Numerical integration rules based on B-spline bases

被引:0
|
作者
Yanez, Dionisio F. [1 ]
机构
[1] Univ Valencia, Fac Matemat, Dept Matemat, Valencia, Spain
来源
APPLIED MATHEMATICS LETTERS | 2024年 / 156卷
关键词
Integration rules; Quasi-interpolation; Cell-average data; B-spline;
D O I
10.1016/j.aml.2024.109142
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
In this work, we present some new integration formulas for any order of accuracy as an application of the B -spline relations obtained in Amat et al. (2022). The resulting rules are defined as a perturbation of the trapezoidal integration method. We prove the order of approximation and extend the results to several dimensions. Finally, some numerical experiments are performed in order to check the theoretical results.
引用
收藏
页数:6
相关论文
共 50 条
  • [1] Optimal B-Spline Bases for the Numerical Solution of Fractional Differential Problems
    Pitolli, Francesca
    AXIOMS, 2018, 7 (03)
  • [2] NOTE ON CONDITION NUMBERS OF B-SPLINE BASES
    LYCHE, T
    JOURNAL OF APPROXIMATION THEORY, 1978, 22 (03) : 202 - 205
  • [3] On the Construction of Stable B-Spline Wavelet Bases
    Cerna, D.
    Finek, V.
    NUMERICAL MATHEMATICS AND ADVANCED APPLICATIONS, 2008, : 167 - 174
  • [4] Transformation between ωBezier and ωB-spline bases
    He, Zhi-min
    PROCEEDINGS OF THE THIRD INTERNATIONAL WORKSHOP ON MATRIX ANALYSIS AND APPPLICATIONS, VOL 1, 2009, : 225 - 230
  • [5] ORTHOGONAL WAVELET TRANSFORM OF SIGNAL BASED ON COMPLEX B-SPLINE BASES
    Zhu, Xiu-Ge
    Li, Bao-Bin
    Li, Deng-Feng
    INTERNATIONAL JOURNAL OF WAVELETS MULTIRESOLUTION AND INFORMATION PROCESSING, 2012, 10 (06)
  • [6] Nonparametric density estimation with nonuniform B-spline bases
    Wang, Xuhui
    Zhao, Yanchun
    Ni, Qian
    Tang, Shuo
    JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 2024, 440
  • [7] A background cell-based numerical integration for B-spline wavelet on the interval finite element method
    Vadlamani, Shashank
    Arun, C. O.
    ENGINEERING COMPUTATIONS, 2019, 36 (02) : 569 - 598
  • [8] Adaptive Nonparametric Density Estimation with B-Spline Bases
    Zhao, Yanchun
    Zhang, Mengzhu
    Ni, Qian
    Wang, Xuhui
    MATHEMATICS, 2023, 11 (02)
  • [9] Towards existence of piecewise Chebyshevian b-spline bases
    Mazure, ML
    NUMERICAL ALGORITHMS, 2005, 39 (04) : 399 - 414
  • [10] A quartic B-spline based explicit time integration scheme for structural dynamics with controllable numerical dissipation
    Wen, W. B.
    Duan, S. Y.
    Yan, J.
    Ma, Y. B.
    Wei, K.
    Fang, D. N.
    COMPUTATIONAL MECHANICS, 2017, 59 (03) : 403 - 418
12345