Feynman-Kac formula for perturbations of order $\leq 1$ and noncommutative geometry

TL;DR

This paper extends the Feynman-Kac formula to certain non-self-adjoint differential operators of order ≤ 1 on complex vector bundles over Riemannian manifolds, with applications to noncommutative geometry and localization formulas.

Contribution

It provides an explicit Feynman-Kac type formula for non-self-adjoint first-order perturbations, generalizing classical results and applying to equivariant Chern characters in noncommutative geometry.

Findings

Derived a Feynman-Kac formula for non-self-adjoint operators of order ≤ 1.

Connected probabilistic representations to equivariant Chern characters.

Applied results to localization formulas on loop spaces.

Abstract

Let $Q$ be a differential operator of order $\leq 1$ on a complex metric vector bundle $\mathscr{E}\to \mathscr{M}$ with metric connection $\nabla$ over a possibly noncompact Riemannian manifold $\mathscr{M}$. Under very mild regularity assumptions on $Q$ that guarantee that $\nabla^{\dagger}\nabla/2+Q$ generates a holomorphic semigroup $\mathrm{e}^{-zH^{\nabla}_{Q}}$ in $\Gamma_{L^2}(\mathscr{M},\mathscr{E})$ (where $z$ runs through a complex sector which contains $[0,\infty)$), we prove an explicit Feynman-Kac type formula for $\mathrm{e}^{-tH^{\nabla}_{Q}}$, $t>0$, generalizing the standard self-adjoint theory where $Q$ is a self-adjoint zeroth order operator. For compact $\mathscr{M}$'s we combine this formula with Berezin integration to derive a Feynman-Kac type formula for an operator trace of the form $$ \mathrm{Tr}\left(\widetilde{V}\int^t_0\mathrm{e}^{-sH^{\nabla}_{V}}P\mathrm{e}^{-(t-s)H^{\nabla}_{V}}\mathrm{d} s\right), $$ where $V,\widetilde{V}$ are of zeroth order and $P$ is of order $\leq 1$. These formulae are then used to obtain a probabilistic representations of the lower order terms of the equivariant Chern character (a differential graded extension of the JLO-cocycle) of a compact even-dimensional Riemannian spin manifold, which in combination with cyclic homology play a crucial role in the context of the Duistermaat-Heckmann localization formula on the loop space of such a manifold.