Normalized Ground State Solutions for Fractional Schrodinger Systems with General Nonlinearities (2311.16846v1)

Abstract: Normalized ground state solutions (NGSS) of Schrodinger equations (SE) have attracted the attention of many research groups during the last decades. This is essentially due to their relevance in many fields in physics and engineering, where the stable and most attractive solutions happen to be the normalized ones. For a single (SE), recent developments lead to the establishment of existence and non-existence results for a wide range of natural nonlinearities in (SE) in the sub-critical, critical and super-critical regimes. However for systems of (SE), there are still many interesting open questions for basic nonlinearities. It certainly requires innovative ideas to shed some light to treat these complex situations. So far, only a very few specific nonlinearities have been addressed. Unlike the single (SE), the corresponding strict sub-additivity inequality is challenging and an improved concentration-compactness theorem is critical to treat (NGSS) of systems of (SE). The aim of this paper is to establish the existence of (NGSS) for a large class of nonlinearities. This class includes many relevant pure-power type nonlinearities and can be easily extended to Hartree type nonlinearities (and a combination of both). The presence of the fractional Laplacian adds a considerable difficulty to rule out the dichotomy. We were able to overcome this challenge and establish very general assumptions ensuring the strict subadditivity of the constrained energy functional. We believe that our approach will open the door to many unresolved problems.