Open book structures on semi-algebraic manifolds

Abstract

Given a C2 semi-algebraic mapping F: RN → Rp, we consider its restriction to W RN an embedded closed semi-algebraic manifold of dimension n-1≥ p≥ 2 and introduce sufficient conditions for the existence of a fibration structure (generalized open book structure) induced by the projection F F :W F-1(0) Sp-1. Moreover, we show that the well known local and global Milnor fibrations, in the real and complex settings, follow as a byproduct by considering W as spheres of small and big radii, respectively. Furthermore, we consider the composition mapping of F with the canonical projection π: Rp Rp-1 and prove that the fibers of F F and π F π F are homotopy equivalent. We also show several formulae relating the Euler characteristics of the fiber of the projection F F and W F-1(0). Similar formulae are proved for mappings obtained after composition of F with canonical projections.