A Bulk Localized State and New Holographic Renormalization Group Flow in 3D Spin-3 Gravity

Abstract

We construct a localized state of a scalar field in 3D spin-3 gravity. 3D spin-3 gravity is thought to be holographically dual to W3 extended CFT on a boundary at infinity. It is known that while W3 algebra is a non-linear algebra, in the limit of large central charge c a linear finite-dimensional subalgebra generated by Wn \, (n=0,1,2) and Ln (n= 0,1) is singled out. The localized state is constructed in terms of these generators. To write down an equation of motion for a scalar field which is satisfied by this localized state it is necessary to introduce new variables for an internal space α, β, γ, in addition to ordinary coordinates x and y. The higher-dimensional space, which combines the bulk spacetime with the `internal space', which is an analog of superspace in supersymmetric theory, is introduced. The `physical bulk spacetime' is a 3D hypersurface with constant α, β and γ embedded in this space. We will work in Poincar\'e coordinates of AdS space and consider W-quasi-primary operators h(x+) with a conformal weight h in the boundary and study two and three point functions of W-quasi-primary operators transformed as eix+Lh-1 eβ+Wh-1 h(0) e-β+Wh-1e-ix+Lh-1. Here Lhn and Whn are sl(3,R) generators in the hyperbolic basis for Poincar\'e coordinates. It is shown that in the β+ → ∞ limit, the conformal weight changes to a new value h'=h/2. This may be regarded as a Renormalization Group (RG) flow. It is argued that this RG flow will be triggered by terms S β+ Wh-1+β- Wh-1 added to the action.