Asymptotic Higher Spin Symmetries I: Covariant Wedge Algebra in Gravity

Abstract

In this paper, we study gravitational symmetry algebras that live on 2-dimensional cuts S of asymptotic infinity. We define a notion of wedge algebra W(S) which depends on the topology of S. For the cylinder S=C* we recover the celebrated Lw1+∞ algebra. For the 2-sphere S2, the wedge algebra reduces to a central extension of the anti-self-dual projection of the Poincar\'e algebra. We then extend W(S) outside of the wedge space and build a new Lie algebra Wσ(S), which can be viewed as a deformation of the wedge algebra by a spin two field σ playing the role of the shear at a cut of I. This algebra represents the gravitational symmetry algebra in the presence of a non trivial shear and is characterized by a covariantized version of the wedge condition. Finally, we construct a dressing map that provides a Lie algebra isomorphism between the covariant and regular wedge algebras.