Context Tree Estimation in Variable Length Hidden Markov Models
Information Theory
2011-09-15 v2 math.IT
Statistics Theory
Statistics Theory
Abstract
We address the issue of context tree estimation in variable length hidden Markov models. We propose an estimator of the context tree of the hidden Markov process which needs no prior upper bound on the depth of the context tree. We prove that the estimator is strongly consistent. This uses information-theoretic mixture inequalities in the spirit of Finesso and Lorenzo(Consistent estimation of the order for Markov and hidden Markov chains(1990)) and E.Gassiat and S.Boucheron (Optimal error exponents in hidden Markov model order estimation(2003)). We propose an algorithm to efficiently compute the estimator and provide simulation studies to support our result.
Keywords
Cite
@article{arxiv.1109.0392,
title = {Context Tree Estimation in Variable Length Hidden Markov Models},
author = {Thierry Dumont},
journal= {arXiv preprint arXiv:1109.0392},
year = {2011}
}