Circle-like concentrated solutions for two-component Bose-Einstein condensates

Abstract

We investigate the normalized solutions of the following two-component Bose-Einstein condensates (BEC) system equation\ split - u + (λ+P(x))u &= α u3 +β uv2, && in R2,\\- v + (λ+Q(x))v &= γ v3 +β u2 v, && in R2, split .equation with L2-constraint ∫R2(u2+v2)\,dx = 1. For any α>0, γ > 0 and \ β ∈ (-αγ,0)(0, \α,γ\) ( \α,γ\ , + ∞), we establish the existence of synchronized solutions concentrating on high-dimensional subsets of R2 by employing a finite-dimensional reduction method combined with some local Pohozaev identities. More precisely, we construct vector radial solutions that concentrate on circles when α + γ - 2βαγ - β2 tends to zero. Our results fill the blank in the system for high-dimensional concentrated normalized solutions.