Convergences and projection Markov property of Markov processes on ultrametric spaces

Abstract

Let (S,) be an ultrametric space with certain conditions and Sk be the quotient space of S with respect to the partition by balls with a fixed radius φ(k). We prove that, for a Hunt process X on S associated with a Dirichlet form ( E, F), a Hunt process Xk on Sk associated with the averaged Dirichlet form ( Ek, Fk) is Mosco convergent to X, and under certain additional conditions, Xk converges weakly to X. Moreover, we give a sufficient condition for the Markov property of X to be preserved under the canonical projection πk to Sk. In this case, we see that the projected process πk X is identical in law to Xk and converges weakly to X.