Thickness functions for elliptic level sets: gradient formulas, normal expansions, and geometric remarks

Abstract

We study the geometry of superlevel sets Ωt = \u > t\ of solutions to -Δu = μ with μ≥ 0 compactly supported in a convex core C ⊂ Ω. Under the radial monotonicity lemma (due to Shahgholian), each level set is a normal graph over ∂ C with thickness function dt. We derive an exact formula for the tangential gradient of dt and, under a quantitative small-thickness hypothesis \|dt\|C1(∂ C) 1, an asymptotic expansion of the unit normal to Γt = ∂ Ωt. We discuss the relation with Shahgholian's theorem and give examples showing that the geometric normal property (GNP) does not imply that dt is constant, even in the small-thickness regime. This work provides a geometric language for studying elliptic level sets, without claiming a new proof of Shahgholian's theorem.