A multiplicity result via Ljusternick-Schnirelmann category and morse theory for a fractional schr\"odinger equation in RN

Abstract

In this work we study the following class of problems in RN, N>2s 2s (-)su + V(z)u=f(u), \,\,\, u(z) > 0 where 0<s<1, (-)s is the fractional Laplacian, is a positive parameter, the potential V:RN %is a continuous functions and the nonlinearity f: R R satisfy suitable assumptions; in particular it is assumed that V achieves its positive minimum on some set M. By using variational methods we prove existence, multiplicity and concentration of maxima of positive solutions when 0+. In particular the multiplicity result is obtained by means of the Ljusternick-Schnirelmann and Morse theory, by exploiting the "topological complexity" of the set M.