[petsc-users] [SLEPc] GD is not deterministic when using different number of cores
Denis Davydov
davydden at gmail.com
Fri Nov 20 05:06:11 CST 2015
> On 19 Nov 2015, at 11:19, Jose E. Roman <jroman at dsic.upv.es> wrote:
>
>>
>> El 19 nov 2015, a las 10:49, Denis Davydov <davydden at gmail.com> escribió:
>>
>> Dear all,
>>
>> I was trying to get some scaling results for the GD eigensolver as applied to the density functional theory.
>> Interestingly enough, the number of self-consistent iterations (solution of couple eigenvalue problem and poisson equations)
>> depends on the number of MPI cores used. For my case the range of iterations is 19-24 for MPI cores between 2 and 160.
>> That makes the whole scaling check useless as the eigenproblem is solved different number of times.
>>
>> That is **not** the case when I use Krylov-Schur eigensolver with zero shift, which makes me believe that I am missing some settings on GD to make it fully deterministic. The only non-deterministic part I am currently aware of is the initial subspace for the first SC iterations. But that’s the case for both KS and GD. For subsequent iterations I provide previously obtained eigenvectors as initial subspace.
>>
>> Certainly there will be some round-off error due to different partition of DoFs for different number of MPI cores,
>> but i don’t expect it to have such a strong influence. Especially given the fact that I don’t see this problem with KS.
>>
>> Below is the output of -eps-view for GD with -eps_type gd -eps_harmonic -st_pc_type bjacobi -eps_gd_krylov_start -eps_target -10.0
>> I would appreciate any suggestions on how to address the issue.
>
> The block Jacobi preconditioner differs when you change the number of processes. This will probably make GD iterate more when you use more processes.
Switching to Jacobi preconditioner reduced variation in number of SC iterations, but does not remove it.
Any other options but initial vector space which may introduce non-deterministic behaviour?
>>
>> As a side question, why GD uses KSP pre-only? It could as well be using a proper linear solver to apply K^{-1} in the expansion state --
>
> You can achieve that with PCKSP. But if you are going to do that, why not using JD instead of GD?
It was more a general question why the inverse is implemented by pre-only for GD and is done properly with a full control of KSP for JD.
I will try JD as well because so far GD for my problems has a bottleneck in: BVDot (13% time), BVOrthogonalize (10% time), DSSolve (62% time);
whereas only 11% of time is spent in MatMult.
I suppose BVDot is mostly used in BVOrthogonalize and partly in calculation of Ritz vectors?
My best bet with DSSolve (with mpd=175 only) is a better preconditioner and thus reduced number of iterations or double expansion with simple preconditioner?
Regards,
Denis.
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