Combinatorialization of spaces of nondegenerate spherical curves

Abstract

A parametric curve γ of class Cn on the n-sphere is said to be nondegenerate (or locally convex) when (γ(t),γ'(t),·s,γ(n)(t))>0 for all values of the parameter t. We orthogonalize this ordered basis to obtain the Frenet frame Fγ of γ assuming values in the orthogonal group SOn+1 (or its universal double cover, Spinn+1), which we decompose into Schubert or Bruhat cells. To each nondegenerate curve γ we assign its itinerary: a word w in the alphabet Sn+1\e\ that encodes the succession of non open Schubert cells pierced by the complete flag of Rn+1 spanned by the columns of Fγ. Without loss of generality, we can focus on nondegenerate curves with initial and final flags both fixed at the (non oriented) standard complete flag. For such curves, given a word w, the subspace of curves following the itinerary w is a contractible globally collared topological submanifold of finite codimension. By a construction reminiscent of Poincar\'e duality, we define abstract cell complexes mapped into the original space of curves by weak homotopy equivalences. The gluing instructions come from a partial order in the set of words. The main aim of this construction is to attempt to determine the homotopy type of spaces of nondegenerate curves for n>2. The reader may want to contrast the present paper's combinatorial approach with the geometry-flavoured methods of previous works.