Title :
Identifiability of hidden Markov information sources and their minimum degrees of freedom
Author :
Ito, H. ; Amari, S.-I. ; Kobayashi, K.
Author_Institution :
Dept. of Math. Eng. & Inf. Phys., Tokyo Univ., Japan
fDate :
3/1/1992 12:00:00 AM
Abstract :
If only a function of the state in a finite-state Markov chain is observed, then the stochastic process is no longer Markovian in general. This type of information source is found widely and the basic problem of its identifiability remains open, that is, the problem of showing when two different Markov chains generate the same stochastic process. The identifiability problem is completely solved by linear algebra, where a block structure of a Markov transition matrix plays a fundamental role, and from which the minimum degree of freedom for a source is revealed.<>
Keywords :
Markov processes; information theory; linear algebra; Markov transition matrix; hidden Markov information sources; identifiability; linear algebra; minimum degrees of freedom; stochastic process; Computer science; Conferences; Hidden Markov models; Indium tin oxide; Information theory; Mathematics; Physics; Stochastic processes;
Journal_Title :
Information Theory, IEEE Transactions on
