BIMSA > 谢尔盖·奥布莱津
研究员 谢尔盖·奥布莱津

谢尔盖·奥布莱津

研究员
单位: 北京雁栖湖应用数学研究院
研究方向: 表示论、调和分析
邮箱: oblezin@bimsa.cn
CV: PDF

个人简介

谢尔盖·奥布莱津(Sergey Oblezin)于2004年在莫斯科物理技术学院(MIPT)获得博士学位。他在莫斯科接受的教育以及在阿利哈诺夫理论与实验物理研究所(ITEP)的工作经历,塑造了他独特的跨学科视野——以量子物理与数学之间相互启发、彼此转化的深刻融合为基础。 他的早期研究成果获得了多项荣誉,包括两次俄罗斯联邦总统青年数学家奖学金(2007–2008年和2008–2009年)。2009至2012年,他的研究荣获皮埃尔·德利涅奖(Pierre Deligne Prize,由德利涅2004年巴尔赞奖资助设立)。2013至2017年,他主持的项目“拓扑场论、Baxter算子与朗兰兹纲领”获得英国工程与自然科学研究理事会(EPSRC)“成熟职业阶段”(Established Career)研究基金支持。 2015至2023年,谢尔盖任英国诺丁汉大学几何学副教授,2024年全职加入北京雁栖湖应用数学研究院(BIMSA),担任教授。他长期致力于将量子物理中的方法与构造引入并发展于朗兰兹纲领的研究。其研究兴趣包括表示论、调和分析,以及它们与数论和数学物理的深刻联系。

教育经历

  • 2000 - 2003 | Moscow Institute of Physics and Technology | Mathematics | Ph.D | (Supervisor: A.M. Levin)
  • 1999 - 2003 | Independent University of Moscow | Pure Mathematics | M.Sc. | (Supervisor: A.M. Levin)
  • 1994 - 2000 | Moscow Institute of Physics and Technology | Fundamental and Applied Mathematics and Physics | M.Sc. | (Supervisor: I.A. Chubarov)

工作经历

  • 2015 - 2023 | University of Nottingham | Associate Professor
  • 2003 - 2014 | Institute for Theoretical and Experimental Physics | Senior researcher

荣誉与奖项

  • 2019 | Higher Education Academy Associated Fellow (UK)
  • 2013 | EPSRC Established Career grant (UK) | £783,918
  • 2012 | Dynasty Foundation fellowship (Russia)
  • 2009 | Pierre Deligne Fellowship spported by P. Deligne's Balzan Prize 2004
  • 2007 | Russian Federation President grant for young researchers

出版物

  • [1] A.Gerasimov, D.Lebedev, S.Oblezin, On equivalence of the Mellin–Barnes and the Givental integral realizations of the Whittaker functions as matrix elements, Algebra i Analiz, 37(6), 1-52 (2025)
  • [2] A.A.Gerasimov, D.R.Lebedev, S.V.Oblezin, The $GL_{\ell+1}(\IR)$ Hecke-Baxter operator: principal series representations, Letters in Mathematical Physics, 115 (2025)
  • [3] A.A.Gerasimov, D.R.Lebedev, S.V.Oblezin, Global GL2 Hecke-Baxter operator (2025)
  • [4] AA Gerasimov, DR Lebedev, SV Oblezin, The Hecke-Baxter operators via Heisenberg group extensions, Letters in Mathematical Physics, 115 (2025)
  • [5] A.Gerasimov, D.Lebedev, S.Oblezin, Normalizers of maximal tori in classical Lie groups, St. Petersburg Math. J, 35(2), 245-285 (2024)
  • [6] A.Gerasimov, D.Lebedev, S.Oblezin, On a matrix element representation of the GKZ hypergeometric functions, Letters in Mathematical Physics, 113(2023), 43
  • [7] A.Gerasimov, D.Lebedev, S.Oblezin, Normaizers of maximal tori and real forms of Lie groups, European Journal of Mathematics, 8(2022), 655-671
  • [8] A.Gerasimov, D.Lebedev, S.Oblezin, On a matrix element representation of special functions associated with toric varieties, arXiv preprint arXiv:2112.15013 (2021)
  • [9] A.Gerasimov, D.Lebedev, S.Oblezin, On the quantum osp(1|2\ell)-Toda chain, THEORETICAL AND MATHEMATICAL PHYSICS, 208(2), 1004-1017 (2021)
  • [10] AA Gerasimov, DR Lebedev, SV Oblezin, On the quantum$\mathfrak{osp}(1|2\ell)$Toda chain, Teoreticheskaya i Matematicheskaya Fizika, 208(2), 180-195 (2021)
  • [11] A.Gerasimov, D.Lebedev, S.Oblezin, Baxter operator formalism for Macdonald polynomials, Letters in Mathematical Physics, 104, 115-139 (2014)
  • [12] S Oblezin, On parabolic Whittaker functions, Letters in Mathematical Physics, 101(3), 289-304 (2012)
  • [13] A Gerasimov, D Lebedev, S Oblezin, On a Classical Limit of-Deformed Whittaker Functions, Letters in Mathematical Physics, 100(3), 279-290 (2012)
  • [14] S Oblezin, On parabolic Whittaker functions II, Central European Journal of Mathematics, 10, 543-558 (2012)
  • [15] AA Gerasimov, DR Lebedev, SV Oblezin, New integral representations of Whittaker functions for classical Lie groups, Russian Mathematical Surveys, 67(1) (2012)
  • [16] A Gerasimov, D Lebedev, S Oblezin, On q-deformed-Whittaker function III, Letters in Mathematical Physics, 97(1), 1-24 (2011)
  • [17] A Gerasimov, D Lebedev, S Oblezin, From Archimedean-Factors to Topological Field Theories, Letters in Mathematical Physics, 96(1-3), 285-297 (2011)
  • [18] A Gerasimov, D Lebedev, S Oblezin, Quantum Toda chains intertwined, St. Petersburg Mathematical Journal, 22(3), 411-435 (2011)
  • [19] A Gerasimov, D Lebedev, S Oblezin, Parabolic Whittaker functions and topological field theories I, arXiv preprint arXiv:1002.2622 (2010)
  • [20] A Gerasimov, D Lebedev, S Oblezin, On q-Deformed {\mathfrak {gl} _ {ℓ+ 1}}-Whittaker Function I, Communications in Mathematical Physics, 294(1), 97-119 (2010)
  • [21] A Gerasimov, D Lebedev, S Oblezin, On q-Deformed-Whittaker Function II, Communications in Mathematical Physics, 294(1), 121-143 (2010)
  • [22] A Gerasimov, D Lebedev, S Oblezin, On q-Deformed-Whittaker Function I, Communications in Mathematical Physics, 294(1), 97-119 (2010)
  • [23] A Gerasimov, D Lebedev, S Oblezin, On q-Deformed [FORMULA]-Whittaker Function II, Communications in mathematical physics, 294(1), 121-143 (2010)
  • [24] A Gerasimov, D Lebedev, S Oblezin, On q-deformed${\mathfrak {gl} _ {\ell+ 1}}$-Whittaker functions II, Comm. Math. Phys, 294 (2010)
  • [25] A Gerasimov, D Lebedev, S Oblezin, Archimedean L-factors and topological field theories II, arXiv preprint arXiv:0909.2016 (2009)
  • [26] A Gerasimov, D Lebedev, S Oblezin, On Baxter-Operators and their Arithmetic Implications, Letters in Mathematical Physics, 88(1-3), 3-30 (2009)
  • [27] A Gerasimov, D Lebedev, S Oblezin, Mathematische Arbeitstagung 2009-From Archimedean L-factors to topological field theories, (2009)
  • [28] A Gerasimov, D Lebedev, S Oblezin, Baxter operator and Archimedean Hecke algebra, Communications in mathematical physics, 284(3), 867-896 (2008)
  • [29] A Gerasimov, D Lebedev, S Oblezin, On q-deformed gl ℓ-Whittaker function II, arXiv preprint arXiv:0803.0970 (2008)
  • [30] A Gerasimov, S Kharchev, D Lebedev, S Oblezin, On a Class of Representations of Quantum Groups and Its Applications, Translations of the American Mathematical Society-Series 2, 221, 59-78 (2007)
  • [31] A Gerasimov, D Lebedev, S Oblezin, Baxter Q-operator and Givental integral representation for C_n and D_n, arXiv preprint math/0609082 (2006)
  • [32] A Gerasimov, D Lebedev, S Oblezin, Givental integral representation for classical groups, arXiv preprint math/0608152 (2006)
  • [33] A Gerasimov, S Kharchev, D Lebedev, S Oblezin, On a Gauss-Givental representation of quantum Toda chain wave function, International Mathematics Research Notices, 2006, O96489 (2006)
  • [34] A Gerasimov, S Kharchev, D Lebedev, S Oblezin, On a class of representations of the Yangian and moduli space of monopoles, Communications in mathematical physics, 260, 511-525 (2005)
  • [35] A Gerasimov, S Kharchev, D Lebedev, S Oblezin, On a class of representations of quantum groups, arXiv preprint math/0501473 (2005)
  • [36] A Gerasimov, S Kharchev, D Lebedev, S Oblezin, Contemporary Mathematics Volume 391, 2005, Noncommutative Geometry and Representation Theory in Mathematical Physics: Satellite Conference to the Fourth European Congress of Mathematics, July 5-10, 2004, Karlstad University, Karlstad, Sweden, 391, 101 (2005)
  • [37] A Gerasimov, D Lebedev, S Oblezin, On a Gauss-Givental representation for classical groups, to appear (2005)
  • [38] SV Oblezin, Discrete symmetries of systems of isomonodromic deformations of second-order Fuchsian differential equations, Functional Analysis and Its Applications, 38, 111-124 (2004)
  • [39] S Oblezin, Discrete structure of some Schlesinger systems on the Riemann sphere, Czechoslovak journal of physics, 53, 1085-1092 (2003)
  • [40] S Oblezin, Isomonodromic deformations of the sl (2) Fuchsian systems on the Riemann sphere, arXiv preprint math-ph/0309048 (2003)
  • [41] S OBLEZIN, RESEARCH PROPOSAL FOR P. DELIGNE CONTEST,
更新时间: 2026-06-18 18:00:10