Contactomorphisms with L2 metric on stream functions

Abstract

Here we investigate some geometric properties of the contactomorphism group Dθ(M) of a compact contact manifold with the L2 metric on the stream functions. Viewing this group as a generalization to the D(S1), the diffeomorphism group of the circle, we show that its sectional curvature is always non-negative and that the the Riemannian exponential map is not locally C1. Lastly, we show that the quantomorphism group is a totally geodesic submanifold of Dθ(M) and talk about its Riemannian submersion onto the symplectomorphism group of the Boothby-Wang quotient of M.