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1

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Computational analysis of single-server bulk-arrival queues: GIX/M/1 (1987)

Brière, G. ; Chaudhry, M. L.

Springer

Queueing systems 2 (1987), S. 173-185

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ISSN: 1572-9443

Keywords: Roots ; random group arrival ; single server ; probability distribution

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science

Notes: Abstract This paper deals with numerical computations for the bulk-arrival queueing modelGI X/M/1. First an algorithm is developed to find the roots inside the unit circle of the characteristic equation for this model. These roots are then used to calculate both the moments and the steady-state distribution of the number of customers in the system at a pre-arrival epoch. These results are used to compute the distribution of the same random variable at post-departure and random epochs. Unifying the method used by Easton [7], we have extended its application to the special cases where the interarrival time distribution is deterministic or uniform, and to cases whereX has a given arbitrary distribution. We also improved on the various root-finding methods used by several previous authors so that high values of the parameters, in particular large batch sizes, can be investigated as well.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01158398

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2

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Editorial introduction (1992)

Chaudhry, M. L.

Springer

Queueing systems 10 (1992), S. 1-3

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ISSN: 1572-9443

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01158519

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3

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Exact and approximate numerical solutions to steady-state single-server queues:M/G/1 — a unified approach (1992)

Chaudhry, M. L. ; Gupta, U. C. ; Agarwal, Manju

Springer

Queueing systems 10 (1992), S. 351-379

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ISSN: 1572-9443

Keywords: Computations ; roots ; queueing ; approximations

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science

Notes: Abstract This paper presents a unified approach for the numerical solutions of anM/G/1 queue. On the assumption that the service-time distribution has a rational Laplace-Stieltjes transform (LST), explicit closed-form expressions have been obtained for moments, distributions of system length and waiting time (in queue) in terms of the roots of associated characteristic equations (c.e.'s). Approximate analyses for the tails of the distributions based on one or more roots are also discussed. Numerical aspects have been tested for a variety of complex service-time distributions including but not restricted to only mixed generalized Erlang and generalized hyperexponential. A sample of numerical computations is also included. It is hoped that the results obtained would prove to be beneficial to both practitioners and theorists dealing with bounds, inequalities, approximations, and other aspects.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01193326

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4

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Exact and approximate numerical solutions of steady-state distributions arising in the queueGI/G/1 (1992)

Chaudhry, M. L. ; Agarwal, Manju ; Templeton, J. G. C.

Springer

Queueing systems 10 (1992), S. 105-152

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ISSN: 1572-9443

Keywords: Roots ; queueing time ; idle time ; interdeparture time ; approximations

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science

Notes: Abstract In this paper we first obtain, in a unified way, closed-form analytic expressions in terms of roots of the so-called characteristic equation (c.e.), and then discuss the exact numerical solutions of steady-state distributions of (i) actual queueing time, (ii) virtual queueing time, (iii) actual idle time, and (iv) interdeparture time for the queueGI/R/1, whereR denotes the class of distributions whose Laplace-Stieltjes transforms (LSTs) are rational functions (ratios of a polynomial of degree at mostn to a polynomial of degreen). For the purpose of numerical discussions of idle- and interdeparture-time distributions, the interarrival-time distribution is also taken to belong to the classR. It is also shown that numerical computations of the idle-time distribution ofR/G/1 queues can be done even ifG is not taken asR. Throughout the discussions it is assumed that the queue discipline is first-come-first-served (FCFS). For the tail of the actual queueing-time distribution ofGI/R/1, approximations in terms of one or more roots of the c.e. are also discussed. If more than one root is used, they are taken in ascending order of magnitude. Numerical aspects have been tested for a variety of complex interarrival- and service-time distributions. The analysis is not restricted to generalized distributions with phases such as Coxian-n (C n ), but also covers nonphase type distributions such as uniform (U) and deterministic (D). Some numerical results are also presented in the form of tables and figures. It is expected that the results obtained from the present study should prove to be useful not only to practitioners, but also to queueing theorists who would like to test the accuracies of inequalities, bounds or approximations.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01158522

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5

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Computational analysis of steady-state probabilities of M/Ga,b/1 and related nonbulk queues (1987)

Chaudhry, M. L. ; Madill, B. R. ; Brière, G.

Springer

Queueing systems 2 (1987), S. 93-114

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ISSN: 1572-9443

Keywords: Roots ; batch service ; single server ; probability distributions

Source: Springer Online Journal Archives 1860-2000

Topics: Computer Science

Notes: Abstract In their book, Chaudhry and Templeton [6] present a unified approach to many problems on bulk queues. Using their analytical approach, we show how to numerically evaluate steady-state probabilities and moments for number in system (or queue) at each of three time epochs — postdeparture, prearrival and random — for several bulk and nonbulk queues. The approach can be used for other problems in queueing theory, and for similar problems in the theories of dams, inventories, etc. The present study extends the computational results available in tables, such as those produced by Hillier and Yu [12], and has several potential applications. The method proposed is computationally efficient, accurate, and stable. It accommodates high values of the queueing parameters. Sample numerical results and graphs are also presented.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01158395

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6

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Numerical analysis for bulk-arrival queueing systems: Root-finding and steady-state probabilities inGI r /M/1 queues (1987)

Chaudhry, M. L. ; Jain, J. L. ; Templeton, J. G. C.

Springer

Annals of operations research 8 (1987), S. 307-320

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ISSN: 1572-9338

Keywords: Roots ; group arrival ; single server ; probability distribution

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics , Economics

Notes: Abstract Queueing theorists have presented, as solutions to many queueing models, probability generating functions in which state probabilities are expressed as functions of the roots of characteristic equations, evaluation of the roots in particular cases being left to the reader. Many users have complained that such solutions are inadequate. Some queueing theorists, in particular Neuts [6], rather than use Rouché's theorem to count roots and an equation-solver to find them, have developed new algorithms to solve queueing problems numerically, without explicit calculation of roots. Powell [7] has shown that in many bulk service queues arising in transportation models, characteristic equations can be solved and state probabilities can be found without serious difficulty, even when the number of roots to be found is large. We have slightly modified Powell's method, and have extended his work to cover a number of bulk-service queues discussed by Chaudhry et al. [1] and a number of bulk-arrival queues discussed in the present paper.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF02187099

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7

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Computing steady-state queueing-time distributions of single-server queues:GI X /M/1 (1993)

Chaudhry, M. L. ; Agarwal, M. ; Templeton, J. G. C.

Springer

Mathematical methods of operations research 37 (1993), S. 13-29

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ISSN: 1432-5217

Keywords: Queueing-Time Distribution ; Roots ; Computations

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics , Economics

Notes: Abstract This paper presents a computationally efficient method to find the steady-state distributions of actual queueing times of the first customer, as well as of a randomly selected customer, of an arrival group for the queueing systemGI X /M/1, and hence the queueing-time distribution of a customer for the systemGI/E X /1. The distribution of virtual queueing time is also obtained. Approximate analysis based on one or more roots is also discussed. Though the exact detailed as well as approximate computations for a variety of interarrival-time distributions such as generalized Erlang, mixed generalized Erlang, hyperexponential, generalized hyperexponential, and deterministic have been carried out, only representative results in the form of tables have been appended. The results obtained should prove useful to queueing theorists, practitioners, and others.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01415525

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