Finite Density $QED_{1+1}$ Near Lefschetz Thimbles
High Energy Physics - Lattice
2018-09-12 v1 Statistical Mechanics
Strongly Correlated Electrons
Abstract
One strategy for reducing the sign problem in finite-density field theories is to deform the path integral contour from real to complex fields. If the deformed manifold is the appropriate combination of Lefschetz thimbles -- or somewhat close to them -- the sign problem is alleviated. Gauge theories lack a well-defined thimble decomposition, and therefore it is unclear how to carry out a generalized thimble method. In this paper we discuss some of the conceptual issues involved by applying this method to at finite density, showing that the generalized thimble method yields correct results with less computational effort than standard methods.
Keywords
Cite
@article{arxiv.1807.02027,
title = {Finite Density $QED_{1+1}$ Near Lefschetz Thimbles},
author = {Andrei Alexandru and Gokce Basar and Paulo F. Bedaque and Henry Lamm and Scott Lawrence},
journal= {arXiv preprint arXiv:1807.02027},
year = {2018}
}
Comments
9 Pages, 8 Figures