First exit time from a bounded interval for pseudo-processes driven by the equation ∂/∂ t=(-1)N-1∂2N/∂ x2N

Abstract

Let N be a positive integer. We consider pseudo-Brownian motion X=(X(t))t 0 driven by the high-order heat-type equation ∂/∂ t=(-1)N-1∂2N/∂ x2N. Let us introduce the first exit time τab from a bounded interval (a,b) by X (a,b∈R). In this paper, we provide a representation of the joint pseudo-distribution of the vector (τab,X(τab)) by means of Vandermonde-like determinants. The method we use is based on the Feynman-Kac functional related to pseudo-Brownian motion which leads to a boundary value problem. In particular, the pseudo-distribution of the location of X at time τab, namely X(τab), admits a fine expression involving famous Hermite interpolating polynomials.