H\"older bounds and regularity of emerging free boundaries for strongly competing Schr\"odinger equations with nontrivial grouping

Abstract

We study regularity issues for systems of elliptic equations of the type \[ - ui=fi,β(x)-β Σj≠ i aij ui |ui|p-1|uj|p+1 \] set in domains ⊂ RN, for N ≥ 1. The paper is devoted to the derivation of C0,α estimates that are uniform in the competition parameter β > 0, as well as to the regularity of the limiting free-boundary problem obtained for β + ∞. The main novelty of the problem under consideration resides in the non-trivial grouping of the densities: in particular, we assume that the interaction parameters aij are only non-negative, and thus may vanish for specific couples (i,j). As a main consequence, in the limit β +∞, densities do not segregate pairwise in general, but are grouped in classes which, in turn, form a mutually disjoint partition. Moreover, with respect to the literature, we consider more general forcing terms, sign-changing solutions, and an arbitrary p>0. In addition, we present a regularity theory of the emerging free-boundary, defined by the interface among different segregated groups. These equations are very common in the study of Bose-Einstein condensates and are of key importance for the analysis of optimal partition problems related to high order eigenvalues.