Edgeworth expansion with error estimates for power law shot noise

Abstract

Consider a homogeneous Poisson process in Rd, d 1. Let R1 < R2 < … be the distances of the points from the origin, and let S = R1-γ + R2-γ + …, where γ > d is a parameter. Let S(r) = Σk Rk-γ \, 1Rk r be the contribution to S outside radius r. For large enough r, and any s in the support of S(r), consider the change of measure that shifts the mean to s. We derive rigorous error estimates for the Edgeworth expansion of the transformed random variable. Our error terms are uniform in s, and we give explicitly the dependence of the error on r and the order k of the expansion. As an application, we provide a scheme that approximates the conditional distribution of R1 given S = s to any desired accuracy, with error bounds that are uniform in s. Along the way, we prove a stochastic comparison between (R1, R2, …) given S = s and unconditioned radii (R'1, R'2, …).