Skip to main content
To KTH's start page To KTH's start page

Lorenzo Brasco: Hardy’s inequality for convex sets: local and nonlocal

Time: Tue 2022-08-30 14.00 - 15.00

Location: Institut Mittag-Leffler, Seminar Hall Kuskvillan and Zoom

Video link: Meeting ID: 921 756 1880

Participating: Lorenzo Brasco (University of Ferrara)

Export to calendar


We start by reviewing the classical Hardy inequality for convex sets. In particu-lar, we recall a couple of classical analytic proofs. We then discuss the counterpart of Hardy’s inequality for the case of fractional Sobolev-Slobodecki˘ı spaces, still in the case of open convex subsets of the Euclidean space. In particular, we determine the sharp constant in this inequality, by constructing explicit supersolutions based on the distance function. We also show that this method works only for the mildly nonlocal regime and it gets stuck for the strongly nonlocal one. We conclude by presenting some open problems. Some of the results presented are issued from papers in collaboration with Francesca Bianchi (Ferrara & Parma), Eleonora Cinti (Bologna) and Anna Chiara Zagati (Ferrara & Parma).