Construction of distorted Brownian motion with permeable sticky behaviour on sets with Lebesgue measure zero

Abstract

The starting point is a gradient Dirichlet form with respect to λd on the space L2(Rd, μ). Here λd is the Lebesgue measure on Rd, a strictly positive density and μ puts weight on a set A⊂ Rd with Lebesgue measure zero. We show that the Dirichlet form admits an associated stochastic process X. We derive an explicit representation of the corresponding generator if A is a Lipschitz boundary. This representation together with the Fukushima decomposition identifies X as a distorted Brownian motion with drift given by the logarithmic derivative of in Rd A. Furthermore, we prove X to be irreducible and recurrent. Finally, via ergodicity we prove positive s\'ejour time of X on A. Hence we obtain a stochastic process X with permeable sticky behaviour on A.

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