The Epsilon Expansion of Feynman Diagrams via Hypergeometric Functions and Differential Reduction

B.A. Kniehl; B.F.L. Ward; M.Yu. Kalmykov; S.A. Yost; V.V. Bytev

arxiv: 1110.0210 · v3 · pith:XBWDW5BSnew · submitted 2011-10-02 · 🧮 math-ph · hep-ph· hep-th· math.MP

The Epsilon Expansion of Feynman Diagrams via Hypergeometric Functions and Differential Reduction

S.A. Yost , V.V. Bytev , M.Yu. Kalmykov , B.A. Kniehl , B.F.L. Ward This is my paper

classification 🧮 math-ph hep-phhep-thmath.MP

keywords diagramsfeynmanfunctionshypergeometricreductiondifferentialepsilonexpansion

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Higher-order diagrams required for radiative corrections to mixed electroweak and QCD processes at the LHC and anticipated future colliders will require numerically stable representations of the associated Feynman diagrams. The hypergeometric representation supplies an analytic framework that is useful for deriving such stable representations. We discuss the reduction of Feynman diagrams to master integrals, and compare integration-by-parts methods to differential reduction of hypergeometric functions. We describe the problem of constructing higher-order terms in the epsilon expansion, and characterize the functions generated in such expansions.

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