A universal non-embedding theorem for 3-manifolds

Abstract

We prove that given two compact oriented 3-manifolds N and M, with M satisfying only a mild hypothesis, there is a hyperbolic 3-manifold N' arbitrarily ``closely related'' to N, and such that N' does not embed in M. For instance, as a weak version of our main theorem, if M is a rational homology sphere then for any k≥ 1 the 3-manifold N' can be chosen to be Yk-equivalent to N. Our techniques rely on the construction of 3-manifolds with complicated Frohman--Kania-Bartoszy\'nska ideals, using the strong approximation for SO3-Witten-Reshetikhin-Turaev quantum representations of mapping class groups of surfaces.