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Best Approximation-Preserving Operators over Hardy Space

Complex Variables 2022-06-24 v1

Abstract

Let TnT_n be the linear Hadamard convolution operator acting over Hardy space HqH^q, 1q1\le q\le\infty. We call TnT_n a best approximation-preserving operator (BAP operator) if Tn(en)=enT_n(e_n)=e_n, where en(z):=zn,e_n(z):=z^n, and if Tn(f)qEn(f)q\|T_n(f)\|_q\le E_n(f)_q for all fHqf\in H^q, where En(f)qE_n(f)_q is the best approximation by algebraic polynomials of degree a most n1n-1 in HqH^q space. We give necessary and sufficient conditions for TnT_n to be a BAP operator over HH^\infty. We apply this result to establish an exact lower bound for the best approximation of bounded holomorphic functions. In particular, we show that the Landau-type inequality f^n+cf^NEn(f)\left|\widehat f_n\right|+c\left|\widehat f_N\right|\le E_n(f)_\infty, where c>0c>0 and n<Nn<N, holds for every fHf\in H^\infty iff c12c\le\frac{1}{2} and N2n+1N\ge 2n+1.

Keywords

Cite

@article{arxiv.2206.11841,
  title  = {Best Approximation-Preserving Operators over Hardy Space},
  author = {Fahreddin. G. Abdullayev and Viktor V. Savchuk and Maryna V. Savchuk},
  journal= {arXiv preprint arXiv:2206.11841},
  year   = {2022}
}
R2 v1 2026-06-24T12:02:09.162Z