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From positive geometries to a coaction on hypergeometric functions

Samuel Abreu, Ruth Britto, Claude Duhr, Einan Gardi, James Matthew

2020Journal of High Energy Physics36 citationsDOIOpen Access PDF

Abstract

A bstract It is well known that Feynman integrals in dimensional regularization often evaluate to functions of hypergeometric type. Inspired by a recent proposal for a coaction on one-loop Feynman integrals in dimensional regularization, we use intersection numbers and twisted homology theory to define a coaction on certain hypergeometric functions. The functions we consider admit an integral representation where both the integrand and the contour of integration are associated with positive geometries. As in dimensionally- regularized Feynman integrals, endpoint singularities are regularized by means of exponents controlled by a small parameter ϵ. We show that the coaction defined on this class of integral is consistent, upon expansion in ϵ, with the well-known coaction on multiple polylogarithms. We illustrate the validity of our construction by explicitly determining the coaction on various types of hypergeometric p +1 F p and Appell functions.

Topics & Concepts

Hypergeometric functionGravitational singularityFeynman integralRegularization (linguistics)Hypergeometric distributionDimensional regularizationFeynman diagramMathematicsPure mathematicsGeneralized hypergeometric functionClass (philosophy)Feynman graphMathematical physicsFormalism (music)Methods of contour integrationPhysicsIntersection (aeronautics)Point (geometry)Algebraic and Geometric AnalysisPolynomial and algebraic computationHolomorphic and Operator Theory
From positive geometries to a coaction on hypergeometric functions | Litcius