单纯觉得一个人要教书做学问还要同时跟这么多女人纠缠真是好难。奇才
baby.chen 发表于 12/3/2019 6:29:09 PM [url=http://forums.huaren.us/showtopic.aspx?topicid=2479020&postid=82033593#82033593][/url]
真的是精力充沛
![[em58]](https://emojis.huaren.us/static/emojis/v1/yoci/em58.gif)
Renjie Feng
University of Science and Technology of China, Bachelor, 2002-2006
Johns Hopkins University, Master, 2006-2009
Northwestern University, Ph. D (advisor: [url=http://www.math.northwestern.edu/~zelditch/]S. Zelditch[/url]), 2009-2012
McGill University, postdoc, 2012-2013
Maryland University College Park, Brin postdoc, 2013-2015
BICMR, Peking University, assistant professor, 2015-
Recent research
For the last two years, I am interested in the following three topics,
1. SYK model:
With [url=http://tian.bicmr.pku.edu.cn/index.htm]Gang Tian[/url] and Dongyi Wei, we have three papers on the global distribution of eigenvalues of SYK model such as the global density of eigenvalues, the central limit theorem and the concentration of measure theorem. The SYK model a random matrix model which is a simple model of the black hole and it's very topical in physics recently, and it's also a quantum spin glass model. There are still many interesting open problems in this new emerging area, such as the behaviors of partition function (recall the Parisi formula in the spin glass) and the largest eigenvalue.
2. Random matrices:
a. We study the smallest gaps for the circular beta-ensemble and GOE, and largest gaps for CUE and GUE, in all cases, we proved that the extreme gaps are asymptotic to the Poisson distribution after rescaling, as a consequence, we derived the rescaling limits of extreme gaps.
b. We derive the Berry-Esseen theorem for the number counting function of circular beta-ensemble, which implies the central limit theorem of number of points in arcs. We also derived the uniform bound for the variance.
3. Random waves:
With [url=http://webee.technion.ac.il/Sites/People/adler/]R. Adler[/url], we get an explicit formula for the supremum of random spherical harmonics by Weyl's tube formula, where we proved that unexpectedly the critical radius of the embedding/immersion of the sphere to higher dimensional sphere by the spherical harmonics has an explicit limit given by the Bessel function, although the image become more and more twisted. The result is universal, i.e., true for more general Riemannian manifolds with assumptions.
Random matrix theory
1.[url=https://arxiv.org/abs/1807.02149]Large gaps of CUE and GUE[/url] (with D. Wei)
2.[url=https://arxiv.org/abs/1806.01555]Small gaps of circular beta-ensemble[/url](with D. Wei)
3.[url=http://bicmr.pku.edu.cn/~renjie/small%20gaps%20of%20GOE_final_revision.pdf]Small gaps of GOE[/url] (with G. Tian and D. Wei), to appear in GAFA
4.[url=https://arxiv.org/abs/1905.09448]Normality of circular beta-ensemble[/url](with G. Tian and D. Wei)
5.[url=https://arxiv.org/abs/1801.10073]Spectrum of SYK model[/url] (with G. Tian and D. Wei), Peking Mathematical J (2019) 2:41-70.
6.[url=https://arxiv.org/abs/1806.05714]Spectrum of SYK model II: Central limit theorem [/url](with G. Tian and D.Wei)
7.[url=https://arxiv.org/abs/1806.04701]Spectrum of SYK model III: Large deviations and concentration of measures[/url](with G. Tian and D. Wei), to appear in Random matrices: Theory and Applications.
Random geometry
1.[url=https://arxiv.org/abs/1702.02767]Critical radius and supremum of random spherical harmonics[/url] (with R. Adler), Annals of Probability, 2019, Vol.47, No.2, 1162-1184.
2.[url=https://arxiv.org/abs/1709.00691]Critical radius and supremum of random spherical harmonics II[/url]
(with X. Xu and R. Adler), Electronic Communications in Probability, Volume 23 (2018), paper no. 50, 11 pp.
3.[url=https://arxiv.org/abs/1009.5142]Large deviations for zeros of P(\phi)_2 random polynomials[/url](with S. Zelditch), J. Stat. Phys (2011) 143: 619-635.
4.[url=https://arxiv.org/abs/1212.4762]Critical values of random analytic functions on complex manifolds[/url]
(with S. Zelditch), Indiana Univ. Math. J.63. (2014). no.3.,651-686.
5.[url=https://arxiv.org/abs/1303.4096]Median and mean of the Supremum of L^2 normalized random [/url]
[url=https://arxiv.org/abs/1303.4096]holomorphic fields[/url] (with S. Zelditch), J. Funct. Anal. 266 (2014), no. 8, 5085-5107.
6.[url=https://arxiv.org/abs/1112.3993]Random Riesz energies on compact Kahler manifolds[/url](with S. Zelditch), Trans. Amer. Math. Soc., Vol 365, no. 10, 5579-5604, (2013).
7.[url=https://arxiv.org/abs/1210.4829]Critical values of Gaussian SU(2) random polynomials[/url](with Z. Wang), Proceeding of AMS, Vol 144, no 2, 2016, 487-502.
8.[url=https://arxiv.org/abs/1604.07693]Correlations between zeros and critical points of random analytic[/url][url=https://arxiv.org/abs/1604.07693]functions[/url], Trans. Amer. Math. Soc.371 (2019), no. 8, 5247-5265.
9.[url=https://arxiv.org/abs/1511.02383]Conditional expectations of random holomorphic fields on Riemann surfaces[/url], IMRN, Volume 2017, Issue 14, 4406-4434.
10. [url=https://arxiv.org/abs/1908.00730]Zeros of repeated derivatives of random polynomials[/url] (with D. Yao), Anal. PDE 12 (2019), no. 6, 1489-1512.
Geometric analysis and PDEs
1.[url=https://arxiv.org/abs/1101.5133]Periodic solutions of Abreu's equation[/url] (with G. Szekelyhidi), Math. Res. Lett. 18 (2011), no. 6, 1271-1279.
2.[url=https://arxiv.org/abs/1210.2190]The global convergence of the Calabi flow on Abelian varieties[/url]
(with H. Huang), J. Funct. Anal. 263 (2012), no. 4, 1129-1146.
3.[url=https://arxiv.org/abs/0910.2311]Bergman metrics and geodesics in the space of Kahler metrics on[/url]
[url=https://arxiv.org/abs/0910.2311]principally polarized Abelian varieties[/url], Journal of the Institute of Mathematics of Jussieu (2012) Volume 11, Issue 01, 1-25.
4.[url=https://arxiv.org/abs/0809.2436]Szasz analytic functions and noncompact Kahler toric manifolds[/url],
Journal of Geometric Analysis (2012), Volume 22, Number 1, 107-131.
Email: [email][email protected][/email]