English

Comonotone Second Jackson's Inequality

Classical Analysis and ODEs 2014-04-28 v1

Abstract

Let 2s2s points yi=πy2s<<y1<πy_i=-\pi\le y_{2s}<\ldots<y_1<\pi be given. Using these points, we define the points yiy_i for all integer indices ii by the equality yi=yi+2s+2πy_i=y_{i+2s}+2\pi. We shall write f(1)(Y)f\in\bigtriangleup^{(1)}(Y) if ff is a 2π2\pi-periodic function and ff does not decrease on [yi,yi1][y_i, y_{i-1}] if ii is odd; and ff does not increase on [yi,yi1][y_i, y_{i-1}] if ii is even. We denote En(1)(f;Y)E_n^{(1)}(f;Y) the value of the best uniform comonotone approximation. In this article the following Theorem -- the comonotone analogue of second Jackson's Inequality -- is proved. Theorem. If f(1)(Y)Wrf\in\bigtriangleup^{(1)}(Y)\bigcap {\Bbb W}^r, r>2r>2, then En(1)(f;Y)cnr,E_n^{(1)}(f;Y)\le \frac c{n^r}, where c=c(r,Y)=constc=c(r,Y)=const depending only on rr and YY, Wr{\Bbb W}^r Sobolev space.

Cite

@article{arxiv.1404.6337,
  title  = {Comonotone Second Jackson's Inequality},
  author = {M. G. Pleshakov},
  journal= {arXiv preprint arXiv:1404.6337},
  year   = {2014}
}

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in Russian

R2 v1 2026-06-22T03:58:29.227Z