Degree of Lp Approximation by Multivariate Generalized Discrete Singular Operators
Abstract
Here we give the approximation properties with rates of multivariate generalized discrete versions of Picard, Gauss. Weierstrass, and Poisson. Cauchy singular operators over ℝ N, N ≥ 1. We treat both the unitary and non-unitary cases of the operators above. We derive quantitatively Lp convergence of these operators to the unit operator by involving the Lp higher modulus of smoothness of an Lp-function. It follows [4].
Publication Title
Series on Concrete and Applicable Mathematics
Recommended Citation
Anastassiou, G., & Kester, M. (2017). Degree of Lp Approximation by Multivariate Generalized Discrete Singular Operators. Series on Concrete and Applicable Mathematics, 20, 213-237. https://doi.org/10.1142/9789813145849_0008
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