Difference between revisions of "Markov chain, generalized"
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{{MSC|60J10}} | {{MSC|60J10}} | ||
[[Category:Markov chains]] | [[Category:Markov chains]] | ||
| − | A sequence of random variables | + | A sequence of random variables $ \xi _ {n} $ |
| + | with the properties: | ||
| − | 1) the set of values of each | + | 1) the set of values of each $ \xi _ {n} $ |
| + | is finite or countable; | ||
| − | 2) for any | + | 2) for any $ n $ |
| + | and any $ i _ {0} \dots i _ {n} $, | ||
| − | + | $$ \tag{* } | |
| + | {\mathsf P} \{ \xi _ {n} = i _ {n} \mid | ||
| + | \xi _ {0} = i _ {0} \dots \xi _ {n-} s = i _ {n-} s \dots | ||
| + | \xi _ {n-} 1 = i _ {n-} 1 \} = | ||
| + | $$ | ||
| − | + | $$ | |
| + | = \ | ||
| + | {\mathsf P} \{ \xi _ {n} = i _ {n} \mid \xi _ {n-} s | ||
| + | = i _ {n-} s \dots \xi _ {n-} 1 = i _ {n-} 1 \} . | ||
| + | $$ | ||
| − | A generalized Markov chain satisfying (*) is called | + | A generalized Markov chain satisfying (*) is called $ s $- |
| + | generalized. For $ s = 1 $, | ||
| + | (*) is the usual [[Markov property|Markov property]]. The study of $ s $- | ||
| + | generalized Markov chains can be reduced to the study of ordinary Markov chains. Consider the sequence of random variables $ \eta _ {n} $ | ||
| + | whose values are in one-to-one correspondence with the values of the vector | ||
| − | + | $$ | |
| + | ( \xi _ {n-} s+ 1 , \xi _ {n-} s+ 2 \dots \xi _ {n} ) . | ||
| + | $$ | ||
| − | The sequence | + | The sequence $ \eta _ {n} $ |
| + | forms an ordinary [[Markov chain|Markov chain]]. | ||
====References==== | ====References==== | ||
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====Comments==== | ====Comments==== | ||
| − | |||
====References==== | ====References==== | ||
Latest revision as of 07:59, 6 June 2020
2020 Mathematics Subject Classification: Primary: 60J10 [MSN][ZBL]
A sequence of random variables $ \xi _ {n} $ with the properties:
1) the set of values of each $ \xi _ {n} $ is finite or countable;
2) for any $ n $ and any $ i _ {0} \dots i _ {n} $,
$$ \tag{* } {\mathsf P} \{ \xi _ {n} = i _ {n} \mid \xi _ {0} = i _ {0} \dots \xi _ {n-} s = i _ {n-} s \dots \xi _ {n-} 1 = i _ {n-} 1 \} = $$
$$ = \ {\mathsf P} \{ \xi _ {n} = i _ {n} \mid \xi _ {n-} s = i _ {n-} s \dots \xi _ {n-} 1 = i _ {n-} 1 \} . $$
A generalized Markov chain satisfying (*) is called $ s $- generalized. For $ s = 1 $, (*) is the usual Markov property. The study of $ s $- generalized Markov chains can be reduced to the study of ordinary Markov chains. Consider the sequence of random variables $ \eta _ {n} $ whose values are in one-to-one correspondence with the values of the vector
$$ ( \xi _ {n-} s+ 1 , \xi _ {n-} s+ 2 \dots \xi _ {n} ) . $$
The sequence $ \eta _ {n} $ forms an ordinary Markov chain.
References
| [D] | J.L. Doob, "Stochastic processes" , Wiley (1953) MR1570654 MR0058896 Zbl 0053.26802 |
Comments
References
| [F] | D. Freedman, "Markov chains" , Holden-Day (1975) MR0686269 MR0681291 MR0556418 MR0428472 MR0292176 MR0237001 MR0211464 MR0164375 MR0158435 MR0152015 Zbl 0501.60071 Zbl 0501.60069 Zbl 0426.60064 Zbl 0325.60059 Zbl 0322.60057 Zbl 0212.49801 Zbl 0129.30605 |
| [KS] | J.G. Kemeny, J.L. Snell, "Finite Markov chains" , v. Nostrand (1960) MR1531032 MR0115196 Zbl 0089.13704 |
| [Re] | D. Revuz, "Markov chains" , North-Holland (1975) MR0415773 Zbl 0332.60045 |
| [Ro] | V.I. Romanovsky, "Discrete Markov chains" , Wolters-Noordhoff (1970) (Translated from Russian) MR0266312 Zbl 0201.20002 |
| [S] | E. Seneta, "Non-negative matrices and Markov chains" , Springer (1981) MR2209438 Zbl 0471.60001 |
| [BF] | A. Blanc-Lapierre, R. Fortet, "Theory of random functions" , 1–2 , Gordon & Breach (1965–1968) (Translated from French) Zbl 0185.44502 Zbl 0159.45802 |
How to Cite This Entry:
Markov chain, generalized. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Markov_chain,_generalized&oldid=26566
Markov chain, generalized. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Markov_chain,_generalized&oldid=26566
This article was adapted from an original article by V.P. Chistyakov (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article