Heterogeneous diffusion process with power-law nonlinearity

Abstract

In this paper, we study solutions of the heterogeneous diffusion process with power-law nonlinearity governed by the stochastic differential equation dXt= |Xt|α\,dBt + αλ |Xt|2α-1sign(Xt)\,dt, where α∈ (0,1) and λ∈[0,1]. The parameter α controls the nonlinear power-law profile of the diffusion coefficient, while the parameter λ specifies the interpretation of the stochastic integral in the pre-equation X=|X|α B. We demonstrate that the solutions of this equation can be represented as nonlinear transformations of a skew Bessel process with dimension δ ∈ R.

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