Sobolev Metrics on Shape Space, II: Weighted Sobolev Metrics and Almost Local Metrics

Abstract

In continuation of [3] we discuss metrics of the form GPf(h,k)=∫M Σi=0pi((f)) ((Pi)fh,k) (f*) on the space of immersions (M,N) and on shape space Bi(M,N)=(M,N)/Diff(M). Here (N,) is a complete Riemannian manifold, M is a compact manifold, f:M N is an immersion, h and k are tangent vectors to f in the space of immersions, f* is the induced Riemannian metric on M, (f*) is the induced volume density on M, (f)=∫M(f*), i are positive real-valued functions, and (Pi)f are operators like some power of the Laplacian f*. We derive the geodesic equations for these metrics and show that they are sometimes well-posed with the geodesic exponential mapping a local diffeomorphism. The new aspect here are the weights i((f)) which we use to construct scale invariant metrics and order 0 metrics with positive geodesic distance. We treat several concrete special cases in detail.