Transience/Recurrence and Growth Rates for Diffusion Processes in Time-Dependent Domains

Abstract

Let K⊂ Rd, d2, be a smooth, bounded domain satisfying 0∈K, and let f(t),\ t0, be a smooth, continuous, nondecreasing function satisfying f(0)>1. Define Dt=f(t)K⊂ Rd. Consider a diffusion process corresponding to the generator 12+b(x)∇ in the time-dependent domain Dt with normal reflection at the time-dependent boundary. Consider also the one-dimensional diffusion process corresponding to the generator 12d2dx2+B(x) ddx on the time-dependent domain (1,f(t)) with reflection at the boundary. We give precise conditions for transience/recurrence of the one-dimensional process in terms of the growth rates of B(x) and f(t). In the recurrent case, we also investigate positive recurrence, and in the transient case, we also consider the asymptotic growth rate of the process. Using the one-dimensional results, we give conditions for transience/recurrence of the multi-dimensional process in terms of the growth rates of B+(r), B-(r) and f(t), where B+(r)=|x|=rb(x)· x|x| and B-(r)=|x|=rb(x)· x|x|.