On a two-component Bose-Einstein condensate with steep potential wells

Abstract

In this paper, we study the following two-component systems of nonlinear Schr\"odinger equations equation* \& u-(λ a(x)+a0(x))u+μ1u3+β v2u=0&in 3,\\ & v-(λ b(x)+b0(x))v+μ2v3+β u2v=0&in 3,\\ &u,v∈, u,v>0 3,. equation* where λ,μ1,μ2>0 and β<0 are parameters; a(x), b(x)≥0 are steep potentials and a0(x),b0(x) are sign-changing weight functions; a(x), b(x), a0(x) and b0(x) are not necessarily to be radial symmetric. By the variational method, we obtain a ground state solution and multi-bump solutions for such systems with λ sufficiently large. The concentration behaviors of solutions as both λ+∞ and β-∞ are also considered. In particular, the phenomenon of phase separations is observed in the whole space 3. In the Hartree-Fock theory, this provides a theoretical enlightenment of phase separation in 3 for the 2-mixtures of Bose-Einstein condensates.