English

The Dirichlet Problem For the Logarithmic p-Laplacian

Analysis of PDEs 2025-07-08 v3

Abstract

We introduce and study the logarithmic pp-Laplacian LΔpL_{\Delta_p}, which emerges from the formal derivative of the fractional pp-Laplacian (Δp)s(-\Delta_p)^s at s=0s=0. This operator is nonlocal, has logarithmic order, and is the nonlinear version of the newly developed logarithmic Laplacian operator. We present a variational framework to study the Dirichlet problems involving the LΔpL_{\Delta_p} in bounded domains. This allows us to investigate the connection between the first Dirichlet eigenvalue and eigenfunction of the fractional pp-Laplacian and the logarithmic pp-Laplacian. As a consequence, we deduce a Faber-Krahn inequality for the first Dirichlet eigenvalue of LΔpL_{\Delta_p}. We discuss maximum and comparison principles for LΔpL_{\Delta_p} in bounded domains and demonstrate that the validity of these depends on the sign of the first Dirichlet eigenvalue of LΔpL_{\Delta_p}. In addition, we prove that the first Dirichlet eigenfunction of LΔpL_{\Delta_p} is bounded. Furthermore, we establish a boundary Hardy-type inequality for the spaces associated with the weak formulation of the logarithmic pp-Laplacian.

Keywords

Cite

@article{arxiv.2411.11181,
  title  = {The Dirichlet Problem For the Logarithmic p-Laplacian},
  author = {Bartłomiej Dyda and Sven Jarohs and Firoj Sk},
  journal= {arXiv preprint arXiv:2411.11181},
  year   = {2025}
}

Comments

52 pages

R2 v1 2026-06-28T20:02:55.290Z