Asymptotics of self-similar solutions to coagulation equations with product kernel

Abstract

We consider mass-conserving self-similar solutions for Smoluchowski's coagulation equation with kernel K(,η)= ( η)λ with λ ∈ (0,1/2). It is known that such self-similar solutions g(x) satisfy that x-1+2λ g(x) is bounded above and below as x 0. In this paper we describe in detail via formal asymptotics the qualitative behavior of a suitably rescaled function h(x)=hλ x-1+2λ g(x) in the limit λ 0. It turns out that h 1+ C xλ/2 (λ x) as x 0. As x becomes larger h develops peaks of height 1/λ that are separated by large regions where h is small. Finally, h converges to zero exponentially fast as x ∞. Our analysis is based on different approximations of a nonlocal operator, that reduces the original equation in certain regimes to a system of ODE.