Smoothness of the free boundary in a weighted p-Laplacian problem

We study the regularity of the free boundary $\partial {u > 0} \cap Ω$ in the following Alt–Caffarelli type minimum problem for the “weighted” $p$ -Laplace operator (where $1 < p < \infty$ ):

\min {\int_{Ω} (w | \nabla u |^{p} + ψ χ_{{u > 0}}) : u \in W^{1, p} (Ω), u \geq 0, u = g on \partial Ω} .

More precisely, we will show under some appropriate assumptions on the weights $w$ and $ψ$ that the free boundary is $C^{1, α}$ , except possibly at a set of Hausdorff measure zero. This is a generalization of the pioneering work by Alt, Caffarelli and Friedman (1984) and Danielli and Petrosyan (2005) to the case of nonuniform weights $w$ and $ψ$ . In addition, this paper builds upon our prior work (2025), extending the analysis of the above problem to the regularity of the free boundary.

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Keywords

weighted $p$-Laplacian, free boundary, regularity

Mathematical Subject Classification

Primary: 35B65, 35J60, 35J70, 35R35

Milestones

Received: 27 September 2025

Revised: 11 February 2026

Accepted: 9 April 2026

Published: 26 May 2026

Authors

Samer Dweik
Department of Mathematics and Statistics Qatar University Doha Qatar

Vol. 8, No. 2, 2026

Samer Dweik

Abstract

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Keywords

Mathematical Subject Classification

Milestones

Authors