荆文甲 - 清华大学 - 丘成桐数学科学中心

个人简介

教育背景 2002-2006 学士北京大学 2006-2011 博士美国哥伦比亚大学工作经历 2022/12 至今副教授清华大学丘成桐数学科学中心 2016-2022/12 助理教授清华大学丘成桐数学科学中心 2013-2016 Dickson Instructor 美国芝加哥大学 2011-2013 博士后法国巴黎高等师范学院 Grant and Awards Invited speaker (45 minutes talk) in the 9th ICCM, 2022 NSFC Grant 11871300 (co PI), 2019–2022 The Recruitment Program of Global Experts of China, 2019–2021 NSFC Grant 11701314 (Principal Investigator), 2018–2020 NSF Grant DMS-1515150 (Principal Investigator), 2015–2016 Invited speaker (45 minutes talk) in the 8th ICCM, 2019 ICCM distinguished paper award, 2017 Invited speaker (45 minutes talk) in the 7th ICCM, 2016

研究领域

Analysis and Partial Differential Equations, Stochastic Homogenization and Quantitative Estimates, Waves Propagation in Random Media, and other Applied Analysis.

近期论文

查看导师最新文章（温馨提示：请注意重名现象，建议点开原文通过作者单位确认）

W. Jing and Y. Zhang. On the periodic homogenization of elliptic equations in non-divergence form with large drifts. arXiv:2302.01157, Multiscale Modeling & Simulations, to appear. X. Fu and W. Jing. Uniform convergence for linear elastostatic systems with periodic high contrast inclusions. arXiv:2207.05367, Preprint (2022), submitted. W. Jing, H. V. Tran and Y. Yu. Effective fronts of polygon shapes in two dimensions. arXiv:2112.10747, SIAM J. Math. Anal., to appear. W. Jing, Convergence rate for the homogenization of stationary diffusions in dilutely perforated domains with reflecting boundaries. arXiv:2108.08533, Minimax Theory Appl., 8 (2023), no.1, 85–108. W. Jing, Y. Lu and C. Prange. Stokes potentials and applications in homogenization problems in perforated domains, Preprint (2021), submitted. F. Feppon and W. Jing, High order homogenized Stokes models capture all three regimes. SIAM J. Math. Anal., 54 (2022), no.4, 5013–5040. W. Jing, Layer potentials for Lam′e systems and homogenization of perforated elastic medium with clamped holes. arXiv:2007.03333, Calculus of Variations & PDEs., 60 (2021), Paper No.2. W. Jing, H. V. Tran and Y. Yu. Effective fronts of polytope shapes. arXiv:1909.11067, Minimax Theory Appl., 5 (2020), no.2, 347—360. W. Jing, H. Mitake and H. V. Tran. Generalized ergodic problems: existence and uniqueness structures of solutions. arXiv:1902.05034, Journal of Differential Equations, 268 (2020), no. 6, 2886–2909. W. Jing. A unified homogenization approach for the Dirichlet problem in perforated domains. arXiv:1901.08251, SIAM J. Math. Anal., 52 (2020), no.2, 1192–1220. W. Jing, O. Pinaud. A backscattering model based on corrector theory of homogenization for the random Helmholtz equation. DCDS-B, 24 (2019), no. 10, 5377–5407. W. Jing, H. V. Tran and Y. Yu. Inverse problems, non-roundedness and flat pieces of the effective burning velocity from an inviscid quadratic Hamilton-Jacobi model. Nonlinearity, 30 (2017), no. 5, 1853–1875.. W. Jing, P. E. Souganidis and H. V. Tran. Stochastic homogenization of viscous superquadratic Hamilton-Jacobi equations in dynamic random environment. Research Math. Sci., 4 (2017), Paper No. 6, 20pp. W. Jing, P. E. Souganidis and H. V. Tran. Homogenization of interfaces moving in spatially random temporally periodic environment. Preprint 2016, mathscidoc:1806.03001, G. Bal and W. Jing, Fluctuations in the homogenization of semilinear equations with random potential. Comm. Partial Differential Equations, 41 (2016), no. 12, 1839–1859.