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From positive geometries to a coaction on hypergeometric functions
It is well known that Feynman integrals in dimensional regularization often evaluate to functions of hypergeometric type. Inspired by a recent proposal for a coaction on one-loop Feynman integrals in dimensional regularization, we use intersection numbers and twisted homology theory to define a coac...
| Autores principales: | , , , , |
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| Lenguaje: | eng |
| Publicado: |
2019
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| Materias: | |
| Acceso en línea: | https://dx.doi.org/10.1007/JHEP02(2020)122 http://cds.cern.ch/record/2698531 |
| _version_ | 1780964304717086720 |
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| author | Abreu, Samuel Britto, Ruth Duhr, Claude Gardi, Einan Matthew, James |
| author_facet | Abreu, Samuel Britto, Ruth Duhr, Claude Gardi, Einan Matthew, James |
| author_sort | Abreu, Samuel |
| collection | CERN |
| description | It is well known that Feynman integrals in dimensional regularization often evaluate to functions of hypergeometric type. Inspired by a recent proposal for a coaction on one-loop Feynman integrals in dimensional regularization, we use intersection numbers and twisted homology theory to define a coaction on certain hypergeometric functions. The functions we consider admit an integral representation where both the integrand and the contour of integration are associated with positive geometries. As in dimensionally- regularized Feynman integrals, endpoint singularities are regularized by means of exponents controlled by a small parameter ϵ. We show that the coaction defined on this class of integral is consistent, upon expansion in ϵ, with the well-known coaction on multiple polylogarithms. We illustrate the validity of our construction by explicitly determining the coaction on various types of hypergeometric $_{p+1}$F$_{p}$ and Appell functions. |
| id | cern-2698531 |
| institution | Organización Europea para la Investigación Nuclear |
| language | eng |
| publishDate | 2019 |
| record_format | invenio |
| spelling | cern-26985312023-10-04T06:01:24Zdoi:10.1007/JHEP02(2020)122http://cds.cern.ch/record/2698531engAbreu, SamuelBritto, RuthDuhr, ClaudeGardi, EinanMatthew, JamesFrom positive geometries to a coaction on hypergeometric functionsmath.NTMathematical Physics and Mathematicsmath.MPMathematical Physics and Mathematicsmath-phMathematical Physics and Mathematicshep-thParticle Physics - TheoryIt is well known that Feynman integrals in dimensional regularization often evaluate to functions of hypergeometric type. Inspired by a recent proposal for a coaction on one-loop Feynman integrals in dimensional regularization, we use intersection numbers and twisted homology theory to define a coaction on certain hypergeometric functions. The functions we consider admit an integral representation where both the integrand and the contour of integration are associated with positive geometries. As in dimensionally- regularized Feynman integrals, endpoint singularities are regularized by means of exponents controlled by a small parameter ϵ. We show that the coaction defined on this class of integral is consistent, upon expansion in ϵ, with the well-known coaction on multiple polylogarithms. We illustrate the validity of our construction by explicitly determining the coaction on various types of hypergeometric $_{p+1}$F$_{p}$ and Appell functions.It is well known that Feynman integrals in dimensional regularization often evaluate to functions of hypergeometric type. Inspired by a recent proposal for a coaction on one-loop Feynman integrals in dimensional regularization, we use intersection numbers and twisted homology theory to define a coaction on certain hypergeometric functions. The functions we consider admit an integral representation where both the integrand and the contour of integration are associated with positive geometries. As in dimensionally-regularized Feynman integrals, endpoint singularities are regularized by means of exponents controlled by a small parameter $\epsilon$. We show that the coaction defined on this class of integral is consistent, upon expansion in $\epsilon$, with the well-known coaction on multiple polylogarithms. We illustrate the validity of our construction by explicitly determining the coaction on various types of hypergeometric ${}_{p+1}F_p$ and Appell functions.arXiv:1910.08358CERN-TH-2019-168oai:cds.cern.ch:26985312019-10-18 |
| spellingShingle | math.NT Mathematical Physics and Mathematics math.MP Mathematical Physics and Mathematics math-ph Mathematical Physics and Mathematics hep-th Particle Physics - Theory Abreu, Samuel Britto, Ruth Duhr, Claude Gardi, Einan Matthew, James From positive geometries to a coaction on hypergeometric functions |
| title | From positive geometries to a coaction on hypergeometric functions |
| title_full | From positive geometries to a coaction on hypergeometric functions |
| title_fullStr | From positive geometries to a coaction on hypergeometric functions |
| title_full_unstemmed | From positive geometries to a coaction on hypergeometric functions |
| title_short | From positive geometries to a coaction on hypergeometric functions |
| title_sort | from positive geometries to a coaction on hypergeometric functions |
| topic | math.NT Mathematical Physics and Mathematics math.MP Mathematical Physics and Mathematics math-ph Mathematical Physics and Mathematics hep-th Particle Physics - Theory |
| url | https://dx.doi.org/10.1007/JHEP02(2020)122 http://cds.cern.ch/record/2698531 |
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