The norm estimates of the q-Bernstein operators for varying q > 1

被引:5
|
作者
Ostrovska, Sofiya [1 ]
Ozban, Ahmet Yasar [1 ]
机构
[1] Atilim Univ, Dept Math, TR-06836 Ankara, Turkey
来源
COMPUTERS & MATHEMATICS WITH APPLICATIONS | 2011年 / 62卷 / 12期
关键词
q-integers; q-binomial coefficients; q-Bernstein polynomials; q-Bernstein operator; Operator norm; Newton's method; CONVERGENCE PROPERTIES; POLYNOMIALS;
D O I
10.1016/j.camwa.2011.10.067
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
The aim of this paper is to present norm estimates in C [0, 1] for the q-Bernstein basic polynomials and the q-Bernstein operators B-n,B-q in the case q > 1. While for 0 < q <= 1, vertical bar vertical bar B-n,B-q vertical bar vertical bar = 1 for all n is an element of N. in the case q > 1, the norm vertical bar vertical bar B-n,B-q vertical bar vertical bar increases rather rapidly as q -> +infinity. In this study, it is proved that vertical bar vertical bar B-n,B-q vertical bar vertical bar similar to C(n)q(n(n-1)/2), q -> +infinity with C-n = 2/n (1- 1/n)(n-1). Moreover, it is shown that vertical bar vertical bar B-n,B-q vertical bar vertical bar similar to 2q(n(n-1)/2) /ne as n -> infinity, q -> +infinity. The results of the paper are illustrated by numerical examples. (C) 2011 Elsevier Ltd. All rights reserved.
引用
收藏
页码:4758 / 4771
页数:14
相关论文
共 50 条
  • [1] THE NORM ESTIMATES FOR THE q-BERNSTEIN OPERATOR IN THE CASE q &gt; 1
    Wang, Heping
    Ostrovska, Sofiya
    [J]. MATHEMATICS OF COMPUTATION, 2010, 79 (269) : 353 - 363
  • [2] The Limit q-Bernstein Operators with Varying q
    Almesbahi, Manal Mastafa
    Ostrovska, Sofiya
    Turan, Mehmet
    [J]. MATHEMATICAL METHODS IN ENGINEERING: THEORETICAL ASPECTS, 2019, 23 : 203 - 215
  • [3] Approximation by Quaternion q-Bernstein Polynomials, q &gt; 1
    Gal, Sorin G.
    [J]. ADVANCES IN APPLIED CLIFFORD ALGEBRAS, 2012, 22 (02) : 313 - 319
  • [4] On the q-Bernstein Polynomials of Unbounded Functions with q &gt; 1
    Ostrovska, Sofiya
    Ozban, Ahmet Yasar
    [J]. ABSTRACT AND APPLIED ANALYSIS, 2013,
  • [5] The Truncated q-Bernstein Polynomials in the Case q &gt; 1
    Turan, Mehmet
    [J]. ABSTRACT AND APPLIED ANALYSIS, 2014,
  • [6] On the eigenfunctions of the q-Bernstein operators
    Sofiya Ostrovska
    Mehmet Turan
    [J]. Annals of Functional Analysis, 2023, 14
  • [7] On the eigenfunctions of the q-Bernstein operators
    Ostrovska, Sofiya
    Turan, Mehmet
    [J]. ANNALS OF FUNCTIONAL ANALYSIS, 2023, 14 (01)
  • [8] The moments for q-Bernstein operators in the case 0 < q < 1
    Nazim Mahmudov
    [J]. Numerical Algorithms, 2010, 53 : 439 - 450
  • [9] On the eigenvectors of the q-Bernstein operators
    Ostrovska, S.
    Turan, M.
    [J]. MATHEMATICAL METHODS IN THE APPLIED SCIENCES, 2014, 37 (04) : 562 - 570
  • [10] Complex operators generated by q-Bernstein polynomials, q >= 1
    Bascanbaz-Tunca, Gulen
    Cetin, Nursel
    Gal, Sorin G.
    [J]. STUDIA UNIVERSITATIS BABES-BOLYAI MATHEMATICA, 2016, 61 (02): : 169 - 176
12345