A revised proof of uniqueness of self-similar profiles to Smoluchowski's coagulation equation for kernels close to constant

Abstract

In this article we correct the proof of a uniqueness result for self-similar solutions to Smoluchowski's coagulation equation for kernels K=K(x,y) that are homogeneous of degree zero and close to constant in the sense that equation* - ≤ K(x,y)-2 ≤ ( (xy)α + (yx)α) equation* for α ∈ [0, 1 2). Assuming in addition that K has an analytic extension to C(-∞,0] and prescribing the precise asymptotic behaviour of K at the origin, we prove that self-similar solutions with given mass are unique if is sufficiently small.