Browder-Livesay filtrations and the example of Cappell and Shaneson

Abstract

Let M3 be a 3-dimensional manifold with fundamental group π1(M) which contains a quaternion subgroup Q of order 8. In 1979 Cappell and Shaneson constructed a nontrivial normal map f M3× T2 M3× S2 which cannot be detected by simply connected surgery obstructions along submanifolds of codimension 0, 1, or 2, but it can be detected by the codimension 3 Kervaire-Arf invariant. The proof of non-triviality of σ(f)∈ L5(π1(M)) is based on consideration of a Browder-Livesay filtration of a manifold X with π1(X) π1(M). For a Browder-Livesay pair Yn-1⊂ Xn, the restriction of a normal map to the submanifold Y is given by a partial multivalued map Ln(π1(X)) Ln-1(π1(Y)), and the Browder-Livesay filtration provides an iteration n. This map is a basic step in the definition of the iterated Browder-Livesay invariants which give obstructions to realization of surgery obstructions by normal maps of closed manifolds. In the present paper we prove that 3(σ(f))=0 for any Browder-Livesay filtration of a manifold X4k+1 with π1(X) Q. We compute splitting obstruction groups for various inclusions Q of index 2, describe natural maps in the braids of exact sequences, and make more precise several results about surgery obstruction groups of the group Q.