On finite derived quotients of 3-manifold groups

Abstract

This paper studies the set of finite groups appearing as π1(M)/π1(M)(n), where M is a closed, orientable 3-manifold and π1(M)(n) denotes the n-th term of the derived series of π1(M). Our main result is that if M is a closed, orientable 3-manifold, n 2, and G π1(M)/π1(M)(n) is finite, then the cup product pairing H2(G) H2(G) H4(G) has cyclic image C, and the pairing H2(G) H2(G) C is isomorphic to the linking pairing H1(M)Tors H1(M)Tors Q/Z.