Failure of Lr-Calder\'on-Zygmund estimates for the p-Laplace equation for small r
Abstract
Let p ≠ 2. For any small enough r> \p-1,1\ and for any > 1 there exists a Lipschitz function u and a bounded vectorfield f such that \[ cases div(|∇ u|p-2 ∇ u) = div (f) & in B2\\ u=0 &on ∂ B2 cases \] but \[ ∫B2 |∇ u|r ≤ ∫B2 |f|rp-1. \] This disproves a conjecture by Iwaniec from 1983. The proof adapts recent convex-integration ideas by Colombo-Tione.
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