Coagulation equations with source leading to anomalous self-similarity

Abstract

We study the long-time behaviour of the solutions to Smoluchowski coagulation equations with a source term of small clusters. The source drives the system out-of-equilibrium, leading to a rich range of different possible long-time behaviours, including anomalous self-similarity. The coagulation kernel is non-gelling, homogeneous, with homogeneity γ ≤ -1 , and behaves like xγ+λ y-λ when y x with γ+2λ > 1 . Our analysis shows that the long-time behaviour of the solutions depends on the parameters γ and λ. More precisely, we argue that the long-time behaviour is self-similar, although the scaling of the self-similar solutions depends on the sign of γ+λ and on whether γ=-1 or γ < -1. In all these cases, the scaling differs from the usual one that has been previously obtained when γ+2λ <1 or γ+2λ ≥ 1, γ >-1. In the last part of the paper, we present some conjectures supporting the self-similar ansatz also for the critical case γ+2λ=1, γ ≤ -1 .