Statistical convergence of double-complex Picard integral operators

In this paper, we study statistical L p -approximation properties of the double Gauss-Weierstrass singular integral operators which do not need to be positive. Also, we present a non-trivial example showing that our statistical L p -approximation is stronger than the ordinary one.

have recently introduced the notion of statistical σ -convergence. In this paper, we study its use in the Korovkin-type approximation theorem. Then, we construct an example such that our new result works but its classical and statistical cases do not work. We also compute the rates of statistical σ

## 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

The aim of this study is to investigate the convergence of a family of integral operators with within these integral operators, Λ ⊂ R is an index set, for ∀λ ∈ Λ, λ ≥ 0, P k,λ and α k,λ are real numbers and where M is independent of λ and for ∀λ ∈ Λ,

In this paper the iteration operator corresponding to the Picard-LindelSf iteration is considered as a model case in order to investigate the convergence theory of the Arnoldi process. We ask whether it is possible to use a theorem by Nevanlinna and Vainikko to obtain the spectrum of the local opera