Normalized solutions for nonlinear Schr\"odinger systems

Abstract

We consider the existence of normalized solutions in H1(N) × H1(N) for systems of nonlinear Schr\"odinger equations which appear in models for binary mixtures of ultracold quantum gases. Making a solitary wave ansatz one is led to coupled systems of elliptic equations of the form \[ \ aligned - u1 &= 1u1 + f1(u1)+1F(u1,u2),\\ - u2 &= 2u2 + f2(u2)+2F(u1,u2),\\ u1,u2&∈ H1(N),\ N2, aligned . \] and we are looking for solutions satisfying \[ ∫N|u1|2 = a1, ∫N|u2|2 = a2 \] where a1>0 and a2>0 are prescribed. In the system 1 and 2 are unknown and will appear as Lagrange multipliers. We treat the case of homogeneous nonlinearities, i.e.\ fi(ui)=μi|ui|pi-1ui, F(u1,u2)=|u1|r1|u2|r2, with positive constants , μi, pi, ri. The exponents are Sobolev subcritical but may be L2-supercritical: p1,p2,r1+r2∈]2,2*[\,\2+4N\.