The rolling tangent space, a forgotten vision on parallel transport and geodesics

Abstract

Given a submanifold M⊂ Rν, a curve γ:I M and tangent vectors v along γ, we roll the tangent space along γ. In doing so, we get an imprint/trace of γ on the tangent space, as well as an imprint/trace of the tangent vectors. We show that for a vector field v along γ, the imprint/trace of its covariant derivative is the ordinary derivative of its imprint/trace vector field. It then follows easily that v is a set of parallel vectors along γ if and only if their imprint/trace on the (affine) tangent space is constant and that γ is a geodesic if and only if its trace on the tangent space is a straight line.