I am now a Tenure Track Assistant Professor at Beijing International Center for Mathematical Research (BICMR) , Peking University. I was a Hans Rademacher Instructor of Mathematics at Department of Mathematics , University of Pennsylvania from July 2017 to June 2020. From Sep. 2012 - May 2017, I completed a PhD in Mathematics at Department of Mathematics , University of Maryland, College Park, under the supervision of Prof. Pierre-Emmanuel Jabin. Email: zwang@bicmr.pku.edu.cn Mail: Beijing Internatinoal Center for Mathematical Research, Peking University, 5 Yiheyuan Road, Beijing 100871. 地址：100871北京市海淀区颐和园路5号北京大学北京国际数学中心 Office: 镜春园79号院79106 Office Phone Number: TBA. |

My Research YouTube Channel . Summer Course on Mean Field Limit .

- With P.E. Jabin, Mean Field Limit and Propagation of Chaos for Vlasov Systems with Bounded Forces. J. Funct. Anal. 271 (2016) 3588-3627. [Journal] or [arXiv]
- With P.E. Jabin, Mean Field Limit for Stochastic Particle Systems. In Active Particles, Volume 1: Theory, Models, Applications, Birkhauser-Springer (Boston), series Modelling and Simulation in Science Engineering and Technology. (2017) [Link] or [PDF]
- With P.E. Jabin, Quantitative estimates of propagation of chaos for stochastic systems with $W^{-1,\infty}$ kernel. Invent. Math. (2018). [Journal] or [arXiv] (This paper has been presented by Prof. Laure Saint-Raymond in the Bourbaki Seminar. See [Article] and [YouTube]. )
- With R. M. Strain, Uniqueness of Bounded Solutions for the Homogeneous Relativistic Landau Equation with Coulomb Interactions. Quart. Appl. Math. (2019). [Journal] or [arXiv]
- With D. Bresch and P.E. Jabin, On Mean Field Limit and Quantitative Estimates with a Large Class of Singular Kernels: Application to the Patlak-Keller-Segel Model. C.R. Acd. Sci. (2019). [Journal] or [arXiv]
- With D. Bresch and P.E. Jabin, Modulated Free Energy and Mean Field Limit. In Séminaire Laurent Schwartz — EDP et applications. (2019-2020), Talk no.2, 22 p. [arXiv]
- With D. Bresch and P.E. Jabin, Mean Field Limit and Quantitative Estimates with a Large Class of Singular Kernels. In preparation.
- With Z. Shen, A. Ribeiro and H. Hassani, Sinkhorn Barycenter via Functional Gradient Descent. NeurIPS 2020.
- With Z. Shen, A. Ribeiro and H. Hassani, Sinkhorn Natural Gradient for Generative Models. NeurIPS 2020.

We have not succeeded in answering all our problems. The answers we have found only serve to raise a whole set of new questions. In some ways we feel we are as confused as ever, but we believe we are confused on a higher level and about more important things.

Last Updated at July, 2018.