HIGHER-ORDER LINDLEY EQUATIONS

被引：17

作者：

KARPELEVICH, FI

KELBERT, MY

SUHOV, YM

机构：

[1] RUSSIAN MINIST TRANSPORT COMMUN,MOSCOW INST TRANSPORT ENGINEERS,MOSCOW 107174,RUSSIA

[2] RUSSIAN ACAD SCI,INT INST EARTHQUAKE PREDICT THEORY & MATH GEOPHYS,MOSCOW 113556,RUSSIA

[3] UNIV COLL SWANSEA,SCH EUROPEAN BUSINESS MANAGEMENT,SWANSEA SA2 8PP,W GLAM,WALES

[4] RUSSIAN ACAD SCI,INST PROBLEMS INFORMAT TRANSMISS,MOSCOW 101447,RUSSIA

来源：

STOCHASTIC PROCESSES AND THEIR APPLICATIONS | 1994年 / 53卷 / 01期

关键词：

QUEUING NETWORKS; HIGHER-ORDER LINDLEY EQUATIONS; STATIONARY SOLUTIONS;

D O I：

10.1016/0304-4149(94)90058-2

中图分类号：

O21 [概率论与数理统计]; C8 [统计学];

学科分类号：

020208 ; 070103 ; 0714 ;

摘要：

A model of a queueing network is proposed which leads to a stochastic equation generalizing a standard Lindley equation for a single FCFS server. We study the problem of the existence and uniqueness of a stationary solution to this equation and its connection with random processes on a Cayley tree.

引用

页码：65 / 96

页数：32

共 18 条

[1] THE CONTINUUM RANDOM TREE .1.
ALDOUS, D
[J]. ANNALS OF PROBABILITY, 1991, 19 (01) : 1 - 28
[2] Andronov A.A., 1971, QUALITATIVE THEORY 2
[3] QUEUING MODELS FOR SYSTEMS WITH SYNCHRONIZATION CONSTRAINTS
BACCELLI, F
MAKOWSKI, AM
[J]. PROCEEDINGS OF THE IEEE, 1989, 77 (01) : 138 - 161
[4] BACCELLI F, 1992, J STAT PHYS, V66, P802
[5] BACCELLI F, 1987, LECTURE NOTES STATIS, V43
[6] BOROVKOV AA, 1980, ASYMPTOTICAL METHODS
[7] Brandt A., 1985, Elektronische Informationsverarbeitung und Kybernetik (EIK), V21, P151
[8] Brandt A., 1985, Elektronische Informationsverarbeitung und Kybernetik (EIK), V21, P47
[9] Bremaud P., 1981, POINT PROCESSES QUEU
[10] FELLER W, 1966, INTRO PROBABILITY TH, V1

← 1 2 →