A unified approach to the small-time behavior of the spectral heat content for isotropic L\'evy processes

Abstract

This paper establishes the precise small-time asymptotic behavior of the spectral heat content for isotropic L\'evy processes on bounded C1,1 open sets of Rd with d 2, where the underlying characteristic exponents are regularly varying at infinity with index α∈ (1,2], including the case α=2. Moreover, this asymptotic behavior is shown to be stable under an integrable perturbation of its L\'evy measure. These results cover a wide class of isotropic L\'evy processes, including Brownian motions, stable processes, and jump diffusions, and the proofs provide a unified approach to the asymptotic behavior of the spectral heat content for all of these processes.