2006.03-2009.03 于浙江大学理学院攻读理学博士学位；

2003.09-2006.02 于南京航空航天大学理学院攻读理学硕士学位；

1999.09-2003.07 于安徽理工大学数学系攻读理学学士学位。

2014.07-至今 扬州大学数学科学学院副教授； 2014.09-2015.03 美国西北大学数学系访问学者； 2009.06-2014.06 扬州大学数学科学学院讲师；

科研与人才项目：

1. 主持国家自然科学青年基金项目(11401514)：几何流下热方程的微分Harnack不等式及其应用；

2. 主持江苏省高校自然科学研究面上项目(13KJB110029)：关于几何流的若干研究；

3. 主持国家自然科学基金项目数学天元基金(11026117)：和Hamilton的Ricci流相关的若干问题；

4. 主持扬大科技培育基金两项(2011CXJ004和2013CXJ001)。

1. Shouwen Fang, Tao Zheng, The (logarithmic) Sobolev inequalities along geometric flow and applications, J. Math. Anal. Appl., 434(1), 2016, 729-764.

2. Fang Shouwen, Xu Haifeng, Zhu Peng, Evolution and monotonicity of eigenvalues under the Ricci flow, Sci. China Math., 58(8), 2015, 1737-1744.

3. Shouwen Fang and Peng Zhu，Differential Harnack estimates for backward heat equations with potentials under geometric flows, Commun. Pure Appl. Anal., 14(3), 2015,793-809.

4. Peng Zhu, Shouwen Fang, Finiteness of non-parabolic ends on submanifolds in spheres，Ann. Global Anal. Geom.，46(2), 2014, 187-196.

5. Peng Zhu, Shouwen Fang, A gap theorem on submanifolds with finite total curvature in spheres, J. Math. Anal. Appl., 413(1), 2014, 195-201.

6. Shouwen Fang, Differential Harnack estimates for backward heat equations with potentials under an extended Ricci flow, Advances in Geometry, 13(4), 2013, 741-755.

7. Shouwen Fang, Differential Harnack inequalities for heat equations with potentials under geometric flows, Arch. Math., 100(2), 2013, 179–189.

8. Shouwen Fang, Differential Harnack inequalities for heat equations with potentials under the Bernhard List's flow, Geom. Dedicata, 161(1), 2012, 11-22.

9. 方守文, 叶斐, Kähler-Ricci流下带有位能的热方程的微分Harnack不等式, 数学学报, 53(3), 2010, 597-606.

10. Fang Shouwen, Harnack estimates for curvature flows depending on mean curvature, Appl. Math. J. Chinese Univ. B, 24(3), 2009, 361-369.

11．Shouwen Fang, Local Harnack estimate for Yamabe flow on locally conformally flat manifolds, Asian J. Math., 12(4), 2008, 545-552获奖和荣誉：