Normalized solutions for a coupled fractional schrodinger system in low dimensions

Abstract

We consider the following coupled fractional Schr\"odinger system: equation* \ aligned &(-)su+λ1u=μ1|u|2p-2u+β|v|p|u|p-2u\\ &(-)sv+λ2v=μ2|v|2p-2v+β|u|p|v|p-2v\\ aligned .~RN, equation* with 0<s<1, 2s<N 4s and 1+2sN<p<NN-2s, under the following constraint align* ∫RN|u|2dx=a12 ∫RN|v|2dx=a22. align* Assuming that the parameters μ1,μ2,a1, a2 are fixed quantities, we prove the existence of normalized solution for different ranges of the coupling parameter β>0 .