Litcius/Paper detail

Distributions in CFT. Part I. Cross-ratio space

Petr Kravchuk, Jiaxin Qiao, Slava Rychkov

2020Journal of High Energy Physics29 citationsDOIOpen Access PDF

Abstract

A bstract We show that the four-point functions in conformal field theory are defined as distributions on the boundary of the region of convergence of the conformal block expansion. The conformal block expansion converges in the sense of distributions on this boundary, i.e. it can be integrated term by term against appropriate test functions. This can be interpreted as a giving a new class of functionals that satisfy the swapping property when applied to the crossing equation, and we comment on the relation of our construction to other types of functionals. Our language is useful in all considerations involving the boundary of the region of convergence, e.g. for deriving the dispersion relations. We establish our results by elementary methods, relying only on crossing symmetry and the standard convergence properties of the conformal block expansion. This is the first in a series of papers on distributional properties of correlation functions in conformal field theory.

Topics & Concepts

Conformal mapBoundary conformal field theoryPhysicsConformal field theoryConformal symmetryBoundary (topology)Field (mathematics)Convergence (economics)Series (stratigraphy)Conformal anomalyBoundary value problemCorrelation function (quantum field theory)Term (time)Primary fieldSpace (punctuation)Class (philosophy)Symmetry (geometry)Block (permutation group theory)Mathematical analysisDistribution (mathematics)Theoretical physicsCompleteness (order theory)Extremal lengthFunction (biology)Relation (database)Property (philosophy)Mathematical physicsPure mathematicsDomain (mathematical analysis)Duality (order theory)Type (biology)Field theory (psychology)Series expansionAlgebraic structures and combinatorial modelsMathematical functions and polynomialsStochastic processes and statistical mechanics