Self-similar solutions of kinetic-type equations: the boundary case

Abstract

For a time dependent family of probability measures (t)t 0 we consider a kinetic-type evolution equation ∂ φt/∂ t + φt = Q φt where Q is a smoothing transform and φt is the Fourier--Stieltjes transform of t. Assuming that the initial measure 0 belongs to the domain of attraction of a stable law, we describe asymptotic properties of t, as t∞. We consider the critical regime when the standard normalization leads to a degenerate limit and find an appropriate scaling ensuring a non-degenerate self-similar limit. Our approach is based on a probabilistic representation of probability measures (t)t 0 that refines the corresponding construction proposed in Bassetti and Ladelli [Ann. Appl. Probab. 22(5): 1928--1961, 2012].