The Fundamental Crossed Module of the Complement of a Knotted Surface

Abstract

We prove that if M is a CW-complex and M1 is its 1-skeleton then the crossed module 2(M,M1) depends only on the homotopy type of M as a space, up to free products, in the category of crossed modules, with 2(D2,S1). From this it follows that, if G is a finite crossed module and M is finite, then the number of crossed module morphisms 2(M,M1) G can be re-scaled to a homotopy invariant IG(M), depending only on the homotopy 2-type of M. We describe an algorithm for calculating π2(M,M(1)) as a crossed module over π1(M(1)), in the case when M is the complement of a knotted surface in S4 and M(1) is the handlebody made from the 0- and 1-handles of a handle decomposition of M. Here is presented by a knot with bands. This in particular gives us a geometric method for calculating the algebraic 2-type of the complement of a knotted surface from a hyperbolic splitting of it. We prove in addition that the invariant IG yields a non-trivial invariant of knotted surfaces in S4 with good properties with regards to explicit calculations.