Add to ORKGSolution of sequences of complex symmetric linear systems of the form Ajxj = bj, j = 0,..., s, Aj = A + αjEj, A Hermitian, E0, ..., E a complex diagonal matrices and α0, ..., αa scalar complex parameters arise in a variety of challenging problems. This is the case of time dependent PDEs; lattice gauge computations in quantum chromodynamics; the Helmholtz equation; shift-and-invert and Jacobi-Davidson algorithms for large-scale eigenvalue calculations; problems in control theory and many others. If A is symmetric and has real entries then Aj is complex symmetric. The case A Hermitian positive semideflnite, Re(αj) ≥ 0 and such that the diagonal entries of E j, j = 0,..., s have nonnegative real part is considered here. Some strategies based o...
We propose a preconditioned variant of the modified HSS (MHSS) iteration method for solving a class ...
We consider symmetric preconditioning strategies for the iterative solution of dense complex symmetr...
We present a technique for building effective and low cost preconditioners for sequences of shifted ...
Solution of sequences of complex symmetric linear systems of the form Ajxj = bj, j = 0,..., s, Aj = ...
A new polynomial preconditioner for symmetric complex linear systems based on Hermitian and skew-Her...
We consider the solution of sequences of linear systems A(i)x = b(i), i = 1,..., where A(i) ∈ Rn×n ...
We revisit real-valued preconditioned iterative methods for the solution of complex linear systems, ...
The aim of this survey is to review some recent developments in devising efficient preconditioners f...
Incomplete factorizations are popular preconditioning techniques for solving large and sparse linear...
We propose a class of preconditioners for symmetric linear systems arising from numerical analysis a...
We propose a framework for building preconditioners for sequences of linear systems of the form $(A+...
We propose a framework for building preconditioners for sequences of linear systems of the form (A+Δ...
We consider conjugate gradient type methods for the solution of large sparse linear system Ax equals...
Based on the MHSS (Modified Hermitian and skew-Hermitian splitting) and preconditioned MHSS methods,...
We propose a preconditioned variant of the modified HSS (MHSS) iteration method for solving a class ...
We consider symmetric preconditioning strategies for the iterative solution of dense complex symmetr...
We present a technique for building effective and low cost preconditioners for sequences of shifted ...
Solution of sequences of complex symmetric linear systems of the form Ajxj = bj, j = 0,..., s, Aj = ...
A new polynomial preconditioner for symmetric complex linear systems based on Hermitian and skew-Her...
We consider the solution of sequences of linear systems A(i)x = b(i), i = 1,..., where A(i) ∈ Rn×n ...
We revisit real-valued preconditioned iterative methods for the solution of complex linear systems, ...
The aim of this survey is to review some recent developments in devising efficient preconditioners f...
Incomplete factorizations are popular preconditioning techniques for solving large and sparse linear...
We propose a class of preconditioners for symmetric linear systems arising from numerical analysis a...
We propose a framework for building preconditioners for sequences of linear systems of the form $(A+...
We propose a framework for building preconditioners for sequences of linear systems of the form (A+Δ...
We consider conjugate gradient type methods for the solution of large sparse linear system Ax equals...
Based on the MHSS (Modified Hermitian and skew-Hermitian splitting) and preconditioned MHSS methods,...
We propose a preconditioned variant of the modified HSS (MHSS) iteration method for solving a class ...
We consider symmetric preconditioning strategies for the iterative solution of dense complex symmetr...
We present a technique for building effective and low cost preconditioners for sequences of shifted ...