On the Convergence and Iterates of q-Bernstein Polynomials

## Abstract The paper focuses at the estimates for the rate of convergence of the __q__ ‐Bernstein polynomials (0 < __q__ < 1) in the complex plane. In particular, a generalization of previously known results on the possibility of analytic continuation of the limit function and an elaboration of th

In this paper, we establish two basic functional-type identities between the iterates of the Bleimann᎐Butzer᎐Hahn operator and those of the Bernstein Ž . operator, on the one hand, and the iterates of the modified Meyer᎐Konig and Zeller operator and those of the Baskakov operator, on the other. Thes

The linear combination of iterates \(1-\left(1-P_{n}\right)^{M}\) of Bernstein and Durrmeyer operators of a fixed degree \(n\) is considered for increasing order of iteration \(M\). The resulting sequence of polynomials is shown to converge to the Lagrange interpolating polynomial for the Bernstein

## Abstract The limit __q__‐Bernstein operator __B__~__q__~ emerges naturally as an analogue to the Szász–Mirakyan operator related to the Euler distribution. Alternatively, __B__~__q__~ comes out as a limit for a sequence of __q__‐Bernstein polynomials in the case 0<__q__<1. Lately, different prop

This paper investigates the convergence condition for the polynomial approximation of rational functions and rational curves. The main result, based on a hybrid expression of rational functions (or curves), is that two-point Hermite interpolation converges if all eigenvalue moduli of a certain r\_r