Vanishing geodesic distance for right-invariant Sobolev metrics on diffeomorphism groups

Abstract

We study the geodesic distance induced by right-invariant metrics on the group Diffc(M) of compactly supported diffeomorphisms, for various Sobolev norms Ws,p. Our main result is that the geodesic distance vanishes identically on every connected component whenever s<\n/p,1\, where n is the dimension of M. We also show that previous results imply that whenever s > n/p or s 1, the geodesic distance is always positive. In particular, when n 2, the geodesic distance vanishes if and only if s<1 in the Riemannian case p=2, contrary to a conjecture made in Bauer et al. [BBHM13].