On the best polynomial approximation of entire transcendental functions in Banach spaces. II

  • S. B. Vakarchuk Днепропетр. ун-т им. А. Нобеля

Abstract

We study the behavior of the best approximations $E_n(f)_{E′_p}$ of entire transcendental functions $f(z)$ of the order $ρ = 0$ by polynomials of at most $n$ th degree in the metric of the space $E′_p(Ω),\, p ≥ 1$. In particular, we describe the relationship between the best approximations $E_n(f)E′_p$ and the logarithmic order $ρ_L$ and type $σ_L$ of the function $f(z)$.
Published
25.10.1994
How to Cite
VakarchukS. B. “On the Best Polynomial Approximation of Entire Transcendental Functions in Banach Spaces. II”. Ukrains’kyi Matematychnyi Zhurnal, Vol. 46, no. 10, Oct. 1994, pp. 1318–1322, https://umj.imath.kiev.ua/index.php/umj/article/view/5609.
Section
Research articles