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Sequential discontinuities of Feynman integrals and the monodromy group

Jacob L. Bourjaily, Holmfridur Hannesdottir, Andrew J. McLeod, Matthew D. Schwartz, Cristian Vergu

2021Journal of High Energy Physics55 citationsDOIOpen Access PDF

Abstract

A bstract We generalize the relation between discontinuities of scattering amplitudes and cut diagrams to cover sequential discontinuities (discontinuities of discontinuities) in arbitrary momentum channels. The new relations are derived using time-ordered perturbation theory, and hold at phase-space points where all cut momentum channels are simultaneously accessible. As part of this analysis, we explain how to compute sequential discontinuities as monodromies and explore the use of the monodromy group in characterizing the analytic properties of Feynman integrals. We carry out a number of cross-checks of our new formulas in polylogarithmic examples, in some cases to all loop orders.

Topics & Concepts

MonodromyClassification of discontinuitiesPhysicsFeynman diagramMathematical physicsScattering amplitudeGroup (periodic table)Momentum (technical analysis)Perturbation theory (quantum mechanics)AmplitudeFeynman graphPerturbation (astronomy)Cover (algebra)Formalism (music)Pure mathematicsMathematical analysisMeromorphic functionFeynman integralScatteringClassical mechanicsLorentz groupComputationQuantum electrodynamicsInvariant (physics)SL2(R)Algebraic and Geometric AnalysisBlack Holes and Theoretical PhysicsParticle physics theoretical and experimental studies