Séminaire Gaston Darboux :

Le 11 septembre 2020 à 11:15 - salle 430

Présentée par Fillastre Francois - Université Montpellier

Hyperbolic geometry of shapes of convex bodies

We define a distance on the space of convex bodies in then-dimensional Euclidean space, up to translations and homotheties, which makes it isometric to a convex subset of the infinite dimensional hyperbolic space. The ambient Lorentzian structure is an extension of the intrinsic area form of convex bodies. We deduce that the space of shapes of convex bodies (i.e. convex bodies up to similarities) has a proper distance with curvature bounded from below by ?1. In dimension 3, this space naturally identifies with the space of distances with non-negative curvature on the 2-sphere. (joint work with C. Debin)