Phase unwrapping and one-dimensional sign problems

Author(s)

Detmold, William; Kanwar, Gurtej S.; Wagman, Michael L

Abstract

Sign problems in path integrals arise when different field configurations contribute with different signs or phases. Phase unwrapping describes a family of signal processing techniques in which phase differences between elements of a time series are integrated to construct noncompact unwrapped phase differences. By combining phase unwrapping with a cumulant expansion, path integrals with sign problems arising from phase fluctuations can be systematically approximated as linear combinations of path integrals without sign problems. This work explores phase unwrapping in zero-plus-one-dimensional complex scalar field theory. Results with improved signal-to-noise ratios for the spectrum of scalar field theory can be obtained from unwrapped phases, but the size of cumulant expansion truncation errors is found to be undesirably sensitive to the parameters of the phase unwrapping algorithm employed. It is argued that this numerical sensitivity arises from discretization artifacts that become large when phases fluctuate close to singularities of a complex logarithm in the definition of the unwrapped; phase.

Date issued

2018-10

URI

http://hdl.handle.net/1721.1/118948

Department

Massachusetts Institute of Technology. Center for Theoretical Physics
Massachusetts Institute of Technology. Department of Physics

Journal

Physical Review D

Publisher

American Physical Society

Citation

Detmold, William, et al. “Phase Unwrapping and One-Dimensional Sign Problems.” Physical Review D, vol. 98, no. 7, Oct. 2018. © 2018 American Physical Society

Version: Final published version

ISSN

2470-0010

2470-0029