Approximation by Semigroups of Spherical Operators

Abstract

This paper discusses the approximation by %semigroups of operators of class (C0) 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), from which the equivalence between approximation for these operators and K-functionals introduced by the operators is given. As examples, the constructed r-th Boolean of generalized spherical Abel-Poisson operator and r-th Boolean of generalized spherical Weierstrass operator denoted by r Vtγ and r Wt separately (r is any positive integer, 0<γ,≤1 and t>0) satisfy that \|r Vtγf - f\|X≈ ωrγ(f,t1/γ)X and \|r Wtf - f\|X≈ ω2rγ(f,t1/(2))X, for all f∈ X, where X is a Banach space of continuous functions or Lp-integrable functions (1≤ p<∞) and \|·\|X is the norm on X and ωs(f,t)X is the moduli of smoothness of degree s>0 for f∈ 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 r Vtγ and r Wt have the same saturation class if γ=2.