A note on deformation argument for L2 constraint problem

Abstract

We study the existence of L2 normalized solutions for nonlinear Schr\"odinger equations and systems. Under new Palais-Smale type conditions we develop new deformation arguments for the constraint functional on Sm=\ u; \, ∫RN | u |2=m\ or Sm1 × Sm2. As applications, we give other proofs to the results of [[J:20], [BdV:6], [BS1:7]]. As to the results of [[J:20], [BdV:6]], our deformation result enables us to apply the genus theory directly to the corresponding functional to obtain infinitely many solutions. As to the result [[BS1:7]], via our deformation result we can show the existence of vector solution without using constraint related to the Pohozaev identity.