The Volume of complete anti-de Sitter 3-manifolds

Abstract

Up to a finite cover, closed anti-de Sitter 3-manifolds are quotients of SO0(2,1) by a discrete subgroup of SO0(2,1) × SO0(2,1) of the form \[j× ()~,\] where is the fundamental group of a closed oriented surface, j a Fuchsian representation and another representation which is "strictly dominated" by j. Here we prove that the volume of such a quotient is proportional to the sum of the Euler classes of j and . As a consequence, we obtain that this volume is constant under deformation of the anti-de Sitter structure. Our results extend to (not necessarily compact) quotients of SO0(n,1) by a discrete subgroup of SO0(n,1) × SO0(n,1).