Chern Simons Theory and the volume of 3-manifolds

Abstract

We give some applications of the Chern Simons gauge theory to the study of the set vol(N,G) of volumes of all representations π1N G, where N is a closed oriented three-manifold and G is either Isoe SL2(), the isometry group of the Seifert geometry, or Iso+3, the orientation preserving isometry group of the hyperbolic 3-space. We focus on three natural questions: (1) How to find non-zero values in vol(N, G)? or weakly how to find non-zero elements in vol( N, G) for some finite cover N of N? (2) Do these volumes satisfy the covering property in the sense of Thurston? (3) What kind of topological information is enclosed in the elements of vol(N, G)? We determine vol(N, G) when N supports the Seifert geometry, and we find some non-zero values in vol(N,G) for certain 3-manifolds with non-trivial geometric decomposition for either G= Iso+3 or Isoe SL2(). Moreover we will show that unlike the Gromov simplicial volume, these non-zero elements carry the gluing information between the geometric pieces of N. For a large class 3-manifolds N, including all rational homology 3-spheres, we prove that N has a positive Gromov simplicial volume iff it admits a finite covering N with vol( N, Iso+3) \0\. On the other hand, among such class, there are some N with positive simplicial volume but vol(N, Iso+3)=\0\, yielding a negative answer to question (2) for hyperbolic volume.