Litcius/Paper detail

Divergent predictive states: The statistical complexity dimension of stationary, ergodic hidden Markov processes

Alexandra M. Jurgens, James P. Crutchfield

2021Chaos An Interdisciplinary Journal of Nonlinear Science17 citationsDOIOpen Access PDF

Abstract

Even simply defined, finite-state generators produce stochastic processes that require tracking an uncountable infinity of probabilistic features for optimal prediction. For processes generated by hidden Markov chains, the consequences are dramatic. Their predictive models are generically infinite state. Until recently, one could determine neither their intrinsic randomness nor structural complexity. The prequel to this work introduced methods to accurately calculate the Shannon entropy rate (randomness) and to constructively determine their minimal (though, infinite) set of predictive features. Leveraging this, we address the complementary challenge of determining how structured hidden Markov processes are by calculating their statistical complexity dimension-the information dimension of the minimal set of predictive features. This tracks the divergence rate of the minimal memory resources required to optimally predict a broad class of truly complex processes.

Topics & Concepts

RandomnessMathematicsUncountable setMarkov chainHidden Markov modelErgodic theoryProbabilistic logicMarkov processDimension (graph theory)Variable-order Markov modelHidden semi-Markov modelTheoretical computer scienceMarkov modelComputer scienceAlgorithmDiscrete mathematicsArtificial intelligenceCombinatoricsStatisticsMathematical analysisCountable setNeural dynamics and brain functionNeural Networks and ApplicationsBlind Source Separation Techniques
Divergent predictive states: The statistical complexity dimension of stationary, ergodic hidden Markov processes | Litcius