On open books and embedding of smooth and contact manifolds

Abstract

We discuss embedding of manifolds in the category of open books, contact manifolds and contact open books. We prove an open book version of the Haefliger--Hirsch embedding theorem by showing that every k-connected closed n-manifold (n≥ 7, k < n-42) admits an open book embedding in the trivial open book of S2n-k. We then prove that every closed manifold M2n+1 that bounds an achiral Lefschetz fibration, admits open book embedding in the trivial open book of S23n2 + 3. We also prove that every closed manifold M2n+1 bounding an achiral Lefschetz fibration admits a contact structure that isocontact embeds in the standard contact structure on R2n+3. Finally, we give various examples of contact open book embeddings of contact (2n+1)-manifolds in the trivial supporting open book of the standard contact structure on S4n+1.