A discontinuous Galerkin method for approximating the stationary distribution of stochastic fluid-fluid processes

Abstract

Introduced by Bean and O'Reilly (2014), a stochastic fluid-fluid process is a Markov processes \Xt, Yt, t\t ≥ 0, where the first fluid Xt is driven by the Markov chain t, and the second fluid Yt is driven by t as well as by Xt. That paper derived a closed-form expression for the joint stationary distribution, given in terms of operators acting on measures, which does not lend itself easily to numerical computations. Here, we construct a discontinuous Galerkin method for approximating this stationary distribution, and illustrate the methodology using an on-off bandwidth sharing system, which is a special case of a stochastic fluid-fluid process.