Wong--Zakai approximations with convergence rate for stochastic differential equations with regime switching

Abstract

We construct Wong--Zakai approximations of time--inhomogeneous stochastic differential equations with regime switching (RSSDEs), and provide a convergence rate. %Given a family of finite-variation processes \Fλ\λ 0 that converge strongly to a standard Brownian motion B, we construct pathwise approximations for regime-switching, time-inhomogeneous stochastic differential equations in the Wong-Zakai sense. Moreover, we determine the rate of strong convergence to the solutions of such regime-switching SDEs, showing that this rate is almost as good as that of \Fλ\λ 0 to B. In the proposed approximations, the standard Brownian motion driving the time-inhomogeneous RSSDEs is replaced by a family of finite--variation processes \Fλ\λ > 0. We show that if Fλ strongly converges to B at rate δ(λ), then the Wong--Zakai approximation strongly converges to the original solution of the time--inhomogeneous RSSDE at rate δ(λ) λ, for any > 0. This is the first paper on Wong--Zakai approximations for time--inhomogeneous RSSDEs, and significantly extends the counterparts for time--homogeneous SDEs without regime switching in R\"omisch and Wakolbinger (1985).

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