| Flexible and multi‐shift induced dimension reduction algorithms for solving large sparse linear systems MB van Gijzen, GLG Sleijpen, JPM Zemke Numerical Linear Algebra with Applications 22 (1), 1-25, 2015 | 52 | 2015 |
| b4m: A free interval arithmetic toolbox for MATLAB based on BIAS J Zemke Technical report, Technische Universitaet Hamburg, 0 | 33* | |
| Eigenvalue computations based on IDR MH Gutknecht, JPM Zemke SIAM Journal on Matrix Analysis and Applications 34 (2), 283-311, 2013 | 32 | 2013 |
| Krylov subspace methods in finite precision: a unified approach JPM Zemke | 29 | 2003 |
| On eigenvector bounds SM Rump, JPM Zemke BIT Numerical Mathematics 43, 823-837, 2003 | 25 | 2003 |
| Hessenberg eigenvalue–eigenmatrix relations JPM Zemke Linear algebra and its applications 414 (2-3), 589-606, 2006 | 24 | 2006 |
| IDR: A new generation of Krylov subspace methods? O Rendel, A Rizvanolli, JPM Zemke Linear Algebra and its Applications 439 (4), 1040-1061, 2013 | 15 | 2013 |
| Abstract perturbed Krylov methods JPM Zemke Linear algebra and its applications 424 (2-3), 405-434, 2007 | 13 | 2007 |
| An augmented analysis of the perturbed two-sided Lanczos tridiagonalization process CC Paige, I Panayotov, JPM Zemke Linear Algebra and its Applications 447, 119-132, 2014 | 12 | 2014 |
| Variants of IDR with partial orthonormalization JPM Zemke Preprints des Institutes für Mathematik, 2016 | 4 | 2016 |
| How orthogonality is lost in Krylov methods JPM Zemke Symbolic Algebraic Methods and Verification Methods, 255-266, 2001 | 2 | 2001 |
| On structured pencils arising in Sonneveld methods JPM Zemke | 1 | 2014 |
| Quasi‐Minimal Residual Eigenpairs JPM Zemke PAMM: Proceedings in Applied Mathematics and Mechanics 8 (1), 10835-10836, 2008 | | 2008 |
| Polynomial representations from abstract perturbed Krylov methods JPM Zemke PAMM: Proceedings in Applied Mathematics and Mechanics 6 (1), 725-726, 2006 | | 2006 |
Martin van GijzenDelft University of TechnologyE-mail confirmado em TUDelft.nl
