Abstract
We describe preliminary results from a multiobjective
graph matching algorithm, in the coarsening step of an
aggregation-based Algebraic MultiGrid (AMG) preconditioner,
for solving large and sparse linear systems of equations on highend
parallel computers. We have two objectives. First, we wish
to improve the convergence behavior of the AMG method when
applied to highly anisotropic problems. Second, we wish to extend
the parallel package PSCToolkit to exploit multi-threaded
parallelism at the node level on multi-core processors. Our
matching proposal balances the need to simultaneously compute
high weights and large cardinalities by a new formulation of
the weighted matching problem combining both these objectives
using a parameter ?. We compute the matching by a parallel
2/3 - ?-approximation algorithm for maximum weight matchings.
Results with the new matching algorithm show that for a suitable
choice of the parameter ? we compute effective preconditioners
in the presence of anisotropy, i.e., smaller solve times, setup times,
iterations counts, and operator complexity.
Anno
2023
Autori IAC
Tipo pubblicazione
Altri Autori
Pasqua D;Ambra, Fabio Durastante, S M Ferdous,Salvatore Filippone,Mahantesh Halappanavar,Alex Pothen