Positive energy representations of Sobolev diffeomorphism groups of the circle

Abstract

We show that any positive energy projective unitary representation of Diff(S1) extends to a strongly continuous projective unitary representation of the fractional Sobolev diffeomorphisms Ds(S1) for any real s>3, and in particular to Ck-diffeomorphisms Diffk(S1) with k>=4. A similar result holds for the universal covering groups provided that the representation is assumed to be a direct sum of irreducibles. As an application we show that a conformal net of von Neumann algebras on S1 is covariant with respect to Ds(S1), s > 3. Moreover every direct sum of irreducible representations of a conformal net is also Ds(S1)-covariant.