A Galerkin approximation scheme for the mean correction in a mean-reversion stochastic differential equation

Abstract

This paper is concerned with the following Markovian stochastic differential equation of mean-reversion type \[ dRt= (θ +σ α(Rt, t))Rt dt +σ Rt dBt \] with an initial value R0=r0∈R, where θ∈R and σ>0 are constants, and the mean correction function α:R×[0,∞) α(x,t)∈R is twice continuously differentiable in x and continuously differentiable in t. We first derive that under the assumption of path independence of the density process of Girsanov transformation for the above stochastic differential equation, the mean correction function α satisfies a non-linear partial differential equation which is known as the viscous Burgers equation. We then develop a Galerkin type approximation scheme for the function α by utilizing truncation of discretised Fourier transformation to the viscous Burgers equation.