The homotopy and cohomology of spaces of locally convex curves in the sphere -- I

Abstract

A smooth curve γ: [0,1] S2 is locally convex if its geodesic curvature is positive at every point. J. A. Little showed that the space of all locally positive curves γ with γ(0) = γ(1) = e1 and γ'(0) = γ'(1) = e2 has three connected components L-1,c, L+1, L-1,n. The space L-1,c is known to be contractible but the topology of the other two connected components is not well understood. We study the homotopy and cohomology of these spaces. In particular, for L-1 = L-1,c L-1,n, we show that H2k(L(-1)k, ) 1, that H2k(L(-1)(k+1), ) 2, that π2(L+1) contains a copy of Z2 and that π2k(L(-1)(k+1)) contains a copy of Z.