| Quantitative estimates of propagation of chaos for stochastic systems with kernels PE Jabin, Z Wang Inventiones mathematicae 214, 523-591, 2018 | 182 | 2018 |
| Mean Field Limit for Stochastic Particle Systems PE Jabin, Z Wang Active Particles: Theory, Models, Applications 1 (Modelling and Simulation …, 2016 | 155 | 2016 |
| Mean Field Limit and Propagation of Chaos for Vlasov Systems with Bounded Forces PE Jabin, Z Wang Journal of Functional Analysis 271, 3588-3627, 2016 | 117 | 2016 |
| On Mean Field Limit and Quantitative Estimates with a Large Class of Singular Kernels: Application to the Patlak-Keller-Segel Model D Bresch, PE Jabin, Z Wang Comptes Rendus Mathematique 357 (9), 708-720, 2019 | 67 | 2019 |
| Mean-field limit and quantitative estimates with singular attractive kernels D Bresch, PE Jabin, Z Wang Duke Mathematical Journal, 2023 | 52 | 2023 |
| Modulated Free Energy and Mean Field Limit D Bresch, PE Jabin, Z Wang Séminaire Laurent Schwartz—EDP et applications, 2019 | 27 | 2019 |
| Gaussian fluctuations for interacting particle systems with singular kernels Z Wang, X Zhao, R Zhu Archive for Rational Mechanics and Analysis, 2023 | 17 | 2023 |
| Sinkhorn barycenter via functional gradient descent Z Shen, Z Wang, A Ribeiro, H Hassani Advances in Neural Information Processing Systems 33, 986-996, 2020 | 16 | 2020 |
| Sinkhorn natural gradient for generative models Z Shen, Z Wang, A Ribeiro, H Hassani Advances in Neural Information Processing Systems 33, 1646-1656, 2020 | 13 | 2020 |
| Self-Consistency of the Fokker-Planck Equation Z Shen, Z Wang, S Kale, A Ribeiro, A Karbasi, H Hassani COLT 2022, 2022 | 8 | 2022 |
| Uniqueness of Bounded Solutions for the Homogeneous Relativistic Landau Equation with Coulomb Interactions RM Strain, Z Wang Quarterly of Applied Mathematics 78, 107-145, 2019 | 8 | 2019 |
| Quantitative Propagation of Chaos for 2D Viscous Vortex Model on the Whole Space X Feng, Z Wang https://arxiv.org/abs/2310.05156, 2023 | 5 | 2023 |
| Mean-field limit of non-exchangeable interacting diffusions with singular kernels Z Wang, X Zhao, R Zhu https://arxiv.org/abs/2209.14002, 2022 | 3 | 2022 |
| Entropy-Dissipation Informed Neural Network for McKean-Vlasov type PDEs Z Shen, Z Wang | 2 | 2023 |
| Mean field limit for stochastic particle systems with singular forces Z Wang University of Maryland, College Park, 2017 | 2 | 2017 |
| Limites de champ moyen pour des noyaux singuliers et applications au modèle de Patlak–Keller–Segel D Bresch, PE Jabin, Z Wang Comptes Rendus Mathematique 357 (9), 708-720, 2019 | 1 | 2019 |
| Large stochastic systems of interacting particles PE Jabin, D Bresch, Z Wang PROCEEDINGS OF SIMAI 2020+ 21, 2021 | | 2021 |
| Topics in Analysis of Many Particle Systems Z Wang | | 2020 |
| Quantitative methods for the mean field limit problem Z Wang International Workshop on Interacting Particle Systems, 2020 | | 2020 |
didier breschVerified email at univ-smb.fr
