Existence and non-existence for the collision-induced breakage equation

Abstract

A mathematical model for collision-induced breakage is considered. Existence of weak solutions to the continuous nonlinear collision-induced breakage equation is shown for a large class of unbounded collision kernels and daughter distribution functions, assuming the collision kernel K to be given by K(x,y)= xα yβ + xβ yα with α β 1. When α + β ∈ [1,2], it is shown that there exists at least one weak mass-conserving solution for all times. In contrast, when α + β ∈ [0,1) and α 0, global mass-conserving weak solutions do not exist, though such solutions are constructed on a finite time interval depending on the initial condition. The question of uniqueness is also considered. Finally, for α <0 and a specific daughter distribution function, the non-existence of mass-conserving solutions is also established.