Infinitely many nonradial positive solutions for multi-species nonlinear Schr\"odinger systems in RN

Abstract

In this paper, we consider the multi-species nonlinear Schr\"odinger systems in N: equation* \&- uj+Vj(x)uj=μjuj3+Σi=1;i=jdβi,j ui2uj N, &uj(x)>0 RN, &uj(x)0 |x|+∞, j=1,2,·s,d,. equation* where N=2,3, μj>0 are constants, βi,j=βj,i=0 are coupling parameters, d≥2 and Vj(x) are potentials. By Ljapunov-Schmidt reduction arguments, we construct infinitely many nonradial positive solutions of the above system under some mild assumptions on potentials Vj(x) and coupling parameters \βi,j\, without any symmetric assumptions on the limit case of the above system. Our result, giving a positive answer to the conjecture in Pistoia and Vaira PV22 and extending the results in PW13,PV22, reveals new phenomenon in the case of N=2 and d=2 and is almost optimal for the coupling parameters \βi,j\.