Spaces of curves with constrained curvature on hyperbolic surfaces

Abstract

Let S be a hyperbolic surface. We investigate the topology of the space of all curves on S which start and end at given points in given directions, and whose curvatures are constrained to lie in a given interval (1,2) . Such a space falls into one of four qualitatively distinct classes, according to whether (1,2) contains, overlaps, is disjoint from, or contained in the interval [-1,1] . Its homotopy type is computed in the latter two cases. We also study the behavior of these spaces under covering maps when S is arbitrary (not necessarily hyperbolic nor orientable) and show that if S is compact then they are always nonempty.