An Inverse Problem for Infinitely Divisible Moving Average Random Fields

Abstract

Given a low frequency sample of an infinitely divisible moving average random field \∫Rd f(x-t)(dx); \ t ∈ Rd \ with a known simple function f, we study the problem of nonparametric estimation of the L\'evy characteristics of the independently scattered random measure . We provide three methods, a simple plug-in approach, a method based on Fourier transforms and an approach involving decompositions with respect to L2-orthonormal bases, which allow to estimate the L\'evy density of . For these methods, the bounds for the L2-error are given. Their numerical performance is compared in a simulation study.