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| Format: | Preprint |
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2024
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| Online Access: | https://arxiv.org/abs/2402.13362 |
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| _version_ | 1866929250230075392 |
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| author | Belliard, Raphaël |
| author_facet | Belliard, Raphaël |
| contents | The Renormalisation Group (RG) is a systematic procedure used to regularise divergences appearing as artefacts when constructing solutions to a large class of differential problems, whether perturbatively or not. This paper is devoted to performing it in the non-perturbative context of flat sections of meromorphic connections in holomorphic principal bundles over a base complex curve, with reductive and complex structure Lie groups. Using the interpretation of Kunuhiro of RG in terms of envelopes of families of solutions, we identify these envelopes as particular flat sections associated to points on the corresponding quantum spectral curve, namely certain divisors on the base curve with local coefficients in the adjoint bundle, yielding integral representations. This shows that the non-perturbative renormalisation of flat sections of principal bundles over curves fits naturally within the description of meromorphic connections via their quantum geometry, or homology \textit{à la} Goldman, where the flat sections and their deformations are parameterized by degree zero and one chains respectively. We conclude the paper by mentioning upcoming applications. |
| format | Preprint |
| id |
arxiv_https___arxiv_org_abs_2402_13362 |
| institution | arXiv |
| publishDate | 2024 |
| record_format | arxiv |
| spellingShingle | A renormalised description of meromorphic connections over curves Belliard, Raphaël Mathematical Physics 17B80, 17B81, 30F30, 37K10, 32L05, 51M15, 81T40 The Renormalisation Group (RG) is a systematic procedure used to regularise divergences appearing as artefacts when constructing solutions to a large class of differential problems, whether perturbatively or not. This paper is devoted to performing it in the non-perturbative context of flat sections of meromorphic connections in holomorphic principal bundles over a base complex curve, with reductive and complex structure Lie groups. Using the interpretation of Kunuhiro of RG in terms of envelopes of families of solutions, we identify these envelopes as particular flat sections associated to points on the corresponding quantum spectral curve, namely certain divisors on the base curve with local coefficients in the adjoint bundle, yielding integral representations. This shows that the non-perturbative renormalisation of flat sections of principal bundles over curves fits naturally within the description of meromorphic connections via their quantum geometry, or homology \textit{à la} Goldman, where the flat sections and their deformations are parameterized by degree zero and one chains respectively. We conclude the paper by mentioning upcoming applications. |
| title | A renormalised description of meromorphic connections over curves |
| topic | Mathematical Physics 17B80, 17B81, 30F30, 37K10, 32L05, 51M15, 81T40 |
| url | https://arxiv.org/abs/2402.13362 |