Sign-Preserving Approximation of Periodic Functions

被引:0
作者
M. G. Pleshakov
P. A. Popov
机构
[1] Saratov University,
[2] Kiev National University of Technology and Design,undefined
来源
Ukrainian Mathematical Journal | 2003年 / 55卷 / 8期
关键词
Continuous Function; Initial Point; Periodic Function; Jackson Theorem;
D O I
10.1023/B:UKMA.0000010761.91730.16
中图分类号
学科分类号
摘要
We prove the Jackson theorem for a zero-preserving approximation of periodic functions (i.e., in the case where the approximating polynomial has the same zeros yi) and for a sign-preserving approximation [i.e., in the case where the approximating polynomial is of the same sign as a function f on each interval (yi, yi − 1)]. Here, yi are the points obtained from the initial points −π ≤ y2s ≤y2s−1 <...< y1 < π using the equality yi = yi + 2s + 2π furthermore, these points are zeros of a 2π-periodic continuous function f.
引用
收藏
页码:1314 / 1328
页数:14
相关论文
共 50 条
[31]   Approximation of infinitely differentiable periodic functions by interpolation trigonometric polynomials in integral metric [J].
Serdyuk A.S. .
Ukrainian Mathematical Journal, 2001, 53 (12) :2014-2026
[32]   Exact order of approximation of periodic functions by one nonclassical method of summation of Fourier series [J].
O. V. Kotova ;
R. M. Trigub .
Ukrainian Mathematical Journal, 2012, 64 :1090-1108
[33]   Wavelet approximation and Fourier widths of classes of periodic functions of several variables. II [J].
Bazarkhanov, D. B. .
ANALYSIS MATHEMATICA, 2012, 38 (04) :249-289
[34]   Approximation of the Classes H p Ω of Periodic Functions of Many Variables in the Space L p [J].
Derev'yanko, N. V. .
UKRAINIAN MATHEMATICAL JOURNAL, 2014, 66 (05) :707-718
[35]   Approximation of analytic periodic functions by de la Vallée-Poussin sums [J].
Rukasov V.I. ;
Chaichenko S.O. .
Ukrainian Mathematical Journal, 2002, 54 (12) :2006-2024
[36]   Estimation of the best approximation of periodic functions of two variables by an "angle" in the metric of L p [J].
Kononovych T.O. .
Ukrainian Mathematical Journal, 2004, 56 (9) :1403-1416
[37]   Exact order of approximation of periodic functions by one nonclassical method of summation of Fourier series [J].
Kotova, O. V. ;
Trigub, R. M. .
UKRAINIAN MATHEMATICAL JOURNAL, 2012, 64 (07) :1090-1108
[38]   Inequalities of the Jackson type in the approximation of periodic functions by Fejér, Rogosinski, and Korovkin polynomials [J].
Bozhukha L.N. .
Ukrainian Mathematical Journal, 2000, 52 (12) :1818-1825
[39]   Wavelet approximation and Fourier widths of classes of periodic functions of several variables. IIПриближение всплесками и поперечники Фурье классов периодических функций многих переменных. II [J].
Д. Б. Бaзaрхaноь .
Analysis Mathematica, 2012, 38 :249-289
[40]   Approximation of periodic functions of high smoothness by interpolation trigonometric polynomials in the metric of L1 [J].
Serdyuk A.S. .
Ukrainian Mathematical Journal, 2000, 52 (7) :1141-1146
12345