Heat Kernel Asymptotics, Path Integrals and Infinite-Dimensional Determinants

TL;DR

This paper explores the short-time asymptotics of the heat kernel on Riemannian manifolds, linking it to infinite-dimensional determinants and path integrals, and relates these to zeta determinants and behavior at the cut locus.

Contribution

It establishes a connection between heat kernel asymptotics and Fredholm determinants of the Hessian of the energy functional, providing a formal path integral interpretation.

Findings

Lowest order heat kernel term given by Fredholm determinant

Relation between heat kernel asymptotics and zeta determinants

Analysis of near-diagonal and cut locus behavior

Abstract

We investigate the short-time expansion of the heat kernel of a Laplace type operator on a compact Riemannian manifold and show that the lowest order term of this expansion is given by the Fredholm determinant of the Hessian of the energy functional on a space of finite energy paths. This is the asymptotic behavior to be expected from formally expressing the heat kernel as a path integral and then (again formally) using Laplace's method on the integral. We also relate this to the zeta determinant of the Jacobi operator, which is another way to assign a determinant to the Hessian of the energy functional. We consider both the near-diagonal asymptotics as well as the behavior at the cut locus.