--- _id: '60993' abstract: - lang: eng text: "

We determine the distribution of discriminants of wildly ramified elementary-abelian extensions of local and global function fields in characteristic \r\n\r\n \r\n p\r\n p\r\n \r\n\r\n. For local and rational function fields, we also give precise formulae for the number of elementary-abelian extensions with a fixed discriminant divisor, which describe a local-global principle.

" author: - first_name: Nicolas full_name: Potthast, Nicolas id: '63958' last_name: Potthast citation: ama: Potthast N. On the asymptotics of elementary-abelian extensions of local and global function fields. Transactions of the American Mathematical Society. 2026;379(1):289-340. doi:10.1090/tran/9509 apa: Potthast, N. (2026). On the asymptotics of elementary-abelian extensions of local and global function fields. Transactions of the American Mathematical Society, 379(1), 289–340. https://doi.org/10.1090/tran/9509 bibtex: '@article{Potthast_2026, title={On the asymptotics of elementary-abelian extensions of local and global function fields}, volume={379}, DOI={10.1090/tran/9509}, number={1}, journal={Transactions of the American Mathematical Society}, publisher={American Mathematical Society (AMS)}, author={Potthast, Nicolas}, year={2026}, pages={289–340} }' chicago: 'Potthast, Nicolas. “On the Asymptotics of Elementary-Abelian Extensions of Local and Global Function Fields.” Transactions of the American Mathematical Society 379, no. 1 (2026): 289–340. https://doi.org/10.1090/tran/9509.' ieee: 'N. Potthast, “On the asymptotics of elementary-abelian extensions of local and global function fields,” Transactions of the American Mathematical Society, vol. 379, no. 1, pp. 289–340, 2026, doi: 10.1090/tran/9509.' mla: Potthast, Nicolas. “On the Asymptotics of Elementary-Abelian Extensions of Local and Global Function Fields.” Transactions of the American Mathematical Society, vol. 379, no. 1, American Mathematical Society (AMS), 2026, pp. 289–340, doi:10.1090/tran/9509. short: N. Potthast, Transactions of the American Mathematical Society 379 (2026) 289–340. date_created: 2025-08-25T12:37:47Z date_updated: 2025-12-12T08:40:53Z doi: 10.1090/tran/9509 intvolume: ' 379' issue: '1' language: - iso: eng page: 289 - 340 publication: Transactions of the American Mathematical Society publication_identifier: issn: - 1088-6850 - 0002-9947 publication_status: published publisher: American Mathematical Society (AMS) status: public title: On the asymptotics of elementary-abelian extensions of local and global function fields type: journal_article user_id: '63958' volume: 379 year: '2026' ... --- _id: '53191' abstract: - lang: eng text: "

This paper is the first in a series of two dedicated to the study of period relations of the type \r\n\r\n \r\n \r\n \ L\r\n \r\n \r\n (\r\n \ \r\n \r\n \r\n 1\r\n \ 2\r\n \r\n +\r\n \ k\r\n ,\r\n Π\r\n \r\n \r\n \ )\r\n \r\n \ \r\n \r\n ∈\r\n \r\n (\r\n 2\r\n π\r\n i\r\n \r\n )\r\n \r\n \ d\r\n ⋅\r\n k\r\n \ \r\n \r\n \r\n Ω\r\n \r\n \ (\r\n −\r\n \ 1\r\n \r\n )\r\n \ k\r\n \r\n \r\n \ \r\n \r\n \\bf Q\r\n \r\n (\r\n \ Π\r\n )\r\n \ ,\r\n \r\n \r\n \ 1\r\n 2\r\n \r\n \ +\r\n k\r\n \r\n critical\r\n ,\r\n \r\n \ \\begin{equation*} L\\Big (\\frac {1}{2}+k,\\Pi \\Big )\\;\\in \\;(2\\pi i)^{d\\cdot k}\\Omega _{(-1)^k}\\textrm {\\bf Q}(\\Pi ),\\quad \\frac {1}{2}+k\\;\\text {critical}, \\end{equation*}\r\n \ \r\n\r\n\r\n for certain automorphic representations \r\n\r\n \r\n Π\r\n \\Pi\r\n \ \r\n\r\n of a reductive group \r\n\r\n \r\n \r\n G\r\n \ .\r\n \r\n G.\r\n \ \r\n\r\n In this paper we discuss the case \r\n\r\n \r\n \r\n G\r\n \ =\r\n \r\n G\r\n L\r\n \ \r\n (\r\n n\r\n \ +\r\n 1\r\n )\r\n \ ×\r\n \r\n \ G\r\n L\r\n \ \r\n (\r\n n\r\n \ )\r\n .\r\n \r\n \ G=\\mathrm {GL}(n+1)\\times \\mathrm {GL}(n).\r\n \r\n\r\n The case \r\n\r\n \ \r\n \r\n G\r\n =\r\n \ \r\n G\r\n \ L\r\n \r\n (\r\n 2\r\n n\r\n \ )\r\n \r\n G=\\mathrm {GL}(2n)\r\n \r\n\r\n is discussed in part two. Our method is representation theoretic and relies on the author’s recent results on global rational structures on automorphic representations. We show that the above period relations are intimately related to the field of definition of the global representation \r\n\r\n \ \r\n Π\r\n \ \\Pi\r\n \r\n\r\n under consideration. The new period relations we prove are in accordance with Deligne’s Conjecture on special values of \r\n\r\n \r\n \ L\r\n L\r\n \ \r\n\r\n-functions, and the author expects this method to apply to other cases as well.

" article_type: original author: - first_name: Fabian full_name: Januszewski, Fabian id: '81636' last_name: Januszewski orcid: 0000-0002-3184-237X citation: ama: "Januszewski F. On period relations for automorphic \U0001D43F-functions I. Transactions of the American Mathematical Society. 2018;371(9):6547-6580. doi:10.1090/tran/7527" apa: "Januszewski, F. (2018). On period relations for automorphic \U0001D43F-functions I. Transactions of the American Mathematical Society, 371(9), 6547–6580. https://doi.org/10.1090/tran/7527" bibtex: "@article{Januszewski_2018, title={On period relations for automorphic \U0001D43F-functions I}, volume={371}, DOI={10.1090/tran/7527}, number={9}, journal={Transactions of the American Mathematical Society}, publisher={American Mathematical Society (AMS)}, author={Januszewski, Fabian}, year={2018}, pages={6547–6580} }" chicago: "Januszewski, Fabian. “On Period Relations for Automorphic \U0001D43F-Functions I.” Transactions of the American Mathematical Society 371, no. 9 (2018): 6547–80. https://doi.org/10.1090/tran/7527." ieee: "F. Januszewski, “On period relations for automorphic \U0001D43F-functions I,” Transactions of the American Mathematical Society, vol. 371, no. 9, pp. 6547–6580, 2018, doi: 10.1090/tran/7527." mla: "Januszewski, Fabian. “On Period Relations for Automorphic \U0001D43F-Functions I.” Transactions of the American Mathematical Society, vol. 371, no. 9, American Mathematical Society (AMS), 2018, pp. 6547–80, doi:10.1090/tran/7527." short: F. Januszewski, Transactions of the American Mathematical Society 371 (2018) 6547–6580. date_created: 2024-04-03T16:58:26Z date_updated: 2024-04-03T17:26:38Z doi: 10.1090/tran/7527 extern: '1' intvolume: ' 371' issue: '9' keyword: - Applied Mathematics - General Mathematics language: - iso: eng page: 6547-6580 publication: Transactions of the American Mathematical Society publication_identifier: issn: - 0002-9947 - 1088-6850 publication_status: published publisher: American Mathematical Society (AMS) status: public title: "On period relations for automorphic \U0001D43F-functions I" type: journal_article user_id: '81636' volume: 371 year: '2018' ... --- _id: '64666' article_type: original author: - first_name: Helge full_name: Glöckner, Helge id: '178' last_name: Glöckner - first_name: Lutz G. full_name: Lucht, Lutz G. last_name: Lucht citation: ama: Glöckner H, Lucht LG. Weighted inversion of general Dirichlet series. Transactions of the American Mathematical Society. 2014;366(6):3275–3293. doi:10.1090/S0002-9947-2013-06018-7 apa: Glöckner, H., & Lucht, L. G. (2014). Weighted inversion of general Dirichlet series. Transactions of the American Mathematical Society, 366(6), 3275–3293. https://doi.org/10.1090/S0002-9947-2013-06018-7 bibtex: '@article{Glöckner_Lucht_2014, title={Weighted inversion of general Dirichlet series}, volume={366}, DOI={10.1090/S0002-9947-2013-06018-7}, number={6}, journal={Transactions of the American Mathematical Society}, author={Glöckner, Helge and Lucht, Lutz G.}, year={2014}, pages={3275–3293} }' chicago: 'Glöckner, Helge, and Lutz G. Lucht. “Weighted Inversion of General Dirichlet Series.” Transactions of the American Mathematical Society 366, no. 6 (2014): 3275–3293. https://doi.org/10.1090/S0002-9947-2013-06018-7.' ieee: 'H. Glöckner and L. G. Lucht, “Weighted inversion of general Dirichlet series,” Transactions of the American Mathematical Society, vol. 366, no. 6, pp. 3275–3293, 2014, doi: 10.1090/S0002-9947-2013-06018-7.' mla: Glöckner, Helge, and Lutz G. Lucht. “Weighted Inversion of General Dirichlet Series.” Transactions of the American Mathematical Society, vol. 366, no. 6, 2014, pp. 3275–3293, doi:10.1090/S0002-9947-2013-06018-7. short: H. Glöckner, L.G. Lucht, Transactions of the American Mathematical Society 366 (2014) 3275–3293. date_created: 2026-02-26T10:56:00Z date_updated: 2026-02-27T08:29:40Z department: - _id: '10' - _id: '87' - _id: '93' doi: 10.1090/S0002-9947-2013-06018-7 intvolume: ' 366' issue: '6' keyword: - 11M41 - 30B50 - 30J99 - 46H99 language: - iso: eng page: 3275–3293 publication: Transactions of the American Mathematical Society publication_identifier: issn: - 0002-9947 quality_controlled: '1' status: public title: Weighted inversion of general Dirichlet series type: journal_article user_id: '178' volume: 366 year: '2014' ...