师资队伍



个人简介:洪伟,博士,副教授。2023年博士毕业于天津大学,概率论与数理统计专业。已在Probab. Theory Related FieldsAnn. Appl. Probab.SIAM J. Math. Anal. J. Differential Equations Appl. Math. Optim.等国内外SCI杂志上发表论文十余篇,主要研究兴趣:随机 () 微分方程,McKean-Vlasov 方程,多尺度系统, 大 () 偏差原理。


E-mail address: weihong@jsnu.edu.cn


教育经历:

2020.09-2023.06:博士,天津大学,概率论与数理统计专业,导师:王凤雨 教授

2017.09-2020.06:硕士,江苏师范大学,统计学专业,导师:刘伟 教授

2013.09-2017.06:本科,江苏师范大学,数学与应用数学专业


工作经历:

2023.07-2024.01:讲师,江苏师范大学数学与统计学院

2024.01-至今: 副教授,江苏师范大学数学与统计学院


荣誉与获奖:

2023年  天津大学优秀博士论文

2023年  天津大学优秀毕业生

2022年  中国航天科技集团CASC奖学金

2021年  博士国家奖学金

2021年  天津大学学生科学奖(提名奖)

2021年  天津大学科技创新先进个人

2021年  江苏省优秀硕士论文


学术兼职:

美国《数学评论》评论员 (2022-至今)


学术论文:

1.  Hong, W., Li, S., Liu, W.(2020): Asymptotic Log-Harnack Inequality and Applications for SPDE with Degenerate Multiplicative Noise. Statistics and Probability Letters 164, 108810, 8 pp.


2.  Hong, W., Li, S., Liu, W.(2021): Asymptotic Log-Harnack Inequality and Applications for Stochastic 2D Hydrodynamical-Type Systems with Degenerate Noise. Journal of Evolution Equations 21, 419-440.


3.  Hong, W., Li, S., Liu, W.(2021): Well-Posedness and Exponential Mixing for Stochastic Magneto-Hydrodynamic Equations with Fractional Dissipations. Frontiers of Mathematics in China 16, 425-457.


4.  Hong, W., Li, S., Liu, W.(2021): Asymptotic Log-Harnack Inequality and Ergodicity for 3D Leray-α Model with Degenerate Type Noise. Potential Analysis 55, 477-490.


5.   Hong, W., Li, S., Liu, W. (2021): Large Deviation Principle for McKean-Vlasov Quasilinear Stochastic Evolution Equations. Applied Mathematics and Optimization 84, S1119-S1147.


6.   Hong, W., Li, S., Liu, W.(2021): Freidlin-Wentzell Type Large Deviation Principle for Multiscale Locally Monotone SPDEs.SIAM Journal on Mathematical Analysis 53, 6517-6561.


7.   Hong, W., Li, M., Li, S., Liu, W. (2022): Large Deviations and Averaging for StochasticTamed 3D Navier-Stokes Equations with Fast Oscillations. Applied Mathematics and Optimization 86, Paper No. 15, 54 pp.


8.   Hong, W., Li, S., Liu, W. (2022): Strong Convergence Rates in Averaging Principle for Slow-Fast McKean-Vlasov SPDEs. Journal of Differential Equations 316, 94-135.


9.   Gao, J., Hong, W., Liu, W. (2022): Distribution-Dependent Stochastic Porous Media Equations. Stochastics and Dynamics 22, Paper No. 2240026, 31 pp.


10.  Huang, X., Hong, W., Liu, W.(2023): Stochastic Integral Evolution Equations with Locally Monotone and Non-Lipschitz Coefficients. Frontiers of Mathematics18, 455-490.


11.  Gao, J., Hong, W., Liu, W.(2023): Small Noise Asymptotics of Multi-Scale McKean-Vlasov Stochastic Dynamical Systems. Journal of Differential Equations364, 521-575.


12.  Hong, W., Li, S., Liu, W., Sun, X. (2023): Central Limit Type Theorem and Large Deviation Principle for Multi-Scale McKean-Vlasov SDEs. Probability Theory and Related Fields 187133–201.


13.  Hong, W., Hu S., Liu, W. (2024):  McKean-Vlasov SDE and SPDE with Locally Monotone CoefficientsAnnals of Applied Probability, 34, no. 2, 2136-2189.

 

14.  Hong, W., Li, S., Sun, X. (2022): Diffusion Approximation for Multi-Scale McKean-Vlasov SDEs Through Different Methods, arXiv:2206.01928, submitted.


15.  Hong, W., Li, S., Liu, W. (2023): McKean-Vlasov Stochastic Partial Differential Equations: Existence, Uniqueness and Propagation of Chaos, arXiv:2306.15508submitted.


16.  Hong, W., Li, G., Li, S. (2023): Multi-Scale McKean-Vlasov SDEs: Moderate Deviation Principle in Different Regimes, arXiv:2306.11569submitted.


17. Hong, W., Liu, W., Yang, L. (2024): Large Deviation Principle for Multi-Scale Fully Local Monotone Stochastic Dynamical Systems with Multiplicative Noise,  arXiv:2402.18108, submitted.