[petsc-users] LU factorization and solution of independent matrices does not scale, why?
Jed Brown
jedbrown at mcs.anl.gov
Fri Dec 21 08:08:14 CST 2012
MUMPS uses MPI_Iprobe on MPI_COMM_WORLD (hard-coded). What MPI
implementation have you been using? Is the behavior different with a
different implementation?
On Fri, Dec 21, 2012 at 2:36 AM, Thomas Witkowski <
thomas.witkowski at tu-dresden.de> wrote:
> Okay, I did a similar benchmark now with PETSc's event logging:
>
> UMFPACK
> 16p: Local solve 350 1.0 2.3025e+01 1.1 5.00e+04 1.0 0.0e+00
> 0.0e+00 7.0e+02 63 0 0 0 52 63 0 0 0 51 0
> 64p: Local solve 350 1.0 2.3208e+01 1.1 5.00e+04 1.0 0.0e+00
> 0.0e+00 7.0e+02 60 0 0 0 52 60 0 0 0 51 0
> 256p: Local solve 350 1.0 2.3373e+01 1.1 5.00e+04 1.0 0.0e+00
> 0.0e+00 7.0e+02 49 0 0 0 52 49 0 0 0 51 1
>
> MUMPS
> 16p: Local solve 350 1.0 4.7183e+01 1.1 5.00e+04 1.0 0.0e+00
> 0.0e+00 7.0e+02 75 0 0 0 52 75 0 0 0 51 0
> 64p: Local solve 350 1.0 7.1409e+01 1.1 5.00e+04 1.0 0.0e+00
> 0.0e+00 7.0e+02 78 0 0 0 52 78 0 0 0 51 0
> 256p: Local solve 350 1.0 2.6079e+02 1.1 5.00e+04 1.0 0.0e+00
> 0.0e+00 7.0e+02 82 0 0 0 52 82 0 0 0 51 0
>
>
> As you see, the local solves with UMFPACK have nearly constant time with
> increasing number of subdomains. This is what I expect. The I replace
> UMFPACK by MUMPS and I see increasing time for local solves. In the last
> columns, UMFPACK has a decreasing value from 63 to 49, while MUMPS's column
> increases here from 75 to 82. What does this mean?
>
> Thomas
>
> Am 21.12.2012 02:19, schrieb Matthew Knepley:
>
> On Thu, Dec 20, 2012 at 3:39 PM, Thomas Witkowski
>> <Thomas.Witkowski at tu-dresden.**de <Thomas.Witkowski at tu-dresden.de>>
>> wrote:
>>
>>> I cannot use the information from log_summary, as I have three different
>>> LU
>>> factorizations and solve (local matrices and two hierarchies of coarse
>>> grids). Therefore, I use the following work around to get the timing of
>>> the
>>> solve I'm intrested in:
>>>
>> You misunderstand how to use logging. You just put these thing in
>> separate stages. Stages represent
>> parts of the code over which events are aggregated.
>>
>> Matt
>>
>> MPI::COMM_WORLD.Barrier();
>>> wtime = MPI::Wtime();
>>> KSPSolve(*(data->ksp_schur_**primal_local), tmp_primal,
>>> tmp_primal);
>>> FetiTimings::fetiSolve03 += (MPI::Wtime() - wtime);
>>>
>>> The factorization is done explicitly before with "KSPSetUp", so I can
>>> measure the time for LU factorization. It also does not scale! For 64
>>> cores,
>>> I takes 0.05 seconds, for 1024 cores 1.2 seconds. In all calculations,
>>> the
>>> local coarse space matrices defined on four cores have exactly the same
>>> number of rows and exactly the same number of non zero entries. So, from
>>> my
>>> point of view, the time should be absolutely constant.
>>>
>>> Thomas
>>>
>>> Zitat von Barry Smith <bsmith at mcs.anl.gov>:
>>>
>>>
>>> Are you timing ONLY the time to factor and solve the subproblems? Or
>>>> also the time to get the data to the collection of 4 cores at a time?
>>>>
>>>> If you are only using LU for these problems and not elsewhere in
>>>> the
>>>> code you can get the factorization and time from MatLUFactor() and
>>>> MatSolve() or you can use stages to put this calculation in its own
>>>> stage
>>>> and use the MatLUFactor() and MatSolve() time from that stage.
>>>> Also look at the load balancing column for the factorization and solve
>>>> stage, it is well balanced?
>>>>
>>>> Barry
>>>>
>>>> On Dec 20, 2012, at 2:16 PM, Thomas Witkowski
>>>> <thomas.witkowski at tu-dresden.**de <thomas.witkowski at tu-dresden.de>>
>>>> wrote:
>>>>
>>>> In my multilevel FETI-DP code, I have localized course matrices, which
>>>>> are defined on only a subset of all MPI tasks, typically between 4
>>>>> and 64
>>>>> tasks. The MatAIJ and the KSP objects are both defined on a MPI
>>>>> communicator, which is a subset of MPI::COMM_WORLD. The LU
>>>>> factorization of
>>>>> the matrices is computed with either MUMPS or superlu_dist, but both
>>>>> show
>>>>> some scaling property I really wonder of: When the overall problem
>>>>> size is
>>>>> increased, the solve with the LU factorization of the local matrices
>>>>> does
>>>>> not scale! But why not? I just increase the number of local matrices,
>>>>> but
>>>>> all of them are independent of each other. Some example: I use 64
>>>>> cores,
>>>>> each coarse matrix is spanned by 4 cores so there are 16 MPI
>>>>> communicators
>>>>> with 16 coarse space matrices. The problem need to solve 192 times
>>>>> with the
>>>>> coarse space systems, and this takes together 0.09 seconds. Now I
>>>>> increase
>>>>> the number of cores to 256, but let the local coarse space be defined
>>>>> again
>>>>> on only 4 cores. Again, 192 solutions with these coarse spaces are
>>>>> required, but now this takes 0.24 seconds. The same for 1024 cores,
>>>>> and we
>>>>> are at 1.7 seconds for the local coarse space solver!
>>>>>
>>>>> For me, this is a total mystery! Any idea how to explain, debug and
>>>>> eventually how to resolve this problem?
>>>>>
>>>>> Thomas
>>>>>
>>>>
>>>>
>>>>
>>>
>>
>> --
>> 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
>>
>
>
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