趙全庭,博士,華中師範大學數學與統計學學院師資博士後。
基本介紹
- 中文名:趙全庭
- 學位/學歷:博士
- 職業:教師
- 專業方向:復微分幾何與復代數幾何
- 任職院校:華中師範大學
研究方向,個人經歷,學術成果,
研究方向
復微分幾何與復代數幾何
個人經歷
教育經歷
2008.09 --- 2015.03 浙江大學 基礎數學 理學博士
工作經歷
2015.09 --- 華中師範大學數統學院師資博士後
學術成果
研究成果
1. Q. Zhao, S. Rao, Applications of deformation formula of holomorphic one-forms of Riemann surface, Pacific J. Math., Vol.266, No.1, 2013.
2. Q. Zhao, S. Rao, New proofs of Local Torelli Theorems of Riemann surfaces, Acta Mathematique Sinica, Chinese series, Vol.58, No.5, 2015.
3. Q. Zhao, S. Rao, Extension formulas and deformation invariance of Hodge numbers, to appear in C. R. Math. Acad. Sci. Paris, 2015.
4. S. Rao, Q. Zhao, Several special complex structures and their deformation properties, J Geom Anal, Vol.28, No.4, 2018, Page 2984–3047.
5. Q. Gao, Q. Zhao, X. Zheng, Y. Ling, Convergence of Numerov's method for inverse Sturm-Liouville problems, Appl. Math. Comput., Vol.293, 2017, Page 1-17.
6. Q. Gao; Q. Zhao, M. Chen, On a modified Numerov's method for inverse Sturm-Liouville problems, Internat. Jour. Comput. Math., Vol.95, No.2, 2018, Page 412-426.
7. S. Rao; X. Wan, Q. Zhao; On local stabilities of p-Kähler structures,to appear in Compostio Math, 2018.
8. S. Rao; X. Wan; Q. Zhao; Power series proofs for local stabilities of Kähler and balanced structures with mild ddbar-lemma, submitted.
