Elise de Doncker scite author profile

A new approach is presented to evaluate multi-loop integrals, which appear in the calculation of cross-sections in high-energy physics. It relies on a fully numerical method and is applicable to a wide class of integrals with various mass configurations. As an example, the computation of two-loop planar and non-planar box diagrams is shown. The results are confirmed by comparisons with other techniques, including the reduction method, and by a consistency check using the dispersion relation.

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Loop integration results using numerical extrapolation for a non-scalar integral

Doncker¹,

Shimizu²,

Fujimoto³

et al. 2004

Nuclear Instruments and Methods in Physics Research Section A:

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Loop integration results have been obtained using numerical integration and extrapolation. An extrapolation to the limit is performed with respect to a parameter in the integrand which tends to zero. Results are given for a non-scalar four-point diagram. Extensions to accommodate loop integration by existing integration packages are also discussed. These include: using previously generated partitions of the domain and roundoff error guards.

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Quadpack computation of Feynman loop integrals

Doncker

Fujimoto

Hamaguchi

et al. 2012

Journal of Computational Science

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Elise de Doncker

Computation of loop integrals using extrapolation

Twitter sentiment analysis with a deep neural network: An enhanced approach using user behavioral information

Numerical computation of two-loop box diagrams with masses

Loop integration results using numerical extrapolation for a non-scalar integral

Quadpack computation of Feynman loop integrals

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