Fractional Sobolev metrics on spaces of immersed curves

Abstract

Motivated by applications in the field of shape analysis, we study reparametrization invariant, fractional order Sobolev-type metrics on the space of smooth regular curves Imm(S1,Rd) and on its Sobolev completions Iq(S1,Rd). We prove local well-posedness of the geodesic equations both on the Banach manifold Iq(S1,Rd) and on the Fr\'echet-manifold Imm(S1,Rd) provided the order of the metric is greater or equal to one. In addition we show that the Hs-metric induces a strong Riemannian metric on the Banach manifold Is(S1,Rd) of the same order s, provided s> 32. These investigations can be also interpreted as a generalization of the analysis for right invariant metrics on the diffeomorphism group.