The Minkowski problem for the k-torsional rigidity

Abstract

P. Salani [Adv. Math., 229 (2012)] introduced the k-torsional rigidity associated with a k-Hessian equation and obtained the Brunn-Minkowski inequalities w.r.t. the torsional rigidity in R3. Following this work, we first construct, in the present paper, a Hadamard variational formula for the k-torsional rigidity with 1≤ k≤ n-1, then we can deduce a k-torsional measure from the Hadamard variational formula. Based on the k-torsional measure, we propose the Minkowski problem for the k-torsional rigidity and confirm the existence of its smooth non-even solutions by the method of a curvature flow. Specially, a new proof method for the uniform lower bound estimation in the C0 estimation for the solution to the curvature flow is presented with the help of invariant functional (t).