Pruning Galton-Watson Trees and Tree-valued Markov Processes

Abstract

We present a new pruning procedure on discrete trees by adding marks on the nodes of trees. This procedure allows us to construct and study a tree-valued Markov process \ G(u)\ by pruning Galton-Watson trees and an analogous process \ G*(u)\ by pruning a critical or subcritical Galton-Watson tree conditioned to be infinite. Under a mild condition on offspring distributions, we show that the process \ G(u)\ run until its ascension time has a representation in terms of \ G*(u)\. A similar result was obtained by Aldous and Pitman (1998) in the special case of Poisson offspring distributions where they considered uniform pruning of Galton-Watson trees by adding marks on the edges of trees.