姓名:周胜林
性别:男
出生年月:1968.11
职称:教授
学院:理学院(数学)
研究方向:群与代数组合论
周胜林,男,1968年11月生,湖北罗田人,博士,教授,博士生导师。1999年6月于浙江大学数学系获理学博士学位。1999年7月至2007年10月在汕头大学任教,期间2004年10月至2006年10月在澳大利亚西澳大学(University of Western Australia)作公派访问学者两年。2004年11月被评为教授。2007年9月调入华南理工大学数学系工作,并入选华南理工大学“百人计划”杰出青年教师,2008年1月遴选为华南理工大学应用数学专业博士生导师。先后主持完成国家自然科学基金(数学天元基金)和广东省自然科学基金各1项,现正主持国家自然科学基金、教育部博士点基金、教育部留学回国基金各1项。主要研究方向为代数学、有限群论、组合设计,已在 J.Combin.Theory Series A, Discrete Math., Europ.J. Combin.,Designs Codes and Cryptography,数学学报等数学核心刊物发表论文20余篇,其中SCI收录10余篇。
近期发表的主要论文如下:1. Dong, Huili, Zhou, Shenglin, Alternating groups and flag-transitive 2-(v,k,4) symmetric designs. J. Combin. Des. 19 (2011), no. 6, 475–483.
2. Zhou, Shenglin, Tian, Delu, Flag-transitive point-primitive 2-(v,k,4) symmetric designs and two dimensional classical groups. Appl. Math. J. Chinese Univ. Ser. B 26 (2011), no. 3, 334–341.
3. Zhou Shenglin, Ma Yanbo; Fang Weidong,Line-primitive linear spaces with Fang-Li parameter gcd(k,r) at most 12. Acta Math. Sin. (Engl. Ser.) 27 (2011), no. 4, 657–670.
4. S. L.Zhou, H. L. Dong, Alternating groups and flag-transitive triplanes,Des. Codes Cryptogr. (2010) 57:117–126.
5. S. L. Zhou, H.L. Dong, Exceptional groups of Lie type and flag-transitive triplanes, Science in China, Series A, 2010 Vol. 53 No. 2: 447–456
6. Fang, W., Dong H. and Zhou, S., Flag-transitive 2-(v,k,4) symmetric designs. Ars Combin. 95 (2010), 333–342.
7.A. Betten, A. Delandtsheer, M. Law, A. C. Niemeyer, C. E. Praeger and S. L. Zhou, Finite line-transitive linear spaces: theory and search strategies, Acta Mathematica Sinica, English Series, 25(9),2009,1399-1436.
8.S. L. Zhou, H.L. Dong, Finite classical groups and flag-transitive triplanes, Discrete Math. ,2009 (16): 5183-5195.
9. S. L. Zhou, H.L. Dong, Sporadic simple groups and flag-transitive triplanes, Science China Mathematics, 52(2), 2009 :394-400.
10. G. G. Han, S. L. Zhou, Block-transitive 2-(v,k,1) Designs and the groups E_7(q), Ars Combinatoria, 2009, 93: 439-450.
11. Praeger C. E.; Zhou Shenglin, Classification of line-transitive point-imprimitive linear spaces with line size at most 12. Des. Codes Cryptogr. 47 (2008), no. 1-3, 99–111.
12. C E Praeger, S. L. Zhou, Imprimitive flag-transitive symmetric designs, Journal of Combinatorial Theory, Series A, Vol. 113(7),2006,1381-1395.
13. S. L. Zhou, Block primitive 2-(v, k,1) designs admitting a Ree simple group of characteristic two, Designs, Codes and Cryptography,36(2005), pp.159-169.
14 .W. Liu, S. Zhou, H. Li and X. Fang, Finite linear spaces admitting a Ree simple group, European J. Combin. 25(2004),311-325.
15 .S. Zhou, Block-primitive 2-(v, k, 1) designs adimtting a Ree simple groups, Europ. J. Combin., 23(2002), 1085-1090.
16. S. Zhou, H. Li, W. Liu, The Ree groups and 2-(v,k,1) block designs, Discrete Math., 224(2000), No. 1-3: 251-258.
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