Inverse problems for random walks on trees: network tomography
Abstract
Let G be a finite tree with root r and associate to the internal vertices of G a collection of transition probabilities for a simple nondegenerate Markov chain. Embedd G into a graph G constructed by gluing finite linear chains of length at least 2 to the terminal vertices of G. Then G admits distinguished boundary layers and the transition probabilities associated to the internal vertices of G can be augmented to define a simple nondegenerate Markov chain X on the vertices of G. We show that the transition probabilities of X can be recovered from the joint distribution of first hitting time and first hitting place of X started at the root r for the distinguished boundary layers of G.
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