Equivalence of Milnor and Milnor-L\e fibrations for real analytic maps

Abstract

In [22] Milnor proved that a real analytic map f (Rn,0) (Rp,0), where n ≥ p, with an isolated critical point at the origin has a fibration on the tube f| Bεn f-1(Sδp-1) Sδp-1. Constructing a vector field such that, (1) it is transverse to the spheres, and (2) it is transverse to the tubes, he "inflates" the tube to the sphere, to get a fibration Sεn-1 f-1(0) Sp-1, but the projection is not necessarily given by f/ \|f\| as in the complex case. In the case f has isolated critical value, in [9] it was proved that if the fibres inside a small tube are transverse to the sphere Sε, then it has a fibration on the tube. Also in [9], the concept of d-regularity was defined, it turns out that f is d-regular if and only if the map f/|f\| Sεn-1 f-1(0) Sp-1 is a fibre bundle equivalent to the one on the tube. In this article, we prove the corresponding facts in a more general setting: if a locally surjective map f has a linear discriminant and a fibration on the tube f| Bεn f-1(Sδp-1 ) Sδp-1 , then f is d-regular if and only if the map f/ \|f\| Sεn-1 f-1() Sp-1 A (with A the radial projection of on Sp-1) is a fibre bundle equivalent to the one on the tube. We do this by constructing a vector field w which inflates the tube to the sphere in a controlled way, it satisfies properties analogous to the vector field constructed by Milnor in the complex setting: besides satisfying (1) and (2) above, it also satisfies that f/ \|f\| is constant on the integral curves of w.