Xinwen Zhu, Ph.D. - Publications
Affiliations: | Mathematics | California Institute of Technology, Pasadena, CA | |
2009 | University of California, Berkeley, Berkeley, CA, United States |
Area:
Representation theory, Integrable systems, Mathematical physicsYear | Citation | Score | |||
---|---|---|---|---|---|
2017 | Zhu X. Affine Grassmannians and the geometric Satake in mixed characteristic Annals of Mathematics. 185: 403-492. DOI: 10.4007/Annals.2017.185.2.2 | 0.337 | |||
2017 | Chen T, Zhu X. Geometric Langlands in Prime Characteristic Compositio Mathematica. 153: 395-452. DOI: 10.1112/S0010437X16008113 | 0.362 | |||
2016 | Huang A, Lian BH, Zhu X. Period integrals and the Riemann–Hilbert correspondence Journal of Differential Geometry. 104: 325-369. DOI: 10.4310/Jdg/1476367060 | 0.365 | |||
2016 | Osipov D, Zhu X. The two-dimensional Contou-Carrère symbol and reciprocity laws Journal of Algebraic Geometry. 25: 703-774. DOI: 10.1090/Jag/664 | 0.339 | |||
2015 | Zhu X. The Geometric Satake Correspondence for Ramified Groups Annales Scientifiques De L Ecole Normale Superieure. 48: 409-451. DOI: 10.24033/Asens.2248 | 0.379 | |||
2014 | Zhu X. On the coherence conjecture of pappas and Rapoport Annals of Mathematics. 180: 1-85. DOI: 10.4007/Annals.2014.180.1.1 | 0.382 | |||
2013 | Pappas G, Zhu X. Local models of Shimura varieties and a conjecture of Kottwitz Inventiones Mathematicae. 194: 147-254. DOI: 10.1007/S00222-012-0442-Z | 0.413 | |||
2012 | Frenkel E, Zhu X. Gerbal representations of double loop groups International Mathematics Research Notices. 2012: 3929-4013. DOI: 10.1093/Imrn/Rnr159 | 0.508 | |||
2011 | Osipov D, Zhu X. A categorical proof of the Parshin reciprocity laws on algebraic surfaces Algebra & Number Theory. 5: 289-337. DOI: 10.2140/Ant.2011.5.289 | 0.385 | |||
2011 | Yun Z, Zhu X. Integral homology of loop groups via Langlands dual groups Representation Theory of the American Mathematical Society. 15: 347-369. DOI: 10.1090/S1088-4165-2011-00399-X | 0.398 | |||
2010 | Frenkel E, Zhu X. Any flat bundle on a punctured disc has an oper structure Mathematical Research Letters. 17: 27-37. DOI: 10.4310/Mrl.2010.V17.N1.A3 | 0.508 | |||
2009 | Zhu X. Affine Demazure modules and T-fixed point subschemes in the affine Grassmannian Advances in Mathematics. 221: 570-600. DOI: 10.1016/J.Aim.2009.01.003 | 0.355 | |||
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