Stochastic selection problem for a Stratonovich SDE with power non-linearity

Abstract

In our paper [Bernoulli 26(2), 2020, 1381-1409], we found all strong Markov solutions that spend zero time at 0 of the Stratonovich stochastic differential equation d X=|X|α dB, α∈ (0,1). These solutions have the form Xtθ=F(Bθt), where F(x)=11-α|x|1/(1-α)sign\, x and Bθ is the skew Brownian motion with skewness parameter θ∈ [-1,1] starting at F-1(X0). In this paper we show how an addition of small external additive noise W restores uniqueness. In the limit as 0, we recover heterogeneous diffusion corresponding to the physically symmetric case θ=0.