On the spectral radius of the (L,)-lazy Markov chain

Abstract

We consider an (L,)-lazy operation on an irreducible Markov transition probability P with state space S where L ⊂ S and ∈[0,1). For each x ∈ L and y∈ S, this (L,)-operation replaces P(x,y), the transition probability from x to y, by 1\x=y\ + (1-)P(x,y). We are interested in how L and influence the spectral radius L of this new transition probability. We first show that L is non-decreasing and continuous in . We then show that: (1) If L is nonempty and finite, then P being rho-transient is equivalent to that the growth of (L)∈[0,1) exhibits a phase transition: There exists a critical value c(L) ∈ (0,1) such that L is a constant on [0,c(L)] and increases strictly on [c(L),1); (2) For every ∈(0,1), if S L is nonempty and finite, then L=S if and only if P is not strictly rho-recurrent.