Why is your C matrix an MPIAIJ matrix on one process? In general we recommend creating a SeqAIJ matrix for one process and MPIAIJ for multiple. You can use MatCreateAIJ() and it will always create the correct one.
We could change the code as you suggest but I want to make sure that is the best solution in your case. Barry > On Sep 16, 2016, at 3:31 AM, Hoang Giang Bui <hgbk2...@gmail.com> wrote: > > Hi Matt > > I believed at line 523, src/ksp/ksp/utils/schurm.c > > ierr = MatMatMult(C, AinvB, MAT_INITIAL_MATRIX, fill, S);CHKERRQ(ierr); > > in my test case C is MPIAIJ and AinvB is SEQAIJ, hence it throws the error. > > In fact I guess there are two issues with it > line 521, ierr = MatConvert(AinvBd, MATAIJ, MAT_INITIAL_MATRIX, > &AinvB);CHKERRQ(ierr); > shall we convert this to type of C matrix to ensure compatibility ? > > line 552, if(norm > PETSC_MACHINE_EPSILON) > SETERRQ(PetscObjectComm((PetscObject) M), PETSC_ERR_SUP, "Not yet implemented > for Schur complements with non-vanishing D"); > with this the Schur complement with A11!=0 will be aborted > > Giang > > On Thu, Sep 15, 2016 at 4:28 PM, Matthew Knepley <knep...@gmail.com> wrote: > On Thu, Sep 15, 2016 at 9:07 AM, Hoang Giang Bui <hgbk2...@gmail.com> wrote: > Hi Matt > > Thanks for the comment. After looking carefully into the manual again, the > key take away is that with selfp there is no option to compute the exact > Schur, there are only two options to approximate the inv(A00) for selfp, > which are lump and diag (diag by default). I misunderstood this previously. > > There is online manual entry mentioned about PC_FIELDSPLIT_SCHUR_PRE_FULL, > which is not documented elsewhere in the offline manual. I tried to access > that by setting > -pc_fieldsplit_schur_precondition full > > Yep, I wrote that specifically for testing, but its very slow so I did not > document it to prevent people from complaining. > > but it gives the error > > [0]PETSC ERROR: --------------------- Error Message > -------------------------------------------------------------- > [0]PETSC ERROR: Arguments are incompatible > [0]PETSC ERROR: MatMatMult requires A, mpiaij, to be compatible with B, seqaij > [0]PETSC ERROR: See http://www.mcs.anl.gov/petsc/documentation/faq.html for > trouble shooting. > [0]PETSC ERROR: Petsc Release Version 3.7.3, Jul, 24, 2016 > [0]PETSC ERROR: python on a arch-linux2-c-opt named bermuda by hbui Thu Sep > 15 15:46:56 2016 > [0]PETSC ERROR: Configure options --with-shared-libraries --with-debugging=0 > --with-pic --download-fblaslapack=yes --download-suitesparse > --download-ptscotch=yes --download-metis=yes --download-parmetis=yes > --download-scalapack=yes --download-mumps=yes --download-hypre=yes > --download-ml=yes --download-pastix=yes --with-mpi-dir=/opt/openmpi-1.10.1 > --prefix=/home/hbui/opt/petsc-3.7.3 > [0]PETSC ERROR: #1 MatMatMult() line 9514 in > /home/hbui/sw/petsc-3.7.3/src/mat/interface/matrix.c > [0]PETSC ERROR: #2 MatSchurComplementComputeExplicitOperator() line 526 in > /home/hbui/sw/petsc-3.7.3/src/ksp/ksp/utils/schurm.c > [0]PETSC ERROR: #3 PCSetUp_FieldSplit() line 792 in > /home/hbui/sw/petsc-3.7.3/src/ksp/pc/impls/fieldsplit/fieldsplit.c > [0]PETSC ERROR: #4 PCSetUp() line 968 in > /home/hbui/sw/petsc-3.7.3/src/ksp/pc/interface/precon.c > [0]PETSC ERROR: #5 KSPSetUp() line 390 in > /home/hbui/sw/petsc-3.7.3/src/ksp/ksp/interface/itfunc.c > [0]PETSC ERROR: #6 KSPSolve() line 599 in > /home/hbui/sw/petsc-3.7.3/src/ksp/ksp/interface/itfunc.c > > Please excuse me to insist on forming the exact Schur complement, but as you > said, I would like to track down what creates problem in my code by starting > from a very exact but ineffective solution. > > Sure, I understand. I do not understand how A can be MPI and B can be Seq. Do > you know how that happens? > > Thanks, > > Matt > > Giang > > On Thu, Sep 15, 2016 at 2:56 PM, Matthew Knepley <knep...@gmail.com> wrote: > On Thu, Sep 15, 2016 at 4:11 AM, Hoang Giang Bui <hgbk2...@gmail.com> wrote: > Dear Barry > > Thanks for the clarification. I got exactly what you said if the code changed > to > ierr = KSPSetOperators(ksp_S,B,B);CHKERRQ(ierr); > Residual norms for stokes_ solve. > 0 KSP Residual norm 1.327791371202e-02 > Residual norms for stokes_fieldsplit_p_ solve. > 0 KSP preconditioned resid norm 0.000000000000e+00 true resid norm > 0.000000000000e+00 ||r(i)||/||b|| -nan > 1 KSP Residual norm 3.997711925708e-17 > > but I guess we solve a different problem if B is used for the linear system. > > in addition, changed to > ierr = KSPSetOperators(ksp_S,A,A);CHKERRQ(ierr); > also works but inner iteration converged not in one iteration > > Residual norms for stokes_ solve. > 0 KSP Residual norm 1.327791371202e-02 > Residual norms for stokes_fieldsplit_p_ solve. > 0 KSP preconditioned resid norm 5.308049264070e+02 true resid norm > 5.775755720828e-02 ||r(i)||/||b|| 1.000000000000e+00 > 1 KSP preconditioned resid norm 1.853645192358e+02 true resid norm > 1.537879609454e-02 ||r(i)||/||b|| 2.662646558801e-01 > 2 KSP preconditioned resid norm 2.282724981527e+01 true resid norm > 4.440700864158e-03 ||r(i)||/||b|| 7.688519180519e-02 > 3 KSP preconditioned resid norm 3.114190504933e+00 true resid norm > 8.474158485027e-04 ||r(i)||/||b|| 1.467194752449e-02 > 4 KSP preconditioned resid norm 4.273258497986e-01 true resid norm > 1.249911370496e-04 ||r(i)||/||b|| 2.164065502267e-03 > 5 KSP preconditioned resid norm 2.548558490130e-02 true resid norm > 8.428488734654e-06 ||r(i)||/||b|| 1.459287605301e-04 > 6 KSP preconditioned resid norm 1.556370641259e-03 true resid norm > 2.866605637380e-07 ||r(i)||/||b|| 4.963169801386e-06 > 7 KSP preconditioned resid norm 2.324584224817e-05 true resid norm > 6.975804113442e-09 ||r(i)||/||b|| 1.207773398083e-07 > 8 KSP preconditioned resid norm 8.893330367907e-06 true resid norm > 1.082096232921e-09 ||r(i)||/||b|| 1.873514541169e-08 > 9 KSP preconditioned resid norm 6.563740470820e-07 true resid norm > 2.212185528660e-10 ||r(i)||/||b|| 3.830123079274e-09 > 10 KSP preconditioned resid norm 1.460372091709e-08 true resid norm > 3.859545051902e-12 ||r(i)||/||b|| 6.682320441607e-11 > 11 KSP preconditioned resid norm 1.041947844812e-08 true resid norm > 2.364389912927e-12 ||r(i)||/||b|| 4.093645969827e-11 > 12 KSP preconditioned resid norm 1.614713897816e-10 true resid norm > 1.057061924974e-14 ||r(i)||/||b|| 1.830170762178e-13 > 1 KSP Residual norm 1.445282647127e-16 > > > Seem like zero pivot does not happen, but why the solver for Schur takes 13 > steps if the preconditioner is direct solver? > > Look at the -ksp_view. I will bet that the default is to shift (add a > multiple of the identity) the matrix instead of failing. This > gives an inexact PC, but as you see it can converge. > > Thanks, > > Matt > > > I also so tried another problem which I known does have a nonsingular Schur > (at least A11 != 0) and it also have the same problem: 1 step outer > convergence but multiple step inner convergence. > > Any ideas? > > Giang > > On Fri, Sep 9, 2016 at 1:04 AM, Barry Smith <bsm...@mcs.anl.gov> wrote: > > Normally you'd be absolutely correct to expect convergence in one > iteration. However in this example note the call > > ierr = KSPSetOperators(ksp_S,A,B);CHKERRQ(ierr); > > It is solving the linear system defined by A but building the preconditioner > (i.e. the entire fieldsplit process) from a different matrix B. Since A is > not B you should not expect convergence in one iteration. If you change the > code to > > ierr = KSPSetOperators(ksp_S,B,B);CHKERRQ(ierr); > > you will see exactly what you expect, convergence in one iteration. > > Sorry about this, the example is lacking clarity and documentation its > author obviously knew too well what he was doing that he didn't realize > everyone else in the world would need more comments in the code. If you > change the code to > > ierr = KSPSetOperators(ksp_S,A,A);CHKERRQ(ierr); > > it will stop without being able to build the preconditioner because LU > factorization of the Sp matrix will result in a zero pivot. This is why this > "auxiliary" matrix B is used to define the preconditioner instead of A. > > Barry > > > > > > On Sep 8, 2016, at 5:30 PM, Hoang Giang Bui <hgbk2...@gmail.com> wrote: > > > > Sorry I slept quite a while in this thread. Now I start to look at it > > again. In the last try, the previous setting doesn't work either (in fact > > diverge). So I would speculate if the Schur complement in my case is > > actually not invertible. It's also possible that the code is wrong > > somewhere. However, before looking at that, I want to understand thoroughly > > the settings for Schur complement > > > > I experimented ex42 with the settings: > > mpirun -np 1 ex42 \ > > -stokes_ksp_monitor \ > > -stokes_ksp_type fgmres \ > > -stokes_pc_type fieldsplit \ > > -stokes_pc_fieldsplit_type schur \ > > -stokes_pc_fieldsplit_schur_fact_type full \ > > -stokes_pc_fieldsplit_schur_precondition selfp \ > > -stokes_fieldsplit_u_ksp_type preonly \ > > -stokes_fieldsplit_u_pc_type lu \ > > -stokes_fieldsplit_u_pc_factor_mat_solver_package mumps \ > > -stokes_fieldsplit_p_ksp_type gmres \ > > -stokes_fieldsplit_p_ksp_monitor_true_residual \ > > -stokes_fieldsplit_p_ksp_max_it 300 \ > > -stokes_fieldsplit_p_ksp_rtol 1.0e-12 \ > > -stokes_fieldsplit_p_ksp_gmres_restart 300 \ > > -stokes_fieldsplit_p_ksp_gmres_modifiedgramschmidt \ > > -stokes_fieldsplit_p_pc_type lu \ > > -stokes_fieldsplit_p_pc_factor_mat_solver_package mumps > > > > In my understanding, the solver should converge in 1 (outer) step. > > Execution gives: > > Residual norms for stokes_ solve. > > 0 KSP Residual norm 1.327791371202e-02 > > Residual norms for stokes_fieldsplit_p_ solve. > > 0 KSP preconditioned resid norm 0.000000000000e+00 true resid norm > > 0.000000000000e+00 ||r(i)||/||b|| -nan > > 1 KSP Residual norm 7.656238881621e-04 > > Residual norms for stokes_fieldsplit_p_ solve. > > 0 KSP preconditioned resid norm 1.512059266251e+03 true resid norm > > 1.000000000000e+00 ||r(i)||/||b|| 1.000000000000e+00 > > 1 KSP preconditioned resid norm 1.861905708091e-12 true resid norm > > 2.934589919911e-16 ||r(i)||/||b|| 2.934589919911e-16 > > 2 KSP Residual norm 9.895645456398e-06 > > Residual norms for stokes_fieldsplit_p_ solve. > > 0 KSP preconditioned resid norm 3.002531529083e+03 true resid norm > > 1.000000000000e+00 ||r(i)||/||b|| 1.000000000000e+00 > > 1 KSP preconditioned resid norm 6.388584944363e-12 true resid norm > > 1.961047000344e-15 ||r(i)||/||b|| 1.961047000344e-15 > > 3 KSP Residual norm 1.608206702571e-06 > > Residual norms for stokes_fieldsplit_p_ solve. > > 0 KSP preconditioned resid norm 3.004810086026e+03 true resid norm > > 1.000000000000e+00 ||r(i)||/||b|| 1.000000000000e+00 > > 1 KSP preconditioned resid norm 3.081350863773e-12 true resid norm > > 7.721720636293e-16 ||r(i)||/||b|| 7.721720636293e-16 > > 4 KSP Residual norm 2.453618999882e-07 > > Residual norms for stokes_fieldsplit_p_ solve. > > 0 KSP preconditioned resid norm 3.000681887478e+03 true resid norm > > 1.000000000000e+00 ||r(i)||/||b|| 1.000000000000e+00 > > 1 KSP preconditioned resid norm 3.909717465288e-12 true resid norm > > 1.156131245879e-15 ||r(i)||/||b|| 1.156131245879e-15 > > 5 KSP Residual norm 4.230399264750e-08 > > > > Looks like the "selfp" does construct the Schur nicely. But does "full" > > really construct the full block preconditioner? > > > > Giang > > P/S: I'm also generating a smaller size of the previous problem for > > checking again. > > > > > > On Sun, Apr 17, 2016 at 3:16 PM, Matthew Knepley <knep...@gmail.com> wrote: > > On Sun, Apr 17, 2016 at 4:25 AM, Hoang Giang Bui <hgbk2...@gmail.com> wrote: > > > > It could be taking time in the MatMatMult() here if that matrix is dense. > > Is there any reason to > > believe that is a good preconditioner for your problem? > > > > This is the first approach to the problem, so I chose the most simple > > setting. Do you have any other recommendation? > > > > This is in no way the simplest PC. We need to make it simpler first. > > > > 1) Run on only 1 proc > > > > 2) Use -pc_fieldsplit_schur_fact_type full > > > > 3) Use -fieldsplit_lu_ksp_type gmres > > -fieldsplit_lu_ksp_monitor_true_residual > > > > This should converge in 1 outer iteration, but we will see how good your > > Schur complement preconditioner > > is for this problem. > > > > You need to start out from something you understand and then start making > > approximations. > > > > Matt > > > > For any solver question, please send us the output of > > > > -ksp_view -ksp_monitor_true_residual -ksp_converged_reason > > > > > > I sent here the full output (after changed to fgmres), again it takes long > > at the first iteration but after that, it does not converge > > > > -ksp_type fgmres > > -ksp_max_it 300 > > -ksp_gmres_restart 300 > > -ksp_gmres_modifiedgramschmidt > > -pc_fieldsplit_type schur > > -pc_fieldsplit_schur_fact_type diag > > -pc_fieldsplit_schur_precondition selfp > > -pc_fieldsplit_detect_saddle_point > > -fieldsplit_u_ksp_type preonly > > -fieldsplit_u_pc_type lu > > -fieldsplit_u_pc_factor_mat_solver_package mumps > > -fieldsplit_lu_ksp_type preonly > > -fieldsplit_lu_pc_type lu > > -fieldsplit_lu_pc_factor_mat_solver_package mumps > > > > 0 KSP unpreconditioned resid norm 3.037772453815e+06 true resid norm > > 3.037772453815e+06 ||r(i)||/||b|| 1.000000000000e+00 > > 1 KSP unpreconditioned resid norm 3.024368791893e+06 true resid norm > > 3.024368791296e+06 ||r(i)||/||b|| 9.955876673705e-01 > > 2 KSP unpreconditioned resid norm 3.008534454663e+06 true resid norm > > 3.008534454904e+06 ||r(i)||/||b|| 9.903751846607e-01 > > 3 KSP unpreconditioned resid norm 4.633282412600e+02 true resid norm > > 4.607539866185e+02 ||r(i)||/||b|| 1.516749505184e-04 > > 4 KSP unpreconditioned resid norm 4.630592911836e+02 true resid norm > > 4.605625897903e+02 ||r(i)||/||b|| 1.516119448683e-04 > > 5 KSP unpreconditioned resid norm 2.145735509629e+02 true resid norm > > 2.111697416683e+02 ||r(i)||/||b|| 6.951466736857e-05 > > 6 KSP unpreconditioned resid norm 2.145734219762e+02 true resid norm > > 2.112001242378e+02 ||r(i)||/||b|| 6.952466896346e-05 > > 7 KSP unpreconditioned resid norm 1.892914067411e+02 true resid norm > > 1.831020928502e+02 ||r(i)||/||b|| 6.027511791420e-05 > > 8 KSP unpreconditioned resid norm 1.892906351597e+02 true resid norm > > 1.831422357767e+02 ||r(i)||/||b|| 6.028833250718e-05 > > 9 KSP unpreconditioned resid norm 1.891426729822e+02 true resid norm > > 1.835600473014e+02 ||r(i)||/||b|| 6.042587128964e-05 > > 10 KSP unpreconditioned resid norm 1.891425181679e+02 true resid norm > > 1.855772578041e+02 ||r(i)||/||b|| 6.108991395027e-05 > > 11 KSP unpreconditioned resid norm 1.891417382057e+02 true resid norm > > 1.833302669042e+02 ||r(i)||/||b|| 6.035023020699e-05 > > 12 KSP unpreconditioned resid norm 1.891414749001e+02 true resid norm > > 1.827923591605e+02 ||r(i)||/||b|| 6.017315712076e-05 > > 13 KSP unpreconditioned resid norm 1.891414702834e+02 true resid norm > > 1.849895606391e+02 ||r(i)||/||b|| 6.089645075515e-05 > > 14 KSP unpreconditioned resid norm 1.891414687385e+02 true resid norm > > 1.852700958573e+02 ||r(i)||/||b|| 6.098879974523e-05 > > 15 KSP unpreconditioned resid norm 1.891399614701e+02 true resid norm > > 1.817034334576e+02 ||r(i)||/||b|| 5.981469521503e-05 > > 16 KSP unpreconditioned resid norm 1.891393964580e+02 true resid norm > > 1.823173574739e+02 ||r(i)||/||b|| 6.001679199012e-05 > > 17 KSP unpreconditioned resid norm 1.890868604964e+02 true resid norm > > 1.834754811775e+02 ||r(i)||/||b|| 6.039803308740e-05 > > 18 KSP unpreconditioned resid norm 1.888442703508e+02 true resid norm > > 1.852079421560e+02 ||r(i)||/||b|| 6.096833945658e-05 > > 19 KSP unpreconditioned resid norm 1.888131521870e+02 true resid norm > > 1.810111295757e+02 ||r(i)||/||b|| 5.958679668335e-05 > > 20 KSP unpreconditioned resid norm 1.888038471618e+02 true resid norm > > 1.814080717355e+02 ||r(i)||/||b|| 5.971746550920e-05 > > 21 KSP unpreconditioned resid norm 1.885794485272e+02 true resid norm > > 1.843223565278e+02 ||r(i)||/||b|| 6.067681478129e-05 > > 22 KSP unpreconditioned resid norm 1.884898771362e+02 true resid norm > > 1.842766260526e+02 ||r(i)||/||b|| 6.066176083110e-05 > > 23 KSP unpreconditioned resid norm 1.884840498049e+02 true resid norm > > 1.813011285152e+02 ||r(i)||/||b|| 5.968226102238e-05 > > 24 KSP unpreconditioned resid norm 1.884105698955e+02 true resid norm > > 1.811513025118e+02 ||r(i)||/||b|| 5.963294001309e-05 > > 25 KSP unpreconditioned resid norm 1.881392557375e+02 true resid norm > > 1.835706567649e+02 ||r(i)||/||b|| 6.042936380386e-05 > > 26 KSP unpreconditioned resid norm 1.881234481250e+02 true resid norm > > 1.843633799886e+02 ||r(i)||/||b|| 6.069031923609e-05 > > 27 KSP unpreconditioned resid norm 1.852572648925e+02 true resid norm > > 1.791532195358e+02 ||r(i)||/||b|| 5.897519391579e-05 > > 28 KSP unpreconditioned resid norm 1.852177694782e+02 true resid norm > > 1.800935543889e+02 ||r(i)||/||b|| 5.928474141066e-05 > > 29 KSP unpreconditioned resid norm 1.844720976468e+02 true resid norm > > 1.806835899755e+02 ||r(i)||/||b|| 5.947897438749e-05 > > 30 KSP unpreconditioned resid norm 1.843525447108e+02 true resid norm > > 1.811351238391e+02 ||r(i)||/||b|| 5.962761417881e-05 > > 31 KSP unpreconditioned resid norm 1.834262885149e+02 true resid norm > > 1.778584233423e+02 ||r(i)||/||b|| 5.854896179565e-05 > > 32 KSP unpreconditioned resid norm 1.833523213017e+02 true resid norm > > 1.773290649733e+02 ||r(i)||/||b|| 5.837470306591e-05 > > 33 KSP unpreconditioned resid norm 1.821645929344e+02 true resid norm > > 1.781151248933e+02 ||r(i)||/||b|| 5.863346501467e-05 > > 34 KSP unpreconditioned resid norm 1.820831279534e+02 true resid norm > > 1.789778939067e+02 ||r(i)||/||b|| 5.891747872094e-05 > > 35 KSP unpreconditioned resid norm 1.814860919375e+02 true resid norm > > 1.757339506869e+02 ||r(i)||/||b|| 5.784960965928e-05 > > 36 KSP unpreconditioned resid norm 1.812512010159e+02 true resid norm > > 1.764086437459e+02 ||r(i)||/||b|| 5.807171090922e-05 > > 37 KSP unpreconditioned resid norm 1.804298150360e+02 true resid norm > > 1.780147196442e+02 ||r(i)||/||b|| 5.860041275333e-05 > > 38 KSP unpreconditioned resid norm 1.799675012847e+02 true resid norm > > 1.780554543786e+02 ||r(i)||/||b|| 5.861382216269e-05 > > 39 KSP unpreconditioned resid norm 1.793156052097e+02 true resid norm > > 1.747985717965e+02 ||r(i)||/||b|| 5.754169361071e-05 > > 40 KSP unpreconditioned resid norm 1.789109248325e+02 true resid norm > > 1.734086984879e+02 ||r(i)||/||b|| 5.708416319009e-05 > > 41 KSP unpreconditioned resid norm 1.788931581371e+02 true resid norm > > 1.766103879126e+02 ||r(i)||/||b|| 5.813812278494e-05 > > 42 KSP unpreconditioned resid norm 1.785522436483e+02 true resid norm > > 1.762597032909e+02 ||r(i)||/||b|| 5.802268141233e-05 > > 43 KSP unpreconditioned resid norm 1.783317950582e+02 true resid norm > > 1.752774080448e+02 ||r(i)||/||b|| 5.769932103530e-05 > > 44 KSP unpreconditioned resid norm 1.782832982797e+02 true resid norm > > 1.741667594885e+02 ||r(i)||/||b|| 5.733370821430e-05 > > 45 KSP unpreconditioned resid norm 1.781302427969e+02 true resid norm > > 1.760315735899e+02 ||r(i)||/||b|| 5.794758372005e-05 > > 46 KSP unpreconditioned resid norm 1.780557458973e+02 true resid norm > > 1.757279911034e+02 ||r(i)||/||b|| 5.784764783244e-05 > > 47 KSP unpreconditioned resid norm 1.774691940686e+02 true resid norm > > 1.729436852773e+02 ||r(i)||/||b|| 5.693108615167e-05 > > 48 KSP unpreconditioned resid norm 1.771436357084e+02 true resid norm > > 1.734001323688e+02 ||r(i)||/||b|| 5.708134332148e-05 > > 49 KSP unpreconditioned resid norm 1.756105727417e+02 true resid norm > > 1.740222172981e+02 ||r(i)||/||b|| 5.728612657594e-05 > > 50 KSP unpreconditioned resid norm 1.756011794480e+02 true resid norm > > 1.736979026533e+02 ||r(i)||/||b|| 5.717936589858e-05 > > 51 KSP unpreconditioned resid norm 1.751096154950e+02 true resid norm > > 1.713154407940e+02 ||r(i)||/||b|| 5.639508666256e-05 > > 52 KSP unpreconditioned resid norm 1.712639990486e+02 true resid norm > > 1.684444278579e+02 ||r(i)||/||b|| 5.544998199137e-05 > > 53 KSP unpreconditioned resid norm 1.710183053728e+02 true resid norm > > 1.692712952670e+02 ||r(i)||/||b|| 5.572217729951e-05 > > 54 KSP unpreconditioned resid norm 1.655470115849e+02 true resid norm > > 1.631767858448e+02 ||r(i)||/||b|| 5.371593439788e-05 > > 55 KSP unpreconditioned resid norm 1.648313805392e+02 true resid norm > > 1.617509396670e+02 ||r(i)||/||b|| 5.324656211951e-05 > > 56 KSP unpreconditioned resid norm 1.643417766012e+02 true resid norm > > 1.614766932468e+02 ||r(i)||/||b|| 5.315628332992e-05 > > 57 KSP unpreconditioned resid norm 1.643165564782e+02 true resid norm > > 1.611660297521e+02 ||r(i)||/||b|| 5.305401645527e-05 > > 58 KSP unpreconditioned resid norm 1.639561245303e+02 true resid norm > > 1.616105878219e+02 ||r(i)||/||b|| 5.320035989496e-05 > > 59 KSP unpreconditioned resid norm 1.636859175366e+02 true resid norm > > 1.601704798933e+02 ||r(i)||/||b|| 5.272629281109e-05 > > 60 KSP unpreconditioned resid norm 1.633269681891e+02 true resid norm > > 1.603249334191e+02 ||r(i)||/||b|| 5.277713714789e-05 > > 61 KSP unpreconditioned resid norm 1.633257086864e+02 true resid norm > > 1.602922744638e+02 ||r(i)||/||b|| 5.276638619280e-05 > > 62 KSP unpreconditioned resid norm 1.629449737049e+02 true resid norm > > 1.605812790996e+02 ||r(i)||/||b|| 5.286152321842e-05 > > 63 KSP unpreconditioned resid norm 1.629422151091e+02 true resid norm > > 1.589656479615e+02 ||r(i)||/||b|| 5.232967589850e-05 > > 64 KSP unpreconditioned resid norm 1.624767340901e+02 true resid norm > > 1.601925152173e+02 ||r(i)||/||b|| 5.273354658809e-05 > > 65 KSP unpreconditioned resid norm 1.614000473427e+02 true resid norm > > 1.600055285874e+02 ||r(i)||/||b|| 5.267199272497e-05 > > 66 KSP unpreconditioned resid norm 1.599192711038e+02 true resid norm > > 1.602225820054e+02 ||r(i)||/||b|| 5.274344423136e-05 > > 67 KSP unpreconditioned resid norm 1.562002802473e+02 true resid norm > > 1.582069452329e+02 ||r(i)||/||b|| 5.207991962471e-05 > > 68 KSP unpreconditioned resid norm 1.552436010567e+02 true resid norm > > 1.584249134588e+02 ||r(i)||/||b|| 5.215167227548e-05 > > 69 KSP unpreconditioned resid norm 1.507627069906e+02 true resid norm > > 1.530713322210e+02 ||r(i)||/||b|| 5.038933447066e-05 > > 70 KSP unpreconditioned resid norm 1.503802419288e+02 true resid norm > > 1.526772130725e+02 ||r(i)||/||b|| 5.025959494786e-05 > > 71 KSP unpreconditioned resid norm 1.483645684459e+02 true resid norm > > 1.509599328686e+02 ||r(i)||/||b|| 4.969428591633e-05 > > 72 KSP unpreconditioned resid norm 1.481979533059e+02 true resid norm > > 1.535340885300e+02 ||r(i)||/||b|| 5.054166856281e-05 > > 73 KSP unpreconditioned resid norm 1.481400704979e+02 true resid norm > > 1.509082933863e+02 ||r(i)||/||b|| 4.967728678847e-05 > > 74 KSP unpreconditioned resid norm 1.481132272449e+02 true resid norm > > 1.513298398754e+02 ||r(i)||/||b|| 4.981605507858e-05 > > 75 KSP unpreconditioned resid norm 1.481101708026e+02 true resid norm > > 1.502466334943e+02 ||r(i)||/||b|| 4.945947590828e-05 > > 76 KSP unpreconditioned resid norm 1.481010335860e+02 true resid norm > > 1.533384206564e+02 ||r(i)||/||b|| 5.047725693339e-05 > > 77 KSP unpreconditioned resid norm 1.480865328511e+02 true resid norm > > 1.508354096349e+02 ||r(i)||/||b|| 4.965329428986e-05 > > 78 KSP unpreconditioned resid norm 1.480582653674e+02 true resid norm > > 1.493335938981e+02 ||r(i)||/||b|| 4.915891370027e-05 > > 79 KSP unpreconditioned resid norm 1.480031554288e+02 true resid norm > > 1.505131104808e+02 ||r(i)||/||b|| 4.954719708903e-05 > > 80 KSP unpreconditioned resid norm 1.479574822714e+02 true resid norm > > 1.540226621640e+02 ||r(i)||/||b|| 5.070250142355e-05 > > 81 KSP unpreconditioned resid norm 1.479574535946e+02 true resid norm > > 1.498368142318e+02 ||r(i)||/||b|| 4.932456808727e-05 > > 82 KSP unpreconditioned resid norm 1.479436001532e+02 true resid norm > > 1.512355315895e+02 ||r(i)||/||b|| 4.978500986785e-05 > > 83 KSP unpreconditioned resid norm 1.479410419985e+02 true resid norm > > 1.513924042216e+02 ||r(i)||/||b|| 4.983665054686e-05 > > 84 KSP unpreconditioned resid norm 1.477087197314e+02 true resid norm > > 1.519847216835e+02 ||r(i)||/||b|| 5.003163469095e-05 > > 85 KSP unpreconditioned resid norm 1.477081559094e+02 true resid norm > > 1.507153721984e+02 ||r(i)||/||b|| 4.961377933660e-05 > > 86 KSP unpreconditioned resid norm 1.476420890986e+02 true resid norm > > 1.512147907360e+02 ||r(i)||/||b|| 4.977818221576e-05 > > 87 KSP unpreconditioned resid norm 1.476086929880e+02 true resid norm > > 1.508513380647e+02 ||r(i)||/||b|| 4.965853774704e-05 > > 88 KSP unpreconditioned resid norm 1.475729830724e+02 true resid norm > > 1.521640656963e+02 ||r(i)||/||b|| 5.009067269183e-05 > > 89 KSP unpreconditioned resid norm 1.472338605465e+02 true resid norm > > 1.506094588356e+02 ||r(i)||/||b|| 4.957891386713e-05 > > 90 KSP unpreconditioned resid norm 1.472079944867e+02 true resid norm > > 1.504582871439e+02 ||r(i)||/||b|| 4.952914987262e-05 > > 91 KSP unpreconditioned resid norm 1.469363056078e+02 true resid norm > > 1.506425446156e+02 ||r(i)||/||b|| 4.958980532804e-05 > > 92 KSP unpreconditioned resid norm 1.469110799022e+02 true resid norm > > 1.509842019134e+02 ||r(i)||/||b|| 4.970227500870e-05 > > 93 KSP unpreconditioned resid norm 1.468779696240e+02 true resid norm > > 1.501105195969e+02 ||r(i)||/||b|| 4.941466876770e-05 > > 94 KSP unpreconditioned resid norm 1.468777757710e+02 true resid norm > > 1.491460779150e+02 ||r(i)||/||b|| 4.909718558007e-05 > > 95 KSP unpreconditioned resid norm 1.468774588833e+02 true resid norm > > 1.519041612996e+02 ||r(i)||/||b|| 5.000511513258e-05 > > 96 KSP unpreconditioned resid norm 1.468771672305e+02 true resid norm > > 1.508986277767e+02 ||r(i)||/||b|| 4.967410498018e-05 > > 97 KSP unpreconditioned resid norm 1.468771086724e+02 true resid norm > > 1.500987040931e+02 ||r(i)||/||b|| 4.941077923878e-05 > > 98 KSP unpreconditioned resid norm 1.468769529855e+02 true resid norm > > 1.509749203169e+02 ||r(i)||/||b|| 4.969921961314e-05 > > 99 KSP unpreconditioned resid norm 1.468539019917e+02 true resid norm > > 1.505087391266e+02 ||r(i)||/||b|| 4.954575808916e-05 > > 100 KSP unpreconditioned resid norm 1.468527260351e+02 true resid norm > > 1.519470484364e+02 ||r(i)||/||b|| 5.001923308823e-05 > > 101 KSP unpreconditioned resid norm 1.468342327062e+02 true resid norm > > 1.489814197970e+02 ||r(i)||/||b|| 4.904298200804e-05 > > 102 KSP unpreconditioned resid norm 1.468333201903e+02 true resid norm > > 1.491479405434e+02 ||r(i)||/||b|| 4.909779873608e-05 > > 103 KSP unpreconditioned resid norm 1.468287736823e+02 true resid norm > > 1.496401088908e+02 ||r(i)||/||b|| 4.925981493540e-05 > > 104 KSP unpreconditioned resid norm 1.468269778777e+02 true resid norm > > 1.509676608058e+02 ||r(i)||/||b|| 4.969682986500e-05 > > 105 KSP unpreconditioned resid norm 1.468214752527e+02 true resid norm > > 1.500441644659e+02 ||r(i)||/||b|| 4.939282541636e-05 > > 106 KSP unpreconditioned resid norm 1.468208033546e+02 true resid norm > > 1.510964155942e+02 ||r(i)||/||b|| 4.973921447094e-05 > > 107 KSP unpreconditioned resid norm 1.467590018852e+02 true resid norm > > 1.512302088409e+02 ||r(i)||/||b|| 4.978325767980e-05 > > 108 KSP unpreconditioned resid norm 1.467588908565e+02 true resid norm > > 1.501053278370e+02 ||r(i)||/||b|| 4.941295969963e-05 > > 109 KSP unpreconditioned resid norm 1.467570731153e+02 true resid norm > > 1.485494378220e+02 ||r(i)||/||b|| 4.890077847519e-05 > > 110 KSP unpreconditioned resid norm 1.467399860352e+02 true resid norm > > 1.504418099302e+02 ||r(i)||/||b|| 4.952372576205e-05 > > 111 KSP unpreconditioned resid norm 1.467095654863e+02 true resid norm > > 1.507288583410e+02 ||r(i)||/||b|| 4.961821882075e-05 > > 112 KSP unpreconditioned resid norm 1.467065865602e+02 true resid norm > > 1.517786399520e+02 ||r(i)||/||b|| 4.996379493842e-05 > > 113 KSP unpreconditioned resid norm 1.466898232510e+02 true resid norm > > 1.491434236258e+02 ||r(i)||/||b|| 4.909631181838e-05 > > 114 KSP unpreconditioned resid norm 1.466897921426e+02 true resid norm > > 1.505605420512e+02 ||r(i)||/||b|| 4.956281102033e-05 > > 115 KSP unpreconditioned resid norm 1.466593121787e+02 true resid norm > > 1.500608650677e+02 ||r(i)||/||b|| 4.939832306376e-05 > > 116 KSP unpreconditioned resid norm 1.466590894710e+02 true resid norm > > 1.503102560128e+02 ||r(i)||/||b|| 4.948041971478e-05 > > 117 KSP unpreconditioned resid norm 1.465338856917e+02 true resid norm > > 1.501331730933e+02 ||r(i)||/||b|| 4.942212604002e-05 > > 118 KSP unpreconditioned resid norm 1.464192893188e+02 true resid norm > > 1.505131429801e+02 ||r(i)||/||b|| 4.954720778744e-05 > > 119 KSP unpreconditioned resid norm 1.463859793112e+02 true resid norm > > 1.504355712014e+02 ||r(i)||/||b|| 4.952167204377e-05 > > 120 KSP unpreconditioned resid norm 1.459254939182e+02 true resid norm > > 1.526513923221e+02 ||r(i)||/||b|| 5.025109505170e-05 > > 121 KSP unpreconditioned resid norm 1.456973020864e+02 true resid norm > > 1.496897691500e+02 ||r(i)||/||b|| 4.927616252562e-05 > > 122 KSP unpreconditioned resid norm 1.456904663212e+02 true resid norm > > 1.488752755634e+02 ||r(i)||/||b|| 4.900804053853e-05 > > 123 KSP unpreconditioned resid norm 1.449254956591e+02 true resid norm > > 1.494048196254e+02 ||r(i)||/||b|| 4.918236039628e-05 > > 124 KSP unpreconditioned resid norm 1.448408616171e+02 true resid norm > > 1.507801939332e+02 ||r(i)||/||b|| 4.963511791142e-05 > > 125 KSP unpreconditioned resid norm 1.447662934870e+02 true resid norm > > 1.495157701445e+02 ||r(i)||/||b|| 4.921888404010e-05 > > 126 KSP unpreconditioned resid norm 1.446934748257e+02 true resid norm > > 1.511098625097e+02 ||r(i)||/||b|| 4.974364104196e-05 > > 127 KSP unpreconditioned resid norm 1.446892504333e+02 true resid norm > > 1.493367018275e+02 ||r(i)||/||b|| 4.915993679512e-05 > > 128 KSP unpreconditioned resid norm 1.446838883996e+02 true resid norm > > 1.510097796622e+02 ||r(i)||/||b|| 4.971069491153e-05 > > 129 KSP unpreconditioned resid norm 1.446696373784e+02 true resid norm > > 1.463776964101e+02 ||r(i)||/||b|| 4.818586600396e-05 > > 130 KSP unpreconditioned resid norm 1.446690766798e+02 true resid norm > > 1.495018999638e+02 ||r(i)||/||b|| 4.921431813499e-05 > > 131 KSP unpreconditioned resid norm 1.446480744133e+02 true resid norm > > 1.499605592408e+02 ||r(i)||/||b|| 4.936530353102e-05 > > 132 KSP unpreconditioned resid norm 1.446220543422e+02 true resid norm > > 1.498225445439e+02 ||r(i)||/||b|| 4.931987066895e-05 > > 133 KSP unpreconditioned resid norm 1.446156526760e+02 true resid norm > > 1.481441673781e+02 ||r(i)||/||b|| 4.876736807329e-05 > > 134 KSP unpreconditioned resid norm 1.446152477418e+02 true resid norm > > 1.501616466283e+02 ||r(i)||/||b|| 4.943149920257e-05 > > 135 KSP unpreconditioned resid norm 1.445744489044e+02 true resid norm > > 1.505958339620e+02 ||r(i)||/||b|| 4.957442871432e-05 > > 136 KSP unpreconditioned resid norm 1.445307936181e+02 true resid norm > > 1.502091787932e+02 ||r(i)||/||b|| 4.944714624841e-05 > > 137 KSP unpreconditioned resid norm 1.444543817248e+02 true resid norm > > 1.491871661616e+02 ||r(i)||/||b|| 4.911071136162e-05 > > 138 KSP unpreconditioned resid norm 1.444176915911e+02 true resid norm > > 1.478091693367e+02 ||r(i)||/||b|| 4.865709054379e-05 > > 139 KSP unpreconditioned resid norm 1.444173719058e+02 true resid norm > > 1.495962731374e+02 ||r(i)||/||b|| 4.924538470600e-05 > > 140 KSP unpreconditioned resid norm 1.444075340820e+02 true resid norm > > 1.515103203654e+02 ||r(i)||/||b|| 4.987546719477e-05 > > 141 KSP unpreconditioned resid norm 1.444050342939e+02 true resid norm > > 1.498145746307e+02 ||r(i)||/||b|| 4.931724706454e-05 > > 142 KSP unpreconditioned resid norm 1.443757787691e+02 true resid norm > > 1.492291154146e+02 ||r(i)||/||b|| 4.912452057664e-05 > > 143 KSP unpreconditioned resid norm 1.440588930707e+02 true resid norm > > 1.485032724987e+02 ||r(i)||/||b|| 4.888558137795e-05 > > 144 KSP unpreconditioned resid norm 1.438299468441e+02 true resid norm > > 1.506129385276e+02 ||r(i)||/||b|| 4.958005934200e-05 > > 145 KSP unpreconditioned resid norm 1.434543079403e+02 true resid norm > > 1.471733741230e+02 ||r(i)||/||b|| 4.844779402032e-05 > > 146 KSP unpreconditioned resid norm 1.433157223870e+02 true resid norm > > 1.481025707968e+02 ||r(i)||/||b|| 4.875367495378e-05 > > 147 KSP unpreconditioned resid norm 1.430111913458e+02 true resid norm > > 1.485000481919e+02 ||r(i)||/||b|| 4.888451997299e-05 > > 148 KSP unpreconditioned resid norm 1.430056153071e+02 true resid norm > > 1.496425172884e+02 ||r(i)||/||b|| 4.926060775239e-05 > > 149 KSP unpreconditioned resid norm 1.429327762233e+02 true resid norm > > 1.467613264791e+02 ||r(i)||/||b|| 4.831215264157e-05 > > 150 KSP unpreconditioned resid norm 1.424230217603e+02 true resid norm > > 1.460277537447e+02 ||r(i)||/||b|| 4.807066887493e-05 > > 151 KSP unpreconditioned resid norm 1.421912821676e+02 true resid norm > > 1.470486188164e+02 ||r(i)||/||b|| 4.840672599809e-05 > > 152 KSP unpreconditioned resid norm 1.420344275315e+02 true resid norm > > 1.481536901943e+02 ||r(i)||/||b|| 4.877050287565e-05 > > 153 KSP unpreconditioned resid norm 1.420071178597e+02 true resid norm > > 1.450813684108e+02 ||r(i)||/||b|| 4.775912963085e-05 > > 154 KSP unpreconditioned resid norm 1.419367456470e+02 true resid norm > > 1.472052819440e+02 ||r(i)||/||b|| 4.845829771059e-05 > > 155 KSP unpreconditioned resid norm 1.419032748919e+02 true resid norm > > 1.479193155584e+02 ||r(i)||/||b|| 4.869334942209e-05 > > 156 KSP unpreconditioned resid norm 1.418899781440e+02 true resid norm > > 1.478677351572e+02 ||r(i)||/||b|| 4.867636974307e-05 > > 157 KSP unpreconditioned resid norm 1.418895621075e+02 true resid norm > > 1.455168237674e+02 ||r(i)||/||b|| 4.790247656128e-05 > > 158 KSP unpreconditioned resid norm 1.418061469023e+02 true resid norm > > 1.467147028974e+02 ||r(i)||/||b|| 4.829680469093e-05 > > 159 KSP unpreconditioned resid norm 1.417948698213e+02 true resid norm > > 1.478376854834e+02 ||r(i)||/||b|| 4.866647773362e-05 > > 160 KSP unpreconditioned resid norm 1.415166832324e+02 true resid norm > > 1.475436433192e+02 ||r(i)||/||b|| 4.856968241116e-05 > > 161 KSP unpreconditioned resid norm 1.414939087573e+02 true resid norm > > 1.468361945080e+02 ||r(i)||/||b|| 4.833679834170e-05 > > 162 KSP unpreconditioned resid norm 1.414544622036e+02 true resid norm > > 1.475730757600e+02 ||r(i)||/||b|| 4.857937123456e-05 > > 163 KSP unpreconditioned resid norm 1.413780373982e+02 true resid norm > > 1.463891808066e+02 ||r(i)||/||b|| 4.818964653614e-05 > > 164 KSP unpreconditioned resid norm 1.413741853943e+02 true resid norm > > 1.481999741168e+02 ||r(i)||/||b|| 4.878573901436e-05 > > 165 KSP unpreconditioned resid norm 1.413725682642e+02 true resid norm > > 1.458413423932e+02 ||r(i)||/||b|| 4.800930438685e-05 > > 166 KSP unpreconditioned resid norm 1.412970845566e+02 true resid norm > > 1.481492296610e+02 ||r(i)||/||b|| 4.876903451901e-05 > > 167 KSP unpreconditioned resid norm 1.410100899597e+02 true resid norm > > 1.468338434340e+02 ||r(i)||/||b|| 4.833602439497e-05 > > 168 KSP unpreconditioned resid norm 1.409983320599e+02 true resid norm > > 1.485378957202e+02 ||r(i)||/||b|| 4.889697894709e-05 > > 169 KSP unpreconditioned resid norm 1.407688141293e+02 true resid norm > > 1.461003623074e+02 ||r(i)||/||b|| 4.809457078458e-05 > > 170 KSP unpreconditioned resid norm 1.407072771004e+02 true resid norm > > 1.463217409181e+02 ||r(i)||/||b|| 4.816744609502e-05 > > 171 KSP unpreconditioned resid norm 1.407069670790e+02 true resid norm > > 1.464695099700e+02 ||r(i)||/||b|| 4.821608997937e-05 > > 172 KSP unpreconditioned resid norm 1.402361094414e+02 true resid norm > > 1.493786053835e+02 ||r(i)||/||b|| 4.917373096721e-05 > > 173 KSP unpreconditioned resid norm 1.400618325859e+02 true resid norm > > 1.465475533254e+02 ||r(i)||/||b|| 4.824178096070e-05 > > 174 KSP unpreconditioned resid norm 1.400573078320e+02 true resid norm > > 1.471993735980e+02 ||r(i)||/||b|| 4.845635275056e-05 > > 175 KSP unpreconditioned resid norm 1.400258865388e+02 true resid norm > > 1.479779387468e+02 ||r(i)||/||b|| 4.871264750624e-05 > > 176 KSP unpreconditioned resid norm 1.396589283831e+02 true resid norm > > 1.476626943974e+02 ||r(i)||/||b|| 4.860887266654e-05 > > 177 KSP unpreconditioned resid norm 1.395796112440e+02 true resid norm > > 1.443093901655e+02 ||r(i)||/||b|| 4.750500320860e-05 > > 178 KSP unpreconditioned resid norm 1.394749154493e+02 true resid norm > > 1.447914005206e+02 ||r(i)||/||b|| 4.766367551289e-05 > > 179 KSP unpreconditioned resid norm 1.394476969416e+02 true resid norm > > 1.455635964329e+02 ||r(i)||/||b|| 4.791787358864e-05 > > 180 KSP unpreconditioned resid norm 1.391990722790e+02 true resid norm > > 1.457511594620e+02 ||r(i)||/||b|| 4.797961719582e-05 > > 181 KSP unpreconditioned resid norm 1.391686315799e+02 true resid norm > > 1.460567495143e+02 ||r(i)||/||b|| 4.808021395114e-05 > > 182 KSP unpreconditioned resid norm 1.387654475794e+02 true resid norm > > 1.468215388414e+02 ||r(i)||/||b|| 4.833197386362e-05 > > 183 KSP unpreconditioned resid norm 1.384925240232e+02 true resid norm > > 1.456091052791e+02 ||r(i)||/||b|| 4.793285458106e-05 > > 184 KSP unpreconditioned resid norm 1.378003249970e+02 true resid norm > > 1.453421051371e+02 ||r(i)||/||b|| 4.784496118351e-05 > > 185 KSP unpreconditioned resid norm 1.377904214978e+02 true resid norm > > 1.441752187090e+02 ||r(i)||/||b|| 4.746083549740e-05 > > 186 KSP unpreconditioned resid norm 1.376670282479e+02 true resid norm > > 1.441674745344e+02 ||r(i)||/||b|| 4.745828620353e-05 > > 187 KSP unpreconditioned resid norm 1.376636051755e+02 true resid norm > > 1.463118783906e+02 ||r(i)||/||b|| 4.816419946362e-05 > > 188 KSP unpreconditioned resid norm 1.363148994276e+02 true resid norm > > 1.432997756128e+02 ||r(i)||/||b|| 4.717264962781e-05 > > 189 KSP unpreconditioned resid norm 1.363051099558e+02 true resid norm > > 1.451009062639e+02 ||r(i)||/||b|| 4.776556126897e-05 > > 190 KSP unpreconditioned resid norm 1.362538398564e+02 true resid norm > > 1.438957985476e+02 ||r(i)||/||b|| 4.736885357127e-05 > > 191 KSP unpreconditioned resid norm 1.358335705250e+02 true resid norm > > 1.436616069458e+02 ||r(i)||/||b|| 4.729176037047e-05 > > 192 KSP unpreconditioned resid norm 1.337424103882e+02 true resid norm > > 1.432816138672e+02 ||r(i)||/||b|| 4.716667098856e-05 > > 193 KSP unpreconditioned resid norm 1.337419543121e+02 true resid norm > > 1.405274691954e+02 ||r(i)||/||b|| 4.626003801533e-05 > > 194 KSP unpreconditioned resid norm 1.322568117657e+02 true resid norm > > 1.417123189671e+02 ||r(i)||/||b|| 4.665007702902e-05 > > 195 KSP unpreconditioned resid norm 1.320880115122e+02 true resid norm > > 1.413658215058e+02 ||r(i)||/||b|| 4.653601402181e-05 > > 196 KSP unpreconditioned resid norm 1.312526182172e+02 true resid norm > > 1.420574070412e+02 ||r(i)||/||b|| 4.676367608204e-05 > > 197 KSP unpreconditioned resid norm 1.311651332692e+02 true resid norm > > 1.398984125128e+02 ||r(i)||/||b|| 4.605295973934e-05 > > 198 KSP unpreconditioned resid norm 1.294482397720e+02 true resid norm > > 1.380390703259e+02 ||r(i)||/||b|| 4.544088552537e-05 > > 199 KSP unpreconditioned resid norm 1.293598434732e+02 true resid norm > > 1.373830689903e+02 ||r(i)||/||b|| 4.522493737731e-05 > > 200 KSP unpreconditioned resid norm 1.265165992897e+02 true resid norm > > 1.375015523244e+02 ||r(i)||/||b|| 4.526394073779e-05 > > 201 KSP unpreconditioned resid norm 1.263813235463e+02 true resid norm > > 1.356820166419e+02 ||r(i)||/||b|| 4.466497037047e-05 > > 202 KSP unpreconditioned resid norm 1.243190164198e+02 true resid norm > > 1.366420975402e+02 ||r(i)||/||b|| 4.498101803792e-05 > > 203 KSP unpreconditioned resid norm 1.230747513665e+02 true resid norm > > 1.348856851681e+02 ||r(i)||/||b|| 4.440282714351e-05 > > 204 KSP unpreconditioned resid norm 1.198014010398e+02 true resid norm > > 1.325188356617e+02 ||r(i)||/||b|| 4.362368731578e-05 > > 205 KSP unpreconditioned resid norm 1.195977240348e+02 true resid norm > > 1.299721846860e+02 ||r(i)||/||b|| 4.278535889769e-05 > > 206 KSP unpreconditioned resid norm 1.130620928393e+02 true resid norm > > 1.266961052950e+02 ||r(i)||/||b|| 4.170691097546e-05 > > 207 KSP unpreconditioned resid norm 1.123992882530e+02 true resid norm > > 1.270907813369e+02 ||r(i)||/||b|| 4.183683382120e-05 > > 208 KSP unpreconditioned resid norm 1.063236317163e+02 true resid norm > > 1.182163029843e+02 ||r(i)||/||b|| 3.891545689533e-05 > > 209 KSP unpreconditioned resid norm 1.059802897214e+02 true resid norm > > 1.187516613498e+02 ||r(i)||/||b|| 3.909169075539e-05 > > 210 KSP unpreconditioned resid norm 9.878733567790e+01 true resid norm > > 1.124812677115e+02 ||r(i)||/||b|| 3.702754877846e-05 > > 211 KSP unpreconditioned resid norm 9.861048081032e+01 true resid norm > > 1.117192174341e+02 ||r(i)||/||b|| 3.677669052986e-05 > > 212 KSP unpreconditioned resid norm 9.169383217455e+01 true resid norm > > 1.102172324977e+02 ||r(i)||/||b|| 3.628225424167e-05 > > 213 KSP unpreconditioned resid norm 9.146164223196e+01 true resid norm > > 1.121134424773e+02 ||r(i)||/||b|| 3.690646491198e-05 > > 214 KSP unpreconditioned resid norm 8.692213412954e+01 true resid norm > > 1.056264039532e+02 ||r(i)||/||b|| 3.477100591276e-05 > > 215 KSP unpreconditioned resid norm 8.685846611574e+01 true resid norm > > 1.029018845366e+02 ||r(i)||/||b|| 3.387412523521e-05 > > 216 KSP unpreconditioned resid norm 7.808516472373e+01 true resid norm > > 9.749023000535e+01 ||r(i)||/||b|| 3.209267036539e-05 > > 217 KSP unpreconditioned resid norm 7.786400257086e+01 true resid norm > > 1.004515546585e+02 ||r(i)||/||b|| 3.306750462244e-05 > > 218 KSP unpreconditioned resid norm 6.646475864029e+01 true resid norm > > 9.429020541969e+01 ||r(i)||/||b|| 3.103925881653e-05 > > 219 KSP unpreconditioned resid norm 6.643821996375e+01 true resid norm > > 8.864525788550e+01 ||r(i)||/||b|| 2.918100655438e-05 > > 220 KSP unpreconditioned resid norm 5.625046780791e+01 true resid norm > > 8.410041684883e+01 ||r(i)||/||b|| 2.768489678784e-05 > > 221 KSP unpreconditioned resid norm 5.623343238032e+01 true resid norm > > 8.815552919640e+01 ||r(i)||/||b|| 2.901979346270e-05 > > 222 KSP unpreconditioned resid norm 4.491016868776e+01 true resid norm > > 8.557052117768e+01 ||r(i)||/||b|| 2.816883834410e-05 > > 223 KSP unpreconditioned resid norm 4.461976108543e+01 true resid norm > > 7.867894425332e+01 ||r(i)||/||b|| 2.590020992340e-05 > > 224 KSP unpreconditioned resid norm 3.535718264955e+01 true resid norm > > 7.609346753983e+01 ||r(i)||/||b|| 2.504910051583e-05 > > 225 KSP unpreconditioned resid norm 3.525592897743e+01 true resid norm > > 7.926812413349e+01 ||r(i)||/||b|| 2.609416121143e-05 > > 226 KSP unpreconditioned resid norm 2.633469451114e+01 true resid norm > > 7.883483297310e+01 ||r(i)||/||b|| 2.595152670968e-05 > > 227 KSP unpreconditioned resid norm 2.614440577316e+01 true resid norm > > 7.398963634249e+01 ||r(i)||/||b|| 2.435654331172e-05 > > 228 KSP unpreconditioned resid norm 1.988460252721e+01 true resid norm > > 7.147825835126e+01 ||r(i)||/||b|| 2.352982635730e-05 > > 229 KSP unpreconditioned resid norm 1.975927240058e+01 true resid norm > > 7.488507147714e+01 ||r(i)||/||b|| 2.465131033205e-05 > > 230 KSP unpreconditioned resid norm 1.505732242656e+01 true resid norm > > 7.888901529160e+01 ||r(i)||/||b|| 2.596936291016e-05 > > 231 KSP unpreconditioned resid norm 1.504120870628e+01 true resid norm > > 7.126366562975e+01 ||r(i)||/||b|| 2.345918488406e-05 > > 232 KSP unpreconditioned resid norm 1.163470506257e+01 true resid norm > > 7.142763663542e+01 ||r(i)||/||b|| 2.351316226655e-05 > > 233 KSP unpreconditioned resid norm 1.157114340949e+01 true resid norm > > 7.464790352976e+01 ||r(i)||/||b|| 2.457323735226e-05 > > 234 KSP unpreconditioned resid norm 8.702850618357e+00 true resid norm > > 7.798031063059e+01 ||r(i)||/||b|| 2.567022771329e-05 > > 235 KSP unpreconditioned resid norm 8.702017371082e+00 true resid norm > > 7.032943782131e+01 ||r(i)||/||b|| 2.315164775854e-05 > > 236 KSP unpreconditioned resid norm 6.422855779486e+00 true resid norm > > 6.800345168870e+01 ||r(i)||/||b|| 2.238595968678e-05 > > 237 KSP unpreconditioned resid norm 6.413921210094e+00 true resid norm > > 7.408432731879e+01 ||r(i)||/||b|| 2.438771449973e-05 > > 238 KSP unpreconditioned resid norm 4.949111361190e+00 true resid norm > > 7.744087979524e+01 ||r(i)||/||b|| 2.549265324267e-05 > > 239 KSP unpreconditioned resid norm 4.947369357666e+00 true resid norm > > 7.104259266677e+01 ||r(i)||/||b|| 2.338641018933e-05 > > 240 KSP unpreconditioned resid norm 3.873645232239e+00 true resid norm > > 6.908028336929e+01 ||r(i)||/||b|| 2.274044037845e-05 > > 241 KSP unpreconditioned resid norm 3.841473653930e+00 true resid norm > > 7.431718972562e+01 ||r(i)||/||b|| 2.446437014474e-05 > > 242 KSP unpreconditioned resid norm 3.057267436362e+00 true resid norm > > 7.685939322732e+01 ||r(i)||/||b|| 2.530123450517e-05 > > 243 KSP unpreconditioned resid norm 2.980906717815e+00 true resid norm > > 6.975661521135e+01 ||r(i)||/||b|| 2.296308109705e-05 > > 244 KSP unpreconditioned resid norm 2.415633545154e+00 true resid norm > > 6.989644258184e+01 ||r(i)||/||b|| 2.300911067057e-05 > > 245 KSP unpreconditioned resid norm 2.363923146996e+00 true resid norm > > 7.486631867276e+01 ||r(i)||/||b|| 2.464513712301e-05 > > 246 KSP unpreconditioned resid norm 1.947823635306e+00 true resid norm > > 7.671103669547e+01 ||r(i)||/||b|| 2.525239722914e-05 > > 247 KSP unpreconditioned resid norm 1.942156637334e+00 true resid norm > > 6.835715877902e+01 ||r(i)||/||b|| 2.250239602152e-05 > > 248 KSP unpreconditioned resid norm 1.675749569790e+00 true resid norm > > 7.111781390782e+01 ||r(i)||/||b|| 2.341117216285e-05 > > 249 KSP unpreconditioned resid norm 1.673819729570e+00 true resid norm > > 7.552508026111e+01 ||r(i)||/||b|| 2.486199391474e-05 > > 250 KSP unpreconditioned resid norm 1.453311843294e+00 true resid norm > > 7.639099426865e+01 ||r(i)||/||b|| 2.514704291716e-05 > > 251 KSP unpreconditioned resid norm 1.452846325098e+00 true resid norm > > 6.951401359923e+01 ||r(i)||/||b|| 2.288321941689e-05 > > 252 KSP unpreconditioned resid norm 1.335008887441e+00 true resid norm > > 6.912230871414e+01 ||r(i)||/||b|| 2.275427464204e-05 > > 253 KSP unpreconditioned resid norm 1.334477013356e+00 true resid norm > > 7.412281497148e+01 ||r(i)||/||b|| 2.440038419546e-05 > > 254 KSP unpreconditioned resid norm 1.248507835050e+00 true resid norm > > 7.801932499175e+01 ||r(i)||/||b|| 2.568307079543e-05 > > 255 KSP unpreconditioned resid norm 1.248246596771e+00 true resid norm > > 7.094899926215e+01 ||r(i)||/||b|| 2.335560030938e-05 > > 256 KSP unpreconditioned resid norm 1.208952722414e+00 true resid norm > > 7.101235824005e+01 ||r(i)||/||b|| 2.337645736134e-05 > > 257 KSP unpreconditioned resid norm 1.208780664971e+00 true resid norm > > 7.562936418444e+01 ||r(i)||/||b|| 2.489632299136e-05 > > 258 KSP unpreconditioned resid norm 1.179956701653e+00 true resid norm > > 7.812300941072e+01 ||r(i)||/||b|| 2.571720252207e-05 > > 259 KSP unpreconditioned resid norm 1.179219541297e+00 true resid norm > > 7.131201918549e+01 ||r(i)||/||b|| 2.347510232240e-05 > > 260 KSP unpreconditioned resid norm 1.160215487467e+00 true resid norm > > 7.222079766175e+01 ||r(i)||/||b|| 2.377426181841e-05 > > 261 KSP unpreconditioned resid norm 1.159115040554e+00 true resid norm > > 7.481372509179e+01 ||r(i)||/||b|| 2.462782391678e-05 > > 262 KSP unpreconditioned resid norm 1.151973184765e+00 true resid norm > > 7.709040836137e+01 ||r(i)||/||b|| 2.537728204907e-05 > > 263 KSP unpreconditioned resid norm 1.150882463576e+00 true resid norm > > 7.032588895526e+01 ||r(i)||/||b|| 2.315047951236e-05 > > 264 KSP unpreconditioned resid norm 1.137617003277e+00 true resid norm > > 7.004055871264e+01 ||r(i)||/||b|| 2.305655205500e-05 > > 265 KSP unpreconditioned resid norm 1.137134003401e+00 true resid norm > > 7.610459827221e+01 ||r(i)||/||b|| 2.505276462582e-05 > > 266 KSP unpreconditioned resid norm 1.131425778253e+00 true resid norm > > 7.852741072990e+01 ||r(i)||/||b|| 2.585032681802e-05 > > 267 KSP unpreconditioned resid norm 1.131176695314e+00 true resid norm > > 7.064571495865e+01 ||r(i)||/||b|| 2.325576258022e-05 > > 268 KSP unpreconditioned resid norm 1.125420065063e+00 true resid norm > > 7.138837220124e+01 ||r(i)||/||b|| 2.350023686323e-05 > > 269 KSP unpreconditioned resid norm 1.124779989266e+00 true resid norm > > 7.585594020759e+01 ||r(i)||/||b|| 2.497090923065e-05 > > 270 KSP unpreconditioned resid norm 1.119805446125e+00 true resid norm > > 7.703631305135e+01 ||r(i)||/||b|| 2.535947449079e-05 > > 271 KSP unpreconditioned resid norm 1.119024433863e+00 true resid norm > > 7.081439585094e+01 ||r(i)||/||b|| 2.331129040360e-05 > > 272 KSP unpreconditioned resid norm 1.115694452861e+00 true resid norm > > 7.134872343512e+01 ||r(i)||/||b|| 2.348718494222e-05 > > 273 KSP unpreconditioned resid norm 1.113572716158e+00 true resid norm > > 7.600475566242e+01 ||r(i)||/||b|| 2.501989757889e-05 > > 274 KSP unpreconditioned resid norm 1.108711406381e+00 true resid norm > > 7.738835220359e+01 ||r(i)||/||b|| 2.547536175937e-05 > > 275 KSP unpreconditioned resid norm 1.107890435549e+00 true resid norm > > 7.093429729336e+01 ||r(i)||/||b|| 2.335076058915e-05 > > 276 KSP unpreconditioned resid norm 1.103340227961e+00 true resid norm > > 7.145267197866e+01 ||r(i)||/||b|| 2.352140361564e-05 > > 277 KSP unpreconditioned resid norm 1.102897652964e+00 true resid norm > > 7.448617654625e+01 ||r(i)||/||b|| 2.451999867624e-05 > > 278 KSP unpreconditioned resid norm 1.102576754158e+00 true resid norm > > 7.707165090465e+01 ||r(i)||/||b|| 2.537110730854e-05 > > 279 KSP unpreconditioned resid norm 1.102564028537e+00 true resid norm > > 7.009637628868e+01 ||r(i)||/||b|| 2.307492656359e-05 > > 280 KSP unpreconditioned resid norm 1.100828424712e+00 true resid norm > > 7.059832880916e+01 ||r(i)||/||b|| 2.324016360096e-05 > > 281 KSP unpreconditioned resid norm 1.100686341559e+00 true resid norm > > 7.460867988528e+01 ||r(i)||/||b|| 2.456032537644e-05 > > 282 KSP unpreconditioned resid norm 1.099417185996e+00 true resid norm > > 7.763784632467e+01 ||r(i)||/||b|| 2.555749237477e-05 > > 283 KSP unpreconditioned resid norm 1.099379061087e+00 true resid norm > > 7.017139420999e+01 ||r(i)||/||b|| 2.309962160657e-05 > > 284 KSP unpreconditioned resid norm 1.097928047676e+00 true resid norm > > 6.983706716123e+01 ||r(i)||/||b|| 2.298956496018e-05 > > 285 KSP unpreconditioned resid norm 1.096490152934e+00 true resid norm > > 7.414445779601e+01 ||r(i)||/||b|| 2.440750876614e-05 > > 286 KSP unpreconditioned resid norm 1.094691490227e+00 true resid norm > > 7.634526287231e+01 ||r(i)||/||b|| 2.513198866374e-05 > > 287 KSP unpreconditioned resid norm 1.093560358328e+00 true resid norm > > 7.003716824146e+01 ||r(i)||/||b|| 2.305543595061e-05 > > 288 KSP unpreconditioned resid norm 1.093357856424e+00 true resid norm > > 6.964715939684e+01 ||r(i)||/||b|| 2.292704949292e-05 > > 289 KSP unpreconditioned resid norm 1.091881434739e+00 true resid norm > > 7.429955169250e+01 ||r(i)||/||b|| 2.445856390566e-05 > > 290 KSP unpreconditioned resid norm 1.091817808496e+00 true resid norm > > 7.607892786798e+01 ||r(i)||/||b|| 2.504431422190e-05 > > 291 KSP unpreconditioned resid norm 1.090295101202e+00 true resid norm > > 6.942248339413e+01 ||r(i)||/||b|| 2.285308871866e-05 > > 292 KSP unpreconditioned resid norm 1.089995012773e+00 true resid norm > > 6.995557798353e+01 ||r(i)||/||b|| 2.302857736947e-05 > > 293 KSP unpreconditioned resid norm 1.089975910578e+00 true resid norm > > 7.453210925277e+01 ||r(i)||/||b|| 2.453511919866e-05 > > 294 KSP unpreconditioned resid norm 1.085570944646e+00 true resid norm > > 7.629598425927e+01 ||r(i)||/||b|| 2.511576670710e-05 > > 295 KSP unpreconditioned resid norm 1.085363565621e+00 true resid norm > > 7.025539955712e+01 ||r(i)||/||b|| 2.312727520749e-05 > > 296 KSP unpreconditioned resid norm 1.083348574106e+00 true resid norm > > 7.003219621882e+01 ||r(i)||/||b|| 2.305379921754e-05 > > 297 KSP unpreconditioned resid norm 1.082180374430e+00 true resid norm > > 7.473048827106e+01 ||r(i)||/||b|| 2.460042330597e-05 > > 298 KSP unpreconditioned resid norm 1.081326671068e+00 true resid norm > > 7.660142838935e+01 ||r(i)||/||b|| 2.521631542651e-05 > > 299 KSP unpreconditioned resid norm 1.078679751898e+00 true resid norm > > 7.077868424247e+01 ||r(i)||/||b|| 2.329953454992e-05 > > 300 KSP unpreconditioned resid norm 1.078656949888e+00 true resid norm > > 7.074960394994e+01 ||r(i)||/||b|| 2.328996164972e-05 > > Linear solve did not converge due to DIVERGED_ITS iterations 300 > > KSP Object: 2 MPI processes > > type: fgmres > > GMRES: restart=300, using Modified Gram-Schmidt Orthogonalization > > GMRES: happy breakdown tolerance 1e-30 > > maximum iterations=300, initial guess is zero > > tolerances: relative=1e-09, absolute=1e-20, divergence=10000 > > right preconditioning > > using UNPRECONDITIONED norm type for convergence test > > PC Object: 2 MPI processes > > type: fieldsplit > > FieldSplit with Schur preconditioner, factorization DIAG > > Preconditioner for the Schur complement formed from Sp, an assembled > > approximation to S, which uses (lumped, if requested) A00's diagonal's > > inverse > > Split info: > > Split number 0 Defined by IS > > Split number 1 Defined by IS > > KSP solver for A00 block > > KSP Object: (fieldsplit_u_) 2 MPI processes > > type: preonly > > maximum iterations=10000, initial guess is zero > > tolerances: relative=1e-05, absolute=1e-50, divergence=10000 > > left preconditioning > > using NONE norm type for convergence test > > PC Object: (fieldsplit_u_) 2 MPI processes > > type: lu > > LU: out-of-place factorization > > tolerance for zero pivot 2.22045e-14 > > matrix ordering: natural > > factor fill ratio given 0, needed 0 > > Factored matrix follows: > > Mat Object: 2 MPI processes > > type: mpiaij > > rows=184326, cols=184326 > > package used to perform factorization: mumps > > total: nonzeros=4.03041e+08, allocated nonzeros=4.03041e+08 > > total number of mallocs used during MatSetValues calls =0 > > MUMPS run parameters: > > SYM (matrix type): 0 > > PAR (host participation): 1 > > ICNTL(1) (output for error): 6 > > ICNTL(2) (output of diagnostic msg): 0 > > ICNTL(3) (output for global info): 0 > > ICNTL(4) (level of printing): 0 > > ICNTL(5) (input mat struct): 0 > > ICNTL(6) (matrix prescaling): 7 > > ICNTL(7) (sequentia matrix ordering):7 > > ICNTL(8) (scalling strategy): 77 > > ICNTL(10) (max num of refinements): 0 > > ICNTL(11) (error analysis): 0 > > ICNTL(12) (efficiency control): > > 1 > > ICNTL(13) (efficiency control): > > 0 > > ICNTL(14) (percentage of estimated workspace increase): > > 20 > > ICNTL(18) (input mat struct): > > 3 > > ICNTL(19) (Shur complement info): > > 0 > > ICNTL(20) (rhs sparse pattern): > > 0 > > ICNTL(21) (solution struct): > > 1 > > ICNTL(22) (in-core/out-of-core facility): > > 0 > > ICNTL(23) (max size of memory can be allocated > > locally):0 > > ICNTL(24) (detection of null pivot rows): > > 0 > > ICNTL(25) (computation of a null space basis): > > 0 > > ICNTL(26) (Schur options for rhs or solution): > > 0 > > ICNTL(27) (experimental parameter): > > -24 > > ICNTL(28) (use parallel or sequential ordering): > > 1 > > ICNTL(29) (parallel ordering): > > 0 > > ICNTL(30) (user-specified set of entries in inv(A)): > > 0 > > ICNTL(31) (factors is discarded in the solve phase): > > 0 > > ICNTL(33) (compute determinant): > > 0 > > CNTL(1) (relative pivoting threshold): 0.01 > > CNTL(2) (stopping criterion of refinement): 1.49012e-08 > > CNTL(3) (absolute pivoting threshold): 0 > > CNTL(4) (value of static pivoting): -1 > > CNTL(5) (fixation for null pivots): 0 > > RINFO(1) (local estimated flops for the elimination > > after analysis): > > [0] 5.59214e+11 > > [1] 5.35237e+11 > > RINFO(2) (local estimated flops for the assembly after > > factorization): > > [0] 4.2839e+08 > > [1] 3.799e+08 > > RINFO(3) (local estimated flops for the elimination > > after factorization): > > [0] 5.59214e+11 > > [1] 5.35237e+11 > > INFO(15) (estimated size of (in MB) MUMPS internal data > > for running numerical factorization): > > [0] 2621 > > [1] 2649 > > INFO(16) (size of (in MB) MUMPS internal data used > > during numerical factorization): > > [0] 2621 > > [1] 2649 > > INFO(23) (num of pivots eliminated on this processor > > after factorization): > > [0] 90423 > > [1] 93903 > > RINFOG(1) (global estimated flops for the elimination > > after analysis): 1.09445e+12 > > RINFOG(2) (global estimated flops for the assembly > > after factorization): 8.0829e+08 > > RINFOG(3) (global estimated flops for the elimination > > after factorization): 1.09445e+12 > > (RINFOG(12) RINFOG(13))*2^INFOG(34) (determinant): > > (0,0)*(2^0) > > INFOG(3) (estimated real workspace for factors on all > > processors after analysis): 403041366 > > INFOG(4) (estimated integer workspace for factors on > > all processors after analysis): 2265748 > > INFOG(5) (estimated maximum front size in the complete > > tree): 6663 > > INFOG(6) (number of nodes in the complete tree): 2812 > > INFOG(7) (ordering option effectively use after > > analysis): 5 > > INFOG(8) (structural symmetry in percent of the > > permuted matrix after analysis): 100 > > INFOG(9) (total real/complex workspace to store the > > matrix factors after factorization): 403041366 > > INFOG(10) (total integer space store the matrix factors > > after factorization): 2265766 > > INFOG(11) (order of largest frontal matrix after > > factorization): 6663 > > INFOG(12) (number of off-diagonal pivots): 0 > > INFOG(13) (number of delayed pivots after > > factorization): 0 > > INFOG(14) (number of memory compress after > > factorization): 0 > > INFOG(15) (number of steps of iterative refinement > > after solution): 0 > > INFOG(16) (estimated size (in MB) of all MUMPS internal > > data for factorization after analysis: value on the most memory consuming > > processor): 2649 > > INFOG(17) (estimated size of all MUMPS internal data > > for factorization after analysis: sum over all processors): 5270 > > INFOG(18) (size of all MUMPS internal data allocated > > during factorization: value on the most memory consuming processor): 2649 > > INFOG(19) (size of all MUMPS internal data allocated > > during factorization: sum over all processors): 5270 > > INFOG(20) (estimated number of entries in the factors): > > 403041366 > > INFOG(21) (size in MB of memory effectively used during > > factorization - value on the most memory consuming processor): 2121 > > INFOG(22) (size in MB of memory effectively used during > > factorization - sum over all processors): 4174 > > INFOG(23) (after analysis: value of ICNTL(6) > > effectively used): 0 > > INFOG(24) (after analysis: value of ICNTL(12) > > effectively used): 1 > > INFOG(25) (after factorization: number of pivots > > modified by static pivoting): 0 > > INFOG(28) (after factorization: number of null pivots > > encountered): 0 > > INFOG(29) (after factorization: effective number of > > entries in the factors (sum over all processors)): 403041366 > > INFOG(30, 31) (after solution: size in Mbytes of memory > > used during solution phase): 2467, 4922 > > INFOG(32) (after analysis: type of analysis done): 1 > > INFOG(33) (value used for ICNTL(8)): 7 > > INFOG(34) (exponent of the determinant if determinant > > is requested): 0 > > linear system matrix = precond matrix: > > Mat Object: (fieldsplit_u_) 2 MPI processes > > type: mpiaij > > rows=184326, cols=184326, bs=3 > > total: nonzeros=3.32649e+07, allocated nonzeros=3.32649e+07 > > total number of mallocs used during MatSetValues calls =0 > > using I-node (on process 0) routines: found 26829 nodes, limit > > used is 5 > > KSP solver for S = A11 - A10 inv(A00) A01 > > KSP Object: (fieldsplit_lu_) 2 MPI processes > > type: preonly > > maximum iterations=10000, initial guess is zero > > tolerances: relative=1e-05, absolute=1e-50, divergence=10000 > > left preconditioning > > using NONE norm type for convergence test > > PC Object: (fieldsplit_lu_) 2 MPI processes > > type: lu > > LU: out-of-place factorization > > tolerance for zero pivot 2.22045e-14 > > matrix ordering: natural > > factor fill ratio given 0, needed 0 > > Factored matrix follows: > > Mat Object: 2 MPI processes > > type: mpiaij > > rows=2583, cols=2583 > > package used to perform factorization: mumps > > total: nonzeros=2.17621e+06, allocated nonzeros=2.17621e+06 > > total number of mallocs used during MatSetValues calls =0 > > MUMPS run parameters: > > SYM (matrix type): 0 > > PAR (host participation): 1 > > ICNTL(1) (output for error): 6 > > ICNTL(2) (output of diagnostic msg): 0 > > ICNTL(3) (output for global info): 0 > > ICNTL(4) (level of printing): 0 > > ICNTL(5) (input mat struct): 0 > > ICNTL(6) (matrix prescaling): 7 > > ICNTL(7) (sequentia matrix ordering):7 > > ICNTL(8) (scalling strategy): 77 > > ICNTL(10) (max num of refinements): 0 > > ICNTL(11) (error analysis): 0 > > ICNTL(12) (efficiency control): > > 1 > > ICNTL(13) (efficiency control): > > 0 > > ICNTL(14) (percentage of estimated workspace increase): > > 20 > > ICNTL(18) (input mat struct): > > 3 > > ICNTL(19) (Shur complement info): > > 0 > > ICNTL(20) (rhs sparse pattern): > > 0 > > ICNTL(21) (solution struct): > > 1 > > ICNTL(22) (in-core/out-of-core facility): > > 0 > > ICNTL(23) (max size of memory can be allocated > > locally):0 > > ICNTL(24) (detection of null pivot rows): > > 0 > > ICNTL(25) (computation of a null space basis): > > 0 > > ICNTL(26) (Schur options for rhs or solution): > > 0 > > ICNTL(27) (experimental parameter): > > -24 > > ICNTL(28) (use parallel or sequential ordering): > > 1 > > ICNTL(29) (parallel ordering): > > 0 > > ICNTL(30) (user-specified set of entries in inv(A)): > > 0 > > ICNTL(31) (factors is discarded in the solve phase): > > 0 > > ICNTL(33) (compute determinant): > > 0 > > CNTL(1) (relative pivoting threshold): 0.01 > > CNTL(2) (stopping criterion of refinement): 1.49012e-08 > > CNTL(3) (absolute pivoting threshold): 0 > > CNTL(4) (value of static pivoting): -1 > > CNTL(5) (fixation for null pivots): 0 > > RINFO(1) (local estimated flops for the elimination > > after analysis): > > [0] 5.12794e+08 > > [1] 5.02142e+08 > > RINFO(2) (local estimated flops for the assembly after > > factorization): > > [0] 815031 > > [1] 745263 > > RINFO(3) (local estimated flops for the elimination > > after factorization): > > [0] 5.12794e+08 > > [1] 5.02142e+08 > > INFO(15) (estimated size of (in MB) MUMPS internal data > > for running numerical factorization): > > [0] 34 > > [1] 34 > > INFO(16) (size of (in MB) MUMPS internal data used > > during numerical factorization): > > [0] 34 > > [1] 34 > > INFO(23) (num of pivots eliminated on this processor > > after factorization): > > [0] 1158 > > [1] 1425 > > RINFOG(1) (global estimated flops for the elimination > > after analysis): 1.01494e+09 > > RINFOG(2) (global estimated flops for the assembly > > after factorization): 1.56029e+06 > > RINFOG(3) (global estimated flops for the elimination > > after factorization): 1.01494e+09 > > (RINFOG(12) RINFOG(13))*2^INFOG(34) (determinant): > > (0,0)*(2^0) > > INFOG(3) (estimated real workspace for factors on all > > processors after analysis): 2176209 > > INFOG(4) (estimated integer workspace for factors on > > all processors after analysis): 14427 > > INFOG(5) (estimated maximum front size in the complete > > tree): 699 > > INFOG(6) (number of nodes in the complete tree): 15 > > INFOG(7) (ordering option effectively use after > > analysis): 2 > > INFOG(8) (structural symmetry in percent of the > > permuted matrix after analysis): 100 > > INFOG(9) (total real/complex workspace to store the > > matrix factors after factorization): 2176209 > > INFOG(10) (total integer space store the matrix factors > > after factorization): 14427 > > INFOG(11) (order of largest frontal matrix after > > factorization): 699 > > INFOG(12) (number of off-diagonal pivots): 0 > > INFOG(13) (number of delayed pivots after > > factorization): 0 > > INFOG(14) (number of memory compress after > > factorization): 0 > > INFOG(15) (number of steps of iterative refinement > > after solution): 0 > > INFOG(16) (estimated size (in MB) of all MUMPS internal > > data for factorization after analysis: value on the most memory consuming > > processor): 34 > > INFOG(17) (estimated size of all MUMPS internal data > > for factorization after analysis: sum over all processors): 68 > > INFOG(18) (size of all MUMPS internal data allocated > > during factorization: value on the most memory consuming processor): 34 > > INFOG(19) (size of all MUMPS internal data allocated > > during factorization: sum over all processors): 68 > > INFOG(20) (estimated number of entries in the factors): > > 2176209 > > INFOG(21) (size in MB of memory effectively used during > > factorization - value on the most memory consuming processor): 30 > > INFOG(22) (size in MB of memory effectively used during > > factorization - sum over all processors): 59 > > INFOG(23) (after analysis: value of ICNTL(6) > > effectively used): 0 > > INFOG(24) (after analysis: value of ICNTL(12) > > effectively used): 1 > > INFOG(25) (after factorization: number of pivots > > modified by static pivoting): 0 > > INFOG(28) (after factorization: number of null pivots > > encountered): 0 > > INFOG(29) (after factorization: effective number of > > entries in the factors (sum over all processors)): 2176209 > > INFOG(30, 31) (after solution: size in Mbytes of memory > > used during solution phase): 16, 32 > > INFOG(32) (after analysis: type of analysis done): 1 > > INFOG(33) (value used for ICNTL(8)): 7 > > INFOG(34) (exponent of the determinant if determinant > > is requested): 0 > > linear system matrix followed by preconditioner matrix: > > Mat Object: (fieldsplit_lu_) 2 MPI processes > > type: schurcomplement > > rows=2583, cols=2583 > > Schur complement A11 - A10 inv(A00) A01 > > A11 > > Mat Object: (fieldsplit_lu_) 2 MPI > > processes > > type: mpiaij > > rows=2583, cols=2583, bs=3 > > total: nonzeros=117369, allocated nonzeros=117369 > > total number of mallocs used during MatSetValues calls =0 > > not using I-node (on process 0) routines > > A10 > > Mat Object: 2 MPI processes > > type: mpiaij > > rows=2583, cols=184326, rbs=3, cbs = 1 > > total: nonzeros=292770, allocated nonzeros=292770 > > total number of mallocs used during MatSetValues calls =0 > > not using I-node (on process 0) routines > > KSP of A00 > > KSP Object: (fieldsplit_u_) 2 MPI > > processes > > type: preonly > > maximum iterations=10000, initial guess is zero > > tolerances: relative=1e-05, absolute=1e-50, > > divergence=10000 > > left preconditioning > > using NONE norm type for convergence test > > PC Object: (fieldsplit_u_) 2 MPI > > processes > > type: lu > > LU: out-of-place factorization > > tolerance for zero pivot 2.22045e-14 > > matrix ordering: natural > > factor fill ratio given 0, needed 0 > > Factored matrix follows: > > Mat Object: 2 MPI processes > > type: mpiaij > > rows=184326, cols=184326 > > package used to perform factorization: mumps > > total: nonzeros=4.03041e+08, allocated > > nonzeros=4.03041e+08 > > total number of mallocs used during MatSetValues > > calls =0 > > MUMPS run parameters: > > SYM (matrix type): 0 > > PAR (host participation): 1 > > ICNTL(1) (output for error): 6 > > ICNTL(2) (output of diagnostic msg): 0 > > ICNTL(3) (output for global info): 0 > > ICNTL(4) (level of printing): 0 > > ICNTL(5) (input mat struct): 0 > > ICNTL(6) (matrix prescaling): 7 > > ICNTL(7) (sequentia matrix ordering):7 > > ICNTL(8) (scalling strategy): 77 > > ICNTL(10) (max num of refinements): 0 > > ICNTL(11) (error analysis): 0 > > ICNTL(12) (efficiency control): > > 1 > > ICNTL(13) (efficiency control): > > 0 > > ICNTL(14) (percentage of estimated workspace > > increase): 20 > > ICNTL(18) (input mat struct): > > 3 > > ICNTL(19) (Shur complement info): > > 0 > > ICNTL(20) (rhs sparse pattern): > > 0 > > ICNTL(21) (solution struct): > > 1 > > ICNTL(22) (in-core/out-of-core facility): > > 0 > > ICNTL(23) (max size of memory can be allocated > > locally):0 > > ICNTL(24) (detection of null pivot rows): > > 0 > > ICNTL(25) (computation of a null space basis): > > 0 > > ICNTL(26) (Schur options for rhs or solution): > > 0 > > ICNTL(27) (experimental parameter): > > -24 > > ICNTL(28) (use parallel or sequential > > ordering): 1 > > ICNTL(29) (parallel ordering): > > 0 > > ICNTL(30) (user-specified set of entries in > > inv(A)): 0 > > ICNTL(31) (factors is discarded in the solve > > phase): 0 > > ICNTL(33) (compute determinant): > > 0 > > CNTL(1) (relative pivoting threshold): 0.01 > > CNTL(2) (stopping criterion of refinement): > > 1.49012e-08 > > CNTL(3) (absolute pivoting threshold): 0 > > CNTL(4) (value of static pivoting): -1 > > CNTL(5) (fixation for null pivots): 0 > > RINFO(1) (local estimated flops for the > > elimination after analysis): > > [0] 5.59214e+11 > > [1] 5.35237e+11 > > RINFO(2) (local estimated flops for the > > assembly after factorization): > > [0] 4.2839e+08 > > [1] 3.799e+08 > > RINFO(3) (local estimated flops for the > > elimination after factorization): > > [0] 5.59214e+11 > > [1] 5.35237e+11 > > INFO(15) (estimated size of (in MB) MUMPS > > internal data for running numerical factorization): > > [0] 2621 > > [1] 2649 > > INFO(16) (size of (in MB) MUMPS internal data > > used during numerical factorization): > > [0] 2621 > > [1] 2649 > > INFO(23) (num of pivots eliminated on this > > processor after factorization): > > [0] 90423 > > [1] 93903 > > RINFOG(1) (global estimated flops for the > > elimination after analysis): 1.09445e+12 > > RINFOG(2) (global estimated flops for the > > assembly after factorization): 8.0829e+08 > > RINFOG(3) (global estimated flops for the > > elimination after factorization): 1.09445e+12 > > (RINFOG(12) RINFOG(13))*2^INFOG(34) > > (determinant): (0,0)*(2^0) > > INFOG(3) (estimated real workspace for factors > > on all processors after analysis): 403041366 > > INFOG(4) (estimated integer workspace for > > factors on all processors after analysis): 2265748 > > INFOG(5) (estimated maximum front size in the > > complete tree): 6663 > > INFOG(6) (number of nodes in the complete > > tree): 2812 > > INFOG(7) (ordering option effectively use after > > analysis): 5 > > INFOG(8) (structural symmetry in percent of the > > permuted matrix after analysis): 100 > > INFOG(9) (total real/complex workspace to store > > the matrix factors after factorization): 403041366 > > INFOG(10) (total integer space store the matrix > > factors after factorization): 2265766 > > INFOG(11) (order of largest frontal matrix > > after factorization): 6663 > > INFOG(12) (number of off-diagonal pivots): 0 > > INFOG(13) (number of delayed pivots after > > factorization): 0 > > INFOG(14) (number of memory compress after > > factorization): 0 > > INFOG(15) (number of steps of iterative > > refinement after solution): 0 > > INFOG(16) (estimated size (in MB) of all MUMPS > > internal data for factorization after analysis: value on the most memory > > consuming processor): 2649 > > INFOG(17) (estimated size of all MUMPS internal > > data for factorization after analysis: sum over all processors): 5270 > > INFOG(18) (size of all MUMPS internal data > > allocated during factorization: value on the most memory consuming > > processor): 2649 > > INFOG(19) (size of all MUMPS internal data > > allocated during factorization: sum over all processors): 5270 > > INFOG(20) (estimated number of entries in the > > factors): 403041366 > > INFOG(21) (size in MB of memory effectively > > used during factorization - value on the most memory consuming processor): > > 2121 > > INFOG(22) (size in MB of memory effectively > > used during factorization - sum over all processors): 4174 > > INFOG(23) (after analysis: value of ICNTL(6) > > effectively used): 0 > > INFOG(24) (after analysis: value of ICNTL(12) > > effectively used): 1 > > INFOG(25) (after factorization: number of > > pivots modified by static pivoting): 0 > > INFOG(28) (after factorization: number of null > > pivots encountered): 0 > > INFOG(29) (after factorization: effective > > number of entries in the factors (sum over all processors)): 403041366 > > INFOG(30, 31) (after solution: size in Mbytes > > of memory used during solution phase): 2467, 4922 > > INFOG(32) (after analysis: type of analysis > > done): 1 > > INFOG(33) (value used for ICNTL(8)): 7 > > INFOG(34) (exponent of the determinant if > > determinant is requested): 0 > > linear system matrix = precond matrix: > > Mat Object: (fieldsplit_u_) > > 2 MPI processes > > type: mpiaij > > rows=184326, cols=184326, bs=3 > > total: nonzeros=3.32649e+07, allocated > > nonzeros=3.32649e+07 > > total number of mallocs used during MatSetValues calls =0 > > using I-node (on process 0) routines: found 26829 > > nodes, limit used is 5 > > A01 > > Mat Object: 2 MPI processes > > type: mpiaij > > rows=184326, cols=2583, rbs=3, cbs = 1 > > total: nonzeros=292770, allocated nonzeros=292770 > > total number of mallocs used during MatSetValues calls =0 > > using I-node (on process 0) routines: found 16098 nodes, > > limit used is 5 > > Mat Object: 2 MPI processes > > type: mpiaij > > rows=2583, cols=2583, rbs=3, cbs = 1 > > total: nonzeros=1.25158e+06, allocated nonzeros=1.25158e+06 > > total number of mallocs used during MatSetValues calls =0 > > not using I-node (on process 0) routines > > linear system matrix = precond matrix: > > Mat Object: 2 MPI processes > > type: mpiaij > > rows=186909, cols=186909 > > total: nonzeros=3.39678e+07, allocated nonzeros=3.39678e+07 > > total number of mallocs used during MatSetValues calls =0 > > using I-node (on process 0) routines: found 26829 nodes, limit used > > is 5 > > KSPSolve completed > > > > > > Giang > > > > On Sun, Apr 17, 2016 at 1:15 AM, Matthew Knepley <knep...@gmail.com> wrote: > > On Sat, Apr 16, 2016 at 6:54 PM, Hoang Giang Bui <hgbk2...@gmail.com> wrote: > > Hello > > > > I'm solving an indefinite problem arising from mesh tying/contact using > > Lagrange multiplier, the matrix has the form > > > > K = [A P^T > > P 0] > > > > I used the FIELDSPLIT preconditioner with one field is the main variable > > (displacement) and the other field for dual variable (Lagrange multiplier). > > The block size for each field is 3. According to the manual, I first chose > > the preconditioner based on Schur complement to treat this problem. > > > > > > For any solver question, please send us the output of > > > > -ksp_view -ksp_monitor_true_residual -ksp_converged_reason > > > > > > However, I will comment below > > > > The parameters used for the solve is > > -ksp_type gmres > > > > You need 'fgmres' here with the options you have below. > > > > -ksp_max_it 300 > > -ksp_gmres_restart 300 > > -ksp_gmres_modifiedgramschmidt > > -pc_fieldsplit_type schur > > -pc_fieldsplit_schur_fact_type diag > > -pc_fieldsplit_schur_precondition selfp > > > > > > > > It could be taking time in the MatMatMult() here if that matrix is dense. > > Is there any reason to > > believe that is a good preconditioner for your problem? > > > > > > -pc_fieldsplit_detect_saddle_point > > -fieldsplit_u_pc_type hypre > > > > I would just use MUMPS here to start, especially if it works on the whole > > problem. Same with the one below. > > > > Matt > > > > -fieldsplit_u_pc_hypre_type boomeramg > > -fieldsplit_u_pc_hypre_boomeramg_coarsen_type PMIS > > -fieldsplit_lu_pc_type hypre > > -fieldsplit_lu_pc_hypre_type boomeramg > > -fieldsplit_lu_pc_hypre_boomeramg_coarsen_type PMIS > > > > For the test case, a small problem is solved on 2 processes. Due to the > > decomposition, the contact only happens in 1 proc, so the size of Lagrange > > multiplier dofs on proc 0 is 0. > > > > 0: mIndexU.size(): 80490 > > 0: mIndexLU.size(): 0 > > 1: mIndexU.size(): 103836 > > 1: mIndexLU.size(): 2583 > > > > However, with this setup the solver takes very long at KSPSolve before > > going to iteration, and the first iteration seems forever so I have to stop > > the calculation. I guessed that the solver takes time to compute the Schur > > complement, but according to the manual only the diagonal of A is used to > > approximate the Schur complement, so it should not take long to compute > > this. > > > > Note that I ran the same problem with direct solver (MUMPS) and it's able > > to produce the valid results. The parameter for the solve is pretty standard > > -ksp_type preonly > > -pc_type lu > > -pc_factor_mat_solver_package mumps > > > > Hence the matrix/rhs must not have any problem here. Do you have any idea > > or suggestion for this case? > > > > > > Giang > > > > > > > > -- > > What most experimenters take for granted before they begin their > > experiments is infinitely more interesting than any results to which their > > experiments lead. > > -- Norbert Wiener > > > > > > > > > > -- > > What most experimenters take for granted before they begin their > > experiments is infinitely more interesting than any results to which their > > experiments lead. > > -- Norbert Wiener > > > > > > > > -- > What most experimenters take for granted before they begin their experiments > is infinitely more interesting than any results to which their experiments > lead. > -- Norbert Wiener > > > > > -- > What most experimenters take for granted before they begin their experiments > is infinitely more interesting than any results to which their experiments > lead. > -- Norbert Wiener >
