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Rationalizing Loop Integration

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arxiv 1805.10281 v2 pith:JFEQBED5 submitted 2018-05-25 hep-th hep-ph

Rationalizing Loop Integration

classification hep-th hep-ph
keywords integralsintegrationloopmanydirectfeynman-parametricplanaralgebraic
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We show that direct Feynman-parametric loop integration is possible for a large class of planar multi-loop integrals. Much of this follows from the existence of manifestly dual-conformal Feynman-parametric representations of planar loop integrals, and the fact that many of the algebraic roots associated with (e.g. Landau) leading singularities are automatically rationalized in momentum-twistor space---facilitating direct integration via partial fractioning. We describe how momentum twistors may be chosen non-redundantly to parameterize particular integrals, and how strategic choices of coordinates can be used to expose kinematic limits of interest. We illustrate the power of these ideas with many concrete cases studied through four loops and involving as many as eight particles. Detailed examples are included as ancillary files to this work's submission to the arXiv.

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Cited by 2 Pith papers

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Kinematics, cluster algebras and Feynman integrals

    hep-th 2021-12 unverdicted novelty 7.0

    Cluster algebras for planar conformal kinematics are identified as G(4,n) subalgebras and used to bootstrap the symbol of an 8-point three-loop wheel integral via D3 and new algebraic letters.

  2. Finite Massless Pentaboxes

    hep-ph 2026-06 unverdicted novelty 5.0

    Characterizes numerators yielding finite or evanescent massless pentabox integrals, gives compact generators via momentum basis and Gram determinants, and evaluates lowest-rank cases in polylogarithms and pentagon functions.