Name: Yuanpeng Zhu
Introduction:
Address: School of Mathematics, South China University of Technology, Guangzhou, 510640, P.R. China
Email:ypzhu@scut.edu.cn
Research Interests :
Spline approximation; Isogeometric Design; Computer Aided Geometric Design.
Education :
Sept.2011–July 2014: Ph.D. in Mathematics, Central South University, Changsha, P.R. China
Sept.2008–July 2011: M.S. in Mathematics, Central South University, Changsha, P.R. China
Sept.2004–July 2008: B.S. in Mathematics, Central South University, Changsha, P.R. China
Experiences :
March 2021–Present: Associated professor of Mathematics, School of Mathematics, South China University of Technology, P.R. China
July 2016–February 2021: Lecturer of Mathematics, School of Mathematics, South China University of Technology, P.R. China
September 2014–June 2016: Postdoctor of Mathematics, School of Mathematics and Sciences, University of Science and Technology of China, P.R. China
Research Grants:
2019.01–2021.12: National Natural Science Foundation of China, #61802129
2018.06–2021.06: Natural Science Foundation Guangdong Province, #2018A030310381
Publications:
[30]Yajun Zeng,Yuanpeng Zhu*. Implicit surface reconstruction based on a new interpolation/approximation radial basis function. Computer Aided Geometric Design 92 (2022) 102062.
[29]Yuanpeng Zhu*. A class of blending functions with C∞ smoothness. Numerical Algorithms (2021) 88:555–582.
[28]Yuanpeng Zhu*,Xuli Han. A novel recursive modification framework for enhancing polynomial reproduction property of interpolation basis functions. SIAM Journal on Scientific Computing 43(2021): A511–A540. (SCI)
[27]Zhuo Liu, Shengjun Liu, Yuanpeng Zhu*.C2 Rational Interpolation Splines with Region Control and Image Interpolation Application. Journal of Mathematical Imaging and Vision 63(2021): 394–416. (SCI)
[26]Yunyi Tang, Yuanpeng Zhu*.Image Zooming Based on Two Classes of C1-Continuous Coons Patches Construction with Shape Parameters over Triangular Domain.Symmetry 12(2020).(SCI)
[25]Mingshan Qiu, Yuanpeng Zhu*.C1 triangular Coons surface construction and image interpolation based on new Side-Side and Side-Vertex interpolation operators. PLoS ONE 15(2020): e0231617.(SCI)
[24]Yuanpeng Zhu*,Xuli Han.C2 interpolation T-splines. Computer Methods in Applied Mechanics and Engineering 362(2020) 112835. (SCI)
[23]Yuanpeng Zhu*,Meng Wang. A class of C1 rational interpolation splines in one and two dimensions with region control. Computational and Applied Mathematics (2020)39:69.(SCI)
[22]Lianyun Peng, Yuanpeng Zhu*.C1 convexity-preserving piecewise variable degree rational interpolation spline.Journal of Advanced Mechanical Design, Systems, and Manufacturing 14(2020). (SCI)
[21]Xuewen Tan, Yuanpeng Zhu*.Quasi-quintic trigonometric Bézier curves with two shape parameters.Computational and Applied Mathematics 38(2019):157.(SCI)
[20]Yu Zhang, Yuanpeng Zhu*, Xuqiao Li, Xiaole Wang, Xutong Guo. Anomaly Detection Based on Mining Six Local Data Features and BP Neural Network. Symmetry 11(2019): 571–591. (SCI)
[19]Yuanpeng Zhu, Zehua Jian , Yurui Du, Wenqing Chen, Jiwei Fang. A New GM(1,1) Model Based on Cubic Monotonicity-Preserving Interpolation Spline. Symmetry 11(2019): 420–432. (SCI)
[18]Yuanpeng Zhu, Zhuo Liu. A Class of Trigonometric Bernstein-Type Basis Functions with Four Shape Parameters. Mathematical Problems in Engineering 2019(2019), Article ID 9026187, 16 pages. (SCI)
[17]Yuanpeng Zhu. C2 rational quartic/cubic spline interpolant with shape constraints. Results in Mathematics 73(2018): 73–127. (SCI)
[16]Yuanpeng Zhu. C2 positivity-preserving interpolation splines in one and two dimentions. Applied Mathematics and Computation 316(2018): 186–204.(SCI)
[15]Yuanpen Zhu and Xuli Han. A class of spline curves with four local shape parameters. Acta Mathematicae Applicadae Sinica, English Series 33(2017): 979–988.(SCI)
[14]Yuanpen Zhu and Falai Chen. Modified bases of PHT-splines. Communications in Mathematics and Statistics 5(2017): 381–397.(SCI)
[13]Xuli Han and Yuanpeng Zhu*. A practical method for generating trigonometric polynomial surfaces over triangular domains. Mediterranean Journal of Mathematics 13(2016), 841–855.(SCI)
[12]Yuanpeng Zhu and Xuli Han. New trigonometric basis possessing exponential shape parameters. Journal of Computational Mathematics 33(2015): 642–684.(SCI)
[11]Yuanpeng Zhu and Xuli Han. New cubic rational basis with tension shape parameters. Applied Mathematics–A Journal of Chinese Universities 30(2015): 273–298. (SCI)
[10]Yuanpeng Zhu and Xuli Han. C2 rational quartic interpolation spline with local shape preserving property. Applied Mathematics Letters 46(2015): 57–63. (SCI)
[9]Yuanpeng Zhu and Xuli Han. Quasi-Bernstein-Bézier polynomials over triangular domain with multiple shape parameters. Applied Mathematics and Computation 250(2015): 181–192. (SCI)
[8]Yuanpeng Zhu, Xuli Han and Shengjun Liu. Curve construction based on four αβ-Bernstein-like basis functions. Journal of Computational and Applied Mathematics 273 (2015): 160–181. (SCI)
[7]Yuanpeng Zhu and Xuli Han. Shape preserving C2 rational quartic interpolation spline with two parameters. International Journal of Computer Mathematics 92(2015): 2160–2177. (SCI)
[6]Yuanpeng Zhu, Xuli Han and Shengjun Liu. Quartic rational Said-Ball-like basis with tension shape parameters and its application. Journal of Applied Mathematics 2014(2014): Article ID 857840, 18 pages.(SCI)
[5]Xuli Han and Yuanpeng Zhu*. Total Positivity of the Cubic Trigonometric Bézier Basis. Journal of Applied Mathematics 2014(2014): Article ID 198745, 5 pages.(SCI)
[4]Yuanpeng Zhu and Xuli Han. Curves and surfaces construction based on new basis with exponential functions. Acta Applicandae Mathematicae 129(2014): 183–203. (SCI)
[3]Yuanpeng Zhu and Xuli Han. A class of αβγ-Bernstein-Bézier basis functions over triangular domain. Applied Mathematics and Computation 220(2013):446–454.(SCI)
[2]Xuli Han and Yuanpeng Zhu*. Curve construction based on five trigonometric blending functions. BIT Numerical Mathematics 52(2012): 953–979. (SCI)
[1]Yuanpeng Zhu, Xuli Han, and Jing Han. Quartic trigonometric Bézier curves and shape preserving interpolation curves. Journal of Computational Information Systems 8(2012): 905–914. (EI)
