A Weak Limit Shape Theorem For Planar Isotropic Brownian Flows

Abstract

It has been shown by various authors under different assumptions that the diameter of a bounded non-trivial set γ under the action of a stochastic flow grows linearly in time. We show that the asymptotic linear expansion speed if properly defined is deterministic i.e. we show for a 2-dimensional isotropic Brownian flow with a positive Lyapunov exponent that there exists a non-random set B such that we have for ε>0, arbitrary connected γ⊂⊂2 consisting of at least two different points and arbitrarily large times T that (1-ε)TB⊂ 0≤ t≤ Tx∈γ 0,t(x)⊂(1+ε)TB.