Self-similar solutions to coagulation equations with time-dependent tails: the case of homogeneity one

Abstract

We prove the existence of a one-parameter family of self-similar solutions with time dependent tails for Smoluchowski's coagulation equation, for a class of kernels K(x,y) which are homogeneous of degree one and satisfy K(x,1) k0>0 as x 0. In particular, we establish the existence of a critical *>0 with the property that for all ∈(0,*) there is a positive and differentiable self-similar solution with finite mass M and decay A(t)x-(2+) as x∞, with A(t)=eM(1+)t. Furthermore, we show that (weak) self-similar solutions in the class of positive measures cannot exist for large values of the parameter .