Sobolev Metrics on Diffeomorphism Groups and the Derived Geometry of Spaces of Submanifolds

Abstract

Given a finite dimensional manifold N, the group Diff S(N) of diffeomorphism of N which fall suitably rapidly to the identity, acts on the manifold B(M,N) of submanifolds on N of diffeomorphism type M where M is a compact manifold with M< N. For a right invariant weak Riemannian metric on Diff S(N) induced by a quite general operator L: X S(N) (T*Nvol(N)), we consider the induced weak Riemannian metric on B(M,N) and we compute its geodesics and sectional curvature. For that we derive a covariant formula for curvature in finite and infinite dimensions, we show how it makes O'Neill's formula very transparent, and we use it finally to compute sectional curvature on B(M,N).