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Crossing antisymmetric Polyakov blocks + dispersion relation

Apratim Kaviraj

2022Journal of High Energy Physics20 citationsDOIOpen Access PDF

Abstract

A bstract Many CFT problems, e.g. ones with global symmetries, have correlation functions with a crossing antisymmetric sector. We show that such a crossing antisymmetric function can be expanded in terms of manifestly crossing antisymmetric objects, which we call the ‘+ type Polyakov blocks’. These blocks are built from AdS d +1 Witten diagrams. In 1d they encode the ‘+ type’ analytic functionals which act on crossing antisymmetric functions. In general d we establish this Witten diagram basis from a crossing antisymmetric dispersion relation in Mellin space. Analogous to the crossing symmetric case, the dispersion relation imposes a set of independent ‘locality constraints’ in addition to the usual CFT sum rules given by the ‘Polyakov conditions’. We use the Polyakov blocks to simplify more general analytic functionals in d > 1 and global symmetry functionals.

Topics & Concepts

Antisymmetric relationDispersion relationMathematical physicsSpace (punctuation)PhysicsRelation (database)DiagramSymmetry (geometry)Pure mathematicsFunction (biology)MathematicsTheoretical physicsCombinatoricsQuantum mechanicsGeometryComputer scienceStatisticsEvolutionary biologyDatabaseOperating systemBiologyAlgebraic structures and combinatorial modelsNonlinear Waves and SolitonsAdvanced Topics in Algebra
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