Surface projective convexe de volume fini

Abstract

A convex projective surface is the quotient of a properly convex open of P() by a discret subgroup of SL3(). We give some caracterisations of the fact that a convex projective surface is of finite volume for the Busemann's measure. We deduce of this that if is not a triangle then is strictly convex, with 1 boundary and that a convex projective surface S is of finite volume if and only if the dual surface is of finite volume.