Spectral expansion of LQG heat trace and KPZ scaling

Abstract

Let h be a whole plane Gaussian free field, and let Ω be a bounded domain in two dimensions. We study the asymptotics as t 0 of the Liouville quantum gravity (LQG) heat trace, defined as the integral over Ω of the on-diagonal LQG heat kernel. Our main result is to show that the second term in the spectral expansion as t 0 of the expected heat trace is governed by a nontrivial exponent, given by the KPZ (Knizhnik--Polyakov--Zamolodchikov) relation. A similar but stronger (almost sure) result applies to the related notion of heat content. Along the way we obtain various results on the short-term behaviour of the heat kernel, notably solving a conjecture of BW concerning its annealed asymptotics, and showing the finiteness of all moments of the properly rescaled heat kernel.