Approximations for time-dependent distributions in Markovian fluid models

Abstract

In this paper we study the distribution of the level at time θ of Markovian fluid queues and Markovian continuous time random walks, the maximum (and minimum) level over [0,θ], and their joint distributions. We approximate θ by a random variable T with Erlang distribution and we use an alternative way, with respect to the usual Laplace transform approach, to compute the distributions. We present probabilistic interpretation of the equations and provide a numerical illustration.