Small time asymptotics of spectral heat content of isotropic processes

Abstract

The spectral heat content of a domain ⊂Rd corresponding to a d-dimensional stochastic process X=(Xt)t 0 is defined as \[QX(t)=∫Rd Px(τX>t)dx,\] where τX is the first exit time of X from . We provide a novel technique for proving small time asymptotic of spectral heat content for any translation invariant isotropic process satisfying negligible tail probability condition. As a consequence, we recover several existing results in the context of L\'evy processes and Gaussian processes, and provide spectral heat content asymptotics for a class of α-stable L\'evy processes time-changed by right inverse of positive, increasing, self-similar Markov processes. The latter has connection to some Cauchy problems that are non-local in both time and space.

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