The method of the energy function and applications

Abstract

In this work, we establish a new method to find critical points of differentiable functionals defined in Banach spaces which belong to a suitable class (J) of functionals. Once given a functional J in the class (J), the central idea of the referred method consists in defining a real function ζ of a real variable, called energy function, which is naturally associated to J in the sense that the existence of real critical points for ζ guarantees the existence of critical points for the functional J. As a consequence, we are able to solve some variational elliptic problems, whose associated energy functional belongs to (J) and provide a version of the mountain pass theorem for functionals in the class (J) that allows us to obtain mountain pass solutions without the so-called Ambrosetti-Rabinowitz condition.