Asymptotic property of the occupation measures in a multi-dimensional skip-free Markov modulated random walk

Abstract

We consider a discrete-time d-dimensional process \Xn\=\(X1,n,X2,n,...,Xd,n)\ on Zd with a background process \Jn\ on a countable set S0, where individual processes \Xi,n\,i∈\1,2,...,d\, are skip free. We assume that the joint process \Yn\=\(Xn,Jn)\ is Markovian and that the transition probabilities of the d-dimensional process \Xn\ vary according to the state of the background process \Jn\. This modulation is assumed to be space homogeneous. We refer to this process as a d-dimensional skip-free Markov modulate random walk. For y, y'∈ Z+d× S0, consider the process \Yn\n 0 starting from the state y and let qy,y' be the expected number of visits to the state y' before the process leaves the nonnegative area Z+d× S0 for the first time. For y=(x,j)∈ Z+d× S0, the measure (qy,y'; y'=(x',j')∈ Z+d× S0) is called an occupation measure. Our primary aim is to obtain the asymptotic decay rate of the occupation measure as x' go to infinity in a given direction. We also obtain the convergence domain of the matrix moment generating function of the occupation measures.