Markov processes with product-form stationary distribution

Krzysztof Burdzy (University of Washington)
David White (Belmont University)

Abstract


We consider a continuous time Markov process $(X,L)$, where $X$ jumps between a finite number of states and $L$ is a piecewise linear process with state space $\mathbb{R}^d$. The process $L$ represents an "inert drift" or "reinforcement." We find sufficient and necessary conditions for the process $(X,L)$ to have a stationary distribution of the product form, such that the marginal distribution of $L$ is Gaussian. We present a number of conjectures for processes with a similar structure but with continuous state spaces.

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Pages: 614-627

Publication Date: December 8, 2008

DOI: 10.1214/ECP.v13-1428

References

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