A solution to a linear integral equation with an application to statistics of infinitely divisible moving averages

Abstract

For a stationary moving average random field, a non-parametric low frequency estimator of the L\'evy density of its infinitely divisible independently scattered integrator measure is given. The plug-in estimate is based on the solution w of the linear integral equation v(x) = ∫Rd g(s) w(h(s)x)ds, where g,h:Rd → R are given measurable functions and v is a (weighted) L2-function on R. We investigate conditions for the existence and uniqueness of this solution and give L2-error bounds for the resulting estimates. An application to pure jump moving averages and a simulation study round off the paper.