A Lanczos-type method for solving nonsymmetric linear systems with multiple right-hand sides — matrix and polynomial interpretation

s) Block IDR(s) a b s t r a c t The IDR(s) based on the induced dimension reduction (IDR) theorem, is a new class of efficient algorithms for large nonsymmetric linear systems. IDR(1) is mathematically equivalent to BiCGStab at the even IDR(1) residuals, and IDR(s) with s > 1 is competitive with mos

The EN method proposed by Eirola and Nevanlinna is extended to a block version for solving nonsymmetric linear systems with multiple right-hand sides. Some basic properties of the block-EN method are shown. We use the deflation technique in the block-EN method to delete linearly dependent vectors in

By transforming nonsymmetric linear systems to the extended skew-symmetric ones, we present the skew-symmetric methods for solving nonsymmetric linear systems with multiple right-hand sides. These methods are based on the block and global Arnoldi algorithm which is formed by implementing orthogonal

This paper presents an iterative algorithm for solving non-symmetric systems of equations with multiple righthand sides. The algorithm is an extension of the Generalised Conjugate Residual method (GCR) and combines the advantages of a direct solver with those of an iterative solver: it does not have