Markov-modulated Ornstein–Uhlenbeck processes Article Swipe

PDF

Related Concepts

Ornstein–Uhlenbeck process Mathematics Recursion (computer science) Markov process Laplace transform Markov chain Applied mathematics Limit (mathematics) State space Statistical physics Stochastic process Pure mathematics Discrete mathematics Mathematical analysis Algorithm Physics Statistics

Gang Huang , H. M. Jansen , M. Mandjes , Peter Spreij , Koen De Turck ·

YOU? · · 2016 · Open Access · · DOI: https://doi.org/10.1017/apr.2015.15 · OA: W240227400

In this paper we consider an Ornstein–Uhlenbeck (OU) process ( M ( t )) t ≥0 whose parameters are determined by an external Markov process ( X ( t )) t ≥0 on a finite state space {1, . . ., d }; this process is usually referred to as Markov-modulated Ornstein–Uhlenbeck . We use stochastic integration theory to determine explicit expressions for the mean and variance of M ( t ). Then we establish a system of partial differential equations (PDEs) for the Laplace transform of M ( t ) and the state X ( t ) of the background process, jointly for time epochs t = t 1 , . . ., t K . Then we use this PDE to set up a recursion that yields all moments of M ( t ) and its stationary counterpart; we also find an expression for the covariance between M ( t ) and M ( t + u ). We then establish a functional central limit theorem for M ( t ) for the situation that certain parameters of the underlying OU processes are scaled, in combination with the modulating Markov process being accelerated; interestingly, specific scalings lead to drastically different limiting processes. We conclude the paper by considering the situation of a single Markov process modulating multiple OU processes.