个人简历
巩万中,男,汉族,安徽池州人,出生于1978年12月,ok138cn太阳集团古天乐副教授,硕士生导师,从事本科生、研究生的教学及科研工作。
研究方向
主要研究领域为泛函分析(Banach空间几何理论)。
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教育经历
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2001年本科毕业于安徽师范大学;
2005年硕士毕业于安徽师范大学,导师王建华教授;
2011年博士毕业于上海大学,导师石忠锐教授。
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科研论文
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近些年主要研究若干广义Orlicz空间中几何性质,主要成果如下:
(1) Gong, Wanzhong; Shi, Zhongrui, Drop properties and approximative compactness in Orlicz-Bochner function spaces. J. Math. Anal. Appl. 344 (2008) 748-756.
(2) Shi, Zhongrui; Gong, Wanzhong, Monotone points in Orlicz-Bochner functionspaces. Math. Appl. (Wuhan) 23 (2010) 376-383.
(3) Gong, Wanzhong; Shi, Zhongrui, Points of monotonicity in Orlicz-Lorentz function spaces. Nonlinear Anal. 73 (2010) 1300-1317.
(4) Gong, Wanzhong; Shi, Zhongrui, Monotone points in Orlicz-Bochner sequencespaces. Anal. Theory Appl. 28 (2012) 301-311.
(5) Gong, Wanzhong; Zhang, Daoxiang, Monotonicity in Orlicz-Lorentz Function Spaces with the Orlicz Norm, Math. Appl. (Wuhan) 29(2016) 514-524.
(6) Gong, Wanzhong; Zhang, Daoxiang, Monotonicity in Orlicz-Lorentz sequence spaces equipped with the Orlicz norm, Acta Math. Sci. Ser. B (Engl. Ed.) 36 (2016) 1577-1589.
(7) Gong, Wanzhong; Zhou, Chenghua; Dong, Xiaoli, Uniformly non-$l_n^{(1)}$, locally uniformly non-$l_n^{(1)}$ and non-$l_n^{(1)}$ properties in Orlicz-Bochner function spaces endowed with the Orlicz norm. J. Math. Anal. Appl. 462 (2018) 1283-1297.
(8) Zhou, Chenghua; Gong, Wanzhong; Zhang, Daoxiang, Some remarks on P-convexity and F-convexity. Math. Appl. (Wuhan) 31 (2018) 325-332.
(9) Zhou, Chenghua; Gong, Wanzhong; Zhang, Daoxiang, O-convexity of Orlicz-Bochner Spaces with Orlicz Norm. Communications in Mathematical Research 34 (2018) 261-277.
(10) Gong, Wanzhong; Dong, Xiaoli; Wang, Kangji, I-convexity and Q-convexity in Orlicz-Bochner function spaces equipped with the Luxemburg norm. Ann. Funct. Anal. 10 (2019) 81-96.
(11) Dong, Xiaoli; Gong, Wanzhong, Locally uniformly non-$l_n^{(1)}$ and non-$l_n^{(1)}$ properties in Orlicz-Bochner sequence spaces. Math. Appl. (Wuhan) 32 (2019) 358-369.
(12) Gong, Wanzhong; Dong, Xiaoli; Wang, Kangji, I-convexity and Q-convexity in Orlicz-Bochner function spaces endowed with the Orlicz norm. Math. Nachr. 292 (2019) 2369-2382.
(13) Wang, Kangji; Gong, Wanzhong, Non-$l_n^{(1)}$ Point and Uniformly Non-$l_n^{(1)}$ Point in Orlicz-Bochner Sequence Spaces, Math. Appl. (Wuhan) 33 (2020) 652-665.
(14) Gong, Wanzhong; Wang, Kangji, Non-$l_n^{(1)}$ point and uniformly non-$l_n^{(1)}$ point of Orlicz–Bochner function spaces, Banach J. Math. Anal. DOI 10.1007/s43037-020-00057-y.