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Main Authors: Hu, Chang, Li, Wen-Di, Li, Xiang
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2504.02573
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author Hu, Chang
Li, Wen-Di
Li, Xiang
author_facet Hu, Chang
Li, Wen-Di
Li, Xiang
contents In this work, we study the computation of reduction coefficients for multi loop Feynman integrals using generating functions constructed within the Baikov representation. Compared with traditional Feynman rules, the Baikov formalism offers a more structured and transparent framework, especially well suited for analyzing the reduction problem. We emphasize that, in a variety of nontrivial cases including several one loop and selected multi loop examples the generating functions can be explicitly computed in closed form, often involving hypergeometric or elementary functions. These analytic expressions signifi cantly simplify the determination of reduction coefficients and enhance their interpretability. The results demonstrate the practicality and potential of this approach, suggesting that the use of generating functions within the Baikov representation can serve as a powerful and flexible tool in modern Feynman integral reduction, even though its full scope for generic multi-loop topologies remains to be explored.
format Preprint
id arxiv_https___arxiv_org_abs_2504_02573
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Generating Function of Loop Reduction by Baikov Representation
Hu, Chang
Li, Wen-Di
Li, Xiang
High Energy Physics - Theory
In this work, we study the computation of reduction coefficients for multi loop Feynman integrals using generating functions constructed within the Baikov representation. Compared with traditional Feynman rules, the Baikov formalism offers a more structured and transparent framework, especially well suited for analyzing the reduction problem. We emphasize that, in a variety of nontrivial cases including several one loop and selected multi loop examples the generating functions can be explicitly computed in closed form, often involving hypergeometric or elementary functions. These analytic expressions signifi cantly simplify the determination of reduction coefficients and enhance their interpretability. The results demonstrate the practicality and potential of this approach, suggesting that the use of generating functions within the Baikov representation can serve as a powerful and flexible tool in modern Feynman integral reduction, even though its full scope for generic multi-loop topologies remains to be explored.
title Generating Function of Loop Reduction by Baikov Representation
topic High Energy Physics - Theory
url https://arxiv.org/abs/2504.02573