• In mathematics, a Drinfeld module (or elliptic module) is roughly a special kind of module over a ring of functions on a curve over a finite field, generalizing...
    11 KB (1,623 words) - 07:14, 7 July 2023
  • forms, through the notions of elliptic module and the theory of the geometric Langlands correspondence. Drinfeld introduced the notion of a quantum group...
    9 KB (834 words) - 12:04, 18 November 2024
  • In mathematics a Yetter–Drinfeld category is a special type of braided monoidal category. It consists of modules over a Hopf algebra which satisfy some...
    6 KB (1,114 words) - 08:55, 25 May 2024
  • free modules. In general, the precise relation between flatness and projectivity was established by Raynaud & Gruson (1971) (see also Drinfeld (2006)...
    23 KB (3,082 words) - 06:34, 3 October 2024
  • algebraic variety function field (scheme theory) algebraic function Drinfeld module Gabriel Daniel & Villa Salvador (2007). Topics in the Theory of Algebraic...
    7 KB (914 words) - 17:44, 21 April 2022
  • analysis. It is used in the definition of the Carlitz module – an example of a Drinfeld module. We work over the polynomial ring Fq[T] of one variable...
    3 KB (377 words) - 00:43, 3 June 2021
  • {\displaystyle \{w_{1},\dots ,w_{m}\}} forms a group with the field addition. Drinfeld module Additive map David Goss, Basic Structures of Function Field Arithmetic...
    4 KB (644 words) - 06:22, 13 May 2024
  • "Walking Stuka" Shtuka, a sort of generalization of the mathematical Drinfeld module This disambiguation page lists articles associated with the title Stuka...
    1 KB (170 words) - 07:46, 15 January 2024
  • mathematics, Drinfeld reciprocity, introduced by Drinfeld (1974), is a correspondence between eigenforms of the moduli space of Drinfeld modules and factors...
    1 KB (134 words) - 08:34, 3 February 2024
  • found in the lecture of Heckenberger. Consider a Yetter–Drinfeld module V in the Yetter–Drinfeld category H H Y D {\displaystyle {}_{H}^{H}{\mathcal {YD}}}...
    29 KB (5,008 words) - 02:32, 15 April 2024
  • \operatorname {Hom} _{R}(M,R)} . dualizing dualizing module Drinfeld A Drinfeld module is a module over a ring of functions on algebraic curve with coefficients...
    20 KB (2,611 words) - 13:40, 22 July 2024
  • antipode of H is bijective. A Yetter–Drinfeld module R over H is called a braided bialgebra in the Yetter–Drinfeld category H H Y D {\displaystyle {}_{H}^{H}{\mathcal...
    5 KB (972 words) - 00:08, 13 April 2021
  • a branch of mathematics, the center (or Drinfeld center, after Soviet-American mathematician Vladimir Drinfeld) is a variant of the notion of the center...
    7 KB (1,137 words) - 21:01, 23 February 2023
  • Thumbnail for Bjorn Poonen
    Institutions MIT Thesis The Mordell-Weil theorem, rigidity, and pairings for Drinfeld modules  (1994) Doctoral advisor Kenneth Alan Ribet Doctoral students Kirsten...
    9 KB (660 words) - 06:53, 6 May 2024
  • Huang, Kriz, and others, D-module-theoretic objects called chiral algebras introduced by Alexander Beilinson and Vladimir Drinfeld and factorization algebras...
    52 KB (8,906 words) - 09:04, 23 November 2024
  • random matrix theory, and she has shown interest in elliptic curves and Drinfeld modules. She is the 2013 winner of the Krieger–Nelson Prize, given annually...
    5 KB (387 words) - 09:47, 19 March 2023
  • Thumbnail for Quantum group
    kinds of noncommutative algebras with additional structure. These include Drinfeld–Jimbo type quantum groups (which are quasitriangular Hopf algebras), compact...
    30 KB (4,983 words) - 19:49, 25 July 2024
  • "Explicit Class Field Theory in Function Fields: Gross-Stark Units and Drinfeld Modules." She was then awarded a Churchill Scholarship to study for a year...
    8 KB (774 words) - 08:52, 26 August 2024
  • Beilinson & Drinfeld (2004) as a rigorous version of the rather vague concept of a chiral algebra in physics. In Chiral Algebras, Beilinson and Drinfeld introduced...
    4 KB (510 words) - 02:14, 13 May 2024
  • equidistribution and invariant measures, especially on p-adic spaces. dynamics on Drinfeld modules. number-theoretic iteration problems that are not described by rational...
    15 KB (1,668 words) - 12:55, 12 July 2024
  • {\displaystyle \tau _{V,W}} , most importantly the modules over quasitriangular Hopf algebras and Yetter–Drinfeld modules over finite groups (such as Z 2 {\displaystyle...
    2 KB (362 words) - 02:12, 13 May 2024
  • quasi-isomorphic to a bounded complex of finite projective A-modules. A perfect module is a module that is perfect when it is viewed as a complex concentrated...
    5 KB (562 words) - 23:27, 31 December 2023
  • Lie-* algebra is a D-module with a Lie* bracket. They were introduced by Alexander Beilinson and Vladimir Drinfeld (Beilinson & Drinfeld (2004, section 2...
    1 KB (104 words) - 03:15, 13 May 2024
  • its dual, using the Drinfeld quantum double construction. If the Hopf algebra H is quasitriangular, then the category of modules over H is braided with...
    4 KB (770 words) - 18:29, 19 September 2023
  • 1999 September 17 Died in Pittsburgh, PA The Carlitz module is generalized by the Drinfeld module An identity regarding Bernoulli numbers Carlitz wrote...
    6 KB (543 words) - 18:13, 29 October 2024
  • polynomial ring — this can be applied especially in the theory of Drinfeld modules. Let k {\displaystyle k} be a field of characteristic p {\displaystyle...
    3 KB (617 words) - 13:03, 1 March 2017
  • discussed by M. Takeuchi in 1981, and now a general tool for construction of Drinfeld quantum double. Consider two bialgebras A {\displaystyle A} and X {\displaystyle...
    3 KB (665 words) - 21:29, 6 March 2024
  • 1985, Introduction Deligne, P.; Husemöller, D. (1987). "Survey of Drinfeld's modules" (PDF). Contemp. Math. 67 (1): 25–91. doi:10.1090/conm/067/902591...
    5 KB (776 words) - 16:06, 13 December 2020
  • Nichols Zoeller theorem for Hopf algebras in the category of Yetter Drinfeld modules", Communications in Algebra, 29 (6): 2481–2487, doi:10.1081/AGB-100002402...
    6 KB (343 words) - 16:37, 25 February 2024
  • bialgebras: they were first defined by the Ukrainian mathematician Vladimir Drinfeld in 1990. A quasi-bialgebra differs from a bialgebra by having coassociativity...
    8 KB (1,449 words) - 01:54, 25 April 2024