Ground state and multiple solutions for modified autonomous fourth-order elliptic equations with Berestycki-Lions type conditions

Abstract

This article establishes the existence of a ground state and infinitely many solutions for the modified fourth-order elliptic equation: \[ aligned \ arrayll 2 u - u + u - 12u(u2) = f(u), & in RN, u ∈ H2(RN), array . aligned \] where 4 < N ≤ 6 andf:R→R is a nonlinearity of Berestycki-Lions type. For the ground state solution, we develop a novel approach that combines Jeanjean's technique with a Pohozaev-Palais-Smale sequence construction. When f is odd, we prove infinite multiplicity of radially symmetric solutions via minimax methods on a topologically constrained comparison functional. This work resolves the lack of results for this autonomous problem under almost the weakest nonlinearity conditions.