Brownian loops on non-smooth surfaces and the Polyakov-Alvarez formula

Abstract

Let be compactly supported on D ⊂ R2. Endow R2 with the metric e(dx12 + dx22). As δ 0 the set of Brownian loops centered in D with length at least δ has measure area(D)2π δ + 148π(,)∇+ o(1). When is smooth, this follows from the classical Polyakov-Alvarez formula. We show that the above also holds if is not smooth, e.g. if is only Lipschitz. This fact can alternatively be expressed in terms of heat kernel traces, eigenvalue asymptotics, or zeta regularized determinants. Variants of this statement apply to more general non-smooth manifolds on which one considers all loops (not only those centered in a domain D). We also show that the o(1) error is uniform for any family of satisfying certain conditions. This implies that if we weight a measure on this family by the (δ-truncated) Brownian loop soup partition function, and take the vague δ 0 limit, we obtain a measure whose Radon-Nikodym derivative with respect to is ( 148π(,)∇). When the measure is a certain regularized Liouville quantum gravity measure, a companion work [APPS20] shows that this weighting has the effect of changing the so-called central charge of the surface.