The Disk-Based Origami Theorem and a Glimpse of Holography for Traversing Flows

Abstract

This paper describes a mechanism by which a traversally generic flow v on a smooth connected manifold X with boundary produces a compact CW-complex T(v), which is homotopy equivalent to X and such that X embeds in T(v)× R. The CW-complex T(v) captures some residual information about the smooth structure on X (such as the stable tangent bundle of X). Moreover, T(v) is obtained from a simplicial origami map O: Dn T(v), whose source space is a disk Dn ⊂ ∂ X of dimension n = (X) -1. The fibers of O have the cardinality (n+1) at most. The knowledge of the map O, together with the restriction to Dn of a Lyapunov function f:X R for v, make it possible to reconstruct the topological type of the pair (X, F(v)), were F(v) is the 1-foliation, generated by v. This fact motivates the use of "holography" in the title.