Celestial Sector in CFT: Conformally Soft Symmetries

Abstract

We show that time intervals of width τ in 3-dimensional conformal field theories (CFT3) on the Lorentzian cylinder admit an infinite dimensional symmetry enhancement in the limit τ → 0. The associated vector fields are approximate solutions to the conformal Killing equations in the strip labelled by a function and a conformal Killing vector on the sphere. An Inonu-Wigner contraction yields a set of symmetry generators obeying the extended BMS4 algebra. We analyze the shadow stress tensor Ward identities in CFTd on the Lorentzian cylinder with all operator insertions in infinitesimal time intervals separated by π. We demonstrate that both the leading and subleading conformally soft graviton theorems in (d-1)-dimensional celestial CFT (CCFTd-1) can be recovered from the transverse traceless components of these Ward identities in the limit τ → 0. A similar construction allows for the leading conformally soft gluon theorem in CCFTd-1 to be recovered from shadow current Ward identities in CFTd.