TES-based traffic modeling for performance evaluation of integrated networks
IEEE INFOCOM '92 Proceedings of the eleventh annual joint conference of the IEEE computer and communications societies on One world through communications (Vol. 1)
The Markov-modulated Poisson process (MMPP) cookbook
Performance Evaluation
Research: Queue length solutions for an ATM buffer with MMBP arrivals
Computer Communications
Basic characteristics of variable rate video coding in ATM environment
IEEE Journal on Selected Areas in Communications
An efficient solution method for Markov models of ATM links with loss priorities
IEEE Journal on Selected Areas in Communications
IEEE Journal on Selected Areas in Communications
Modeling and call admission control algorithm of variable bit rate video in ATM networks
IEEE Journal on Selected Areas in Communications
Performance analysis of Bluetooth asynchronous connection-less service
Journal of Network and Computer Applications
Controlling mean queuing delay under multi-class bursty and correlated traffic
Journal of Computer and System Sciences
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In this paper, we systematically present the methodology of modeling bursty traffic sources using the 2-state Markov Modulated Bernoulli Process (called MMBP-2). The technique used can be easily extended to an m-state MMBP though the numerical calculation is complicated. We first defined the parameters of the model and some processes associated with it, and subsequently examined the queue length distribution of an infinite buffer driven by an MMBP-2 with batch arrivals. We next looked at the case where the same buffer is fed by a group of two identical MMBP-2 sources. Instead of deriving the queue length expression, we cast the problem in the framework of the previous case and made use of the previous results with some modification. Lastly, we looked at the case of a finite buffer driven by two MMBP-2 sources with different parameters. We formulated the queue length solution in the framework of Markov theory and calculated the Cell Loss Probability (CLP) for this case.