General theory of global smoothness and approximation by smooth singular operators

In this article we continue with the study of multivariate smooth general singular integral operators over R N , N ≥ 1, regarding their simultaneous global smoothness preservation property with respect to the L p norm, 1 ≤ p ≤ ∞, by involving multivariate higher order moduli of smoothness. Also we s

## In this article, we continue with the study of smooth Picard singular integral operators over the real line regarding their simultaneous global smoothness preservation property with respect to the Lp norm, 1 < p \_< co, by involving higher-order moduli of smoothness. Also, we study their simult

Lu, H. and F.H. Mathis, Surface approximation by spline smoothing and generalized cross-validation, Mathematics and Computers in Simulation 34 (1992) 541-549. A technique is developed to approximate multi-dimensional surfaces based on smoothing splines. The tensor product is used to extend a one-di

Error estimates for approximation of functions ~ox,a,0 (x) = ~x,~,l (x) + i~ox,a,2 (X) = [x[)~exp (iA[x[-°'), A > 0, a :> 0, A e R are given. Let E(f,B, Lp(f~)) denote the error of approximation of f by elements from B in the Lp-metric. Then, it is shown that for polynomial approximation E(~,a,l,Pr,

## Abstract The error of approximation by families of linear trigonometric polynomial operators in the scale of __L~p~__‐spaces of periodic functions with 0 < __p__ ⩽ +∞ is characterized with the help of realization functionals associated with operators of multiplier type describing smoothness prop