A description of values of Seifert form for punctured n-manifolds in (2n-1)-space

Abstract

We study Seifert linking form which is an invariant of embeddings of punctured n-manifolds in R2n-1. For punctured n-manifold N0 the values of this invariant are integer valued bilinear symmetric forms on Hn-1(N0; Z). We prove that value modulo two of this invariant at x, y ∈ Hn-1(N0; Z) equals PD wn-2(N0)2x2y, where PD wn-2(N0) is Poincare dual to Steifel-Whitney class. We also prove that any such form can be realized by some embedding N0 R2n-1. Also, we survey known results on classification of embeddings of connected manifolds with non-empty boundary.