Drift parameter estimation in stochastic differential equation with multiplicative stochastic volatility

Abstract

We consider a stochastic differential equation of the form \[dXt=θ a(t,Xt)\,dt+σ1(t,Xt)σ2(t,Yt)\,dWt\] with multiplicative stochastic volatility, where Y is some adapted stochastic process. We prove existence--uniqueness results for weak and strong solutions of this equation under various conditions on the process Y and the coefficients a, σ1, and σ2. Also, we study the strong consistency of the maximum likelihood estimator for the unknown parameter θ. We suppose that Y is in turn a solution of some diffusion SDE. Several examples of the main equation and of the process Y are provided supplying the strong consistency.