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The SAGEX review on scattering amplitudes Chapter 3: Mathematical structures in Feynman integrals

Samuel Abreu, Ruth Britto, Claude Duhr

2022Journal of Physics A Mathematical and Theoretical54 citationsDOIOpen Access PDF

Abstract

Abstract Dimensionally-regulated Feynman integrals are a cornerstone of all perturbative computations in quantum field theory. They are known to exhibit a rich mathematical structure, which has led to the development of powerful new techniques for their computation. We review some of the most recent advances in our understanding of the analytic structure of multiloop Feynman integrals in dimensional regularisation. In particular, we give an overview of modern approaches to computing Feynman integrals using differential equations, and we discuss some of the properties of the functions that appear in the solutions. We then review how dimensional regularisation has a natural mathematical interpretation in terms of the theory of twisted cohomology groups, and how many of the well-known ideas about Feynman integrals arise naturally in this context.

Topics & Concepts

Feynman diagramRotation formalisms in three dimensionsComputationScattering amplitudeContext (archaeology)Quantum field theoryInterpretation (philosophy)Feynman integralTheoretical physicsPhysicsMathematicsAmplitudeMathematical physicsQuantum mechanicsComputer scienceAlgorithmGeometryProgramming languagePaleontologyBiologyBlack Holes and Theoretical PhysicsParticle physics theoretical and experimental studiesNoncommutative and Quantum Gravity Theories