31 research outputs found
Two properties of volume growth entropy in Hilbert geometry
Get PDFThe aim of this paper is to provide two examples in Hilbert geometry which
show that volume growth entropy is not always a limit on the one hand, and that
it may vanish for a non-polygonal domain in the plane on the other hand
Hilbert domains quasi-isometric to normed vector spaces
Get PDFWe prove that a Hilbert domain which is quasi-isometric to a normed vector
space is actually a convex polytope
Rigidity of Hilbert metrics
Get PDFWe study the groups of isometries for Hilbert metrics on bounded open convex domains in n and show that if is such a set with a strictly convex boundary, the Hilbert geometry is asymptotically Riemannian at infinity. As a consequence of this result, we prove there are no Hausdorff quotients of by isometry subgroups with finite volume except when ∂ is an ellipsoi
Two properties of volume growth entropy in Hilbert geometry
No full textThe aim of this paper is to provide two examples in Hilbert geometry which show that volume growth entropy is not always a limit on the one hand, and that it may vanish for a non-polygonal domain in the plane on the other hand
Hilbert domains that admit a quasi-isometric embedding into Euclidean space
Get PDFWe prove that a Hilbert domain which admits a quasi-isometric embedding into a finite-dimensional normed vector space is actually a convex polytop
Area of ideal triangles and Gromov hyperbolicity in Hilbert Geometry
Get PDFInternational audienceWe prove, in the context of Hilbert geometry, the equivalence between the existence of an upper bound on the area of ideal triangles and the Gromov-hyperbolicity
Hilbert geometry for convex polygonal domains
Get PDFWe prove in this paper that the Hilbert geometry associated with an open
convex polygonal set is Lipschitz equivalent to Euclidean plane
Hyperbolicité au sens de Gromov et aires des triangles idéaux en géométrie de Hilbert
No full textNational audienc
