AbstractThis paper introduces several strategies to deal with pivot blocks in multi-level block incomplete LU factorization (BILUM) preconditioning techniques. These techniques are aimed at increasing the robustness and controlling the amount of fill-ins of BILUM for solving large sparse linear systems when large-size blocks are used to form block-independent set. Techniques proposed in this paper include double-dropping strategies, approximate singular-value decomposition, variable size blocks and use of an arrowhead block submatrix. We point out the advantages and disadvantages of these strategies and discuss their efficient implementations. Numerical experiments are conducted to show the usefulness of the new techniques in dealing with h...
Incomplete LU (ILU) factorizations are popular preconditioning techniques for solving large linear s...
A novel parallel preconditioner combining a generalized Factored Sparse Approximate Inverse (FSAI) w...
University of Minnesota Ph.D. dissertation. December 2011. Major: Scientific Computation. Advisor: ...
AbstractThis paper introduces several strategies to deal with pivot blocks in multi-level block inco...
We introduce block versions of the multi-elimination incomplete LU (ILUM) factorization precondition...
This paper describes a domain-based multi-level block ILU preconditioner (BILUTM) for solving genera...
We investigate the use of sparse approximate inverse techniques in a multilevel block ILU preconditi...
Abstract. This paper describes a domain-based multilevel block ILU preconditioner (BILUTM) for solvi...
We present a class of parallel preconditioning strategies built on a multilevel block incomplete LU ...
This article surveys preconditioning techniques for the iterative solution of large linear systems, ...
A multi-level preconditioned iterative method based on a multi-level block ILU factorization precond...
This paper introduces techniques based on diagonal threshold tolerance when developing multi-elimina...
We present a new supernode-based incomplete LU factorization method to construct a preconditioner fo...
Incomplete LU (ILU) preconditioning is typically used when an iterative solver is applied on an asym...
We consider a new element-by-element algebraic multilevel block-ILU preconditioner for linear system...
Incomplete LU (ILU) factorizations are popular preconditioning techniques for solving large linear s...
A novel parallel preconditioner combining a generalized Factored Sparse Approximate Inverse (FSAI) w...
University of Minnesota Ph.D. dissertation. December 2011. Major: Scientific Computation. Advisor: ...
AbstractThis paper introduces several strategies to deal with pivot blocks in multi-level block inco...
We introduce block versions of the multi-elimination incomplete LU (ILUM) factorization precondition...
This paper describes a domain-based multi-level block ILU preconditioner (BILUTM) for solving genera...
We investigate the use of sparse approximate inverse techniques in a multilevel block ILU preconditi...
Abstract. This paper describes a domain-based multilevel block ILU preconditioner (BILUTM) for solvi...
We present a class of parallel preconditioning strategies built on a multilevel block incomplete LU ...
This article surveys preconditioning techniques for the iterative solution of large linear systems, ...
A multi-level preconditioned iterative method based on a multi-level block ILU factorization precond...
This paper introduces techniques based on diagonal threshold tolerance when developing multi-elimina...
We present a new supernode-based incomplete LU factorization method to construct a preconditioner fo...
Incomplete LU (ILU) preconditioning is typically used when an iterative solver is applied on an asym...
We consider a new element-by-element algebraic multilevel block-ILU preconditioner for linear system...
Incomplete LU (ILU) factorizations are popular preconditioning techniques for solving large linear s...
A novel parallel preconditioner combining a generalized Factored Sparse Approximate Inverse (FSAI) w...
University of Minnesota Ph.D. dissertation. December 2011. Major: Scientific Computation. Advisor: ...