We prove that the Hilbert geometry of a product of convex sets is
bi-lipschitz equivalent the direct product of their respective Hilbert
geometries. We also prove that the volume entropy is additive with respect to
product and that amenability of a product is equivalent to the amenability of
each terms

Vernicos, Constantin

English

arXiv

Abstract. We prove that the Hilbert geometry of a product of convex sets is bi-lipschitz equivalent the direct product of their respective Hilbert geometries. We also prove that the volume en-tropy is additive with respect to product and that amenability of a product is equivalent to the amenability of each terms. Introduction and statement of results Hilbert geometries are simple metric geometries defined in the inte-rior of a convex set thanks to cross-ratios. They are generalisations of the projective model of the Hyperbolic Geometry. Because of their definition they are invariant by the action of projective transforma

On the Hilbert Geometry of products

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