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A basis of analytic functionals for CFTs in general dimension

Dalimil Mazáč, Leonardo Rastelli, Xinan Zhou

2021Journal of High Energy Physics73 citationsDOIOpen Access PDF

Abstract

A bstract We develop an analytic approach to the four-point crossing equation in CFT, for general spacetime dimension. In a unitary CFT, the crossing equation (for, say, the s - and t -channel expansions) can be thought of as a vector equation in an infinite-dimensional space of complex analytic functions in two variables, which satisfy a boundedness condition at infinity. We identify a useful basis for this space of functions, consisting of the set of s- and t-channel conformal blocks of double-twist operators in mean field theory. We describe two independent algorithms to construct the dual basis of linear functionals, and work out explicitly many examples. Our basis of functionals appears to be closely related to the CFT dispersion relation recently derived by Carmi and Caron-Huot.

Topics & Concepts

Basis (linear algebra)PhysicsDimension (graph theory)Conformal mapMathematical physicsSpacetimeDuality (order theory)Space (punctuation)Pure mathematicsConformal field theoryMathematical analysisMathematicsQuantum mechanicsGeometryLinguisticsPhilosophyBlack Holes and Theoretical PhysicsAdvanced Operator Algebra ResearchAlgebraic structures and combinatorial models