English

Exact pointwise estimates for polynomial approximation with Hermite interpolation

Classical Analysis and ODEs 2021-01-07 v2

Abstract

We establish best possible pointwise (up to a constant multiple) estimates for approximation, on a finite interval, by polynomials that satisfy finitely many (Hermite) interpolation conditions, and show that these estimates cannot be improved. In particular, we show that {\bf any} algebraic polynomial of degree nn approximating a function fCr(I)f\in C^r(I), I=[1,1]I=[-1,1], at the classical pointwise rate ρnr(x)ωk(f(r),ρn(x))\rho_n^r(x) \omega_k(f^{(r)}, \rho_n(x)), where ρn(x)=n11x2+n2\rho_n(x)=n^{-1}\sqrt{1-x^2}+n^{-2}, and (Hermite) interpolating ff and its derivatives up to the order rr at a point x0Ix_0\in I, has the best possible pointwise rate of (simultaneous) approximation of ff near x0x_0. Several applications are given.

Keywords

Cite

@article{arxiv.2006.03126,
  title  = {Exact pointwise estimates for polynomial approximation with Hermite interpolation},
  author = {Kirill A. Kopotun and Dany Leviatan and Igor A. Shevchuk},
  journal= {arXiv preprint arXiv:2006.03126},
  year   = {2021}
}
R2 v1 2026-06-23T16:04:11.621Z