A family of fast fixed point iterations for M/G/1-type Markov chains

Abstract

We consider the problem of computing the minimal nonnegative solution G of the nonlinear matrix equation X=Σi=-1∞ AiXi+1 where Ai, for i -1, are nonnegative square matrices such that Σi=-1∞ Ai is stochastic. This equation is fundamental in the analysis of M/G/1-type Markov chains, since the matrix G provides probabilistic measures of interest. A new family of fixed point iterations for the numerical computation of G, that includes the classical iterations, is introduced. A detailed convergence analysis proves that the iterations in the new class converge faster than the classical iterations. Numerical experiments confirm the effectiveness of our extension.