An application of the continuous Steiner symmetrization to Blaschke-Santal\'o diagrams

Abstract

In this paper we consider the so-called procedure of Continuous Steiner Symmetrization, introduced by Brock in bro95,bro00. It transforms every domain ⊂⊂Rd into the ball keeping the volume fixed and letting the first eigenvalue and the torsion respectively decrease and increase. While this does not provide, in general, a γ-continuous map tt, it can be slightly modified so to obtain the γ-continuity for a γ-dense class of domains , namely, the class of polyedral sets in Rd. This allows to obtain a sharp characterization of the Blaschke-Santal\'o diagram of torsion and eigenvalue.