Polyakov Loop in Non-covariant Operator Formalism
Abstract
We discuss a Polyakov loop in non-covariant operator formalism which consists of only physical degrees of freedom at finite temperature. It is pointed out that although the Polyakov loop is expressed by a Euclidean time component of gauge fields in a covariant path integral formalism, there is no direct counterpart of the Polyakov loop operator in the operator formalism because the Euclidean time component of gauge fields is not a physical degree of freedom. We show that by starting with an operator which is constructed in terms of only physical operators in the non-covariant operator formalism, the vacuum expectation value of the operator calculated by trace formula can be rewritten into a familiar form of an expectation value of Polyakov loop in a covariant path integral formalism at finite temperature for the cases of axial and Coulomb gauge.
Cite
@article{arxiv.1612.06660,
title = {Polyakov Loop in Non-covariant Operator Formalism},
author = {Makoto Sakamoto and Kazunori Takenaga},
journal= {arXiv preprint arXiv:1612.06660},
year = {2019}
}
Comments
31 pages, version to appear in Prog.Theor.Exp.Phys, report number corrected