On certain Baskakov-Durrmeyer type operators
Journal Title: Surveys in Mathematics and its Applications - Year 2010, Vol 5, Issue 0
Abstract
This paper is a study of the degree of approximation by the linear combinations of the derivatives of certain Durrmeyer type integral modification of the Baskakov operators in terms of the higher order modulus of smoothness.
Authors and Affiliations
Asha Gairola
Keywords
Related Articles
- EP ID EP160526
- DOI -
- Views 85
- Downloads 0
http://www.utgjiu.ro/math/sma/v02/p10.pdf
In this paper, we shall establish sufficient conditions for the existence of solutions for a first order boundary value problem for fractional differential equations.
Some Absolutely Continuous Representations of Function Algebras
In this paper we study some absolutely continuous representations of function algebras, which are weak ρ-spectral in the sense of [5] and [6], for a scalar ρ > 0. More precisely, we investigate certain conditions for...
New result of existence of periodic solution for a Hopfield neural networks with neutral time-varying delays
In this paper, a Hopfield neural network with neutral time-varying delays is investigated by using the continuation theorem of Mawhin's coincidence degree theory and some analysis technique. Without assuming the continuo...
On certain Baskakov-Durrmeyer type operators
This paper is a study of the degree of approximation by the linear combinations of the derivatives of certain Durrmeyer type integral modification of the Baskakov operators in terms of the higher order modulus of smoothn...
Some applications of generalized Ruscheweyh derivatives involving a general fractional derivative operator to a class of analytic functions with negative coefficients I
For certain univalent function f, we study a class of functions f as defined by making use of the generalized Ruscheweyh derivatives involving a general fractional derivative operator, satisfying <CENTER>Re { (zJ&l...