Strong Converse Inequality for the Bernstein-Durrmeyer Operator

We consider families (L t , t # T) of positive linear operators such that each L t is representable in terms of a stochastic process starting at the origin and having nondecreasing paths and integrable stationary increments. For these families, we give probabilistic characterizations of the best pos

We extend some results of Giroux and Rahman (Trans. Amer. Math. Soc. 193 (1974), 67 98) for Bernstein-type inequalities on the unit circle for polynomials with a prescribed zero at z=1 to those for rational functions. These results improve the Bernstein-type inequalities for rational functions. The

## Abstract In the present paper, we introduce certain __q__‐Durrmeyer operators and estimate the rate of convergence for continuous functions in terms of modulus of continuity. The obtained estimate is sharp with respect to order. Copyright © 2008 John Wiley & Sons, Ltd.

## Abstract We characterize the pairs of weights (__u__, __v__) such that the one‐sided geometric maximal operator __G__^+^,  defined for functions __f__ of one real variable by verifies the weak‐type inequality or the strong type inequality for 0 < __p__ < ∞. We also find two new conditions wh