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Calculation of Feynman loop integration and phase-space integration via auxiliary mass flow

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arxiv 2009.07987 v1 pith:TOJWEQTT submitted 2020-09-17 hep-ph

Calculation of Feynman loop integration and phase-space integration via auxiliary mass flow

classification hep-ph
keywords methodintegrationauxiliarymassboundarycalculatedifferentialfeynman
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We extend the auxiliary-mass-flow (AMF) method originally developed for Feynman loop integration to calculate integrals involving also phase-space integration. Flow of the auxiliary mass from the boundary ($\infty$) to the physical point ($0^+$) is obtained by numerically solving differential equations with respective to the auxiliary mass. For problems with two or more kinematical invariants, the AMF method can be combined with traditional differential equation method by providing systematical boundary conditions and highly nontrivial self-consistent check. The method is described in detail with a pedagogical example of $e^+e^-\rightarrow \gamma^* \rightarrow t\bar{t}+X$ at NNLO. We show that the AMF method can systematically and efficiently calculate integrals to high precision.

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Cited by 4 Pith papers

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