English

Multiple solutions for some symmetric supercritical problems

Analysis of PDEs 2020-05-22 v1

Abstract

The aim of this paper is investigating the existence of one or more critical points of a family of functionals which generalizes the model problem Jˉ(u) = 1p ΩAˉ(x,u)updxΩG(x,u)dx \bar J(u)\ =\ \frac1p\ \int_\Omega \bar A(x,u)|\nabla u|^p dx - \int_\Omega G(x,u) dx in the Banach space X=W01,p(Ω)L(Ω)X = W^{1,p}_0(\Omega)\cap L^\infty(\Omega), where ΩRN\Omega \subset {\mathbb R}^N is an open bounded domain, 1<p<N1 < p < N and the real terms Aˉ(x,t)\bar A(x,t) and G(x,t)G(x,t) are C1C^1 Carath\'eodory functions on Ω×R\Omega \times {\mathbb R}. We prove that, even if the coefficient Aˉ(x,t)\bar A(x,t) makes the variational approach more difficult, if it satisfies ``good'' growth assumptions then at least one critical point exists also when the nonlinear term G(x,t)G(x,t) has a suitable supercritical growth. Moreover, if the functional is even, it has infinitely many critical levels. The proof, which exploits the interaction between two different norms on XX, is based on a weak version of the Cerami-Palais-Smale condition and a suitable intersection lemma which allow us to use a Mountain Pass Theorem.

Keywords

Cite

@article{arxiv.1911.04847,
  title  = {Multiple solutions for some symmetric supercritical problems},
  author = {Anna Maria Candela and Giulina Palmieri and Addolorata Salvatore},
  journal= {arXiv preprint arXiv:1911.04847},
  year   = {2020}
}
R2 v1 2026-06-23T12:12:58.122Z