On weak lumpability in Markov chains

We analyse the conditions under which the aggregated process constructed from an homogeneous Markov chain over a given partition of the state space is also Markov homogeneous. The past work on the subject is revised and new properties are obtained.

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Criteria for classifying general Markov chains

Advances in Applied Probability ◽

10.1017/s0001867800042907 ◽

1976 ◽

Vol 8 (04) ◽

pp. 737-771 ◽

Cited By ~ 40

Author(s):

R. L. Tweedie

Keyword(s):

Markov Chain ◽

Markov Chains ◽

State Space ◽

The State ◽

General State ◽

Classical Work ◽

The Status ◽

General State Space

The aim of this paper is to present a comprehensive set of criteria for classifying as recurrent, transient, null or positive the sets visited by a general state space Markov chain. When the chain is irreducible in some sense, these then provide criteria for classifying the chain itself, provided the sets considered actually reflect the status of the chain as a whole. The first part of the paper is concerned with the connections between various definitions of recurrence, transience, nullity and positivity for sets and for irreducible chains; here we also elaborate the idea of status sets for irreducible chains. In the second part we give our criteria for classifying sets. When the state space is countable, our results for recurrence, transience and positivity reduce to the classical work of Foster (1953); for continuous-valued chains they extend results of Lamperti (1960), (1963); for general spaces the positivity and recurrence criteria strengthen those of Tweedie (1975b).

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A New Algorithm for Computing the Ergodic Probability Vector for Large Markov Chains

Probability in the Engineering and Informational Sciences ◽

10.1017/s0269964800001479 ◽

1990 ◽

Vol 4 (1) ◽

pp. 89-116 ◽

Cited By ~ 15

Author(s):

Ushlo Sumita ◽

Maria Rieders

Keyword(s):

Markov Chain ◽

Markov Chains ◽

State Space ◽

The State ◽

Special Structure ◽

Probability Vector ◽

Rank Reduction ◽

Replacement Process ◽

Novel Algorithm

A novel algorithm is developed which computes the ergodic probability vector for large Markov chains. Decomposing the state space into lumps, the algorithm generates a replacement process on each lump, where any exit from a lump is instantaneously replaced at some state in that lump. The replacement distributions are constructed recursively in such a way that, in the limit, the ergodic probability vector for a replacement process on one lump will be proportional to the ergodic probability vector of the original Markov chain restricted to that lump. Inverse matrices computed in the algorithm are of size (M – 1), where M is the number of lumps, thereby providing a substantial rank reduction. When a special structure is present, the procedure for generating the replacement distributions can be simplified. The relevance of the new algorithm to the aggregation-disaggregation algorithm of Takahashi [29] is also discussed.

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Lumpability for non-irreducible finite markov chains

Journal of Applied Probability ◽

10.1017/s002190020002876x ◽

1984 ◽

Vol 21 (03) ◽

pp. 567-574 ◽

Cited By ~ 2

Author(s):

Atef M. Abdel-Moneim ◽

Frederick W. Leysieffer

Keyword(s):

Markov Chain ◽

Markov Chains ◽

State Space ◽

Discrete Time ◽

The State ◽

Discrete Time Markov Chain ◽

Finite Markov Chains

Conditions under which a function of a finite, discrete-time Markov chain, X(t), is again Markov are given, when X(t) is not irreducible. These conditions are given in terms of an interrelationship between two partitions of the state space of X(t), the partition induced by the minimal essential classes of X(t) and the partition with respect to which lumping is to be considered.

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Reduction techniques for discrete-time Markov chains on totally ordered state space using stochastic comparisons

Journal of Applied Probability ◽

10.1017/s0021900200016004 ◽

2000 ◽

Vol 37 (03) ◽

pp. 795-806 ◽

Cited By ~ 6

Author(s):

Laurent Truffet

Keyword(s):

Markov Chain ◽

Markov Chains ◽

State Space ◽

Discrete Time ◽

Stochastic Comparison ◽

Homogeneous Markov Chain ◽

Monotone Functions ◽

Stochastic Comparisons ◽

Reduction Techniques ◽

Ordered State

We propose in this paper two methods to compute Markovian bounds for monotone functions of a discrete time homogeneous Markov chain evolving in a totally ordered state space. The main interest of such methods is to propose algorithms to simplify analysis of transient characteristics such as the output process of a queue, or sojourn time in a subset of states. Construction of bounds are based on two kinds of results: well-known results on stochastic comparison between Markov chains with the same state space; and the fact that in some cases a function of Markov chain is again a homogeneous Markov chain but with smaller state space. Indeed, computation of bounds uses knowledge on the whole initial model. However, only part of this data is necessary at each step of the algorithms.

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Markov Chains Conditioned Never to Wait Too Long at the Origin

Journal of Applied Probability ◽

10.1017/s0021900200005891 ◽

2009 ◽

Vol 46 (03) ◽

pp. 812-826

Author(s):

Saul Jacka

Keyword(s):

Markov Chain ◽

Markov Chains ◽

State Space ◽

Sufficient Conditions ◽

Weak Limit ◽

The State ◽

Coin Tossing ◽

First Time ◽

Vague Convergence ◽

Irreducible Markov Chain

Motivated by Feller's coin-tossing problem, we consider the problem of conditioning an irreducible Markov chain never to wait too long at 0. Denoting by τ the first time that the chain,X, waits for at least one unit of time at the origin, we consider conditioning the chain on the event (τ›T). We show that there is a weak limit asT→∞ in the cases where either the state space is finite orXis transient. We give sufficient conditions for the existence of a weak limit in other cases and show that we have vague convergence to a defective limit if the time to hit zero has a lighter tail than τ and τ is subexponential.

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Regularity conditions for semi-Markov and Markov chains in continuous time

Journal of Applied Probability ◽

10.1017/s0021900200023767 ◽

1983 ◽

Vol 20 (03) ◽

pp. 505-512

Author(s):

Russell Gerrard

Keyword(s):

Markov Chain ◽

Markov Chains ◽

State Space ◽

Continuous Time ◽

The State ◽

Holding Time ◽

Regularity Conditions ◽

Regularity Properties ◽

Classical Condition

The classical condition for regularity of a Markov chain is extended to include semi-Markov chains. In addition, for any given semi-Markov chain, we find Markov chains which exhibit identical regularity properties. This is done either (i) by transforming the state space or, alternatively, (ii) by imposing conditions on the holding-time distributions. Brief consideration is given to the problem of extending the results to processes other than semi-Markov chains.

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Regularity conditions for semi-Markov and Markov chains in continuous time

Journal of Applied Probability ◽

10.2307/3213887 ◽

1983 ◽

Vol 20 (3) ◽

pp. 505-512 ◽

Cited By ~ 1

Author(s):

Russell Gerrard

Keyword(s):

Markov Chain ◽

Markov Chains ◽

State Space ◽

Continuous Time ◽

The State ◽

Holding Time ◽

Regularity Conditions ◽

Regularity Properties ◽

Classical Condition

The classical condition for regularity of a Markov chain is extended to include semi-Markov chains. In addition, for any given semi-Markov chain, we find Markov chains which exhibit identical regularity properties. This is done either (i) by transforming the state space or, alternatively, (ii) by imposing conditions on the holding-time distributions. Brief consideration is given to the problem of extending the results to processes other than semi-Markov chains.

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Reduction techniques for discrete-time Markov chains on totally ordered state space using stochastic comparisons

Journal of Applied Probability ◽

10.1239/jap/1014842837 ◽

2000 ◽

Vol 37 (3) ◽

pp. 795-806 ◽

Cited By ~ 6

Author(s):

Laurent Truffet

Keyword(s):

Markov Chain ◽

Markov Chains ◽

State Space ◽

Discrete Time ◽

Stochastic Comparison ◽

Homogeneous Markov Chain ◽

Monotone Functions ◽

Stochastic Comparisons ◽

Reduction Techniques ◽

Ordered State

We propose in this paper two methods to compute Markovian bounds for monotone functions of a discrete time homogeneous Markov chain evolving in a totally ordered state space. The main interest of such methods is to propose algorithms to simplify analysis of transient characteristics such as the output process of a queue, or sojourn time in a subset of states. Construction of bounds are based on two kinds of results: well-known results on stochastic comparison between Markov chains with the same state space; and the fact that in some cases a function of Markov chain is again a homogeneous Markov chain but with smaller state space. Indeed, computation of bounds uses knowledge on the whole initial model. However, only part of this data is necessary at each step of the algorithms.

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PIGGYBACKING THRESHOLD PROCESSES WITH A FINITE STATE MARKOV CHAIN

Stochastics and Dynamics ◽

10.1142/s0219493709002622 ◽

2009 ◽

Vol 09 (02) ◽

pp. 187-204

Author(s):

THOMAS R. BOUCHER ◽

DAREN B. H. CLINE

Keyword(s):

Time Series ◽

Markov Chain ◽

Markov Chains ◽

State Space ◽

The State ◽

General State ◽

Stationary Distributions ◽

Autoregressive Time Series ◽

Finite State ◽

Nonlinear Autoregressive

The state-space representations of certain nonlinear autoregressive time series are general state Markov chains. The transitions of a general state Markov chain among regions in its state-space can be modeled with the transitions among states of a finite state Markov chain. Stability of the time series is then informed by the stationary distributions of the finite state Markov chain. This approach generalizes some previous results.

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