English

Anisotropic elliptic equations with gradient-dependent lower order terms and $L^1$ data

Analysis of PDEs 2022-03-15 v3

Abstract

We prove the existence of a weak solution for a general class of Dirichlet anisotropic elliptic problems such as Au+Φ(x,u,u)=Bu+f\mathcal Au+\Phi(x,u,\nabla u)=\mathfrak{B}u+f in Ω\Omega, where Ω\Omega is a bounded open subset of RN\mathbb R^N and fL1(Ω)f\in L^1(\Omega) is arbitrary. The principal part is a divergence-form nonlinear anisotropic operator A\mathcal A, the prototype of which is Au=j=1Nj(jupj2ju)\mathcal A u=-\sum_{j=1}^N \partial_j(|\partial_j u|^{p_j-2}\partial_j u) with pj>1p_j>1 for all 1jN1\leq j\leq N and j=1N(1/pj)>1\sum_{j=1}^N (1/p_j)>1. As a novelty in this paper, our lower order terms involve a new class of operators B\mathfrak B such that AB\mathcal{A}-\mathfrak{B} is bounded, coercive and pseudo-monotone from W01,p(Ω)W_0^{1,\overrightarrow{p}}(\Omega) into its dual, as well as a gradient-dependent nonlinearity Φ\Phi with an "anisotropic natural growth" in the gradient and a good sign condition.

Keywords

Cite

@article{arxiv.2001.02754,
  title  = {Anisotropic elliptic equations with gradient-dependent lower order terms and $L^1$ data},
  author = {Barbara Brandolini and Florica C. Cîrstea},
  journal= {arXiv preprint arXiv:2001.02754},
  year   = {2022}
}
R2 v1 2026-06-23T13:06:26.824Z