English

Multiple solutions of double phase variational problems with variable exponent

Analysis of PDEs 2020-10-12 v1

Abstract

This paper deals with the existence of multiple solutions for the quasilinear equation divA(x,u)uα(x)2u=f(x,u)-\mathrm{div}\,\mathbf{A}(x,\nabla u)| u| ^{\alpha (x)-2}u=f(x,u) in RN \mathbb{R} ^{N}, which involves a general variable exponent elliptic operator A\mathbf{ A} in divergence form. The problem corresponds to double phase anisotropic phenomena, in the sense that the differential operator has behaviors like ξq(x)2ξ | \xi | ^{q(x)-2}\xi for small ξ| \xi | and like ξp(x)2ξ| \xi | ^{p(x)-2}\xi for large ξ | \xi | , where 1<α()p()<q()<N1<\alpha (\cdot )\leq p(\cdot )<q(\cdot )<N. Our aim is to approach variationally the problem by using the tools of critical points theory in generalized Orlicz-Sobolev spaces with variable exponent. Our results extend the previous works Azzollini, d'Avenia, and Pomponio (2014) and Chorfi and R\u{a}dulescu (2016), from the case when exponents pp and qq are constant, to the case when p()p(\cdot ) and % q(\cdot ) are functions. We also substantially weaken some of their hypotheses overcome the lack of compactness by using the weighting method.

Keywords

Cite

@article{arxiv.2010.04467,
  title  = {Multiple solutions of double phase variational problems with variable exponent},
  author = {Xiayang Shi and Vicenţiu D. Rădulescu and Dušan D. Repovš and Qihu Zhang},
  journal= {arXiv preprint arXiv:2010.04467},
  year   = {2020}
}
R2 v1 2026-06-23T19:12:11.473Z