Local topological rigidity of non-geometric 3-manifolds

Abstract

We study Riemannian metrics on compact, torsionless, non-geometric 3-manifolds, i.e. whose interior does not support any of the eight model geometries. We prove a lower bound "\`a la Margulis" for the systole and a volume estimate for these manifolds, only in terms of an upper bound of entropy and diameter. We then deduce corresponding local topological rigidy results in the class Mngt∂ (E,D) of compact non-geometric 3-manifolds with torsionless fundamental group (with possibly empty, non-spherical boundary) whose entropy and diameter are bounded respectively by E, D. For instance, this class locally contains only finitely many topological types; and closed, irreducible manifolds in this class which are close enough (with respect to E,D) are diffeomorphic. Several examples and counter-examples are produced to stress the differences with the geometric case.