Maximum queue lengths during a fixed time interval in the M/M/c retrial queue

作者:

Highlights:

摘要

We are concerned with the problem of characterizing the distribution of the maximum number Z(t0) of customers during a fixed time interval [0,t0] in the M/M/c retrial queue, which is shown to have a matrix exponential form. We present a simple condition on the service and retrial rates for the matrix exponential solution to be explicit or algorithmically tractable. Our methodology is based on splitting methods and the use of eigenvalues and eigenvectors. A particularly appealing feature of our solution is that it allows us to obtain global error control. Specifically, we derive an approximating solution p(x;t0)≡p(x;t0;ε) verifying |P(Z(t0)⩽x|X(0)=(i,j))-p(x;t0)|<ε uniformly in x⩾i+j, for any ε>0 and initial numbers i of busy servers and j of customers in orbit.

论文关键词:Absorbing Markov chain,Eigenvalues/eigenvectors,Maximum queue length,Retrial queue,Splitting method

论文评审过程:Available online 22 March 2014.

论文官网地址:https://doi.org/10.1016/j.amc.2014.02.074