Three-manifolds with boundary and the Andrews-Curtis transformations

Abstract

We investigate an extended version of the stable Andrews-Curtis transformations, referred to as EAC transformations, and compare it with a notion of equivalence in a family of 3-manifolds with boundary, called the simple balanced 3-manifolds. A simple balanced 3-manifold is a 3-manifold with boundary, such that every connected component N of it has unique positive and negative boundary components ∂+N and ∂-N, such that π1(N) is the normalizer of the image of π1(∂ N) in π1(N). Associated with every simple balanced 3-manifold N is the EAC equivalence class of a balanced presentation of the trivial group, denoted by PN, which remains unchanged as long as N remains in a fixed equivalence class of simple balanced 3-manifolds. In particular, the isomorphism class of the corresponding group is unchanged. Motivated by the Andrews-Curtis conjecture, we study the equivalence class of a trivial balanced 3-manifold (obtained as the product of a closed oriented surface with the unit interval). We show that every balanced 3-manifold in the trivial equivalence class admits a simplifier to a trivial balanced 3-manifold.