A CW complex homotopy equivalent to spaces of locally convex curves

Abstract

Locally convex curves in the sphere Sn have been studied for several reasons, including the study of linear ordinary differential equations. Taking Frenet frames obtains corresponding curves in the group Spinn+1; : Spinn+1 Flagn+1 is the universal cover of the space of flags. Determining the homotopy type of spaces of such curves with prescribed initial and final points appears to be a hard problem. We may focus on Ln, the space of locally convex curves : [0,1] Spinn+1 with (0) = 1, ((1)) = (1). Convex curves form a contractible connected component of Ln; there are 2n+1 other components, one for each endpoint. The homotopy type of Ln has so far been determined only for n=2. This paper is a step towards solving the problem for larger values of n. The itinerary of belongs to Wn, the set of finite words in the alphabet Sn+1 \e\. The itinerary of a curve lists the non open Bruhat cells crossed. Itineraries stratify the space Ln. We construct a CW complex Dn which is a kind of dual of Ln under this stratification: the construction is similar to Poincar\'e duality. The CW complex Dn is homotopy equivalent to Ln. The cells of Dn are naturally labeled by words in Wn; Dn is locally finite. Explicit glueing instructions are described for lower dimensions. We describe an open subset Yn ⊂ Ln, a union of strata of Ln. In each non convex component of Ln, the intersection with Yn is connected and dense. Most connected components of Ln are contained in Yn. For n > 3, in the other components the complement of Yn has codimension at least 2. The set Yn is homotopy equivalent to the disjoint union of 2n+1 copies of Spinn+1. For all n 2, all connected components of Ln are simply connected.

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