The regularity of the boundary of a multidimensional aggregation patch

Abstract

Let d ≥ 2 and let N(y) be the fundamental solution of the Laplace equation in Rd We consider the aggregation equation ∂ ∂ t + div( v) =0, v = -∇ N * with initial data (x,0) = D0, where D0 is the indicator function of a bounded domain D0 ⊂ Rd. We now fix 0 < γ < 1 and take D0 to be a bounded C1+γ domain (a domain with smooth boundary of class C1+γ). Then we have Theorem: If D0 is a C1 + γ domain, then the initial value problem above has a solution given by (x,t) = 11 -t Dt(x), x ∈ Rd, 0 t < 1 where Dt is a C1 + γ domain for all 0 ≤ t < 1.