The Moments for the Meyer-König and Zeller Operators

We present the complete asymptotic expansion for the Meyer-Konig and Zeller Ž Ž . . yk Ž . operators M f t ; x as n tends to infinity. All coefficients of n ks1, 2, . . . n are calculated explicitly in terms of Stirling numbers of the first and second kind.

In this paper, the inequality estimates of Bernstein basis functions and Meyer᎐Konig and Zeller basis functions are studied. Exact bounds for these two basis functions are obtained. Moreover, some application results of the new estimates in estimating the rate of convergence of Durrmeyer operators a

## Abstract We study the asymptotic behavior of Maurey–Rosenthal type dominations for operators on Köthe function spaces which satisfy norm inequalities that define weak __q__ ‐concavity properties. In particular, we define and study two new classes of operators that we call __α__ ‐almost __q__ ‐co