团队: 分析和几何
邮箱: ejfu@bimsa.cn
研究方向: 分析
个人简介
2019年在Yuan Pin Lee和Herb Clemens的指导下获得了犹他大学的博士学位;后于清华大学丘成桐数学科学中心做博士后。2022年12月加入北京雁栖湖应用数学研究院任助理研究员。目前研究Darboux Treibich Verdier算子的谱和相关问题。
研究兴趣
- Spectrum of Darboux-Treibich-Verdier potential and related topics
教育经历
- 2013 - 2019 University of Utah Mathematics 博士
- 2010 - 2013 Tsinghua University Mathematics 硕士
- 2006 - 2010 East China Normal University Mathematics 学士
工作经历
- 2022 - Beijing Institute of Mathematical Sciences and Applications Assistant Professor
- 2019 - 2022 Tsinghua University Postdoc.
出版物
- [1] Z. Chen, E. Fu and C.-S. Lin, Green functions, Hitchin's formula and curvature equations on tori (2026)
- [2] Z. Chen, E. Fu and C.-S. Lin, Green functions, Hitchin's formula and curvature equations on tori II: Rectangular torus (2026)
- [3] E. Fu and C.-S. Lin, Monodromy of generalized Lam\'e equations with apparent parameters, I (2026)
- [4] E. Fu and C.-S. Lin, Classification of spherical metrics on tori with four half periods as conic singularities, I (2026)
- [5] Z. Chen, E. Fu and C.-S. Lin, Generic non-degeneracy of critical points of multiple Green functions on torus and applications to curvature equations, J. Reine Angew. Math. (Crelle's Journal), 2026(831), 213--232 (2025)
- [6] E. Fu, Spectrum of the Lamé operator along Reτ = 1/2: The genus 3 case, J. Differ. Equ., 414, 310-347 (2025)
- [7] E. Fu, Deformation of the Spectrum for Darboux-Treibich-Verdier potential along Reτ = 1/2, J. Spectr. Theory, 13, 347–381 (2023)
- [8] Z. Chen, E. Fu and C.-S. Lin, A necessary and sufficient condition for the Darboux-Treibich-Verdier potential with its spectrum contained in R, Amer. J. Math., 144(3), 851–872 (2022)
- [9] E. Fu, Spectrum of the Lamé operator and application, I: Deformation along Reτ = 1/2, Adv. Math., 383(107699) (2021)
更新时间: 2026-03-11 11:00:09