Strongly localized semiclassical states for nonlinear Dirac equations

Abstract

We study semiclassical states of the nonlinear Dirac equation \[ -i∂t = icΣk=13αk∂k - mc2β - M(x) + f(||), t∈R,\ x∈R3, \] where V is a bounded continuous potential function and the nonlinear term f(||) is superlinear, possibly of critical growth. Our main result deals with standing wave solutions that concentrate near a critical point of the potential. Standard methods applicable to nonlinear Schr\"odinger equations, like Lyapunov-Schmidt reduction or penalization, do not work, not even for the homogeneous nonlinearity f(s)=sp. We develop a variational method for the strongly indefinite functional associated to the problem.