吳慶標(浙江大學數學系教授)

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吳慶標,男,博士,浙江大學數學系教授,博士生導師,浙江大學科學與工程計算研究所副所長。

基本介紹

  • 中文名:吳慶標
  • 國籍:中國
  • 性別:男
  • 職稱:教授
研究方向,獲獎情況,學術兼職,

研究方向

非線性數值代數,非線性數值最最佳化,計算機圖形與圖像處理,數值計算方法,Monte Carlo方法,計算機模擬,遺傳算法。
浙江大學教授吳慶標浙江大學教授吳慶標
2005年以來在國內外學術雜誌上發表40多篇SCI檢索論文。

獲獎情況

1、非線性方程數值解法研究及套用,2009年浙江省高等學校科研成果獎一等獎
2、杭州創新指數研究,2009年杭州市科技進步獎二等獎、2010年浙江省科技進步三等獎
3、Convergence ball and error analysis of Muller's method,2010年浙江省自然科學學術獎三等獎
4、Third-order convergence theorem by using majorizing function for a modified Newton method in Banach space,2010年浙江省自然科學學術獎三等獎
開設博士生、碩士生課程:《高性能並行計算》、《計算機模擬》、《多元非線性方程組疊代解法》等。

學術兼職

浙江省套用數學會理事、副秘書長
全國經濟數學與管理數學會常務理事
《International Journal of Information Processing and Management》副主編
《Advances in Information Sciences》編委
《Advances in Information Sciences and Service Sciences》編委
[1]
Shengfeng Zhu, Qingbiao Wu, Chunxiao Liu, Variational piecewise constant level set methods for shape optimization of a two-density drum, Journal of Computational Physics, 229(13), 2010.(SCI)
[2]
Yasir Khan, Qingbiao Wu, Homotopy perturbation transform method for nonlinear equations using He’s polynomials, Computers & Mathematics with Applications, 61(8), 2011.(SCI)
[3]
Shengfeng Zhu, Qingbiao Wu, Chunxiao Liu, Shape and topology optimization for elliptic boundary value problems using a piecewise constant level set method, Applied Numerical Mathematics, 61(6), 2011.(SCI)
[4]
Shengfeng Zhu, Chunxiao Liu, Qingbiao Wu, Binary level set methods for topology and shape optimization of a two-density inhomogeneous drum, Computer Methods in Applied Mechanics and Engineer, 199(45-48), 2010.(SCI)
[5]
Yong Jin, Ligang Liu and Qingbiao Wu, Nonhomogeneous scaling optimization for realtime image resizing, The Visual Computer, 26(6-8), 2010.(SCI)
[6]
Bi WH, Wu Qingbiao, Ren HM, Convergence ball and error analysis of Ostrowski-Traub's method, APPLIED MATHEMATICS-A JOURNAL OF CHINESE UNIVERSIT, 25(3), 2010.(SCI)
[7]
Hongmin Ren, Qingbiao Wu, Weihong Bi, On convergence of a new secant-like method for solving nonlinear equations, Applied Mathematics and Computation, 217(2), 2010.(SCI)
[8]
Hongmin Ren, Qingbiao Wu and Weihong Bi, New variants of Jarratt’s method with sixth-order convergence, Numerical Algorithms, 52(4), 2009.(SCI)
[9]
Zhao YQ, Wu Qingbiao, Convergence analysis for a deformed Newton's method with third-order in Banach space under r-condition, INTERNATIONAL JOURNAL OF COMPUTER MATHEMATICS, 86(3), 2009.(SCI)
[10]
Wu LH, Wu QB, Huang XX, Generation algorithm for cubic curves with double-step increment Generation algorithm for cubic curves, PROCEEDINGS OF 2009 4TH INTERNATIONAL CONFERENCE O, 1, 2009.(SCI)
[11]
Shengfeng Zhu, Qingbiao Wu, Xiaoliang Cheng, Numerical solution of the Falkner–Skan equation based on quasilinearization, Applied Mathematics and Computation, 215(7), 2009.(SCI)
[12]
Weihong Bi, Hongmin Ren, Qingbiao Wu, Three-step iterative methods with eighth-order convergence for solving nonlinear equations, Journal of Computational and Applied Mathematics, 225(1), 2009.(SCI)
[13]
Hongmin Ren, Qingbiao Wu, Weihong Bi, A class of two-step Steffensen type methods with fourth-order convergence, Applied Mathematics and Computation, 209(2), 2009.(SCI)
[14]
Weihong Bi, Qingbiao Wu, Hongmin Ren, A new family of eighth-order iterative methods for solving nonlinear equations, Applied Mathematics and Computation, 214(1), 2009.(SCI)
[15]
Hongmin Ren, Qingbiao Wu, Convergence ball and error analysis of a family of iterative methods with cubic convergence, Applied Mathematics and Computation, 209(2), 2009.(SCI)
[16]
Qingbiao Wu, Hongmin Ren, Weihong Bi, The convergence ball of Wang’s method for finding a zero of a derivative, Mathematical and Computer Modelling, 49(3-4), 2009.(SCI)
[17]
Yueqing Zhao, Qingbiao Wu, Newton–Kantorovich theorem for a family of modified Halley’s method under Hölder continuity conditions in Banach space, Applied Mathematics and Computation, 202(1), 2008.(SCI)
[18]
Weihong Bi, Hongmin Ren, Qingbiao Wu, A new semilocal convergence theorem of Müller’s method, Applied Mathematics and Computation, 199(1), 2008.(SCI)
[19]
Weihong Bi, Hongmin Ren, Qingbiao Wu, New family of seventh-order methods for nonlinear equations, Applied Mathematics and Computation, 203(1), 2008.(SCI)
[20]
Bi WH, Ren HM, Wu Qingbiao, Convergence analysis for the Secant method based on new recurrence relations, APPLIED MATHEMATICS-A JOURNAL OF CHINESE UNIVERSIT, 23(4), 2008.(SCI)
[21]
Hongmin Ren, Qingbiao Wu, A class of modified Secant methods for unconstrained optimization, Applied Mathematics and Computation, 206(2), 2008.(SCI)
[22]
Qingbiao Wu(吳慶標) and Hongmin Ren, Convergence ball and error analysis of Müller’s method, Applied Mathematics and Computation, 184(2), 2007.(SCI)
[23]
Qingbiao Wu(吳慶標) and Hongmin Ren, Convergence ball of a modified secant method with convergence order 1.839
  , Applied Mathematics and Computation, 188(1), 2007.(SCI)
[24]
Qingbiao Wu(吳慶標) and Hongmin Ren, A note on some new iterative methods with third-order convergence, Applied Mathematics and Computation, 188(2), 2007.(SCI)
[25]
Qingbiao Wu(吳慶標) and Yueqing Zhao, Newton–Kantorovich type convergence theorem for a family of new deformed Chebyshev method, Applied Mathematics and Computation, 192(2), 2007.(SCI)
[26]
Yeqing Zhao and Qingbaio Wu, Wallis Ineqality With a Parameter, Journal of Inequalities in Pure and Applied Mathem, 7(2), 2006.
[27]
Qingbiao Wu(吳慶標), Xinxian Huang and Yujuan Han, A clipping algorithm for parabola segments against circular windows, Computer & Graphics, 2006.(SCI)
[28]
Qingbiao Wu (吳慶標)and Hongmin Ren, Convergence ball of a modified secant method for finding zero of derivatives, Applied Mathematics and Computation, 174(1), 2006.(SCI)
[29]
Qingbiao Wu (吳慶標)and Yueqing Zhao, Third-order convergence theorem by using majorizing function for a modified Newton method in Banach space , Applied Mathematics and Computation, 175(2), 2006.(SCI)
[30]
Qingbiao Wu(吳慶標) and Yueqing Zhao, A Newton–Kantorovich convergence theorem for the inverse-free Jarratt method in Banach space, Applied Mathematics and Computation, 2006.(SCI)
[31]
Hongmin Ren, Shijun Yang and Qingbiao Wu, A new semilocal convergence theorem for the Secant method under Hölder continuous divided differences, Applied Mathematics and Computation, 182(1), 2006.(SCI)
[32]
Hongmin Ren and Qingbiao Wu(吳慶標), Mysovskii-type theorem for the Secant method under Hölder continuous Fréchet derivative, Journal of Mathematical Analysis and Applications, 320(1), 2006.(SCI)
[33]
Ren Hongmin and Wu Qingbiao(吳慶標), The convergence ball of the Secant method under Hölder continuous divided differences, Journal of Computational and Applied Mathematics, 194(2), 2006.(SCI)
[34]
Xing-Guo Luo, Qing-Biao Wu(吳慶標) and Bing-Quan Zhan, Revisit on partial solutions in the Adomian decomposition method: Solving heat and wave equations, Journal of Mathematical Analysis and Applications, 321(1), 2006.(SCI)
[35]
Bing-Quan Zhang, Qing-Biao Wu (吳慶標)and Xing-Guo Lu,Experimentation with two-step Adomian decomposition method to solve evolution models, Applied Mathematics and Computation, 175(2), 2006.(SCI)
[36]
Qingbiao Wu(吳慶標) and Yueqing Zhao, Convergence theorem and error analysis of a family iterative method under new conditions, Journal of Information and Computational Science, 3(4), 2006.(Ei)
[37]
Qingbiao Wu (吳慶標), Airong Sheng, A note on finite difference method to analysis an ill-posed problem, Applied Mathematics and Computation, 2006.(SCI)
[38]
WU Qing-biao (吳慶標 and XIA Fei-hai, Shape modification of Bézier curves by constrained optimization, Journal of Zhejiang University SCIENCE, 6A, 2006.(EI)
[39]
Qingbiao Wu(吳慶標) and Yueqing Zhao, The convergence theorem for a family deformed Chebyshev method in Banach space, Applied Mathematics and Computation, 182(2), 2006.(SCI)
[40]
Bing-Quan Zhang, Xing-Guo Luo and Qing-Biao Wu, The restrictions and improvement of the Adomian decomposition method , Applied Mathematics and Computation, 2006.(SCI)
[41]
Qingbiao Wu(吳慶標) and Shijun Yang, A note to Ujević's generalization of Ostrowski's inequality , Applied Mathematics Letters, 18(6), 2005.(SCI,EI)

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