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Decomposition of Feynman integrals by multivariate intersection numbers

Hjalte Frellesvig, Federico Gasparotto, S. Laporta, Manoj K. Mandal, Pierpaolo Mastrolia, Luca Mattiazzi, Sebastian Mizera

2021Journal of High Energy Physics101 citationsDOIOpen Access PDF

Abstract

A bstract We present a detailed description of the recent idea for a direct decomposition of Feynman integrals onto a basis of master integrals by projections, as well as a direct derivation of the differential equations satisfied by the master integrals, employing multivariate intersection numbers. We discuss a recursive algorithm for the computation of multivariate intersection numbers, and provide three different approaches for a direct decomposition of Feynman integrals, which we dub the straight decomposition , the bottom-up decomposition , and the top-down decomposition . These algorithms exploit the unitarity structure of Feynman integrals by computing intersection numbers supported on cuts, in various orders, thus showing the synthesis of the intersection-theory concepts with unitarity-based methods and integrand decomposition. We perform explicit computations to exemplify all of these approaches applied to Feynman integrals, paving a way towards potential applications to generic multi-loop integrals.

Topics & Concepts

UnitarityIntersection (aeronautics)ComputationFeynman diagramDecompositionMathematicsMultivariate statisticsOrder of integration (calculus)Decomposition method (queueing theory)Algebra over a fieldApplied mathematicsPure mathematicsAlgorithmDiscrete mathematicsMathematical physicsMathematical analysisPhysicsQuantum mechanicsStatisticsBiologyAerospace engineeringEngineeringEcologyPolynomial and algebraic computationAlgebraic and Geometric AnalysisCryptography and Residue Arithmetic