Appell F1、F3、Lauricella FD(3) 和 Lauricella-Saran FS(3) 的解析延续和数值评估及其在费曼积分中的应用

IF 7.2 2区 物理与天体物理 Q1 COMPUTER SCIENCE, INTERDISCIPLINARY APPLICATIONS
Souvik Bera , Tanay Pathak
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引用次数: 0

摘要

我们介绍了对两变量超几何级数(即 Appell F1 和 F3 级数)的研究,并获得了其解析连续性的完整列表,足以覆盖整个实(x,y)平面(其奇异点除外)。我们还利用 F1 和 F3 的解析连续性,推导出了它们的三变量广义连续性,即劳里切拉 FD(3) 序列和劳里切拉-萨兰 FS(3) 序列,从而确保除了这些函数的奇异点之外,它们的解析连续性覆盖了整个实(x,y,z)空间。虽然这些研究的动机是费曼积分评估中经常出现的多变量超几何函数,但它们也可用于数学物理的其他分支。为了便于实际使用,我们提供了四个用于分析和数值计算的软件包:AppellF1.wl、AppellF3.wl、LauricellaFD.wl 和 Mathematica 中的 LauricellaSaranFS.wl。这些软件包既适用于一般参数值,也适用于非一般参数值,同时考虑到它们在费曼积分评估中的实用性。我们明确介绍了这些软件包在费曼积分求值中的各种物理应用,并将结果与其他软件包(如 FIESTA)进行了比较。在应用适当的数值评估约定后,我们发现从我们的软件包中获得的结果是一致的。本文还提供了演示不同数值结果的各种 Mathematica 笔记本。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Analytic continuations and numerical evaluation of the Appell F1, F3, Lauricella FD(3) and Lauricella-Saran FS(3) and their application to Feynman integrals
We present our investigation of the study of two variable hypergeometric series, namely Appell F1 and F3 series, and obtain a comprehensive list of its analytic continuations enough to cover the whole real (x,y) plane, except on their singular loci. We also derive analytic continuations of their 3-variable generalisation, the Lauricella FD(3) series and the Lauricella-Saran FS(3) series, leveraging the analytic continuations of F1 and F3, which ensures that the whole real (x,y,z) space is covered, except on the singular loci of these functions. While these studies are motivated by the frequent occurrence of these multivariable hypergeometric functions in Feynman integral evaluation, they can also be used whenever they appear in other branches of mathematical physics. To facilitate their practical use, for analytical and numerical purposes, we provide four packages: AppellF1.wl, AppellF3.wl, LauricellaFD.wl, and LauricellaSaranFS.wl in Mathematica. These packages are applicable for generic as well as non-generic values of parameters, keeping in mind their utilities in the evaluation of the Feynman integrals. We explicitly present various physical applications of these packages in the context of Feynman integral evaluation and compare the results using other packages such as FIESTA. Upon applying the appropriate conventions for numerical evaluation, we find that the results obtained from our packages are consistent. Various Mathematica notebooks demonstrating different numerical results are also provided along with this paper.
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来源期刊
Computer Physics Communications
Computer Physics Communications 物理-计算机:跨学科应用
CiteScore
12.10
自引率
3.20%
发文量
287
审稿时长
5.3 months
期刊介绍: The focus of CPC is on contemporary computational methods and techniques and their implementation, the effectiveness of which will normally be evidenced by the author(s) within the context of a substantive problem in physics. Within this setting CPC publishes two types of paper. Computer Programs in Physics (CPiP) These papers describe significant computer programs to be archived in the CPC Program Library which is held in the Mendeley Data repository. The submitted software must be covered by an approved open source licence. Papers and associated computer programs that address a problem of contemporary interest in physics that cannot be solved by current software are particularly encouraged. Computational Physics Papers (CP) These are research papers in, but are not limited to, the following themes across computational physics and related disciplines. mathematical and numerical methods and algorithms; computational models including those associated with the design, control and analysis of experiments; and algebraic computation. Each will normally include software implementation and performance details. The software implementation should, ideally, be available via GitHub, Zenodo or an institutional repository.In addition, research papers on the impact of advanced computer architecture and special purpose computers on computing in the physical sciences and software topics related to, and of importance in, the physical sciences may be considered.
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