Bifurcations for a Coupled Schr\"odinger System with Multiple Components

Abstract

In this paper, we study local bifurcations of an indefinite elliptic system with multiple components: equation* \arrayll - uj + auj = μjuj3+βΣk juk2uj, uj>0\ \ in\ , uj=0 \ \ on\ ∂,\ j=1,…,n. array . equation* Here ⊂RN is a smooth and bounded domain, n3, a<-1 where 1 is the principal eigenvalue of (-, H01()); μj and β are real constants. Using the positive and non-degenerate solution of the scalar equation -ω-ω=-ω3, ω∈ H01(), we construct a synchronized solution branch Tω. Then we find a sequence of local bifurcations with respect to Tω, and we find global bifurcation branches of partially synchronized solutions.