Sharp lower bound for the Monge-Amp\`ere torsion on convex sets

Abstract

The Monge-Amp\`ere torsion deficit of an open, bounded convex set ⊂n of class C2 is the normalized gap between the value of the torsion functional evaluated on and its value on the ball with the same (n-1)-quermassintegral as . Using the technique of the shape derivative, we prove that the ratio between this deficit and to a geometric deficit arising from the Alexandrov-Fenchel inequality, for any given family of open, bounded convex sets of n (n≥2) of class C2, smoothly converging to a ball, is bounded from below by a dimensional constant. We also show that this ratio is always bounded from above by a constant.