DOI10.1137/040608246zbMath1105.65049OpenAlexW1995078768MaRDI QIDQ5470389
Reinhard Nabben, Kees Vuik
Publication date: 30 May 2006
Published in: SIAM Journal on Scientific Computing (Search for Journal in Brave)
Full work available at URL: https://semanticscholar.org/paper/09f22c6e95cb68fabdb9dd9033dd554b17ad9d2a
A Dimension-Oblivious Domain Decomposition Method Based on Space-Filling Curves,
On deflation and singular symmetric positive semi-definite matrices,
Avoiding singular coarse grid systems,
Scalable multi-level deflation preconditioning for highly indefinite time-harmonic waves,
Comparison of two-level preconditioners derived from deflation, domain decomposition and multigrid methods,
Deflation and projection methods applied to symmetric positive semi-definite systems,
Deflated and augmented global Krylov subspace methods for the matrix equations,
Deflation techniques applied on mixed model equations,
On the Spectrum of Deflated Matrices with Applications to the Deflated Shifted Laplace Preconditioner for the Helmholtz Equation,
Subdomain deflation combined with local AMG: a case study using AMGCL library,
The deflated conjugate gradient method: convergence, perturbation and accuracy,
Adaptive FETI-DP and BDDC methods with a generalized transformation of basis for heterogeneous problems,
Overlap domain decomposition method for bioluminescence tomography (BLT),
A massively parallel solver for discrete Poisson-like problems,
A coarse space for heterogeneous Helmholtz problems based on the Dirichlet-to-Neumann operator,
Projections, Deflation, and Multigrid for Nonsymmetric Matrices,
Coarse spaces for FETI-DP and BDDC methods for heterogeneous problems: connections of deflation and a generalized transformation-of-basis approach,
Adaptive Coarse Spaces for FETI-DP in Three Dimensions,
KRYLOV SUBSPACE METHODS WITH DEFLATION AND BALANCING PRECONDITIONERS FOR LEAST SQUARES PROBLEMS,
The Multilevel Krylov-Multigrid Method for the Helmholtz Equation Preconditioned by the Shifted Laplacian
