Huhe Han

　　 　　

Name: Huhe Han, College of Science, Northwest A&F University

Nationality: Chinese

Working Address: No.22 Xinong Road, Yangling, Shaanxi, 712100, P.R. China

E-mail: E-mail： han-huhe@nwafu.edu.cn

Education Background

Mar., 2017    Doctor’s degree in Yokohama National University

Nov., 2019-Aug., 2020 A visiting research fellow in Yokohama National University, Japan

Courses Offered

Ÿ Advanced Mathematics I

Ÿ Advanced Mathematics II

Ÿ Space Analytic Geometry

Ÿ Function of Complex Variable

Research Areas

Ÿ Covnex Geometry

Ÿ Wulff Shapes and Their Duals

Papers

[1] Batista, E. B., Han Huhe and Nishimura, T. Stability of convex integrands[J].Kyushu Journal of Mathematics, 71 (2017):187-196.

[2] Han Huhe and Nishimura, T. Strictly convex Wulff shapes and C^1 convex integrands[J]. Proc. of the AMS, 145 (2017):3997-4008.

[3] Han Huhe and Nishimura, T., Self-dual Wulff shapes and spherical convex bodies of constant width[J]. J. Math.Soc. Japan, 69 (2017):1475-1484.

[4]Han Huhe and Nishimura, T. Limit of the Hausdorff distance for one- parameter families of Wulff shapes constructed by affine perturbations of dual Wulff shapes[J]. Methods and Applications of Analysis, 25 (2018):277-290.

[5]Han Huhe and Nishimura, T. Spherical method for studying Wulff shapes and related topics[J]. Advanced Studies in Pure Mathematics, 78 (2018): 1-53.

[6]Han Huhe and Nishimura, T. The spherical dual transform is an isometry for spherical Wulff shapes[J]. Studia Math, 245 (2019):201-211.  

[7] Batista, E. B., Han Huhe and Nishimura, T. Simultaneous smoothness and simultaneous stability of a strictly convex integrand and its dual[J]. Kodai Mathematical Journal, 43 (2020):221-242.

[8]Han Huhe and Wu D.H. Constant diameter and constant width of spherical convex bodies, Aequat. Math., 95 (2021):167–174.

[9]Han Huhe. Maximum and minimum of convex integrands, to be published in Hokkaido Mathematical Journal.