The nonlinear fractional relativistic Schr\"odinger equation: existence, multiplicity, decay and concentration results

Abstract

In this paper we study the following class of fractional relativistic Schr\"odinger equations: equation* \ arrayll (-+m2)su + V( x) u= f(u) & in RN, \\ u∈ Hs(RN), u>0 & in RN, array . equation* where >0 is a small parameter, s∈ (0, 1), m>0, N> 2s, (-+m2)s is the fractional relativistic Schr\"odinger operator, V:RN→ R is a continuous potential satisfying a local condition, and f:R→ R is a continuous subcritical nonlinearity. By using a variant of the extension method and a penalization technique, we first prove that, for >0 small enough, the above problem admits a weak solution u which concentrates around a local minimum point of V as → 0. We also show that u has an exponential decay at infinity by constructing a suitable comparison function and by performing some refined estimates. Secondly, by combining the generalized Nehari manifold method and Ljusternik-Schnirelman theory, we relate the number of positive solutions with the topology of the set where the potential V attains its minimum value.