On the moment distance of Poisson processes

Abstract

Consider the distance between two i.i.d. and independent Poisson processes with arrival rate λ>0 and respective arrival times X1,X2,… and Y1,Y2,… on a line. We give a closed analytical formula for the %expected distance to the power a |Xk+r-Yk|a, for any integer k 1, r 0 and a 1. The expected difference of the arrival times to the power a between two i.i.d. and independent Poisson processes we represent as the combination of the Pochhammer polynomials. Especially, for r=0 and any positive integer a, the following identity is valid |Xk-Yk|a=a!λa(a2+k)(k)(a2+1), where (z) is Gamma function.