论文信息 - Fluid queues driven by birth and death processes with quadratic rates

Fluid queues driven by birth and death processes with quadratic rates

In this paper, we consider fluid queue models with infinite buffer capacity in which the fluid flow is governed by a birth and death process (BDP) with quadratic arrival and service rates on a finite state space. We use certain interesting identities of the tridiagonal determinants to analytically determine the eigenvalues of the underlying tridiagonal matrix that governs the probabilistic behaviour of the system and hence obtain the stationary buffer content distribution of the process. Numerical investigations are presented in the form of graphs to capture the variations in the behaviour of buffer content distribution

K. V. Vijayashree | P. R. Parthasarathy

[1] John P. Lehoczky,et al. Channels that Cooperatively Service a Data Stream and Voice Messages , 1982, IEEE Trans. Commun..

[2] William Kahan,et al. Two working algorithms for the eigenvalues of a symmetric tridiagonal matrix , 1966 .

[3] K. V. Fernando. On computing an eigenvector of a tridiagonal matrix , 1997 .

[4] R. B. Lenin,et al. Fluid queues driven by an M/M/1/N queue , 2000 .

[5] Ward Whitt,et al. An Introduction to Stochastic-Process Limits and their Application to Queues , 2002 .

[6] D. Mitra,et al. Stochastic theory of a data-handling system with multiple sources , 1982, The Bell System Technical Journal.

[7] D. Mitra. Stochastic theory of a fluid model of producers and consumers coupled by a buffer , 1988, Advances in Applied Probability.

[8] A modified bisection algorithm for the determination of the eigenvalues of a symmetric tridiagonal matrix , 1982 .

[9] Peter O'Reilly. Performance Analysis of Data in Burst Switching , 1986, IEEE Trans. Commun..