English

On capacity and torsional rigidity

Analysis of PDEs 2020-09-07 v3

Abstract

We investigate extremality properties of shape functionals which are products of Newtonian capacity \cp(\Om)\cp(\overline{\Om}), and powers of the torsional rigidity T(\Om)T(\Om), for an open set \OmRd\Om\subset \R^d with compact closure \Om\overline{\Om}, and prescribed Lebesgue measure. It is shown that if \Om\Om is convex then \cp(\Om)Tq(\Om)\cp(\overline{\Om})T^q(\Om) is (i) bounded from above if and only if q1q\ge 1, and (ii) bounded from below and away from 00 if and only if qd22(d1)q\le \frac{d-2}{2(d-1)}. Moreover a convex maximiser for the product exists if either q>1q>1, or d=3d=3 and q=1q=1. A convex minimiser exists for q<d22(d1)q< \frac{d-2}{2(d-1)}. If q0q\le 0, then the product is minimised among all bounded sets by a ball of measure 11.

Keywords

Cite

@article{arxiv.2001.04421,
  title  = {On capacity and torsional rigidity},
  author = {Michiel van den Berg and Giuseppe Buttazzo},
  journal= {arXiv preprint arXiv:2001.04421},
  year   = {2020}
}

Comments

14 pages

R2 v1 2026-06-23T13:10:02.373Z