On the Space of C1 Regular Curves on Sphere with Constrained Curvature

Abstract

Let P_12(P, Q) denote the set of C1 regular curves in the 2-sphere S2 that start and end at given points with the corresponding Frenet frames P and Q, whose tangent vectors are Lipschitz continuous, and their a.e. existing geodesic curvatures have essentially bounds in (1, 2), -∞<1<2<∞. In this article, firstly we study the geometric property of the curves in P_12(P, Q). We introduce the concepts of the lower and upper curvatures at any point of a C1 regular curve and prove that a C1 regular curve is in P_12(P, Q) if and only if the infimum of its lower curvature and the supremum of its upper curvature are constrained in (1,2). Secondly we prove that the C0 and C1 topologies on P_12(P, Q) are the same. Further, we show that a curve in P_12(P, Q) can be determined by the solutions of differential equation '(t) = (t)(t) with (t)∈ SO3(R) with special constraints to (t)∈so3(R) and give a complete metric on P_12(P, Q) such that it becomes a (trivial) Banach manifold.