Can we run to infinity? The diameter of the diffeomorphism group with respect to right-invariant Sobolev metrics

Abstract

The group Diff(M) of diffeomorphisms of a closed manifold M is naturally equipped with various right-invariant Sobolev norms Ws,p. Recent work showed that for sufficiently weak norms, the geodesic distance collapses completely (namely, when sp dimM and s<1). But when there is no collapse, what kind of metric space is obtained? In particular, does it have a finite or infinite diameter? This is the question we study in this paper. We show that the diameter is infinite for strong enough norms, when (s-1)p dimM, and that for spheres the diameter is finite when (s-1)p<1. In particular, this gives a full characterization of the diameter of Diff(S1). In addition, we show that for Diffc(Rn), if the diameter is not zero, it is infinite.