Rationalisation of multiple square roots in Feynman integrals

IF 5.5 1区物理与天体物理 Q1 Physics and Astronomy

Journal of High Energy Physics Pub Date : 2025-05-08 DOI:10.1007/JHEP05(2025)078

Georgios Papathanasiou, Stefan Weinzierl, Konglong Wu, Yang Zhang

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Abstract

Feynman integrals are very often computed from their differential equations. It is not uncommon that the ε-factorised differential equation contains only dlog-forms with algebraic arguments, where the algebraic part is given by (multiple) square roots. It is well-known that if all square roots are simultaneously rationalisable, the Feynman integrals can be expressed in terms of multiple polylogarithms. This is a sufficient, but not a necessary criterium. In this paper we investigate weaker requirements. We discuss under which conditions we may use different rationalisations in different parts of the calculation. In particular we show that we may use different rationalisations if they correspond to different parameterisations of the same integration path. We present a non-trivial example — the one-loop pentagon function with three adjacent massive external legs involving seven square roots — where this technique can be used to express the result in terms of multiple polylogarithms.

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费曼积分中多重平方根的合理化

费曼积分通常是从微分方程中计算出来的。ε因子分解的微分方程只包含带有代数参数的对数形式，其中代数部分由（多个）平方根给出，这并不罕见。众所周知，如果所有的平方根都是同时有理的，那么费曼积分就可以用多个多对数来表示。这是充分条件，但不是必要条件。在本文中，我们研究弱需求。我们讨论在哪些条件下可以在计算的不同部分使用不同的合理化。特别是，我们表明，如果它们对应于相同集成路径的不同参数化，我们可以使用不同的合理化。我们给出了一个不平凡的例子——一个有三个相邻的巨大外支的单圈五边形函数，涉及7个平方根——在这个例子中，这种技术可以用来用多个多对数来表示结果。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal of High Energy Physics 物理-物理：粒子与场物理

CiteScore

10.30

自引率

46.30%

发文量

2107

审稿时长

1.5 months

期刊介绍： The aim of the Journal of High Energy Physics (JHEP) is to ensure fast and efficient online publication tools to the scientific community, while keeping that community in charge of every aspect of the peer-review and publication process in order to ensure the highest quality standards in the journal. Consequently, the Advisory and Editorial Boards, composed of distinguished, active scientists in the field, jointly establish with the Scientific Director the journal''s scientific policy and ensure the scientific quality of accepted articles. JHEP presently encompasses the following areas of theoretical and experimental physics: Collider Physics Underground and Large Array Physics Quantum Field Theory Gauge Field Theories Symmetries String and Brane Theory General Relativity and Gravitation Supersymmetry Mathematical Methods of Physics Mostly Solvable Models Astroparticles Statistical Field Theories Mostly Weak Interactions Mostly Strong Interactions Quantum Field Theory (phenomenology) Strings and Branes Phenomenological Aspects of Supersymmetry Mostly Strong Interactions (phenomenology).