Skew flat fibrations

Abstract

A fibration of Rn by oriented copies of Rp is called skew if no two fibers intersect nor contain parallel directions. Conditions on p and n for the existence of such a fibration were given by Ovsienko and Tabachnikov. A classification of smooth fibrations of R3 by skew oriented lines was given by Salvai, in analogue with the classification of oriented great circle fibrations of S3 by Gluck and Warner. We show that Salvai's classification has a topological variation which generalizes to characterize all continuous fibrations of Rn by skew oriented copies of Rp. We show that the space of fibrations of R3 by skew oriented lines deformation retracts to the subspace of Hopf fibrations, and therefore has the homotopy type of a pair of disjoint copies of S2. We discuss skew fibrations in the complex and quaternionic setting and give a necessary condition for the existence of a fibration of Cn ( Hn) by skew oriented copies of Cp ( Hp).