Paper Info
Title
A functional central limit theorem for Markov additive arrival processes and its applications to queueing systems.
Abstract
We prove a functional central limit theorem for Markov additive arrival processes where the modulating Markov process has the transition rate matrix scaled up by $$n^{\\alpha }$$n¿ ($$\\alpha 0$$¿0) and the mean and variance of the arrival process are scaled up by n. It is applied to an infinite-server queue and a fork---join network with a non-exchangeable synchronization constraint, where in both systems both the arrival and service processes are modulated by a Markov process. We prove functional central limit theorems for the queue length processes in these systems joint with the arrival and departure processes, and characterize the transient and stationary distributions of the limit processes. We also observe that the limit processes possess a stochastic decomposition property.
Year
DOI
Venue
2016
10.1007/s11134-016-9496-8
Queueing Syst.
Keywords
Field
DocType
Markov additive arrival process,Functional central limit theorem,Infinite-server queues,Fork–join networks with non-exchangeable synchronization,Gaussian limits,Stochastic decomposition,60F17,60K37,60K25,90B15,90B22
Empirical process,Mathematical optimization,Markov process,Arrival theorem,Markov chain,Markovian arrival process,Markov kernel,Mathematics,Time reversibility,Markov renewal process
Journal
Volume
Issue
ISSN
84
3-4
0257-0130
Citations 
PageRank 
References 
2
0.47
4
Authors
3
Name
Order
Citations
PageRank
Hongyuan Lu171.74
Guodong Pang28412.92
Michel Mandjes353473.65