Geodesic completeness of the H3/2 metric on Diff(S1)

Abstract

Of concern is the study of the long-time existence of solutions to the Euler--Arnold equation of the right-invariant H3/2-metric on the diffeomorphism group of the circle. In previous work by Escher and Kolev it has been shown that this equation admits long-time solutions if the order s of the metric is greater than 3/2, the behaviour for the critical Sobolev index s=3/2 has been left open. In this article we fill this gap by proving the analogous result also for the boundary case. The behaviour of the H3/2-metric is, however, still different from its higher order counter parts, as it does not induce a complete Riemannian metric on any group of Sobolev diffeomorphisms.