The Wolff potential estimate for solutions to elliptic equations with signed data (Q276044)

The author provides a new proof for pointwise Wolff estimates concerning the equation \(-\text{div}A(x,\nabla u)=\mu\) in a bounded domain \(\Omega\subset{\mathbb{R}}^n\), \(n\geq 2\). Here \(\mu\) is a signed Radon measure, \(A(x,\nabla \cdot)\) assumes standard structural conditions that contain the \(p\)-Laplace case. The approach relies on the Poisson modification technique due to Trudinger and Wang combined with an iteration method of Kilpeläinen and Malý.