A quantitative symmetry result for p-Laplace equations with discontinuous nonlinearities
Abstract
In this paper, we study positive solutions u of the homogeneous Dirichlet problem for the p-Laplace equation -p \,u=f(u) in a bounded domain ⊂RN, where N 2, 1<p<+∞ and f is a discontinuous function. We address the quantitative stability of a Gidas-Ni-Nirenberg type symmetry result for u, which was established by Lions and Serra when is a ball. By exploiting a quantitative version of the P\'olya-Szeg\"o principle, we prove that the deviation of u from its Schwarz symmetrization can be estimated in terms of the isoperimetric deficit of .
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