Short-time heat content asymptotics via the wave and eikonal equations

Abstract

In this short paper, we derive an alternative proof for some known [van den Berg & Gilkey 2015] short-time asymptotics of the heat content in compact full-dimensional submanifolds S with smooth boundary. This includes formulae like equation* ∫S (t)( f 1S)\, dx = ∫S f \,dx - tπ ∫∂ S f \,dA + o( t), t → 0\,. equation* and (partially new) explicit expressions for similar expansions involving other powers of t. By the same method, we also obtain short-time asymptotics of ∫S (tmm)(f 1S)\, dx, m ∈ N, and more generally for one-parameter families of operators t k(-t) defined by an even Schwartz function k.