Liouville theorems and 1-dimensional symmetry for solutions of an elliptic system modelling phase separation

Abstract

We consider solutions of the competitive elliptic system \[ \ arrayll - ui = - Σj ≠ i ui uj2 & in RN \\ ui >0 & in RN array. i=1,…,k. \] We are concerned with the classification of entire solutions, according with their growth rate. The prototype of our main results is the following: there exists a function δ=δ(k,N) ∈ N, increasing in k, such that if (u1,…,uk) is a solution and \[ u1(x)+·s+uk(x) C(1+|x|d) for every x ∈ RN, \] then d δ. This means that the number of components k of the solution imposes an increasing in k minimal growth on the solution itself. If N=2, the expression of δ is explicit and optimal, while in higher dimension it can be characterized in terms of an optimal partition problem. We discuss the sharpness of our results and, as a further step, for every N 2 we can prove the 1-dimensional symmetry of the solutions satisfying suitable assumptions, extending known results which are available for k=2. The proofs rest upon a blow-down analysis and on some monotonicity formulae.