AbstractIn the note, we consider saturation of convergence on the interval [0,1] for the q-Bernstein polynomials of a continuous function f for arbitrary fixed q>1. We show that the rate of uniform convergence on [0,1] is o(q−n) if and only if f is linear. The result is sharp in the following sense: it ceases to be true if we replace “o” by “O”
AbstractWe characterize the higher orders of smoothness of functions in C[0, 1] by Bernstein polynom...
AbstractWe give an interesting generalization of the Bernstein polynomials. We find sufficient and n...
Acar, Tuncer/0000-0003-0982-9459WOS: 000350817400002Pointwise convergence of q-Bernstein polynomials...
AbstractIn the note, we consider saturation of convergence on the interval [0,1] for the q-Bernstein...
AbstractIn the paper, we discuss Voronovskaya-type theorem and saturation of convergence for q-Berns...
AbstractIn the note, we obtain the estimates for the rate of convergence for a sequence of q-Bernste...
summary:Due to the fact that in the case $q>1$ the $q$-Bernstein polynomials are no longer positive ...
AbstractIn the note, we discuss Voronovskaya type theorem and saturation of convergence for q-Bernst...
The aim of this paper is to present new results related to the convergence of the sequence of the -B...
AbstractIn this paper, we discuss properties of the ω,q-Bernstein polynomials Bnω,q(f;x) introduced ...
AbstractLet Bn(f,q;x),n=1,2,… be q-Bernstein polynomials of a function f:[0,1]→C. The polynomials Bn...
Since in the case q > 1 the q-Bernstein polynomials Bn,q are not positive linear operators on C[0...
The convergence properties of q-Bernstein polynomials are investigated. When q greater than or equal...
AbstractLet f∈C[0, 1], q∈(0, 1), and Bn(f, q; x) be generalized Bernstein polynomials based on the q...
AbstractLet Bn(f,q;x),n=1,2,… be the q-Bernstein polynomials of a function f∈C[0,1]. In the case 0<q...
AbstractWe characterize the higher orders of smoothness of functions in C[0, 1] by Bernstein polynom...
AbstractWe give an interesting generalization of the Bernstein polynomials. We find sufficient and n...
Acar, Tuncer/0000-0003-0982-9459WOS: 000350817400002Pointwise convergence of q-Bernstein polynomials...
AbstractIn the note, we consider saturation of convergence on the interval [0,1] for the q-Bernstein...
AbstractIn the paper, we discuss Voronovskaya-type theorem and saturation of convergence for q-Berns...
AbstractIn the note, we obtain the estimates for the rate of convergence for a sequence of q-Bernste...
summary:Due to the fact that in the case $q>1$ the $q$-Bernstein polynomials are no longer positive ...
AbstractIn the note, we discuss Voronovskaya type theorem and saturation of convergence for q-Bernst...
The aim of this paper is to present new results related to the convergence of the sequence of the -B...
AbstractIn this paper, we discuss properties of the ω,q-Bernstein polynomials Bnω,q(f;x) introduced ...
AbstractLet Bn(f,q;x),n=1,2,… be q-Bernstein polynomials of a function f:[0,1]→C. The polynomials Bn...
Since in the case q > 1 the q-Bernstein polynomials Bn,q are not positive linear operators on C[0...
The convergence properties of q-Bernstein polynomials are investigated. When q greater than or equal...
AbstractLet f∈C[0, 1], q∈(0, 1), and Bn(f, q; x) be generalized Bernstein polynomials based on the q...
AbstractLet Bn(f,q;x),n=1,2,… be the q-Bernstein polynomials of a function f∈C[0,1]. In the case 0<q...
AbstractWe characterize the higher orders of smoothness of functions in C[0, 1] by Bernstein polynom...
AbstractWe give an interesting generalization of the Bernstein polynomials. We find sufficient and n...
Acar, Tuncer/0000-0003-0982-9459WOS: 000350817400002Pointwise convergence of q-Bernstein polynomials...
DOI
Add to ORKG