胡澤軍

河南省光山縣人。1978.10—1982.7於江西大學數學專業讀本科，獲理學學士學位；1985.9—1988.7於鄭州大學基礎數學專業讀碩士研究生，獲理學碩士學位，隨後畢業留校工作。其間：1993.9—1996.7年於四川大學基礎數學專業讀博士，獲理學博士學位；1996.9—1998.7於杭州大學數學系做博士後；2002.1.10—2003.1.31獲國家留學基金委基金項目赴柏林工業大學（TU Berlin）訪問Udo Simon教授；2005.7.1-2006.1.31獲DAAD（德國學術交流中心）獎學金和TU Berlin經費資助赴柏林工業大學訪問並開展合作研究。先後五次訪問柏林工業大學。此外，還先後訪問過日本東北大學和佐賀大學，法國瓦朗西納大學（Université de Valenciennes），比利時天主教魯汶大學（KU Leuven）等。2005年5月至2019年9月間擔任鄭州大學數學系副主任（數學與統計學院副院長）。曾先後獲河南省優秀中青年骨幹教師（1998）、河南省跨世紀學術與技術帶頭人培養對象（1999）、河南省優秀教師（2004）、鄭州大學首屆“師德標兵”（2005）、鄭州大學“三育人”先進個人（2005、2013、2017）等榮譽稱號。2021年1月被河南省人力資源和社會保障廳認定為“河南省高層次（C類）人才。曾擔任第十二屆和第十三屆“中國數學會”理事（2015-2023）、國際數學期刊“Journal of Geometry”編委（2014--）和“JP Journal of Geometry and Topology”編委（2018--）、美國“Mathematical Reviews”評論員（2006--）。 ^[2] 

1996年獲四川大學基礎數學理學博士學位（導師李安民教授）。

1998年浙江大學博士後出站。現任職教授、博士生導師、數學系副主任。

美國數學會會員、美國“數學評論”評論員、河南省數學會理事。

解析幾何、微分幾何、仿射微分幾何、複流形幾何、微分流形、黎曼幾何等幾何學課程和其它公修課程。

微分幾何。

2002年1月至2003年1月在國家出國留學基金資助下赴德國柏林工業大學學習訪問。2005年7月至9月獲德國學術交流中心(DAAD)獎學金項目再次到柏林工業大學進行研究訪問。2006年以來曾應邀多次訪問德國柏林工業大學和日本東北大學。曾應邀在第四屆中日友好幾何會議(2008年12月22-27日於南開大學)和中國數學會2009年學術年會（2009年4月21-24日於廈門大學）上作邀請報告。

2007-2009年主持國家自然科學基金（現目編號10671181）、2000-2003年主持河南省傑出青年科學基金。 2004-2006年主持教育部留學回國人員科研啓動基金、1999-2001年主持河南省自然科學基金（項目編號994050200）。

2000-2002年參加國家自然科學基金（項目編號19971060）。 ^[1] 

主持國家自然科學基金面上項目：“超曲面的幾何與拓撲分類研究”（2011.1-2013.12；項目批准號11071225）、“典型黎曼流形與子流形的分類研究”（2014.1-2017.12；項目批准號11371330）、“黎曼流形與黎曼子流形的剛性與分類問題研究”（2018.1-2021.12；項目批准號11771404）、“黎曼流形及黎曼子流形的幾何與分類研究”（2022.1-2025.12；項目批准號12171437） ^[2] 

1． Hu Zejun, Li Haizhong, Simon Udo, Vrancken Luc，On locally strongly convex affine hypersurfaces with parallel cubic form, Part I, Differential Geometry and Its Applications, 27, 188–205, 2009.

2． Hu Zejun, Tian Xiaoli，On Moebius form and Moebius isoparametric hypersurfaces, Acta Mathematica Sinica, English Series, 25 (12), 2077–2092, 2009.

3． Hu Zejun, Zhai Shujie，Classification of Moebius isoparametric hypersurfaces in , Tohoku Mathematical Journal, 60, 499–526, 2008.

4． Feng Pinghua, Hu Zejun，An -estimate for surfaces of constant mean curvature in , Archiv der Mathematik, 91, 461–470, 2008.

5． Hu Zejun, Yang Fan，A new variational characterization of four-dimensional manifolds with constant scalar curvature, Results in Mathematics, 52, 315-321, 2008.

6． Hu Zejun, Li Haizhong and Vrancken Luc，Characterisations of the Calabi product of hyperbolic affine hyperspheres, Results in Mathematics, 52, 299-314, 2008.

7． Hu Zejun, Li Haizhong and Simon Udo，Schouten curvature functions on locally conformally flat Riemannian manifolds，Journal of Geometry, 88, 75-100, 2008.

8． Hu Zejun，Scherfner Mike and Zhai Shujie: On spacelike hypersurfaces with constant scalar curvature in the de Sitter space, Differential Geometry and Its Applications, 25, 594–611, 2007.

9． Hu Zejun and Li Deying, Moebius isoparametric hypersurfaces with three principal curvatures, Pacific Journal of Mathematics, 232 (2), 289-311, 2007.

10． Hu Zejun, Li Haizhong and Wang Changping, Classification of Moebius Isoparametric Hypersurfaces in , Monatshefte fuer Mathematik, 151, 201–222, 2007.

11． Hu Zejun and Zhai Shujie: Hypersurfaces of the hyperbolic space with constant scalar curvature，Results in Mathematics, 48, 65-88, 2005.

12． Hu Zejun and Zhao Guosong: Some remarks on the Kozlowski-Simon conjecture for affine ovaloids, Banach Center Publications, 69, 189-193, 2005.

13． Hu Zejun and Li Haizhong: Classification of Moebius isoparametric hypersurfaces in , Nagoya Mathematical Journal, 179, 147-162, 2005.

14． Hu Zejun and Li Haizhong: A rigidity theorem for hypersurfaces with positive Moebius Ricci curvature in, Tsukuba Journal of Mathematics, 29 (1), 29-47, 2005.

15． Hu Zejun and Li Haizhong：Classification of hypersurfaces with parallel Moebius second fundamental form in ，Science in China Ser. A Mathematics, 47 (3), 1-14, 2004.

16． Hu Zejun and Li Haizhong：Willmore Lagrangian spheres in the complex Euclidean space，Annals of Global Analysis and Geometry, 25 (1), 73-98, 2004.

17． Hu Zejun and Li Haizhong：A new variational characterization of n-dimensional space forms，Transactions of the American Mathematical Society, 356 (8), 3005-3023, 2004.

18． Hu Zejun and Li Haizhong：Scalar curvature, Killing vector fields and harmonic one-forms on compact Riemannian manifolds，Bulletin of the London Mathematical Society, 36 (5), 587-598, 2004.

19． Hu Zejun and Li Haizhong: Willmore submanifolds in a Riemannian manifold, Proceedings of the Workshop on Contemporary Geometry and Related Topics, pp. 251-275, Published by World Scientific, 2004.

20． Hu Zejun and Li Haizhong: Submanifolds with constant Moebius scalar curvature in S^n, Manuscripta Mathematica, 478 (3), 887-302, 2003.

21． Hu Zejun and Wei Guoxin: On the nonexistence of stable minimal submanifolds and the Lawson-Simons conjecture, Colloquium Mathematicum, 96 (5), 293-224, 2003.

22． Hu Zejun and Li Haizhong: Complete submanifolds with parallel mean curvature and finite total curvature, Geometry and Topology of Submanifolds X, eds. W.H.Chen et al.(pp.53-86), (2000).

23． Hu Zejun and Sun Zhenzu: A new interpretation for the B\"acklund transformation of the Sine-Gordon equation, Kodai Mathematical Journal, 23 (1), 100-104, (2000).

24． Hu Zejun: A Liouville theorem for a class of nonlinear elliptic equations, Acta Mat hematica Scientia, 20 (4), 474-479, 2000. (in Chinese)

25． Hu Zejun: Conformal deformations for prescribing Gaussian curvature on , Chinese Annals of Mathematics, 20 (5), 587-596, (1999). (in Chinese)

26． Hu Zejun: Isometric immersions from the hyperbolic space into , Colloquium Mathematicum, 79 (1), 17-23, (1999).

27． Hu Zejun: Conformal deformations for prescribing scalar curvature on Riemannian manifolds with negative curvature, Acta Mathematica Sinica, New series, 14 (3), 361-370, (1998).

28． Hu Zejun and Zhao Guosong: Classification of isometric immersions of the hyperbolic space into , Geometriae Dedicata, 65 (1), 47-57, (1997).

29． Hu Zejun and Zhao Guosong: Isometric immersions from the hyperbolic space into , Proceedings of the American Mathematical Society, 125 (9), 2693-2697, (1997).

30． Hu Zejun and Li Haizhong: A global pinching theorem for compact surfaces in with constant mean curvature, Acta Mathematica Sinica, New Series, 12 (2), 126-132, (1996).

31． Hu Zejun and Sun Zhenzu: Submanifolds in space forms with parallel mean curvature vector, Journal of Mathematical Research and Exposition, 16 (1), 69-75, (1996). (in Chinese)

32． Hu Zejun: Complete hypersurfaces with constant mean curvature and nonnegative sectional curvature, Proceedings of the American Mathematical Society, 123 (9), 2835-2840, (1995).

33.Qian Zhao, Xiuxiu Cheng and Zejun Hu,On flat elliptic centroaffine Tchebychev hypersurfaces,Journal of Geometry and Physics, 198 (2024), Art. 105131, 15 pp.

34.Qianshun Cui and Zejun Hu,Nonexistence of non-Hopf Ricci-semisymmetric real hypersurfaces in CP^2 and CH^2,Canadian Mathematical Bulletin, 67 (2024), no. 1, 188-200.

35.Mingzhu Gao, Zejun Hu and Cheng Xing,A rigidity theorem for hypersur- faces of the odd-dimensional unit sphere S^{2n+1}(1),Colloquium Mathematicum, 174 (2023),no. 2,151-160.

36.Qianshun Cui and Zejun Hu,On 2-Hopf hypersurfaces in nonflat complex planes,Mediterranean Journal of Mathematics, 20 (2023), no. 6. Article324. 17 pp.

37.Zejun Hu, Bingxin Xie and Shujie Zhai,Submanifolds with semi-parallel Moebius second fundamental form in the unit sphere,The Journal of Geometric Analysis,33 (2023),no. 12. Article378, 44 pp.

38.Zejun Hu and Xi Zhang,Real hypersurfaces of nonflat complex space forms with weakly transversal Killing operators,Differential Geometry and Its Applications,91 (2023), Article102061, 9 pp.

39.Xi Zhang, Dong Gao, Zejun Hu and Zeke Yao,On Hopf hypersurfaces of S^2*S^2 and H^2*H^2,Journal of Geometry and Physics,194 (2023), Article104996, 14 pp.

40.Zejun Hu and Cheng Xing,Locally conformally flat affine hyperspheres with parallel Ricci tensor,Journal of Mathematical Analysis and Applications,528 (2023),no. 1, Article127596, 11 pp.

41.Xiuxiu Cheng and Zejun Hu,On $C$-totally real submanifolds of S^{2n+1}(1) with non-negative sectional curvature,Kodai Mathematical Journal, 46 (2023), no.2, 184-206.

42.Zejun Hu and Hai Li,On the existence of solutions to the Orlicz Aleksandrov problem,Geometriae Dedicata,217 (2023),no. 3,Article 57, 11 pp.

43.Zejun Hu and Hai Li,On the existence of solutions to the Orlicz-Minkowski problem for torsional rigidity,Archiv der Mathematik,120 (2023),no. 5,543-555.

44.Hai Li and Zejun Hu,On the polar Orlicz-Minkowski type problem for the general mixed p-capacity,Journal of Mathematical Analysis and Applications, 522 (2023),no. 1,Article126925, 18 pp.

45.Dong Gao, Zejun Hu, Hui Ma and Zeke Yao,On real hypersurfaces of S2*S2,Proceedings of the American Mathematical Society,150 (2022), no. 10, 4447- 4461.

46.Zejun Hu, Meng Li and Cheng Xing,OnC-totally real minimal submanifolds of the Sasakian space forms with parallel Ricci tensor,Revista de la Real Academia de Ciencias Exactas, Fisicas y Naturales. Serie A. Matematicas,116 (2022), no. 4,Article163, 25 pp.

47.Zejun Hu and Hai Li,Inequalities on the(p,q)-mixed volume involvingLpcentroid bodies andLpintersection bodies,Filomat, 36 (2022), no.5, 1527-1538.

48.Xiuxiu Cheng, Zejun Hu and Cheng Xing,On centroaffine Tchebychev hypersurfaces with constant sectional curvature.Results in Mathematics, 77 (2022),no. 4,Article175, 29 pp.

49.Zeke Yao and Zejun Hu,On Hopf hypersurfaces of the homogeneous nearly KaehlerS3×S3, II.Manuscripta Mathematica,168 (2022), no. 3-4, 371–402.

50.Zejun Hu, Cece Li and Cheng Xing,On Lorentzian Einstein affine hyperspheres.Journal of Geometry and Physics,179 (2022),Article104587, 13 pp.

51.Zeke Yao, XiZhang and Zejun Hu,Hypersurfaces of the homogeneous nearly KaehlerS^3*S^3withP-invariant holomorphic distributions.The Journal of Geometric Analysis,32 (2022), no. 7,Article209, 16 pp.

52.Zeke Yao, Bangchao Yin and Zejun Hu,Non-existence of conformally flat real hypersurfaces in both the complex quadric and the complex hyperbolic quadric,Canadian Mathematical Bulletin,65 (2022), no. 1, 68-83.

53.Zejun Hu and Cheng Xing,New characterizations of the Whitney spheres and the contact Whitney sphere,Mediterranean Journal of Mathematics, 19 (2022), no. 2, Article 75, 14 pp.

54.Zejun Hu and Hai Li,On the Orlicz Minkowski problem for logarithmic capacity,Journal of Mathematical Analysis and Applications, 510 (2022),no. 1,Article126005, 16 pp.

55.Miroslava Antic, Zejun Hu, Marilena Moruz and Luc Vrancken,Surfaces of the nearly K\ahler S^3*S^3 preserved by the almost product structure,Mathematische Nachrichten, 294 (2021), no.12.2286-2301.

56.Xiuxiu Cheng, Zejun Hu and Luc Vrancken,Every centroaffine Tchebychev hyperovaloid is ellipsoid,Pacific Journal of Mathematics, 315 (2021), no. 1, 27-44.

57.Zejun Hu, Zeke Yao and Xi Zhang,On Hopf hypersurfaces of the complex quadric with recurrent Ricci tensor,Journal of Geometry, 112 (2021), no.3, Article48, 19 pp.

58.Xiuxiu Cheng, Huili He and Zejun Hu,C-totally real submanifolds with constant sectional curvature in the Sasakian space forms,Results in Mathematics,76 (2021),no. 3,Article 144, 16pp.

59.Zejun Hu and Cheng Xing,A new centroaffine characterization of the ellipsoids,Proceedings of the American Mathematical Society, 149 (2021), no. 8, 3531-3540.

60.Xiuxiu Cheng, Zejun Hu, Marilena Moruz and Luc Vrancken,On product minimal Lagrangian submanifolds in complex space forms,The Journal of Geometric Analysis, 31 (2021),no. 2,1934-1964.

61.Zejun Hu and Jiabin Yin,New characterizations of real hypersurfaces with isometric Reeb flow in the complex quadric,Colloquium Mathematicum，164 (2021),no. 2,211-219.

62.Zejun Hu and Cheng Xing,New equiaffine characterizations of the ellipsoids related to an equiaffine integral inequality on hyperovaloids,Mathematical Inequalities & Applications,24 (2021), no. 2, 337-350.

63.Zejun Hu, Marilena Moruz, Luc Vrancken and Zeke Yao,On the nonexistence and rigidity for hypersurfaces of the homogeneous nearly K\ahler S^3*S^3,Differential Geometry and Its Applications, 75 (2021), Article101717, 22pp.

64.Zejun Hu and Jiabin Yin,An optimal inequality related to characterizations of the contact Whitney spheres in Sasakian space forms,The Journal of Geometric Analysis, 30(2020),no. 4,3373-3397.

65.Xiuxiu Cheng, Zejun Hu, Marilena Moruz and Luc Vrancken,On product affine hyperspheres in R^{n+1},ScienceChinaMathematics, 63 (2020),no. 10,2055-2079.

66.Zejun Hu and Cheng Xing,On the Ricci curvature of $3$-submanifolds in the unit sphere,Archiv der Mathematik,115 (2020),no. 6,727-735.

67.Zejun Hu and ZekeYao,On Hopf hypersurfaces of the homogeneous nearly K\ahler S^3*S^3,Annali di Mathematica Pura ed Applicata,199 (2020),no. 3,1147-1170.

68.Zejun Hu, ZekeYao and Jiabin Yin,On Ricci curvature of Lagrangian submanifolds in the homogeneous nearly K\ahler S^6(1),Results in Mathematics, 75 (2020),no. 2,Article52, 7pp.

69.Zejun Hu, ZekeYao and Xi Zhang,Hypersurfaces of the homogeneous nearly K\ahler S^6 and S^3*S^3 with anticommutative structure tensors,Bulletin of the Belgian Mathematical Society – Simon Stevin, 25 (2019),no.4,535-549.

70.Zejun Hu, Jiabin Yin and Bangchao Yin,Rigidity theorems of Lagrangian submanifolds in the homogeneous nearly K\ahler S^6(1),Journal of Geometry and Physics,144 (2019), 199-208.

71.Zejun Hu and Jiabin Yin,Equivariant minimal immersions from S^3 into CP^3,Acta Mathematica Scientia, 39B(2019),no.4,1065-1080.

72.Xiuxiu Cheng, Zejun Hu and Zeke Yao,A rigidity theorem for centroaffine Tchebychev hyperovaloids,Colloquium Mathematicum, 157 (2019),no. 1,133-141.

73.Xiuxiu Cheng and Zejun Hu,Classification of locally strongly convex isotropic centroaffine hypersurfaces,Differential Geometry and Its Applications,65 (2019), 30-54.

74.Zejun Hu, Jiabin Yin and Zhenqi Li,Equivariant CR minimal immersions from S^3 into CP^n,Annals of Global Analysis and Geometry,54 (2018), no.1, 1-24.

75.Zejun Hu and Shujie Zhai,Submanifolds with parallel Moebius second fundamental form in the unit sphere,Results in Mathematics,73(2018),Article93, 46 pp.

76.Shujie Zhai, Xiuli Guo and Zejun Hu,Hypersurfaces in the unit sphere with parallel Moebius form and constant para-Blaschke eigenvalues,Turkish Journal of Mathematics，28 (2018),no. 3,1180-1192.

77.Xiuxiu Cheng and Zejun Hu,On the isolation phenomena of locally conformally flat manifolds with constant scalar curvature--Submanifolds versions,Journal of Mathematical Analysis and Applications,464 (2018), no.2, 1147-1157.

78.Zejun Hu, Dehe Li,On 3-dimensional homogeneous generalized $m$-quasi- Einstein manifolds,Kodai Mathematical Journal, 41 (2018),no. 1,42-51.

79.Zejun Hu, ZekeYao and Yinshan Zhang,On some hypersurfaces of the homogeneous nearly K\ahler S^3*S^3,Mathematische Nachrichten, 291 (2018),no. 2-3,343-373.

80.Xiuxiu Cheng, Zejun Hu, An-Min Li and Haizhong Li,On the isolation phenomena of Einstein manifolds --- submanifolds versions,Proceedings of the American Mathematical Society, 146 (2018),no.4,1731-1740.

81.Xiuxiu Cheng and Zejun Hu,An optimal inequality on locally strongly convex centroaffine hypersurfaces,The Journal of Geometric Analysis,28 (2018),no. 1,643-655.

82.Xiuxiu Cheng, Zejun Hu and Marilena Moruz,Classification of locally strongly convex centroaffine hypersurfaces with parallel cubic form,Results in Mathematics,72 (2017),no. 1-2,419–469.

83.Zejun Hu and Yinshan Zhang,On isotropic Lagrangian submanifolds in the homogeneous nearly K\ahler S^3*S^3,Science China Mathematics, 60 (2017),no. 4,671-684.

84.Zejun Hu, Haizhong Li and Luc Vrancken,On four-dimensional Einstein affine hyperspheres,Differential Geometry and Its Applications,50 (2017), 20-33.

85.Zejun Hu, Dehe Li and Shujie Zhai,On generalized m-quasi-Einstein manifolds with constant Ricci curvatures,Journal of Mathematical Analysis and Applications, 446(2017),no. 1,843-851.

86.Yinshan Zhang, Bart Dioos, Zejun Hu, Luc Vrancken and Xianfeng Wang,Lagrangian submanifolds in the 6-dimensional nearly K\ahler manifolds with parallel second fundamental form,Journal of Geometry and Physics,108 (2016), 21-37.

87.Zejun Hu and Yinshan Zhang,Rigidity of the almost complex surfaces in the nearly K\ahler S^3*S^3,Journal of Geometry and Physics,100(2016), 80-91.

88.Miroslava Antic, Zejun Hu, Cece Li and Vrancken Luc,Characterizations of the generalized Calabi composition of affine hyperspheres,Acta Mathematica Sinica, English Series,31 (2015),no.10,1531–1554.

89.Zejun Hu, Dehe Li and Jing Xu,On generalized m-quasi-Einstein manifolds with constant scalar curvature,Journal of Mathematical Analysis and Applications, 432(2015),no. 2,733-743.

90.Zejun Hu, Dongliang Lyu and Jing Wang,On rigidity phenomena of compact surfaces in homogeneous 3-manifolds,Proceedings of the American Mathematical Society, 143 (2015),no. 7,3097-3109.

91.Shujie Zhai, Zejun Hu and Changping Wang,On submanifolds with parallel Moebius second fundamental form in the unit sphere,International Journal of Mathematics, 25 (2014),no. 6, Article1450062,37pp.

92.Zejun Hu, Cece Li and Chuanjing Zhang,On quasi-umbilical locally strongly convex homogeneous affine hypersurfaces,Differential Geometry and Its Applications,33 (2014), 46-74.

93.Yawei Chu and Zejun Hu,Lower bounds estimates of the first eigenvalue for the f-Laplacian and their applications,The Quarterly Journal of Mathematics,64 (2013), 1023-1041.

94.Zejun Hu and Haifen Song,On Otsuki tori and their Willmore energy,Journal of Mathematical Analysis and Applications, 395 (2012), 465-472.

95.Zejun Hu, Haizhong Li and Luc Vrancken,Locally strongly convex affine hypersurfaces with parallel cubic form,Journal of Differential Geometry,87 (2011),no. 2,239–307.

96.Hu Zejun and Zhai Shujie,Moebius isoparametric hypersurfaces with three principal curvatures (II),Pacific Journal of Mathematics,249 (2011),no. 2,343-370.

97.Zejun Hu, Cece Li and Dong Zhang,A differential geometric characterization of the Cayley hypersurface,Proceedings of the American Mathematical Society,139 (2011),no. 10,3697-3706.

98.Zejun Hu and Cece Li,The classification of 3-dimensional Lorentzian affine hypersurfaces with parallel cubic form,Differential Geometry and Its Applications,29 (2011),no. 3,361-373.

99.Zejun Hu, Xingxiao Li and Shujie Zhai,On the Blaschke isoparametric hypersurfaces in the unit sphere with three distinct Blaschke eigenvalues,Science China Mathematics,54(2011),no. 10,2171-2194.

100.Zejun Hu, Cece Li, Haizhong Li and Luc Vrancken,The classification of 4-dimensional non-degeneratehypersurfaces with parallel cubic form,Journal of Geometry and Physics,61(2011),no. 11,2035-2057.

101.Zejun Hu, Cece Li, Haizhong Li and Luc Vrancken,Lorentzian affine hypersurfaces with parallel cubic form,Results in Mathematics,59(2011),no. 3-4,577-620.

102.Zejun Hu, Seiki Nishikawa and Udo Simon，Critical metrics of the Schouten functional，Journal of Geometry, 98 (2010),no. 1-2,91–113.

103.胡澤軍:一類非線性橢圓型方程的一個Liouville定理，數學物理學報，20A(2000),no. 4,474-479.

104.胡澤軍:負曲率流形上給定數量曲率的共形形變，數學學報，42(1999),no. 2,207-214.

105.胡澤軍:雙曲空間H^2(-1)上預定高斯曲率的共形形變，數學年刊，20A(1999),no. 5,587-596.

106.胡澤軍，孫振祖:常曲率空間中具平行平均曲率向量的子流形，數學研究與評論，16(1996),no. 1,69-75. ^[2] 

Global affine differential geometry of hypersurfaces(作者：An-Min Li, Udo Simon, Guosong Zhao and Zejun Hu), de Gruyter Expositions in Mathematics 11, 2ndrevised and extended edition, 367 pages. 2015年由德國De Gruyter出版社出版。 ^[2] 

曾獲河南省自然科學優秀學術論文獎一等獎2次和二等獎3次，河南省教育廳自然科學優秀學術論文獎一等獎3次和二等獎一次。

為河南省優秀中青年骨幹教師（1998），河南省跨世紀學術與技術帶頭人培養對象（1999），河南省優秀教師（2004），鄭州大學“三育人”先進個人和“師德標兵”（2005）。