English

Approximation by Semigroups of Spherical Operators

Classical Analysis and ODEs 2014-09-15 v1

Abstract

This paper discusses the approximation by %semigroups of operators of class (C0\mathscr{C}_0) on the sphere and focuses on a class of so called exponential-type multiplier operators. It is proved that such operators form a strongly continuous semigroup of contraction operators of class (C0\mathscr{C}_0), from which the equivalence between approximation for these operators and KK-functionals introduced by the operators is given. As examples, the constructed rr-th Boolean of generalized spherical Abel-Poisson operator and rr-th Boolean of generalized spherical Weierstrass operator denoted by rVtγ\oplus^r V_t^{\gamma} and rWtκ\oplus^r W_t^{\kappa} separately (rr is any positive integer, 0<γ,κ10<\gamma,\kappa\leq1 and t>0t>0) satisfy that rVtγffXωrγ(f,t1/γ)X\|\oplus^r V_t^{\gamma}f - f\|_{\mathcal{X}}\approx \omega^{r\gamma}(f,t^{1/\gamma})_{\mathcal{X}} and rWtκffXω2rγ(f,t1/(2κ))X\|\oplus^r W_t^{\kappa}f - f\|_{\mathcal{X}}\approx \omega^{2r\gamma}(f,t^{1/(2\kappa)})_{\mathcal{X}}, for all fXf\in \mathcal{X}, where X\mathcal{X} is a Banach space of continuous functions or Lp\mathcal{L}^p-integrable functions (1p<1\leq p<\infty) and X\|\cdot\|_{\mathcal{X}} is the norm on X\mathcal{X} and ωs(f,t)X\omega^s(f,t)_{\mathcal{X}} is the moduli of smoothness of degree s>0s>0 for fXf\in \mathcal{X}. The saturation order and saturation class of the regular exponential-type multiplier operators with positive kernels are also obtained. Moreover, it is proved that rVtγ\oplus^r V_t^{\gamma} and rWtκ\oplus^r W_t^{\kappa} have the same saturation class if γ=2κ\gamma=2\kappa.

Keywords

Cite

@article{arxiv.1105.2393,
  title  = {Approximation by Semigroups of Spherical Operators},
  author = {Yuguang Wang and Feilong Cao},
  journal= {arXiv preprint arXiv:1105.2393},
  year   = {2014}
}
R2 v1 2026-06-21T18:06:09.825Z