Xinyi Yuan
Xinyi Yuan (Chinese: 袁新意) is a Chinese mathematician who is currently a professor of mathematics at Peking University working in number theory, arithmetic geometry, and automorphic forms.[1] In particular, his work focuses on arithmetic intersection theory, algebraic dynamics, Diophantine equations and special values of L-functions.
Xinyi Yuan | |
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Yuan in 2017 | |
Alma mater | Columbia University Peking University |
Awards |
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Scientific career | |
Fields | Mathematics |
Institutions | Peking University University of California, Berkeley Institute for Advanced Study Princeton University Harvard University |
Thesis | Equidistribution Theory over Algebraic Dynamical Systems (2008) |
Doctoral advisor | Shou-Wu Zhang |
Education
Yuan is from Macheng, Huanggang, Hubei, and graduated from Huanggang Middle School in 2000.[2] That year, he received a gold medal at the International Mathematical Olympiad while representing China.[3] Yuan obtained his A.B. in mathematics from Peking University in 2003 and his Ph.D. in mathematics from the Columbia University in 2008 under the direction of Shou-Wu Zhang.[4] His article "Big Line Bundles over Arithmetic Varieties," published in Inventiones Mathematicae, demonstrates a natural sufficient condition for when the orbit under the absolute Galois group is equidistributed.[5]
Career
He spent time at the Institute for Advanced Study, Princeton University, and Harvard University before joining the Berkeley faculty in 2012.[6]
Yuan was appointed a Clay Research Fellow for a three-year term from 2008 to 2013.[7] Together with a number of other collaborators, Yuan was profiled in Quanta Magazine and Business Insider for, among other things, his research on L-functions.[8][9]
Research
Together with Shou-Wu Zhang, Yuan proved the averaged Colmez conjecture which was later shown to imply the André–Oort conjecture for Siegel modular varieties by Jacob Tsimerman.[10][11]
Publications (selected)
- (with Tong Zhang) "Effective Bound of Linear Series on Arithmetic Surfaces", Duke Math. J. 162 (2013), no. 10, 1723–1770.
- "On Volumes of Arithmetic Line Bundles", Compositio Math. 145 (2009), 1447–1464.
- "Big Line Bundles over Arithmetic Varieties", Invent. Math. 173 (2008), no. 3, 603–649.
- (with Tong Zhang) "Relative Noether inequality on fibered surfaces", Advances in Mathematics 259 (2014), 89–115.
- (with Shou-Wu Zhang) "The arithmetic Hodge index theorem for adelic line bundles", Math. Ann. (2016), 1–49.
- (with Wei Zhang, Shou-Wu Zhang) "The Gross–Kohnen–Zagier theorem over totally real fields", Compositio Math. 145 (2009), no. 5, 1147–1162.
- (with Wei Zhang, Shou-Wu Zhang) "The Gross–Zagier formula on Shimura curves", Annals of Mathematics Studies vol. 184, Princeton University Press, 2012.
- (with Wei Zhang, Shou-Wu Zhang) "Triple product L-series and Gross–Kudla–Schoen cycles", preprint.
- Yuan, Xinyi; Zhang, Shou-Wu (2018). "On the averaged Colmez conjecture". Annals of Mathematics. 187 (2): 553–638. arXiv:1507.06903. doi:10.4007/annals.2018.187.2.4.
References
- "Xinyi Yuan". math.berkeley.edu. Retrieved 2020-11-14.
- "黄冈中学近14年来未出省状元 发展过程中矛盾凸显". Xinhua News Agency. 6 April 2015. Retrieved 3 August 2017.
- "Xinyi Yuan – Official IMO Results", International Mathematical Olympiad. Retrieved on 4 December 2016.
- "Xinyi Yuan CV", UC Berkeley. Retrieved on 3 December 2016.
- "Big line bundles over arithmetic varieties", Inventiones Mathematicae. Published September 2008. Retrieved on 4 December 2016.
- "IAS Member – Xinyi Yuan", Institute of Advanced Study. Retrieved on 4 December 2016.
- "Xinyi Yuan", Clay Mathematics Institute. Retrieved on 3 December 2016.
- "Math Quartet Joins Forces on Unified Theory", Quanta Magazine. Retrieved on 3 December 2016.
- "Math Quartet Joins Forces on Unified Theory", Business Insider. Retrieved on 4 December 2016.
- "February 2018". Notices of the American Mathematical Society. 65 (2): 191. 2018. ISSN 1088-9477.
- Yuan, Xinyi; Zhang, Shou-Wu (2018). "On the averaged Colmez conjecture". Annals of Mathematics. 187 (2): 553–638. arXiv:1507.06903. doi:10.4007/annals.2018.187.2.4.