TY - JOUR
T1 - Quasi-Optimal Elimination Trees for 2D Grids with Singularities
AU - Paszyńska, A.
AU - Paszyński, M.
AU - Jopek, K.
AU - Woźniak, M.
AU - Goik, D.
AU - Gurgul, P.
AU - AbouEisha, Hassan M.
AU - Moshkov, Mikhail
AU - Calo, Victor M.
AU - Lenharth, A.
AU - Nguyen, D.
AU - Pingali, K.
N1 - KAUST Repository Item: Exported on 2020-10-01
PY - 2015/3/10
Y1 - 2015/3/10
N2 - We construct quasi-optimal elimination trees for 2D finite element meshes with singularities.These trees minimize the complexity of the solution of the discrete system. The computational cost estimates of the elimination process model the execution of the multifrontal algorithms in serial and in parallel shared-memory executions. Since the meshes considered are a subspace of all possible mesh partitions, we call these minimizers quasi-optimal.We minimize the cost functionals using dynamic programming. Finding these minimizers is more computationally expensive than solving the original algebraic system. Nevertheless, from the insights provided by the analysis of the dynamic programming minima, we propose a heuristic construction of the elimination trees that has cost O(log(Ne log(Ne)), where N e is the number of elements in the mesh.We show that this heuristic ordering has similar computational cost to the quasi-optimal elimination trees found with dynamic programming and outperforms state-of-the-art alternatives in our numerical experiments.
AB - We construct quasi-optimal elimination trees for 2D finite element meshes with singularities.These trees minimize the complexity of the solution of the discrete system. The computational cost estimates of the elimination process model the execution of the multifrontal algorithms in serial and in parallel shared-memory executions. Since the meshes considered are a subspace of all possible mesh partitions, we call these minimizers quasi-optimal.We minimize the cost functionals using dynamic programming. Finding these minimizers is more computationally expensive than solving the original algebraic system. Nevertheless, from the insights provided by the analysis of the dynamic programming minima, we propose a heuristic construction of the elimination trees that has cost O(log(Ne log(Ne)), where N e is the number of elements in the mesh.We show that this heuristic ordering has similar computational cost to the quasi-optimal elimination trees found with dynamic programming and outperforms state-of-the-art alternatives in our numerical experiments.
UR - http://hdl.handle.net/10754/550467
UR - http://www.hindawi.com/journals/sp/2015/303024/
UR - http://www.scopus.com/inward/record.url?scp=84925582843&partnerID=8YFLogxK
U2 - 10.1155/2015/303024
DO - 10.1155/2015/303024
M3 - Article
SN - 1058-9244
VL - 2015
SP - 1
EP - 18
JO - Scientific Programming
JF - Scientific Programming
ER -