Asymptotic relation for the transition density of the three-dimensional Markov random flight on small time intervals

Abstract

We consider the Markov random flight X(t), \; t>0, in the three-dimensional Euclidean space R3 with constant finite speed c>0 and the uniform choice of the initial and each new direction at random time instants that form a homogeneous Poisson flow of rate λ>0. Series representations for the conditional characteristic functions of X(t) corresponding to two and three changes of direction, are obtained. Based on these results, an asymptotic formula, as t 0, for the unconditional characteristic function of X(t) is derived. By inverting it, we obtain an asymptotic relation for the transition density of the process. We show that the error in this formula has the order o(t3) and, therefore, it gives a good approximation on small time intervals whose lengths depend on λ. Estimate of the accuracy of the approximation is analysed.