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Hello! I'm Hong Wang. I did my PhD with Prof. Larry Guth at MIT in 2019. I'm interested in Fourier analysis and related problems. For example, if we know that the Fourier transform of a function...
Hong Wang. NYU Courant. Verified email at nyu.edu. Fourier analysis geometric measure theory. Articles Cited by Public access. Title. Sort. Sort by citations Sort by year Sort by title. Cited by. Cited by. Year; On Falconer’s distance set problem in the plane. L Guth, A Iosevich, Y Ou, H Wang. Inventiones mathematicae 219 (3), 779-830, 2020. 138: 2020: Weighted restriction estimates and application to Falconer distance set problem.
Sep 9, 2021 · MIT mathematicians Yilin Wang and Hong Wang PhD ’19 will each receive the 2021 Maryam Mirzakhani New Frontiers Prize, a $50,000 award that recognizes outstanding early-career women in mathematics.
Professor (Em) Hong Wang (Fellow of IET, InstMC, IEEE, AAIA) Oak Ridge National Laboratory (Corporate Fellow Grade),
XZH-5 inhibits STAT3 phosphorylation and enhances the cytotoxicity of chemotherapeutic drugs in human breast and pancreatic cancer cells. A Liu, Y Liu, Z Jin, Q Hu, L Lin, D Jou, J Yang, Z Xu, H...
Sep 9, 2021 · UCLA Mathematics Assistant Professor Hong Wang was awarded the 2022 Maryam Mirzakhani New Frontiers Prize today for her “advances on the restriction conjecture, the local smoothing conjecture and related problems.”
Mar 2, 2023 · We will survey some classical and recent projection theorems and discuss their applications. This is based on joint works with Gan, Guo, Guth, Harris, Maldague, Orponen, and Shmerkin, Workshop on...
Sep 9, 2021 · Hong Wang, who joined UCLA as an assistant professor of mathematics in July, was awarded a 2022 Maryam Mirzakhani New Frontiers Prize, presented to exceptional young women mathematicians.
Laureates. Hong Wang. University of California, Los Angeles (PhD MIT 2019) 2022 Maryam Mirzakhani New Frontiers Prize. For advances on the restriction conjecture, the local smoothing conjecture, and related problems.
Hong Wang is interested in Fourier analysis and related problems. For example, if we know that the Fourier transform of a function is supported on some curved objects, a sphere, or some “curved” collection of discrete points, what can we say about this function?
