The departure process from the GI/G/1 Queue

The departure process from the GI/G/1 queue is shown to be a semi-Markov process imbedded at departure points with a two-dimensional state space. Transition probabilities for this process are defined and derived from the distributions of the arrival and service processes. The one step transition probabilities and a stationary distribution are obtained for the imbedded two-dimensional Markov chain.

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An indication of the asymptotic nature of the mendelian Markov process

Journal of Applied Probability ◽

10.1017/s0021900200110046 ◽

1968 ◽

Vol 5 (02) ◽

pp. 350-356 ◽

Cited By ~ 1

Author(s):

R. G. Khazanie

Keyword(s):

Markov Process ◽

Transition Probabilities ◽

Asymptotic Nature ◽

Finite Markov Process ◽

One Step ◽

Step Transition ◽

The One ◽

Image Position

Consider a finite Markov process {Xn } described by the one-step transition probabilities In describing the transition probabilities in the above manner we are adopting the convention that (0)0 = 1 so that the states 0 and M are absorbing, and the states 1,2,···,M-1 are transient.

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An indication of the asymptotic nature of the mendelian Markov process

Journal of Applied Probability ◽

10.2307/3212257 ◽

1968 ◽

Vol 5 (2) ◽

pp. 350-356 ◽

Cited By ~ 3

Author(s):

R. G. Khazanie

Keyword(s):

Markov Process ◽

Transition Probabilities ◽

Asymptotic Nature ◽

Finite Markov Process ◽

One Step ◽

Step Transition ◽

The One ◽

Image Position

Consider a finite Markov process {Xn} described by the one-step transition probabilities In describing the transition probabilities in the above manner we are adopting the convention that (0)0 = 1 so that the states 0 and M are absorbing, and the states 1,2,···,M-1 are transient.

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Single-shelf library-type Markov chains with infinitely many books

Journal of Applied Probability ◽

10.1017/s0021900200104978 ◽

1977 ◽

Vol 14 (02) ◽

pp. 298-308 ◽

Cited By ~ 2

Author(s):

Peter R. Nelson

Keyword(s):

Markov Chain ◽

Markov Chains ◽

Transition Probabilities ◽

Natural Order ◽

Order Book ◽

Exit Boundary ◽

One Step ◽

Step Transition ◽

The Right ◽

Positive Recurrent

In a single-shelf library having infinitely many books B 1 , B 2 , …, the probability of selecting each book is assumed known. Books are removed one at a time and replaced in position k prior to the next removal. Books are moved either to the right or the left as is necessary to vacate position k. Those arrangements of books where after some finite position all the books are in natural order (book i occupies position i) are considered as states in an infinite Markov chain. When k > 1, we show that the chain can never be positive recurrent. When k = 1, we find the limits of ratios of one-step transition probabilities; and when k = 1 and the chain is transient, we find the Martin exit boundary.

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Perturbation theory for unbounded Markov reward processes with applications to queueing

Advances in Applied Probability ◽

10.1017/s0001867800017961 ◽

1988 ◽

Vol 20 (01) ◽

pp. 99-111 ◽

Cited By ~ 1

Author(s):

Nico M. Van Dijk

Keyword(s):

Transition Probabilities ◽

Arrival Rate ◽

Average Reward ◽

Reward Function ◽

One Step ◽

Reward Process ◽

Markov Reward ◽

Step Transition ◽

The One ◽

Queueing Processes

Consider a perturbation in the one-step transition probabilities and rewards of a discrete-time Markov reward process with an unbounded one-step reward function. A perturbation estimate is derived for the finite horizon and average reward function. Results from [3] are hereby extended to the unbounded case. The analysis is illustrated for one- and two-dimensional queueing processes by an M/M/1-queue and an overflow queueing model with an error bound in the arrival rate.

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Stabilité de la récurrence nulle pour certaines chaines de Markov perturbées

Journal of Applied Probability ◽

10.2307/3213886 ◽

1983 ◽

Vol 20 (3) ◽

pp. 482-504 ◽

Cited By ~ 3

Author(s):

C. Cocozza-Thivent ◽

C. Kipnis ◽

M. Roussignol

Keyword(s):

Markov Chain ◽

Markov Chains ◽

Transition Probability ◽

The Other ◽

Barrier Functions ◽

One Step ◽

Null Recurrence ◽

Step Transition ◽

The One ◽

Taylor's Formula

We investigate how the property of null-recurrence is preserved for Markov chains under a perturbation of the transition probability. After recalling some useful criteria in terms of the one-step transition nucleus we present two methods to determine barrier functions, one in terms of taboo potentials for the unperturbed Markov chain, and the other based on Taylor's formula.

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Transient analysis of a queue with queue-length dependent MAP and its application to SS7 network

Journal of Applied Mathematics and Stochastic Analysis ◽

10.1155/s1048953399000325 ◽

1999 ◽

Vol 12 (4) ◽

pp. 371-392

Author(s):

Bong Dae Choi ◽

Sung Ho Choi ◽

Dan Keun Sung ◽

Tae-Hee Lee ◽

Kyu-Seog Song

Keyword(s):

Congestion Control ◽

Queue Length ◽

Transient Analysis ◽

Transition Probabilities ◽

Transient Behavior ◽

Complex Model ◽

Arrival Process ◽

One Step ◽

Step Transition ◽

The One

We analyze the transient behavior of a Markovian arrival queue with congestion control based on a double of thresholds, where the arrival process is a queue-length dependent Markovian arrival process. We consider Markov chain embedded at arrival epochs and derive the one-step transition probabilities. From these results, we obtain the mean delay and the loss probability of the nth arrival packet. Before we study this complex model, first we give a transient analysis of an MAP/M/1 queueing system without congestion control at arrival epochs. We apply our result to a signaling system No. 7 network with a congestion control based on thresholds.

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Single-shelf library-type Markov chains with infinitely many books

Journal of Applied Probability ◽

10.2307/3213000 ◽

1977 ◽

Vol 14 (2) ◽

pp. 298-308 ◽

Cited By ~ 4

Author(s):

Peter R. Nelson

Keyword(s):

Markov Chain ◽

Markov Chains ◽

Transition Probabilities ◽

Natural Order ◽

Order Book ◽

Exit Boundary ◽

One Step ◽

Step Transition ◽

The Right ◽

Positive Recurrent

In a single-shelf library having infinitely many books B1, B2, …, the probability of selecting each book is assumed known. Books are removed one at a time and replaced in position k prior to the next removal. Books are moved either to the right or the left as is necessary to vacate position k. Those arrangements of books where after some finite position all the books are in natural order (book i occupies position i) are considered as states in an infinite Markov chain. When k > 1, we show that the chain can never be positive recurrent. When k = 1, we find the limits of ratios of one-step transition probabilities; and when k = 1 and the chain is transient, we find the Martin exit boundary.

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Perturbation theory for unbounded Markov reward processes with applications to queueing

Advances in Applied Probability ◽

10.2307/1427272 ◽

1988 ◽

Vol 20 (1) ◽

pp. 99-111 ◽

Cited By ~ 18

Author(s):

Nico M. Van Dijk

Keyword(s):

Transition Probabilities ◽

Arrival Rate ◽

Average Reward ◽

Reward Function ◽

One Step ◽

Reward Process ◽

Markov Reward ◽

Step Transition ◽

The One ◽

Queueing Processes

Consider a perturbation in the one-step transition probabilities and rewards of a discrete-time Markov reward process with an unbounded one-step reward function. A perturbation estimate is derived for the finite horizon and average reward function. Results from [3] are hereby extended to the unbounded case. The analysis is illustrated for one- and two-dimensional queueing processes by an M/M/1-queue and an overflow queueing model with an error bound in the arrival rate.

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On a characterization property of finite irreducible Markov chains

Journal of Applied Probability ◽

10.2307/3211955 ◽

1970 ◽

Vol 7 (3) ◽

pp. 771-775

Author(s):

I. V. Basawa

Keyword(s):

Transition Matrix ◽

Transition Probabilities ◽

Homogeneous Markov Chain ◽

Finite State ◽

One Step ◽

Characterization Property ◽

Step Transition ◽

The One ◽

Image Position ◽

Finite State Space

Let {Xk}, k = 1, 2, ··· be a sequence of random variables forming a homogeneous Markov chain on a finite state-space, S = {1, 2, ···, s}. Xk could be thought of as the state at time k of some physical system for which are the (one-step) transition probabilities. It is assumed that all the states are inter-communicating, so that the transition matrix P = ((pij)) is irreducible.

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