3-manifolds of rank 3 have filling links
Abstract
M. Freedman and V. Krushkal introduced the notion of a "filling" link in a 3-manifold: a link L is filling in M if for any spine G of M disjoint from L, π1(G) injects into π1(M L ). Freedman and Krushkal show that there exist links in the 3-torus T3 that satisfy a weaker form of filling, but they leave open the question of whether T3 contains an actual filling link. We answer this question affirmatively by proving in fact that every closed, orientable 3-manifold M with rank(π1(M)) = 3 contains a filling link.
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