Homotopies of Curves on the 2-Sphere with Geodesic Curvature in a Prescribed Interval

Abstract

Let Ck1k2 denote the set of all closed curves of class Cr on the sphere S2 whose geodesic curvatures are restricted to lie in (k1,k2), furnished with the Cr topology (for some r >= 2 and possibly infinite k1 < k2). In 1970, J. Little proved that the space C0+∞ of closed curves having positive geodesic curvature has three connected components. Let ri = arccot ki (i = 1, 2). We show that Ck1k2 has n connected components C1, ..., Cn, where n is the greatest integer smaller than or equal to π/(r1-r2) + 1, and Cj contains circles traversed j times (1 <= j <= n). The component Cn-1 also contains circles traversed (n-1) + 2m times, and Cn also contains circles traversed n + 2m times, for any natural number m. In addition, each of C1, ..., Cn-2 is homotopy equivalent to SO3 (n >= 3). A simple characterization of the components in terms of the properties of a curve and a proof that Ck1k2 is homeomorphic to Ck'1k'2 whenever r1 - r2 = r'1 - r'2 (r'i = arccot k'i) are also presented.