On 2-Dimensional Homotopy Invariants of Complements of Knotted Surfaces
Abstract
We prove that if M is a CW-complex and * is a 0-cell of M, then the crossed module 2(M,M1,*) does not depend on the cellular decomposition of M up to free products with 2(D2,S1,*), where M1 is the 1-skeleton of M. 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 (which is finite) can be re-scaled to a homotopy invariant IG(M) (i. e. not dependent on the cellular decomposition of M). We describe an algorithm to calculate 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 1-handlebody of a handle decomposition of M, which, in particular, gives a method to calculate the algebraic 2-type of M. In addition, we prove that the invariant IG yields a non-trivial invariant of knotted surfaces.
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