Critical Behavior in Physics and Probabilistic Formal Languages

Author(s)

Lin, Henry; Tegmark, Max; Tegmark, Max Erik

Abstract

We show that the mutual information between two symbols, as a function of the number of symbols between the two, decays exponentially in any probabilistic regular grammar, but can decay like a power law for a context-free grammar. This result about formal languages is closely related to a well-known result in classical statistical mechanics that there are no phase transitions in dimensions fewer than two. It is also related to the emergence of power law correlations in turbulence and cosmological inflation through recursive generative processes. We elucidate these physics connections and comment on potential applications of our results to machine learning tasks like training artificial recurrent neural networks. Along the way, we introduce a useful quantity, which we dub the rational mutual information, and discuss generalizations of our claims involving more complicated Bayesian networks. Keywords: formal languages; statistical mechanics; criticality

Date issued

2017-06

URI

http://hdl.handle.net/1721.1/114221

Department

Massachusetts Institute of Technology. Department of Physics
MIT Kavli Institute for Astrophysics and Space Research

Journal

Entropy

Publisher

MDPI AG

Citation

Lin, Henry, and Max Tegmark. “Critical Behavior in Physics and Probabilistic Formal Languages.” Entropy 19, 12 (June 2017): 299 © 2017 The Author(s)

Version: Final published version

ISSN

1099-4300