Solutions to complex smoothing equations

Abstract

We consider smoothing equations of the form X ~law=~ Σj ≥ 1 Tj Xj + C where (C,T1,T2,…) is a given sequence of random variables and X1,X2,… are independent copies of X and independent of the sequence (C,T1,T2,…). The focus is on complex smoothing equations, i.e., the case where the random variables X, C,T1,T2,… are complex-valued, but also more general multivariate smoothing equations are considered, in which the Tj are similarity matrices. Under mild assumptions on (C,T1,T2,…), we describe the laws of all random variables X solving the above smoothing equation. These are the distributions of randomly shifted and stopped L\'evy processes satisfying a certain invariance property called (U,α)-stability, which is related to operator (semi)stability. The results are applied to various examples from applied probability and statistical physics.