- A nested Krylov subspace method to compute the sign function of large complex Jacques C.R. Bloch, Simon Heybrock
- Few-Body Systems 33, 219232 (2003) DOI 10.1007/s00601-003-0018-y
- K\ and a light scalar meson J. C. R. Bloch,1
- Prepared for submission to JHEP February 21, 2011
- arXiv:0709.4630v1[hep-lat]28Sep2007 Domain-wall and overlap fermions at nonzero quark chemical potential
- Prepared for submission to JHEP BNL-94618-2011-JA, KEK-CP-251, RBRC-883
- PoS(LATTICE2007)224 Distributions of individual Dirac eigenvalues
- Individual complex Dirac eigenvalue distributions from random matrix theory and lattice QCD at nonzero chemical potential
- JHEP05(2011)115 Published for SISSA by Springer
- JHEP05(2011)048 Published for SISSA by Springer
- Random matrix analysis of the QCD sign problem Jacques Bloch and Tilo Wettig
- Preprint typeset in JHEP style -HYPER VERSION December 1, 2008 Random matrix analysis of the QCD sign problem for
- Comparing iterative methods to compute the overlap Dirac operator at nonzero chemical potential
- Nonzero chemical potential in the overlap Dirac operator and comparison to random matrix theory
- Vol. 21 no. 21 2005, pages 40264032 doi:10.1093/bioinformatics/bti662BIOINFORMATICS ORIGINAL PAPER
- Few-Body Systems 33, 111152 (2003) DOI 10.1007/s00601-003-0013-3
- Multiplicative renormalizability and quark propagator J. C. R. Bloch
- Multiplicative renormalizability of gluon and ghost propagators in QCD J. C. R. Bloch
- Selected nucleon form factors and a composite scalar diquark J. C. R. Bloch, C. D. Roberts, and S. M. Schmidt
- Nucleon form factors and a nonpointlike diquark J. C. R. Bloch,1
- Pair creation: Back reactions and damping J. C. R. Bloch,1
- Krylov subspace methods and the sign function: multishifts and deflation in the non-Hermitian case
- Evading the sign problem in random matrix simulations Jacques Bloch
- Overlap Dirac Operator at Nonzero Chemical Potential and Random Matrix Theory Jacques Bloch and Tilo Wettig
- arXiv:hep-ph/9501411v131Jan95 December, 1994 DTP-94/100
- Short-recurrence Krylov subspace methods for the overlap Dirac operator at nonzero chemical potential$
- A nested Krylov subspace method to compute the sign function of large complex Jacques C.R. Bloch, Simon Heybrock
- arXiv:hep-ph/0208074v17Aug2002 Numerical Investigation
- Memory effects and thermodynamics in strong field plasmas J. C. R. Bloch, C. D. Roberts, and S. M. Schmidt
- PoS(LATTICE2007)169 An iterative method to compute the overlap Dirac
- Nuclear Physics B 687 (2004) 76100 www.elsevier.com/locate/npe
- Describing a1 and b1 decays J. C. R. Bloch,1
- Diquark condensation and the quark-quark interaction J. C. R. Bloch, C. D. Roberts, and S. M. Schmidt
- arXiv:hep-th/0209173v120Sep2002 Vortex induced confinement and the IR
- arXiv:hep-lat/0209040v211Sep2002 Running coupling constant and propagators in SU(2) Landau gauge
- ARTICLE IN PRESS COMPHY:3410 Please cite this article in press as: J. Bloch et al., An iterative method to compute the sign function of a non-Hermitian matrix and its application to the overlap
- IOP PUBLISHING JOURNAL OF PHYSICS: CONDENSED MATTER J. Phys.: Condens. Matter 19 (2007) 335219 (7pp) doi:10.1088/0953-8984/19/33/335219
- A nested Krylov subspace method for the overlap Jacques C.R. Bloch
- Evading the sign problem in random matrix simulations
