Open book decompositions versus prime factorizations of closed, oriented 3-manifolds

Abstract

Let M be a closed, oriented, connected 3--manifold and (B,π) an open book decomposition on M with page and monodromy . It is easy to see that the first Betti number of is bounded below by the number of S2× S1--factors in the prime factorization of M. Our main result is that equality is realized if and only if is trivial and M is a connected sum of S2× S1's. We also give some applications of our main result, such as a new proof of the result by Birman and Menasco that if the closure of a braid with n strands is the unlink with n components then the braid is trivial.