Homotopy type of spaces of locally convex curves in the sphere S3

Abstract

Locally convex (or nondegenerate) curves in the sphere Sn have been studied for several reasons, including the study of linear ordinary differential equations of order n+1. Taking Frenet frames allows us to obtain corresponding curves in the group Spinn+1. Let Ln(z0;z1) be the space of such curves with prescribed endpoints (0) = z0, (1) = z1. The aim of this paper is to determine the homotopy type of the spaces L3(z0;z1) for all z0, z1 ∈ Spin4. As a corollary, we obtain the homotopy type of the space of closed locally convex curves in either S3 or P3. There are many previous papers addressing related questions. An early paper solves the corresponding problem for curves in S2. Another previous result (with B. Shapiro) reduces the problem to z0 = 1 and z1 ∈ Quat4 where Quat4 ⊂ Spin4 is a finite group of order 16. A more recent paper shows that for z1 ∈ Quat4 Z(Quat4) we have a homotopy equivalence L3(1;z1) ≈ Spin4. In this paper we compute the homotopy type of L3(1;z1) for z1 ∈ Z(Quat4): it is equivalent to the wedge of Spin4 with an infinite countable family of spheres (as for the case n = 2). The structure of the proof can be compared to that of the case n = 2 but some of the steps require the creation of new theories, involving algebra and combinatorics. We construct explicit subsets Y ⊂ Ln(z0;z1) for which the inclusion Y ⊂ Spinn+1(z0;z1) is a homotopy equivalence. For n = 2, there is a simple geometric description of Y; for n = 3, the far less natural construction is based on the theory of itineraries of such curves. The itinerary of a curve in Ln(1;z1) is a finite word in the alphabet Sn+1 \e\ of nontrivial permutations.

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