侯中华
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教授
博士生导师
硕士生导师
- 性别:男
- 毕业院校:日本东京工业大学
- 学位:博士
- 所在单位:数学科学学院
- 学科:基础数学
- 电子邮箱:zhonghua@dlut.edu.cn
访问量:
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[1] 侯中华.双曲空间中的 Crofton 公式[J],大连理工大学学报,2009,1:152-156
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[2] 邓俐伶.四维复欧氏空间单位球面中的一类浸入环面[J],大连民族学院学报,2010,12(1):40-43
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[3] 富宇.ES5中的双调和超曲面[J],数学学报(中文版),2022
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[4] 端木琳.Establishment of human thermoregulation model and simplified solution in non-uniform environment[A],1st International Conference on Building Energy and Environment (COBEE
2008),2022,625-631
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[5] Ji, FH.Helicoidal surfaces under the cubic screw motion in Minkowski 3-space[J],JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS,2022,318(2):634-647
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[6] 侯中华.Helicoidal surfaces with H-2 = K in Minkowski 3-space[J],JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS,2022,325(1):101-113
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[7] 侯中华.Geometry of tangent bundle with Cheeger-Gromoll type metric[J],JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS,2022,402(2):493-504
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[8] 侯中华.Flat Affine Maximal Surfaces in R-4[J],Results in Mathematics,2022,55(3-4):389-400
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[9] 侯中华.Hypersurfaces in a sphere with constant mean curvature[J],PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY,2022,125(4):1193-1196
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[10] 侯中华.Linear Weingarten spacelike hypersurfaces in de Sitter space[J],BULLETIN OF THE BELGIAN MATHEMATICAL SOCIETY SIMON STEVIN,2022,17(5):769-780
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[11] 杨铎.Linear Weingarten spacelike submanifolds in de Sitter space[J],Journal of Geometry,2022,103(1):177-190
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[12] 侯中华.The total mean curvature of submanifolds in a Euclidean space[J],MICHIGAN MATHEMATICAL JOURNAL,2022,45(3):497-505
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[13] 邓俐伶.一类具有常Khler角的四维复欧氏空间浸入环面[J],大连民族学院学报,2022,14(1):50-52
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[14] 侯中华.井下水力活塞泵故障诊断的数学基础[J],大连理工大学学报,2022,34(4):376
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[15] 邱望华.伪黎曼乘积空间中具有平行平均曲率向量的曲面[J],数学物理学报,2022,6:1027-1039
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[16] 侯中华.关于三维Minkowski空间中直线汇的一些注记[J],数学研究与评论 英文版,2022,27(1):185-194
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[17] 侯中华.关于离散参数曲线网上曲率的一种刻画[J],大连理工大学学报,2022,1:152-156
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[18] 付莹.A characterization of affine spheres in R (4)[J],ACTA MATHEMATICA HUNGARICA,2022,131(1-2):160-173
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[19] 侯中华.A Classification Theorem for Complete PMC Surfaces with Non-negative Gaussian Curvature in M-n(c) [J],TAIWANESE JOURNAL OF MATHEMATICS,2022,20(1):205-226
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[20] 侯中华.Affine locally symmetric surfaces in R^4[J],Communications in Mathematical Research,2022,26(3):269-279