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

Xiao Liu, Yan-Qing Ma, Wei Tao, Peng Zhang

2020Chinese Physics C44 citationsDOIOpen Access PDF

Abstract

Abstract We extend the auxiliary-mass-flow (AMF) method originally developed for Feynman loop integration to calculate integrals which also involve phase-space integration. The flow of the auxiliary mass from the boundary ( ) to the physical point ( ) 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 the traditional differential-equation method, providing systematic boundary conditions and a highly nontrivial self-consistency check. The method is described in detail using a pedagogical example of at NNLO. We show that the AMF method can systematically and efficiently calculate integrals to high precision.

Topics & Concepts

PhysicsFeynman diagramLoop (graph theory)Flow (mathematics)Numerical integrationFeynman integralBoundary value problemBoundary (topology)Point (geometry)Integration by partsDifferential equationDifferential (mechanical device)Classical mechanicsApplied mathematicsPoint particleTheoretical physicsNumerical analysisMathematical physicsDirect integration of a beamMathematical analysisNumerical methods for differential equationsNonlinear Waves and SolitonsQuantum Mechanics and Non-Hermitian Physics
Calculation of Feynman loop integration and phase-space integration via auxiliary mass flow * | Litcius