The Viterbo's capacity conjectures for convex toric domains and the product of a 1-unconditional convex body and its polar

Abstract

In this note, we show that the strong Viterbo conjecture holds true on any convex toric domain, and that the Viterbo's volume-capacity conjecture holds for the product of a 1-unconditional convex body A⊂Rn and its polar. We also give a direct calculus proof of the symmetric Mahler conjecture for lp-balls.