Convergence of symmetric Markov chains on d

Abstract

For each n let Ynt be a continuous time symmetric Markov chain with state space n-1 d. A condition in terms of the conductances is given for the convergence of the Ynt to a symmetric Markov process Yt on d. We have weak convergence of \Ynt: t≤ t0\ for every t0 and every starting point. The limit process Y has a continuous part and may also have jumps.