Markov chain, recurrent
2020 Mathematics Subject Classification: Primary: 60J10 [MSN][ZBL]
A Markov chain in which a random trajectory , starting at any state , returns to that state with probability 1. In terms of the transition probabilities , recurrence of a discrete-time Markov chain is equivalent to the divergence for any of the series
In a recurrent Markov chain a trajectory , , , returns infinitely often to the state with probability 1. In a recurrent Markov chain there are no inessential states and the essential states decompose into recurrent classes. An example of a recurrent Markov chain is the symmetric random walk on the integer lattice on the line or plane. In the symmetric walk on the line a particle moves from position to with probabilities ; in the symmetric walk on the plane a particle moves from to one of the four points , with probabilities . In these examples a particle, starting the walk at an arbitrary point, returns to that point with probability 1. The symmetric walk on the integer lattice in the three-dimensional space, when the probability of transition from to a neighbouring point , , is equal to , is not recurrent. In this case the probability of return of the particle to its initial point is approximately 0.35.
References
[1] | W. Feller, "An introduction to probability theory and its applications" , 1 , Wiley (1966) MR0210154 Zbl 0138.10207 |
Comments
References
[a1] | D. Freeman, "Markov chains" , Holden-Day (1975) |
[a2] | M. Iosifescu, "Finite Markov processes and their applications" , Wiley (1980) MR0587116 Zbl 0436.60001 |
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[a7] | E. Seneta, "Non-negative matrices and Markov chains" , Springer (1981) MR2209438 Zbl 0471.60001 |
[a8] | V. Spitzer, "Principles of random walk" , v. Nostrand (1964) MR0171290 Zbl 0119.34304 |
Markov chain, recurrent. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Markov_chain,_recurrent&oldid=25534