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- Paper Publications more+
- [1] Shouwen Fang,郑涛.Diameter Estimate in Geometric Flows.MATHEMATICS,2023,11(22) [2] Shouwen Fang,郑涛.Diameter Estimate in Geometric Flows.MATHEMATICS,2023,11(22) [3] Shouwen Fang,于均伟,朱鹏.Evolution and monotonicity of a geometric constant under the Ricci flow.PURE AND APPLIED MATHEMATICS QUARTERLY,2021,17(1)385-400. [4] Shouwen Fang,郑涛.Isoperimetric inequality along the twisted Kahler-Ricci flow.DIFFERENTIAL GEOMETRY AND ITS APPLICATIONS,2018,5654-66. [5] Shouwen Fang,郑涛.The (logarithmic) Sobolev inequalities along geometric flow and applications.JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS,2016,434(1)729-764. [6] Shouwen Fang,杨飞,朱鹏.Eigenvalues of geometric operators related to the Witten Laplacian under the Ricci flow.Glasgow Mathematical Journal,2017,59(3)743-751. [7] Shouwen Fang,郑涛.An upper bound of the heat kernel along the harmonic-Ricci flow.MANUSCRIPTA MATHEMATICA,2016,151(1)1-2. [8] Shouwen Fang,朱鹏.DIFFERENTIAL HARNACK ESTIMATES FOR BACKWARD HEAT EQUATIONS WITH POTENTIALS UNDER GEOMETRIC FLOWS.COMMUNICATIONS ON PURE AND APPLIED ANALYSIS,2015,14(3)793-809. [9] Shouwen Fang,赵亮,朱鹏.Estimates and Monotonicity of the First Eigenvalues Under the Ricci Flow on Closed Surfaces.Commun. Math. Stat.,2016,4(2)217-228. [10] Shouwen Fang,Tosatti,V,Weinkove,郑涛.Inoue surfaces and the Chern-Ricci flow.JOURNAL OF FUNCTIONAL ANALYSIS,2016,271(11)3162-3185.
- Patents
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- Research Projects
- [1] 几何流下热方程的微分Harnack不等式及其应用,国家自然科学基金青年科学基金项目,方守文, [2] 关于完备流形上的若干几何流问题研究,校创新培育基金,方守文, [3] 几何流下热方程的微分Harnack不等式及其应用,校创新培育基金,方守文, [4] 关于几何流的若干研究,高校自然科学研究面上项目,方守文, [5] 和Hamilton的Ricci流相关的若干问题,国家自然科学基金天元基金,方守文,
