Geometric properties of optimizers for the maximum gradient of the torsion function

Abstract

Consider J():= \|∇ u\|∞/|| and JP():= \|∇ u\|∞/P() , where is a planar convex domain, u is the torsion function, P() is the perimeter of and || its area. We prove that there exist planar convex domains that maximize the functionals J and JP, and any maximizer has a C1 boundary that contains a line segment on which |∇ u| attains its maximum.

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