Spin structures and codimension-two homeomorphism extensions

Abstract

Let : M p+2 be a smooth embedding from a connected, oriented, closed p-dimesional smooth manifold to p+2, then there is a spin structure (p+2) on M canonically induced from the embedding. If an orientation-preserving diffeomorphism τ of M extends over as an orientation-preserving topological homeomorphism of p+2, then τ preserves the induced spin structure. Let () be the subgroup of the -mapping class group (M) consisting of elements whose representatives extend over p+2 as orientation-preserving -homeomorphisms, where =, or . The invariance of (p+2) gives nontrivial lower bounds to [(M):()] in various special cases. We apply this to embedded surfaces in 4 and embedded p-dimensional tori in p+2. In particular, in these cases the index lower bounds for () are achieved for unknotted embeddings.