The M\"obius Domain Wall Fermion Algorithm
Abstract
We present a review of the properties of generalized domain wall Fermions, based on a (real) M\"obius transformation on the Wilson overlap kernel, discussing their algorithmic efficiency, the degree of explicit chiral violations measured by the residual mass () and the Ward-Takahashi identities. The M\"obius class interpolates between Shamir's domain wall operator and Bori\c{c}i's domain wall implementation of Neuberger's overlap operator without increasing the number of Dirac applications per conjugate gradient iteration. A new scaling parameter () reduces chiral violations at finite fifth dimension () but yields exactly the same overlap action in the limit . Through the use of 4d Red/Black preconditioning and optimal tuning for the scaling , we show that chiral symmetry violations are typically reduced by an order of magnitude at fixed . At large we argue that the observed scaling for for Shamir is replaced by for the properly tuned M\"obius algorithm with
Cite
@article{arxiv.1206.5214,
title = {The M\"obius Domain Wall Fermion Algorithm},
author = {Richard C. Brower and Harmut Neff and Kostas Orginos},
journal= {arXiv preprint arXiv:1206.5214},
year = {2014}
}
Comments
59 pages, 11 figures