Hitting Time and Inverse Problems for Markov Chains-Reference-Cited by-同舟云学术

Hitting Time and Inverse Problems for Markov Chains

Published:2008-09 Issue:3 Volume:45 Page:640-649
ISSN:0021-9002
Container-title:Journal of Applied Probability
language:en
Short-container-title:Journal of Applied Probability

Author:

de la Peña Victor,Gzyl Henryk,McDonald Patrick

Abstract

Let Wn be a simple Markov chain on the integers. Suppose that Xn is a simple Markov chain on the integers whose transition probabilities coincide with those of Wn off a finite set. We prove that there is an M > 0 such that the Markov chain Wn and the joint distributions of the first hitting time and first hitting place of Xn started at the origin for the sets {-M, M} and {-(M + 1), (M + 1)} algorithmically determine the transition probabilities of Xn.

Publisher

Cambridge University Press (CUP)

Subject

Statistics, Probability and Uncertainty,General Mathematics,Statistics and Probability

Reference8 articles.

1. De la Peña V. , Gzyl H. and McDonald P. (2008). Inverse problems for random walks on trees: network tomography. To appear in Statist. Prob. Lett.

2. Recursive recovery of a family of Markov transition probabilities from boundary value data

3. Diffuse tomography: the isotropic case

4. Explicit inversion formulas for a model in diffuse tomography

5. Handbook of Stochastic Methods

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