Chern--Simons theory, surface separability, and volumes of 3-manifolds

Abstract

We study the set vol(M,G) of volumes of all representations π1M G, where M is a closed oriented 3-manifold and G is either Iso+3 or Isoe SL2(). By various methods, including relations between the volume of representations and the Chern--Simons invariants of flat connections, and recent results of surfaces in 3-manifolds, we prove that any 3-manifold M with positive Gromov simplicial volume has a finite cover M with vol( M, Iso+3) \0\, and that any non-geometric 3-manifold M containing at least one Seifert piece has a finite cover M with vol( M, Isoe SL2()) \0\. We also find 3-manifolds M with positive simplicial volume but vol(M, Iso+3)=\0\, and non-trivial graph manifolds M with vol(M, Isoe SL2())=\0\, proving that it is in general necessary to pass to some finite covering to guarantee that vol(M,G)=\0\. Besides we determine vol(M, G ) when M supports the Seifert geometry.