Zampini eigenvalues estimated via gmres: min 0.139653, max 0.996438 604a221d59SStefano Zampini eigenvalues estimated using gmres with transform: [0. 0.1; 0. 1.1] 614a221d59SStefano Zampini KSP Object: (mg_levels_1_esteig_) 1 MPI process 624a221d59SStefano Zampini type: gmres 634a221d59SStefano Zampini restart=30, using Classical (unmodified) Gram-Schmidt Orthogonalization with no iterative refinement 644a221d59SStefano Zampini happy breakdown tolerance 1e-30 654a221d59SStefano Zampini maximum iterations=10, initial guess is zero 664a221d59SStefano Zampini tolerances: relative=1e-12, absolute=1e-50, divergence=10000. 674a221d59SStefano Zampini left preconditioning 684a221d59SStefano Zampini using PRECONDITIONED norm type for convergence test 69*dd8e379bSPierre Jolivet estimating eigenvalues using a noisy random number generated right-hand side 704a221d59SStefano Zampini maximum iterations=2, nonzero initial guess 714a221d59SStefano Zampini tolerances: relative=1e-05, absolute=1e-50, divergence=10000. 724a221d59SStefano Zampini left preconditioning 734a221d59SStefano Zampini using NONE norm type for convergence test 744a221d59SStefano Zampini PC Object: (mg_levels_1_) 1 MPI process 754a221d59SStefano Zampini type: sor 764a221d59SStefano Zampini type = local_symmetric, iterations = 1, local iterations = 1, omega = 1. 774a221d59SStefano Zampini linear system matrix = precond matrix: 784a221d59SStefano Zampini Mat Object: 1 MPI process 794a221d59SStefano Zampini type: seqaij 804a221d59SStefano Zampini rows=81, cols=81 814a221d59SStefano Zampini total: nonzeros=625, allocated nonzeros=625 824a221d59SStefano Zampini total number of mallocs used during MatSetValues calls=0 834a221d59SStefano Zampini not using I-node routines 844a221d59SStefano Zampini Up solver (post-smoother) same as down solver (pre-smoother) 854a221d59SStefano Zampini Down solver (pre-smoother) on level 2 ------------------------------- 864a221d59SStefano Zampini KSP Object: (mg_levels_2_) 1 MPI process 874a221d59SStefano Zampini type: chebyshev 88f2edd1f0SMalachi Phillips Chebyshev polynomial of first kind 894a221d59SStefano Zampini eigenvalue targets used: min 0.0990486, max 1.08953 904a221d59SStefano Zampini eigenvalues estimated via gmres: min 0.0626846, max 0.990486 914a221d59SStefano Zampini eigenvalues estimated using gmres with transform: [0. 0.1; 0. 1.1] 924a221d59SStefano Zampini KSP Object: (mg_levels_2_esteig_) 1 MPI process 934a221d59SStefano Zampini type: gmres 944a221d59SStefano Zampini restart=30, using Classical (unmodified) Gram-Schmidt Orthogonalization with no iterative refinement 954a221d59SStefano Zampini happy breakdown tolerance 1e-30 964a221d59SStefano Zampini maximum iterations=10, initial guess is zero 974a221d59SStefano Zampini tolerances: relative=1e-12, absolute=1e-50, divergence=10000. 984a221d59SStefano Zampini left preconditioning 994a221d59SStefano Zampini using PRECONDITIONED norm type for convergence test 100*dd8e379bSPierre Jolivet estimating eigenvalues using a noisy random number generated right-hand side 1014a221d59SStefano Zampini maximum iterations=2, nonzero initial guess 1024a221d59SStefano Zampini tolerances: relative=1e-05, absolute=1e-50, divergence=10000. 1034a221d59SStefano Zampini left preconditioning 1044a221d59SStefano Zampini using NONE norm type for convergence test 1054a221d59SStefano Zampini PC Object: (mg_levels_2_) 1 MPI process 1064a221d59SStefano Zampini type: sor 1074a221d59SStefano Zampini type = local_symmetric, iterations = 1, local iterations = 1, omega = 1. 1084a221d59SStefano Zampini linear system matrix = precond matrix: 1094a221d59SStefano Zampini Mat Object: 1 MPI process 1104a221d59SStefano Zampini type: seqaij 1114a221d59SStefano Zampini rows=289, cols=289 1124a221d59SStefano Zampini total: nonzeros=1377, allocated nonzeros=1377 1134a221d59SStefano Zampini total number of mallocs used during MatSetValues calls=0 1144a221d59SStefano Zampini not using I-node routines 1154a221d59SStefano Zampini Up solver (post-smoother) same as down solver (pre-smoother) 1164a221d59SStefano Zampini linear system matrix = precond matrix: 1174a221d59SStefano Zampini Mat Object: 1 MPI process 1184a221d59SStefano Zampini type: seqaij 1194a221d59SStefano Zampini rows=289, cols=289 1204a221d59SStefano Zampini total: nonzeros=1377, allocated nonzeros=1377 1214a221d59SStefano Zampini total number of mallocs used during MatSetValues calls=0 1224a221d59SStefano Zampini not using I-node routines 1234a221d59SStefano ZampiniNumber of SNES iterations = 9 12424fb275aSStefano ZampiniNumber of Linear iterations = 23 12524fb275aSStefano ZampiniAverage Linear its / SNES = 2.555556e+00 126