The aggregation equation with power-law kernels: ill-posedness, mass concentration and similarity solutions

Abstract

We study the multidimensional aggregation equation ut+(uv)=0, v=-∇ K*u with initial data in 2(d) Lp(d). We prove that with biological relevant potential K(x)=|x|, the equation is ill-posed in the critical Lebesgue space Ld/(d-1)(d) in the sense that there exists initial data in 2(d) Ld/(d-1)(d) such that the unique measure-valued solution leaves Ld/(d-1)(d) immediately. We also extend this result to more general power-law kernels K(x)=|x|α, 0<α<2 for p=ps:=d/(d+α-2), and prove a conjecture in Bertozzi, Laurent and Rosado [5] about instantaneous mass concentration for initial data in 2(d) Lp(d) with p<ps. Finally, we classify all the "first kind" radially symmetric similarity solutions in dimension greater than two.