姓名：胡倩倩      性别：女     出生日期：1980年11月   

学历学位：博士   职称：教授   

电子邮箱：qianqian_hu@163.com

 一、主要学习与工作经历：

2017.12至今   浙江工商大学我院     教授

2015.8-2016.2  加州大学洛杉矶分校, Radiation Oncology Department, 访问学者, 导师: Dr. Dan Ruan

2009.7-2017.12   浙江工商大学我院     副教授

2008.3-2009.7   浙江工商大学我院     讲师

2005.3-2008.3   浙江大学数学系, 计算机辅助几何设计与图形学, 博士, 导师: 王国瑾教授

2004.8-2005.2   香港科技大学计算机科学系Vision & Graphics  lab, 研究助理, 导师:Prof.  Chiew-Lan Tai

2001.9-2004.7    浙江大学数学系, 计算机辅助几何设计与图形学, 硕士, 导师: 王国瑾教授

1997.9-2001.7    浙江大学应用数学系, 本科

二、研究方向：

数字几何处理、计算机辅助几何设计、等几何分析等.

三、主讲课程：

高等数学、线性代数、计算方法、计算机图形学、数字信号处理、概率论与数理统计等.

四、主要获奖情况：

1.  2007年获欧拉应用数学奖(个人)

2.  2008年获陆增镛CAD&CG(计算机辅助设计与图形学)高科技奖三等奖(个人)

3.  2008年获浙江省优秀毕业研究生称号(个人)

4.  2010年获浙江省高校科研成果奖二等奖(排名3/3)

5. 2014年获校青年优秀科研成果二等奖(个人)

五、主要项目：

1、2019.1－2021.12  基于重新参数化的几何近似造型技术及其应用  浙江省自然科学基金 主持

2、2015.1－2017.12 面向NURBS的逼近技术及其在等几何分析中的应用研究 浙江省自然科学基金 主持

3、2013.1－2014.12  高精度几何逼近造型方法及其应用研究  浙江大学CAD国家重点实验室开放式课题  主持

4、2013.1－2015.12  CAD中高精度几何近似造型技术及应用研究  国家自然科学基金  主持

5、2010.1－2011.12   计算几何中几何逼近造型的若干关键技术研究   浙江省自然科学基金 主持

六、主要论著：

[1]      Lin Hongwei, Xiong Yunyang, Wang Xiao, Hu Qianqian, Ren Jingwen. Isogeometric Least-Squares Collocation Method with Consistency and Convergence Analysis. Journal of Systems Science & Complexity, 2020, 33: 1656-1693.(SCI)

[2]      Hu Qianqian, Zhang Yanhui, Wang Guojin. The least square progressive iterative approximation property of low degree non-uniform triangular Bezier surfaces. Journal of Computer-Aided Design & Computer Graphics, 2020,32(3): 360-366.(In Chinese)(EI)

[3]      Lizheng Lu, Shiqing Zhao, Qianqian Hu. Improvement on constrained multi-degree reduction of Bézier surfaces using Jacobi polynomials. Computer Aided Geometric Design, 2018, 61: 20-26.(SCI)

[4]      Hu Qianqian, Wang Weiwei, Wang Guojin. Piecewise Mӧbius Reparameterization of Rational Bézier Curves. Journal of Computer-Aided Design & Computer Graphics, 2018,30(7): 1230-1235. (In Chinese)(EI)

[5]      Wu jinming, Zhang Yu, Zhang Xiaolei, Hu Qianqian. On Integro Quintic Spline Quasi-interpolation. Journal of Computer-Aided Design & Computer Graphics, 2018, 30(5): 801-807.(In Chinese)(EI)

[6]      Lizheng Lu, Chengkai Jiang, Qianqian Hu. Planar cubic G1 and quintic G2 Hermite interpolations via curvature variation minimization. Computers & Graphics, 2018, 92-98.(SCI)

[7]      Guojin Wang, Huixia Xu, Qianqian Hu. Bounds on partial derivatives of NURBS surfaces. Applied Mathematics-A Journal of Chinese Universities, 2017, 32(3): 281-293.(SCI)

[8]      Qianqian Hu. Explicit G1 approximation of conic sections using Bézier curves of arbitrary degree. Journal of Computational and Applied Mathematics, 2016, 292, 505-512. (SCI)

[9]      Hongwei Lin, Sinan Jin, Qianqian Hu, Zhenbao Liu. Constructing B-spline solids from tetrahedral meshes for isogeometric analysis. Computer Aided Geometric Design, 2015, 35-36, 109-120. (SCI)

[10]  Qianqian Hu.G1 approximation of conic sections by quartic Bézier curves. Computers & Mathematics with Applications, 2014, 68(12): 1882-1891. (SCI)

[11]  Qianqian Hu.Constrained polynomial approximation of quadric surfaces. Applied Mathematics and Computation, 2014, 248: 354-362. (SCI)

[12]  Hongwei Lin, Qianqian Hu, Yunyang Xiong. Consistency and Convergence Properties of the Isogeometric Collocation Method. Computer methods in applied mechanics and engineering, 2013, 267: 471-486. (SCI)

[13]  Qianqian Hu. An iterative algorithm for polynomial approximation of rational triangular Bézier surfaces. Applied Mathematics and Computation, 2013, 219: 9308-9316.(SCI)

[14]  Qianqian Hu, Huixia Xu. Constrained polynomial approximation of rational Bézier curves using reparameterization. Journal of computational and applied mathematics, 2013, 249: 133-143.(SCI)

[15]  Huixia Xu, Qianqian Hu. Approximating uniform rational B-spline curves by polynomial B-spline curves. Journal of computational and applied mathematics, 2013, 244: 10-18. (SCI)

[16]  Qian-Qian Hu. Approximating conic sections by constrained Bézier curves of arbitrary degree. Journal of computational and applied mathematics, 2012, 236(11): 2813-2821. (SCI)

[17]  HU Qian-qian, WANG Guo-jin. Rational cubic/quartic Said-Ball conics. Applied Mathematics A Journal of Chinese Universities, 2011, 26(2): 198-212.(SCI)

[18]  Qian-qian Hu, Guo-jin Wang. Representing conics by low degree rational DP curves. Journal of Zhejiang University-SCIENCE, 2010, 11(4): 278-289.(SCI)

[19]  Qianqian Hu, Guojin Wang. Multi-degree reduction of disk Bézier curves in L2 norm. Journal of Information & Computational Science, 2010, 7(5): 1045-1057.(EI)

[20]  陆利正, 胡倩倩, 汪国昭. Bézier曲线降阶的迭代算法. 计算机辅助设计与图形学学报, 2009, 21(12): 1689-1693.(EI)

[21]  QianQian Hu, GuoJin Wang. Optimal multi-degree reduction of triangular Bézier surfaces with corners continuity in the norm L2 . Journal of Computational and Applied Mathematics, 2008, 215(1): 114-126.(SCI)

[22]  Hu Qianqian, Wang Guojin. A novel algorithm for explicit optimal multi-degree reduction of triangular surfaces, SCIENCE IN CHINA, Series F, 2008, 51(1): 13-24. (SCI)

[23]  胡倩倩, 王国瑾. 球域Bézier曲面的精确边界及其多项式逼近. 浙江大学学报工学版,  2008, 42(11): 1906-1909.(EI)

[24]  QianQian Hu, GuoJin Wang. Improved bounds on partial derivatives of rational triangular Bézier surface. Computer-Aided Design, 2007, 39(12):1113-1119. (SCI)

[25]  QianQian Hu, GuoJin Wang. Necessary and sufficient conditions for rational quartic representation of conic sections. Journal of Computational and Applied Mathematics, 2007, 203(1), 190-208. (SCI)

[26]  QianQian Hu, GuoJin Wang. Explicit multi-degree reduction of Said-Bézier generalized Ball curves with endpoints constraints, Journal of Information and Computational Science, 2007, 4(2), 533-543.(EI)

[27]  QianQian Hu, GuoJin Wang. Rational quartic Said-Ball conics. The 3rd Korea- China Joint Conference on Geometric and Visual Computing, 2007, 94-102.

[28]  Hu Qianqian, Wang Guojin. Geometric meanings of the parameters on rational conic segments, SCIENCE IN CHINA, Series A, 2005, 48(9), 1209-1222. (SCI)

王国瑾, 胡倩倩.一类有理Bézier曲线及其求积求导的多项式逼近. 高校应用数学学报A辑, 2004, 19 (1): 89-96.