Random walk on a quadrant: mapping to a one-dimensional level-dependent Quasi-Birth-and-Death process (LD-QBD)

Abstract

We consider a neighbourhood random walk on a quadrant, \(X1(t),X2(t),(t)):t≥ 0\, with state space eqnarray* S&=&\(n,m,i):n,m=0,1,2,…;i=1,2,…,k(n,m)\. eqnarray* Assuming start in state (n,m,i), the process spends exponentially distributed amount of time in (n,m,i) according to some parameter λi(n,m). Upon leaving state (n,m,i) the process moves to some state (n',m',j) with j∈\1,…,k(n',m')\ and n'∈\n-1,n,n+1\, m'∈\m-1,m,m+1\, according to some probabilities (pn;am;b)i,j with a,b∈\+,-,0\. We transform this process into a one-dimensional LD-QBD \(Z(t),(t)):t≥ 0\ with level variable Z(t) and phase variable (t). Using this transform we find its transient and stationary analysis using matrix-analytic methods, as well as the distribution at first hitting times.