[petsc-users] [SLEPc] Number of iterations changes with MPI processes in Lanczos

Tue Oct 23 08:46:16 CDT 2018

El mar., 23 oct. 2018 a las 15:33, Jose E. Roman (<jroman at dsic.upv.es>)
escribió:

>
>
> > El 23 oct 2018, a las 15:17, Ale Foggia <amfoggia at gmail.com> escribió:
> >
> > Hello Jose, thanks for your answer.
> >
> > El mar., 23 oct. 2018 a las 12:59, Jose E. Roman (<jroman at dsic.upv.es>)
> escribió:
> > There is an undocumented option:
> >
> >   -bv_reproducible_random
> >
> > It will force the initial vector of the Krylov subspace to be the same
> irrespective of the number of MPI processes. This should be used for
> scaling analyses as the one you are trying to do.
> >
> > What about when I'm not doing the scaling? Now I would like to ask for
> computing time for bigger size problems, should I also use this option in
> that case? Because, what happens if I have a "bad" configuration? Meaning,
> I ask for some time, enough if I take into account the "correct" scaling,
> but when I run it takes double the time/iterations, like it happened before
> when changing from 960 to 1024 processes?
>
> When you increase the matrix size the spectrum of the matrix changes and
> probably also the convergence, so the computation time is not easy to
> predict in advance.
>

Okey, I'll keep that in mine. I thought that, even if the spectrum changes,
if I had a behaviour/tendency for 6 or 7 smaller cases I could predict more
or less the time. It was working this way until I found this "iterations
problem" which doubled the time of execution for the same size problem. To
be completely sure, do you suggest me or not to use this run-time option
when going in production? Can you elaborate a bit in the effect this
option? Is the (huge) difference I got in the number of iterations
something expected?

> >
> > An additional comment is that we strongly recommend to use the default
> solver (Krylov-Schur), which will do Lanczos with implicit restart. It is
> generally faster and more stable.
> >
> > I will be doing Dynamical Lanczos, that means that I'll need the "matrix
> whose rows are the eigenvectors of the tridiagonal matrix" (so, according
> to the Lanczos Technical Report notation, I need the "matrix whose rows are
> the eigenvectors of T_m", which should be the same as the vectors y_i). I
> checked the Technical Report for Krylov-Schur also and I think I can get
> the same information also from that solver, but I'm not sure. Can you
> confirm this please?
> > Also, as the vectors I want are given by V_m^(-1)*x_i=y_i (following the
> notation on the Report), my idea to get them was to retrieve the invariant
> subspace V_m (with EPSGetInvariantSubspace), invert it, and then multiply
> it with the eigenvectors that I get with EPSGetEigenvector. Is there
> another easier (or with less computations) way to get this?
>
> In Krylov-Schur the tridiagonal matrix T_m becomes
> arrowhead-plus-tridiagonal. Apart from this, it should be equivalent. The
> relevant information can be obtained with EPSGetBV() and EPSGetDS(). But
> this is a "developer level" interface. We could help you get this running.
> Send a small problem matrix to slepc-maint together with a more detailed
> description of what you need to compute.
>

Thanks! When I get to that part I'll write to slepc-maint for help.

> Jose
>
> >
> >
> > Jose
> >
> >
> >
> > > El 23 oct 2018, a las 12:13, Ale Foggia <amfoggia at gmail.com> escribió:
> > >
> > > Hello,
> > >
> > > I'm currently using Lanczos solver (EPSLANCZOS) to get the smallest
> real eigenvalue (EPS_SMALLEST_REAL) of a Hermitian problem (EPS_HEP). Those
> are the only options I set for the solver. My aim is to be able to
> predict/estimate the time-to-solution. To do so, I was doing a scaling of
> the code for different sizes of matrices and for different number of MPI
> processes. As I was not observing a good scaling I checked the number of
> iterations of the solver (given by EPSGetIterationNumber). I've encounter
> that for the **same size** of matrix (that meaning, the same problem), when
> I change the number of MPI processes, the amount of iterations changes, and
> the behaviour is not monotonic. This are the numbers I've got:
> > >
> > > # procs   # iters
> > > 960          157
> > > 992          189
> > > 1024        338
> > > 1056        190
> > > 1120        174
> > > 2048        136
> > >
> > > I've checked the mailing list for a similar situation and I've found
> another person with the same problem but in another solver ("[SLEPc] GD is
> not deterministic when using different number of cores", Nov 19 2015), but
> I think the solution this person finds does not apply to my problem
> (removing "-eps_harmonic" option).
> > >
> > > Can you give me any hint on what is the reason for this behaviour? Is
> there a way to prevent this? It's not possible to estimate/predict any time
> consumption for bigger problems if the number of iterations varies this
> much.
> > >
> > > Ale
> >
>
>
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