Heat content asymptotics of some random Koch type snowflakes

Abstract

We consider the short time asymptotics of the heat content E of a domain D of Rd. The novelty of this paper is that we consider the situation where D is a domain whose boundary ∂ D is a random Koch type curve. When ∂ D is spatially homogeneous, we show that we can recover the lower and upper Minkowski dimensions of ∂ D from the short time behaviour of E(s). Furthermore, in some situations where the Minkowski dimension exists, finer geometric fluctuations can be recovered and the heat content is controlled by sα ef((1/s)) for small s, for some α ∈ (0, ∞) and some regularly varying function f. The function f is not constant is general and carries some geometric information. When ∂ D is statistically self-similar, then the Minkowski dimension and content of ∂ D typically exist and can be recovered from E(s). Furthermore, the heat content has an almost sure expansion E(s) = c sα N∞ + o(sα) for small s, for some c and α ∈ (0, ∞) and some positive random variable N∞ with unit expectation arising as the limit of some martingale.