Background
E Weinan was born in Jingjiang, China.
鄂维南
E Weinan was born in Jingjiang, China.
He completed his undergraduate studies in the Department of Mathematics at University of Science and Technology of China in 1982, and his master's degree in Academy of Mathematics and Systems Science at Chinese Academy of Sciences in 1985. He obtained his Ph.D. degree under the advice of Björn Engquist in the Department of Mathematics at University of California, Los Angeles in 1989.
He is known for his work in applied mathematics, with applications to fluid mechanics and material science. In addition, he has worked on multiscale modeling and the study of rare events. He has also made contributions to homogenization theory, theoretical models of turbulence, stochastic partial differential equations, electronic structure analysis, multiscale methods, computational fluid dynamics, and weak KAM theory.
He is currently a professor in the Department of Mathematics and Program in Applied and Computational Mathematics at Princeton University, and the Beijing International Center for Mathematical Research at Peking University. He then became a visiting member in Courant Institute, New York University from 1989 to 1991, and a member in Institute for Advanced Study from 1991 to 1992. After spending two more years as a long term member in Institute for Advanced Study, he joined Courant Institute, New York University as an associate professor in 1994, and became a full professor in 1997.
Since 1999, he has been holding a professorship in the Department of Mathematics and Program in Applied and Computational Mathematics at Princeton University. He has also been holding a professorship in the Beijing International Center for Mathematical Research (BICMR) since 2005. He has made contributions to homogenization theory, theoretical models of turbulence, stochastic partial differential equations, electronic structure analysis, multiscale methods, computational fluid dynamics, and weak KAM theory.
In the study of rare events, he and collaborators have developed the string method and transition path theory. In multiscale modeling, he and collaborators have developed the heterogeneous multiscale methods (HMM). He has also made significant contributions to the mathematical understanding of the microscopic foundation to the macroscopic theories for solids.
American Mathematical Society. Chinese Academy of Sciences.