Multiple normalized solutions for two coupled Gross-Pitaevskii equations with attractive interactions and mass constriants

Abstract

We are concerned with the following system of two coupled time-independent Gross-Pitaevskii equations cases - u+λ1 u=μ1|u|p-2u+α |u|α-2|v|βu ~in~ N,\\ - v+λ2 v=μ2|v|q-2v+β |u|α|v|β-2v ~in~ N, cases which arises in two-components Bose-Einstein condensates and involve attractive Sobolev subcritical or critical interactions, i. e., >0 and α+β≤ 2*. This system is employed by seeking critical points of the associated variational functional with the constrained mass below ∫RN|u|2 dx=a, ∫RN|v|2 dx=b. In the mass mixed case, i. e., 2<p<2+4N<q<2*, for some suitable a,b, and β, the system above admits two positive solutions. In particular, in the case α+β<2*, using variational methods on the L2-ball, two positive solutions are obtained, one of which is a local minimizer and the second one is a mountain pass solution.