Invariants of embeddings of 2-surfaces in 3-space

Abstract

Let M be a sphere with handles and holes, f:M R3 an embedding, and H1=H1(M; Z). We study a simple isotopy invariant of f, the Seifert bilinear form L(f):H1× H1 Z. Let :H1× H1 Z be the intersection form of M. Then the Seifert form is -symmetric, i.e., L(f)(β,γ)-L(f)(γ,β)=βγ for any β,γ∈ H1. If M has non-empty boundary, then any -symmetric bilinear form H1× H1 Z is realizable as L(f) for some embedding f. We present a characterization of realizable forms for the torus M. The results are simple and presumably known in folklore. We present a simplified exposition accessible to non-specialists.