--- _id: '64068' abstract: - lang: eng text: "When do two irreducible polynomials with integer coefficients\r\n define the same number field? One can define an action of\r\n $\\mathrm{GL}_2 \\times \\mathrm{GL}_1$ on the space of polynomials of degree $n$ so that for any two\r\n \ polynomials $f$ and $g$ in the same orbit, the roots of $f$ may be expressed\r\n \ as rational linear transformations of the roots of $g$; thus, they generate\r\n \ the same field. In this article, we show that almost all polynomials of\r\n \ degree $n$ with size at most $X$ can only define the same number field as\r\n \ another polynomial of degree $n$ with size at most $X$ if they lie in the\r\n \ same orbit for this group action. (Here we measure the size of polynomials by\r\n \ the greatest absolute value of their coefficients.)\r\n This improves on work of Bhargava, Shankar, and Wang, who proved a similar\r\n statement for a positive proportion of polynomials. Using this result, we\r\n prove that the number of degree $n$ fields such that the smallest polynomial\r\n defining the field has size at most $X$ is asymptotic to a constant times\r\n $X^{n+1}$ as long as $n\\geq 3$. For $n = 2$, we obtain a precise asymptotic of\r\n the form $\\frac{27}{π^2} X^2$." author: - first_name: Santiago full_name: Arango-Piñeros, Santiago last_name: Arango-Piñeros - first_name: Fabian full_name: Gundlach, Fabian id: '100450' last_name: Gundlach - first_name: Robert J. full_name: Lemke Oliver, Robert J. last_name: Lemke Oliver - first_name: Kevin J. full_name: McGown, Kevin J. last_name: McGown - first_name: Will full_name: Sawin, Will last_name: Sawin - first_name: Allechar full_name: Serrano López, Allechar last_name: Serrano López - first_name: Arul full_name: Shankar, Arul last_name: Shankar - first_name: Ila full_name: Varma, Ila last_name: Varma citation: ama: Arango-Piñeros S, Gundlach F, Lemke Oliver RJ, et al. Counting number fields of fixed degree by their smallest defining polynomial. arXiv:260206943. Published online 2026. apa: Arango-Piñeros, S., Gundlach, F., Lemke Oliver, R. J., McGown, K. J., Sawin, W., Serrano López, A., Shankar, A., & Varma, I. (2026). Counting number fields of fixed degree by their smallest defining polynomial. In arXiv:2602.06943. bibtex: '@article{Arango-Piñeros_Gundlach_Lemke Oliver_McGown_Sawin_Serrano López_Shankar_Varma_2026, title={Counting number fields of fixed degree by their smallest defining polynomial}, journal={arXiv:2602.06943}, author={Arango-Piñeros, Santiago and Gundlach, Fabian and Lemke Oliver, Robert J. and McGown, Kevin J. and Sawin, Will and Serrano López, Allechar and Shankar, Arul and Varma, Ila}, year={2026} }' chicago: Arango-Piñeros, Santiago, Fabian Gundlach, Robert J. Lemke Oliver, Kevin J. McGown, Will Sawin, Allechar Serrano López, Arul Shankar, and Ila Varma. “Counting Number Fields of Fixed Degree by Their Smallest Defining Polynomial.” ArXiv:2602.06943, 2026. ieee: S. Arango-Piñeros et al., “Counting number fields of fixed degree by their smallest defining polynomial,” arXiv:2602.06943. 2026. mla: Arango-Piñeros, Santiago, et al. “Counting Number Fields of Fixed Degree by Their Smallest Defining Polynomial.” ArXiv:2602.06943, 2026. short: S. Arango-Piñeros, F. Gundlach, R.J. Lemke Oliver, K.J. McGown, W. Sawin, A. Serrano López, A. Shankar, I. Varma, ArXiv:2602.06943 (2026). date_created: 2026-02-09T07:48:05Z date_updated: 2026-02-09T07:49:17Z external_id: arxiv: - '2602.06943' language: - iso: eng publication: arXiv:2602.06943 status: public title: Counting number fields of fixed degree by their smallest defining polynomial type: preprint user_id: '100450' year: '2026' ... --- _id: '64180' author: - first_name: Fabian full_name: Gundlach, Fabian id: '100450' last_name: Gundlach - first_name: Beranger Fabrice full_name: Seguin, Beranger Fabrice id: '102487' last_name: Seguin citation: ama: Gundlach F, Seguin BF. Asymptotics of extensions of simple ℚ-algebras. Algebra & Number Theory. 2026;20(2):383-418. doi:10.2140/ant.2026.20.383 apa: Gundlach, F., & Seguin, B. F. (2026). Asymptotics of extensions of simple ℚ-algebras. Algebra & Number Theory, 20(2), 383–418. https://doi.org/10.2140/ant.2026.20.383 bibtex: '@article{Gundlach_Seguin_2026, title={Asymptotics of extensions of simple ℚ-algebras}, volume={20}, DOI={10.2140/ant.2026.20.383}, number={2}, journal={Algebra & Number Theory}, publisher={Mathematical Sciences Publishers}, author={Gundlach, Fabian and Seguin, Beranger Fabrice}, year={2026}, pages={383–418} }' chicago: 'Gundlach, Fabian, and Beranger Fabrice Seguin. “Asymptotics of Extensions of Simple ℚ-Algebras.” Algebra & Number Theory 20, no. 2 (2026): 383–418. https://doi.org/10.2140/ant.2026.20.383.' ieee: 'F. Gundlach and B. F. Seguin, “Asymptotics of extensions of simple ℚ-algebras,” Algebra & Number Theory, vol. 20, no. 2, pp. 383–418, 2026, doi: 10.2140/ant.2026.20.383.' mla: Gundlach, Fabian, and Beranger Fabrice Seguin. “Asymptotics of Extensions of Simple ℚ-Algebras.” Algebra & Number Theory, vol. 20, no. 2, Mathematical Sciences Publishers, 2026, pp. 383–418, doi:10.2140/ant.2026.20.383. short: F. Gundlach, B.F. Seguin, Algebra & Number Theory 20 (2026) 383–418. date_created: 2026-02-16T12:43:21Z date_updated: 2026-02-17T13:02:21Z doi: 10.2140/ant.2026.20.383 intvolume: ' 20' issue: '2' language: - iso: eng page: 383-418 publication: Algebra & Number Theory publication_identifier: issn: - 1944-7833 - 1937-0652 publication_status: published publisher: Mathematical Sciences Publishers status: public title: Asymptotics of extensions of simple ℚ-algebras type: journal_article user_id: '102487' volume: 20 year: '2026' ... --- _id: '64913' author: - first_name: Fabian full_name: Gundlach, Fabian id: '100450' last_name: Gundlach - first_name: Beranger Fabrice full_name: Seguin, Beranger Fabrice id: '102487' last_name: Seguin orcid: 0000-0002-4800-4647 citation: ama: Gundlach F, Seguin BF. On matrices commuting with their Frobenius. Journal of Algebra. Published online 2026. doi:10.1016/j.jalgebra.2026.02.025 apa: Gundlach, F., & Seguin, B. F. (2026). On matrices commuting with their Frobenius. Journal of Algebra. https://doi.org/10.1016/j.jalgebra.2026.02.025 bibtex: '@article{Gundlach_Seguin_2026, title={On matrices commuting with their Frobenius}, DOI={10.1016/j.jalgebra.2026.02.025}, journal={Journal of Algebra}, publisher={Elsevier BV}, author={Gundlach, Fabian and Seguin, Beranger Fabrice}, year={2026} }' chicago: Gundlach, Fabian, and Beranger Fabrice Seguin. “On Matrices Commuting with Their Frobenius.” Journal of Algebra, 2026. https://doi.org/10.1016/j.jalgebra.2026.02.025. ieee: 'F. Gundlach and B. F. Seguin, “On matrices commuting with their Frobenius,” Journal of Algebra, 2026, doi: 10.1016/j.jalgebra.2026.02.025.' mla: Gundlach, Fabian, and Beranger Fabrice Seguin. “On Matrices Commuting with Their Frobenius.” Journal of Algebra, Elsevier BV, 2026, doi:10.1016/j.jalgebra.2026.02.025. short: F. Gundlach, B.F. Seguin, Journal of Algebra (2026). date_created: 2026-03-13T14:14:23Z date_updated: 2026-03-13T14:15:17Z doi: 10.1016/j.jalgebra.2026.02.025 language: - iso: eng publication: Journal of Algebra publication_identifier: issn: - 0021-8693 publication_status: published publisher: Elsevier BV status: public title: On matrices commuting with their Frobenius type: journal_article user_id: '100450' year: '2026' ... --- _id: '65031' abstract: - lang: eng text: We prove that two-step nilpotent $p$-extensions of rational global function fields of characteristic $p$ satisfy a quantitative local-global principle when they are counted according to their largest upper ramification break ("last jump"). We had previously shown this only for $p\neq2$. Compared to our previous proof, this proof is also more self-contained, and may apply to heights other than the last jump. As an application, we describe the distribution of last jumps of $D_4$-extensions of rational global function fields of characteristic $2$. We also exhibit a counterexample to the analogous local-global principle when counting by discriminants. author: - first_name: Fabian full_name: Gundlach, Fabian id: '100450' last_name: Gundlach - first_name: Beranger Fabrice full_name: Seguin, Beranger Fabrice id: '102487' last_name: Seguin orcid: 0000-0002-4800-4647 citation: ama: Gundlach F, Seguin BF. Lifts of unramified twists and local-global principles. arXiv:260315544. Published online 2026. apa: Gundlach, F., & Seguin, B. F. (2026). Lifts of unramified twists and local-global principles. In arXiv:2603.15544. bibtex: '@article{Gundlach_Seguin_2026, title={Lifts of unramified twists and local-global principles}, journal={arXiv:2603.15544}, author={Gundlach, Fabian and Seguin, Beranger Fabrice}, year={2026} }' chicago: Gundlach, Fabian, and Beranger Fabrice Seguin. “Lifts of Unramified Twists and Local-Global Principles.” ArXiv:2603.15544, 2026. ieee: F. Gundlach and B. F. Seguin, “Lifts of unramified twists and local-global principles,” arXiv:2603.15544. 2026. mla: Gundlach, Fabian, and Beranger Fabrice Seguin. “Lifts of Unramified Twists and Local-Global Principles.” ArXiv:2603.15544, 2026. short: F. Gundlach, B.F. Seguin, ArXiv:2603.15544 (2026). date_created: 2026-03-17T12:17:42Z date_updated: 2026-03-17T12:21:09Z external_id: arxiv: - '2603.15544' language: - iso: eng publication: arXiv:2603.15544 status: public title: Lifts of unramified twists and local-global principles type: preprint user_id: '100450' year: '2026' ... --- _id: '64181' abstract: - lang: eng text: "

\r\n Let\r\n \r\n \ \r\n \r\n G\r\n \ G\r\n \ \r\n \r\n \ \r\n be a finite abelian\r\n \ \r\n \r\n \r\n \ p\r\n p\r\n \r\n \ \r\n \r\n \ -group. We count étale\r\n \r\n \r\n \r\n G\r\n \ G\r\n \ \r\n \r\n \ \r\n -extensions of global rational function fields\r\n \r\n \ \r\n \r\n \r\n \ \r\n \r\n F\r\n \ \r\n q\r\n \ \r\n (\r\n T\r\n \ )\r\n \r\n \ \\mathbb F_q(T)\r\n \r\n \r\n \ \r\n of characteristic\r\n \ \r\n \r\n \r\n \ p\r\n p\r\n \r\n \ \r\n \r\n \ by the degree of what we call their Artin–Schreier conductor. The corresponding (ordinary) generating function turns out to be rational. This gives an exact answer to the counting problem, and seems to beg for a geometric interpretation.\r\n

\r\n

This is in contrast with the generating functions for the ordinary conductor (from class field theory) and the discriminant, which in general have no meromorphic continuation to the entire complex plane.

" author: - first_name: Fabian full_name: Gundlach, Fabian id: '100450' last_name: Gundlach citation: ama: Gundlach F. Counting abelian extensions by Artin–Schreier conductor. Proceedings of the American Mathematical Society. Published online 2025. doi:10.1090/proc/17440 apa: Gundlach, F. (2025). Counting abelian extensions by Artin–Schreier conductor. Proceedings of the American Mathematical Society. https://doi.org/10.1090/proc/17440 bibtex: '@article{Gundlach_2025, title={Counting abelian extensions by Artin–Schreier conductor}, DOI={10.1090/proc/17440}, journal={Proceedings of the American Mathematical Society}, publisher={American Mathematical Society (AMS)}, author={Gundlach, Fabian}, year={2025} }' chicago: Gundlach, Fabian. “Counting Abelian Extensions by Artin–Schreier Conductor.” Proceedings of the American Mathematical Society, 2025. https://doi.org/10.1090/proc/17440. ieee: 'F. Gundlach, “Counting abelian extensions by Artin–Schreier conductor,” Proceedings of the American Mathematical Society, 2025, doi: 10.1090/proc/17440.' mla: Gundlach, Fabian. “Counting Abelian Extensions by Artin–Schreier Conductor.” Proceedings of the American Mathematical Society, American Mathematical Society (AMS), 2025, doi:10.1090/proc/17440. short: F. Gundlach, Proceedings of the American Mathematical Society (2025). date_created: 2026-02-16T13:00:54Z date_updated: 2026-02-16T13:01:13Z doi: 10.1090/proc/17440 language: - iso: eng publication: Proceedings of the American Mathematical Society publication_identifier: issn: - 1088-6826 - 0002-9939 publication_status: published publisher: American Mathematical Society (AMS) status: public title: Counting abelian extensions by Artin–Schreier conductor type: journal_article user_id: '100450' year: '2025' ... --- _id: '58852' abstract: - lang: eng text: "We study the asymptotic distribution of wildly ramified extensions of\r\nfunction fields in characteristic $p > 2$, focusing on (certain) $p$-groups of\r\nnilpotency class at most $2$. Rather than the discriminant, we count extensions\r\naccording to an invariant describing the last jump in the ramification\r\nfiltration at each place. We prove a local-global principle relating the\r\ndistribution of extensions over global function fields to their distribution\r\nover local fields, leading to an asymptotic formula for the number of\r\nextensions with a given global last-jump invariant. A key ingredient is\r\nAbrashkin's nilpotent Artin-Schreier theory, which lets us parametrize\r\nextensions and obtain bounds on the ramification of local extensions by\r\nestimating the number of solutions to certain polynomial equations over finite\r\nfields." author: - first_name: Fabian full_name: Gundlach, Fabian id: '100450' last_name: Gundlach - first_name: Beranger Fabrice full_name: Seguin, Beranger Fabrice id: '102487' last_name: Seguin citation: ama: Gundlach F, Seguin BF. Counting two-step nilpotent wildly ramified extensions of function  fields. arXiv:250218207. Published online 2025. apa: Gundlach, F., & Seguin, B. F. (2025). Counting two-step nilpotent wildly ramified extensions of function  fields. In arXiv:2502.18207. bibtex: '@article{Gundlach_Seguin_2025, title={Counting two-step nilpotent wildly ramified extensions of function  fields}, journal={arXiv:2502.18207}, author={Gundlach, Fabian and Seguin, Beranger Fabrice}, year={2025} }' chicago: Gundlach, Fabian, and Beranger Fabrice Seguin. “Counting Two-Step Nilpotent Wildly Ramified Extensions of Function  Fields.” ArXiv:2502.18207, 2025. ieee: F. Gundlach and B. F. Seguin, “Counting two-step nilpotent wildly ramified extensions of function  fields,” arXiv:2502.18207. 2025. mla: Gundlach, Fabian, and Beranger Fabrice Seguin. “Counting Two-Step Nilpotent Wildly Ramified Extensions of Function  Fields.” ArXiv:2502.18207, 2025. short: F. Gundlach, B.F. Seguin, ArXiv:2502.18207 (2025). date_created: 2025-02-26T08:51:57Z date_updated: 2025-02-26T08:53:08Z external_id: arxiv: - '2502.18207' language: - iso: eng publication: arXiv:2502.18207 status: public title: Counting two-step nilpotent wildly ramified extensions of function fields type: preprint user_id: '100450' year: '2025' ... --- _id: '62308' abstract: - lang: eng text: 'For a polynomial $f(x) = \sum_{i=0}^n a_i x^i$, we study the double discriminant $DD_{n,k} = \operatorname{disc}_{a_k} \operatorname{disc}_x f(x)$. This object has been well studied in algebraic geometry, but has been brought to recent prominence in number theory by its key role in the proof of the Bhargava--van der Waerden theorem. We bridge the knowledge gap for this object by proving an explicit factorization: $DD_{n,k}$ is the product of a square, a cube, and possibly a linear monomial. Our proof is entirely algebraic. We also investigate other aspects of this factorization.' author: - first_name: Theresa C. full_name: Anderson, Theresa C. last_name: Anderson - first_name: Ufuoma V. full_name: Asarhasa, Ufuoma V. last_name: Asarhasa - first_name: Adam full_name: Bertelli, Adam last_name: Bertelli - first_name: Fabian full_name: Gundlach, Fabian id: '100450' last_name: Gundlach - first_name: Evan M. full_name: O'Dorney, Evan M. last_name: O'Dorney citation: ama: Anderson TC, Asarhasa UV, Bertelli A, Gundlach F, O’Dorney EM. The structure of the double discriminant. arXiv:250716138. Published online 2025. apa: Anderson, T. C., Asarhasa, U. V., Bertelli, A., Gundlach, F., & O’Dorney, E. M. (2025). The structure of the double discriminant. In arXiv:2507.16138. bibtex: '@article{Anderson_Asarhasa_Bertelli_Gundlach_O’Dorney_2025, title={The structure of the double discriminant}, journal={arXiv:2507.16138}, author={Anderson, Theresa C. and Asarhasa, Ufuoma V. and Bertelli, Adam and Gundlach, Fabian and O’Dorney, Evan M.}, year={2025} }' chicago: Anderson, Theresa C., Ufuoma V. Asarhasa, Adam Bertelli, Fabian Gundlach, and Evan M. O’Dorney. “The Structure of the Double Discriminant.” ArXiv:2507.16138, 2025. ieee: T. C. Anderson, U. V. Asarhasa, A. Bertelli, F. Gundlach, and E. M. O’Dorney, “The structure of the double discriminant,” arXiv:2507.16138. 2025. mla: Anderson, Theresa C., et al. “The Structure of the Double Discriminant.” ArXiv:2507.16138, 2025. short: T.C. Anderson, U.V. Asarhasa, A. Bertelli, F. Gundlach, E.M. O’Dorney, ArXiv:2507.16138 (2025). date_created: 2025-11-26T08:18:33Z date_updated: 2025-11-26T08:21:27Z external_id: arxiv: - '2507.16138' language: - iso: eng publication: arXiv:2507.16138 status: public title: The structure of the double discriminant type: preprint user_id: '100450' year: '2025' ... --- _id: '54442' abstract: - lang: eng text: "We explain how to construct a uniformly random cubic integral domain $S$ of\r\ngiven signature with $|\\text{disc}(S)| \\leq T$ in expected time $\\widetilde\r\nO(\\log T)$." author: - first_name: Fabian full_name: Gundlach, Fabian id: '100450' last_name: Gundlach citation: ama: Gundlach F. Sampling cubic rings. arXiv:240513734. Published online 2024. apa: Gundlach, F. (2024). Sampling cubic rings. In arXiv:2405.13734. bibtex: '@article{Gundlach_2024, title={Sampling cubic rings}, journal={arXiv:2405.13734}, author={Gundlach, Fabian}, year={2024} }' chicago: Gundlach, Fabian. “Sampling Cubic Rings.” ArXiv:2405.13734, 2024. ieee: F. Gundlach, “Sampling cubic rings,” arXiv:2405.13734. 2024. mla: Gundlach, Fabian. “Sampling Cubic Rings.” ArXiv:2405.13734, 2024. short: F. Gundlach, ArXiv:2405.13734 (2024). date_created: 2024-05-24T08:59:54Z date_updated: 2024-05-24T09:14:58Z external_id: arxiv: - '2405.13734' language: - iso: eng publication: arXiv:2405.13734 status: public title: Sampling cubic rings type: preprint user_id: '100450' year: '2024' ... --- _id: '55192' abstract: - lang: eng text: "We describe the group of $\\mathbb Z$-linear automorphisms of the ring of\r\nintegers of a number field $K$ that preserve the set $V_{K,k}$ of $k$th\r\npower-free integers: every such map is the composition of a field automorphism\r\nand the multiplication by a unit.\r\n We show that those maps together with translations generate the extended\r\nsymmetry group of the shift space $\\mathbb D_{K,k}$ associated to $V_{K,k}$.\r\nMoreover, we show that no two such dynamical systems $\\mathbb D_{K,k}$ and\r\n$\\mathbb D_{L,l}$ are topologically conjugate and no one is a factor system of\r\nanother.\r\n We generalize the concept of $k$th power-free integers to sieves and study\r\nthe resulting admissible shift spaces." author: - first_name: Fabian full_name: Gundlach, Fabian id: '100450' last_name: Gundlach - first_name: Jürgen full_name: Klüners, Jürgen id: '21202' last_name: Klüners citation: ama: Gundlach F, Klüners J. Symmetries of power-free integers in number fields and their shift  spaces. arXiv:240708438. Published online 2024. apa: Gundlach, F., & Klüners, J. (2024). Symmetries of power-free integers in number fields and their shift  spaces. In arXiv:2407.08438. bibtex: '@article{Gundlach_Klüners_2024, title={Symmetries of power-free integers in number fields and their shift  spaces}, journal={arXiv:2407.08438}, author={Gundlach, Fabian and Klüners, Jürgen}, year={2024} }' chicago: Gundlach, Fabian, and Jürgen Klüners. “Symmetries of Power-Free Integers in Number Fields and Their Shift  Spaces.” ArXiv:2407.08438, 2024. ieee: F. Gundlach and J. Klüners, “Symmetries of power-free integers in number fields and their shift  spaces,” arXiv:2407.08438. 2024. mla: Gundlach, Fabian, and Jürgen Klüners. “Symmetries of Power-Free Integers in Number Fields and Their Shift  Spaces.” ArXiv:2407.08438, 2024. short: F. Gundlach, J. Klüners, ArXiv:2407.08438 (2024). date_created: 2024-07-12T08:16:37Z date_updated: 2024-07-12T08:19:11Z external_id: arxiv: - '2407.08438' language: - iso: eng publication: arXiv:2407.08438 status: public title: Symmetries of power-free integers in number fields and their shift spaces type: preprint user_id: '82981' year: '2024' ... --- _id: '53421' abstract: - lang: eng text: "We define invariants $\\operatorname{inv}_1,\\dots,\\operatorname{inv}_m$ of\r\nGalois extensions of number fields with a fixed Galois group. Then, we propose\r\na heuristic in the spirit of Malle's conjecture which asymptotically predicts\r\nthe number of extensions that satisfy $\\operatorname{inv}_i\\leq X_i$ for all\r\n$X_i$. The resulting conjecture is proved for abelian Galois groups. We also\r\ndescribe refined Artin conductors that carry essentially the same information\r\nas the invariants $\\operatorname{inv}_1,\\dots,\\operatorname{inv}_m$." author: - first_name: Fabian full_name: Gundlach, Fabian id: '100450' last_name: Gundlach citation: ama: Gundlach F. Malle’s conjecture with multiple invariants. arXiv:221116698. Published online 2022. apa: Gundlach, F. (2022). Malle’s conjecture with multiple invariants. In arXiv:2211.16698. bibtex: '@article{Gundlach_2022, title={Malle’s conjecture with multiple invariants}, journal={arXiv:2211.16698}, author={Gundlach, Fabian}, year={2022} }' chicago: Gundlach, Fabian. “Malle’s Conjecture with Multiple Invariants.” ArXiv:2211.16698, 2022. ieee: F. Gundlach, “Malle’s conjecture with multiple invariants,” arXiv:2211.16698. 2022. mla: Gundlach, Fabian. “Malle’s Conjecture with Multiple Invariants.” ArXiv:2211.16698, 2022. short: F. Gundlach, ArXiv:2211.16698 (2022). date_created: 2024-04-11T12:43:14Z date_updated: 2024-04-11T12:50:44Z extern: '1' external_id: arxiv: - '2211.16698' language: - iso: eng publication: arXiv:2211.16698 status: public title: Malle's conjecture with multiple invariants type: preprint user_id: '100450' year: '2022' ... --- _id: '53420' abstract: - lang: eng text: "Let $P$ be a bounded convex subset of $\\mathbb R^n$ of positive volume.\r\nDenote the smallest degree of a polynomial $p(X_1,\\dots,X_n)$ vanishing on\r\n$P\\cap\\mathbb Z^n$ by $r_P$ and denote the smallest number $u\\geq0$ such that\r\nevery function on $P\\cap\\mathbb Z^n$ can be interpolated by a polynomial of\r\ndegree at most $u$ by $s_P$. We show that the values $(r_{d\\cdot P}-1)/d$ and\r\n$s_{d\\cdot P}/d$ for dilates $d\\cdot P$ converge from below to some numbers\r\n$v_P,w_P>0$ as $d$ goes to infinity. The limits satisfy $v_P^{n-1}w_P \\leq\r\nn!\\cdot\\operatorname{vol}(P)$. When $P$ is a triangle in the plane, we show\r\nequality: $v_Pw_P = 2\\operatorname{vol}(P)$. These results are obtained by\r\nlooking at the set of standard monomials of the vanishing ideal of $d\\cdot\r\nP\\cap\\mathbb Z^n$ and by applying the Bernstein--Kushnirenko theorem. Finally,\r\nwe study irreducible Laurent polynomials that vanish with large multiplicity at\r\na point. This work is inspired by questions about Seshadri constants." author: - first_name: Fabian full_name: Gundlach, Fabian id: '100450' last_name: Gundlach citation: ama: Gundlach F. Polynomials vanishing at lattice points in a convex set. arXiv:210705353. Published online 2021. apa: Gundlach, F. (2021). Polynomials vanishing at lattice points in a convex set. In arXiv:2107.05353. bibtex: '@article{Gundlach_2021, title={Polynomials vanishing at lattice points in a convex set}, journal={arXiv:2107.05353}, author={Gundlach, Fabian}, year={2021} }' chicago: Gundlach, Fabian. “Polynomials Vanishing at Lattice Points in a Convex Set.” ArXiv:2107.05353, 2021. ieee: F. Gundlach, “Polynomials vanishing at lattice points in a convex set,” arXiv:2107.05353. 2021. mla: Gundlach, Fabian. “Polynomials Vanishing at Lattice Points in a Convex Set.” ArXiv:2107.05353, 2021. short: F. Gundlach, ArXiv:2107.05353 (2021). date_created: 2024-04-11T12:43:04Z date_updated: 2024-04-11T12:50:48Z extern: '1' external_id: arxiv: - '2107.05353' language: - iso: eng publication: arXiv:2107.05353 status: public title: Polynomials vanishing at lattice points in a convex set type: preprint user_id: '100450' year: '2021' ... --- _id: '53424' author: - first_name: Fabian full_name: Gundlach, Fabian id: '100450' last_name: Gundlach citation: ama: Gundlach F. Parametrizing Extensions with Fixed Galois Group.; 2019. apa: Gundlach, F. (2019). Parametrizing extensions with fixed Galois group. bibtex: '@book{Gundlach_2019, title={Parametrizing extensions with fixed Galois group}, author={Gundlach, Fabian}, year={2019} }' chicago: Gundlach, Fabian. Parametrizing Extensions with Fixed Galois Group, 2019. ieee: F. Gundlach, Parametrizing extensions with fixed Galois group. 2019. mla: Gundlach, Fabian. Parametrizing Extensions with Fixed Galois Group. 2019. short: F. Gundlach, Parametrizing Extensions with Fixed Galois Group, 2019. date_created: 2024-04-11T12:45:34Z date_updated: 2024-04-11T12:46:20Z extern: '1' language: - iso: eng status: public title: Parametrizing extensions with fixed Galois group type: dissertation user_id: '100450' year: '2019' ... --- _id: '53423' author: - first_name: Fabian full_name: Gundlach, Fabian id: '100450' last_name: Gundlach citation: ama: Gundlach F. Del Pezzo Surface Fibrations of Degree 4.; 2014. apa: Gundlach, F. (2014). Del Pezzo Surface Fibrations of Degree 4. bibtex: '@book{Gundlach_2014, title={Del Pezzo Surface Fibrations of Degree 4}, author={Gundlach, Fabian}, year={2014} }' chicago: Gundlach, Fabian. Del Pezzo Surface Fibrations of Degree 4, 2014. ieee: F. Gundlach, Del Pezzo Surface Fibrations of Degree 4. 2014. mla: Gundlach, Fabian. Del Pezzo Surface Fibrations of Degree 4. 2014. short: F. Gundlach, Del Pezzo Surface Fibrations of Degree 4, 2014. date_created: 2024-04-11T12:45:07Z date_updated: 2024-04-11T12:46:21Z extern: '1' language: - iso: eng status: public title: Del Pezzo Surface Fibrations of Degree 4 type: mastersthesis user_id: '100450' year: '2014' ... --- _id: '53419' author: - first_name: Fabian full_name: Gundlach, Fabian id: '100450' last_name: Gundlach citation: ama: Gundlach F. Integral Brauer-Manin obstructions for sums of two squares and a power. Journal of the London Mathematical Society. 2013;88(2):599-618. doi:10.1112/jlms/jdt042 apa: Gundlach, F. (2013). Integral Brauer-Manin obstructions for sums of two squares and a power. Journal of the London Mathematical Society, 88(2), 599–618. https://doi.org/10.1112/jlms/jdt042 bibtex: '@article{Gundlach_2013, title={Integral Brauer-Manin obstructions for sums of two squares and a power}, volume={88}, DOI={10.1112/jlms/jdt042}, number={2}, journal={Journal of the London Mathematical Society}, publisher={Wiley}, author={Gundlach, Fabian}, year={2013}, pages={599–618} }' chicago: 'Gundlach, Fabian. “Integral Brauer-Manin Obstructions for Sums of Two Squares and a Power.” Journal of the London Mathematical Society 88, no. 2 (2013): 599–618. https://doi.org/10.1112/jlms/jdt042.' ieee: 'F. Gundlach, “Integral Brauer-Manin obstructions for sums of two squares and a power,” Journal of the London Mathematical Society, vol. 88, no. 2, pp. 599–618, 2013, doi: 10.1112/jlms/jdt042.' mla: Gundlach, Fabian. “Integral Brauer-Manin Obstructions for Sums of Two Squares and a Power.” Journal of the London Mathematical Society, vol. 88, no. 2, Wiley, 2013, pp. 599–618, doi:10.1112/jlms/jdt042. short: F. Gundlach, Journal of the London Mathematical Society 88 (2013) 599–618. date_created: 2024-04-11T12:41:31Z date_updated: 2024-04-11T12:50:38Z doi: 10.1112/jlms/jdt042 extern: '1' intvolume: ' 88' issue: '2' keyword: - General Mathematics language: - iso: eng page: 599-618 publication: Journal of the London Mathematical Society publication_identifier: issn: - 0024-6107 publication_status: published publisher: Wiley status: public title: Integral Brauer-Manin obstructions for sums of two squares and a power type: journal_article user_id: '100450' volume: 88 year: '2013' ... --- _id: '53422' author: - first_name: Fabian full_name: Gundlach, Fabian id: '100450' last_name: Gundlach citation: ama: Gundlach F. Brauer-Manin Obstructions for Sums of Two Squares and a Power.; 2012. apa: Gundlach, F. (2012). Brauer-Manin obstructions for sums of two squares and a power. bibtex: '@book{Gundlach_2012, title={Brauer-Manin obstructions for sums of two squares and a power}, author={Gundlach, Fabian}, year={2012} }' chicago: Gundlach, Fabian. Brauer-Manin Obstructions for Sums of Two Squares and a Power, 2012. ieee: F. Gundlach, Brauer-Manin obstructions for sums of two squares and a power. 2012. mla: Gundlach, Fabian. Brauer-Manin Obstructions for Sums of Two Squares and a Power. 2012. short: F. Gundlach, Brauer-Manin Obstructions for Sums of Two Squares and a Power, 2012. date_created: 2024-04-11T12:44:37Z date_updated: 2024-04-11T12:46:22Z extern: '1' language: - iso: eng status: public title: Brauer-Manin obstructions for sums of two squares and a power type: bachelorsthesis user_id: '100450' year: '2012' ...