Litcius/Paper detail

Celestial operator product expansions and w1+∞ symmetry for all spins

Elizabeth Himwich, Monica Pate, Kyle Singh

2022Journal of High Energy Physics104 citationsDOIOpen Access PDF

Abstract

A bstract The operator product expansion of massless celestial primary operators of arbitrary spin is investigated. Poincaré symmetry is found to imply a set of recursion relations on the operator product expansion coefficients of the leading singular terms at tree-level in a holomorphic limit. The symmetry constraints are solved by an Euler beta function with arguments that depend simply on the right-moving conformal weights of the operators in the product. These symmetry-derived coefficients are shown not only to match precisely those arising from momentum-space tree-level collinear limits, but also to obey an infinite number of additional symmetry transformations that respect the algebra of w 1+ ∞ . In tree-level minimally-coupled gravitational theories, celestial currents are constructed from light transforms of conformally soft gravitons and found to generate the action of w 1+∞ on arbitrary massless celestial primaries. Results include operator product expansion coefficients for fermions as well as those arising from higher-derivative non-minimal couplings of gluons and gravitons.

Topics & Concepts

GravitonOperator product expansionPhysicsMathematical physicsOperator (biology)Symmetry (geometry)Product (mathematics)Massless particleHolomorphic functionGravitationPure mathematicsMathematicsQuantum mechanicsGeometryTranscription factorGeneChemistryRepressorBiochemistryBlack Holes and Theoretical PhysicsCosmology and Gravitation TheoriesNoncommutative and Quantum Gravity Theories