The present paper gives a Jackson type estimate for Nevai operators under weighted L^p norm, and establishes the direct and converse theorems in some proper Besov spaces
This paper is devoted to study direct and converse approximation theorems of the generalized Bemstein operators Cn (f, sn,x) via so-called unified modulus ωφλ^2 (f,t), 0 ≤ λ ≤1. We obtain main results as fol...This paper is devoted to study direct and converse approximation theorems of the generalized Bemstein operators Cn (f, sn,x) via so-called unified modulus ωφλ^2 (f,t), 0 ≤ λ ≤1. We obtain main results as followsωφλ^2 (f,t)=O(t^α)←→|Cn(f,sn,x)-f(x)|=O((n^-1/2δn^1-λ(x))^α),where δn^2(x)=max{φ^2(x),1/n} and 0〈α〈2.展开更多
基金Supported in part by National and Zhejiang Provincial Natural Science Foundations of China under grant numbers 10471130 and 101009 respectively.
文摘The present paper gives a Jackson type estimate for Nevai operators under weighted L^p norm, and establishes the direct and converse theorems in some proper Besov spaces
基金Supported by the Natural Science Foundation of China (No. 11271263, 11371258)
文摘This paper is devoted to study direct and converse approximation theorems of the generalized Bemstein operators Cn (f, sn,x) via so-called unified modulus ωφλ^2 (f,t), 0 ≤ λ ≤1. We obtain main results as followsωφλ^2 (f,t)=O(t^α)←→|Cn(f,sn,x)-f(x)|=O((n^-1/2δn^1-λ(x))^α),where δn^2(x)=max{φ^2(x),1/n} and 0〈α〈2.
