On phase separation in systems of coupled elliptic equations: asymptotic analysis and geometric aspects

Abstract

We consider a family of positive solutions to the system of k components \[ - ui,β = f(x, ui,β) - β ui,β Σj ≠ i aij uj,β2 in , \] where ⊂ RN with N 2. It is known that uniform bounds in L∞ of \uβ\ imply convergence of the densities to a segregated configuration, as the competition parameter β diverges to +∞. In this paper %we study more closely the asymptotic property of the solutions of the system in this singular limit: we establish sharp quantitative point-wise estimates for the densities around the interface between different components, and we characterize the asymptotic profile of uβ in terms of entire solutions to the limit system \[ Ui = Ui Σj≠ i aij Uj2. \] Moreover, we develop a uniform-in-β regularity theory for the interfaces.