Results 91 to 100 of about 1,098 (130)

The approximation of bivariate Chlodowsky-Szász-Kantorovich-Charlier-type operators. [PDF]

J Inequal Appl, 2017
Agrawal PN, Baxhaku B, Baxhaku B, Chauhan R.   +3 more
europepmc   +1 more source

Assessment of atropine-sufentanil-atracurium anaesthesia for endotracheal intubation: an observational study in very premature infants. [PDF]

BMC Pediatr, 2014
Durrmeyer X, Dahan S, Delorme P, Blary S, Dassieu G, Caeymaex L, Carbajal R.   +6 more
europepmc   +1 more source

On certain Durrmeyer type operators

Mathematical Communications, 2009
Deo [5] introduced n-th Durrmeyer operators defined for functions integrable in some interval I. There are gaps and mistakes in some of his lemmas and theorems. Further, in his paper [4] he did not give results on simultaneous approximation as the title reveals. The purpose of this paper is to correct those mistakes.
Agrawal, Purshottam Narayan, Gairola, Asha Ram   +1 more
openaire   +1 more source

Approximation by complex Durrmeyer-Stancu type operators in compact disks [PDF]

Liang Zeng, Mei-Ying Ren, Xiao-Ming Zeng
core   +1 more source

Coefficient bounds for starlike functions involving q- Hurwitz-Lerch Zeta operator in conic region. [PDF]

Heliyon
Uma K, Vijaya K.
europepmc   +1 more source

Effect of Atropine With Propofol vs Atropine With Atracurium and Sufentanil on Oxygen Desaturation in Neonates Requiring Nonemergency Intubation: A Randomized Clinical Trial.

JAMA, 2018
Durrmeyer X, Breinig S, Claris O, Tourneux P, Alexandre C, Saliba E, Beuchée A, Jung C, Levy C, Marchand-Martin L, Marcoux MO, Dechartres A, Danan C, PRETTINEO Research Group.   +13 more
europepmc   +1 more source

Some of the next articles are maybe not open access.

Related searches:

Approximation by q-Durrmeyer operators

Journal of Applied Mathematics and Computing, 2008
The \(q\)-Durrmeyer operators were recently introduced by \textit{V. Gupta} [Appl. Math. Comput. 197, No.~1, 172--178 (2008; Zbl 1142.41008)]. In the present paper, the authors establish new and interesting approximation properties of the mentioned operators. The first main result,contained in Theorem 1, expresses the degree of local approximation of a
Zoltan Finta, Vijay Gupta
exaly   +3 more sources

Some approximation results for Durrmeyer operators

Applied Mathematics and Computation, 2011
This paper deals with approximations on \(C_B([0,\infty))\). The authors consider a modified form of the Durrmeyer operator \(D^{\land}_n\) by composing it with the sequence \(\frac{(n-2c)x-1}{n}\) . Theorem 3.1 then gives an estimate for approximating \(f\) by \(D_n^{\land}(f)\) in terms of the \(\omega_2(f, \sqrt{\delta})\) function for \(n>3c\).
Naokant Deo, Neha Bhardwaj
exaly   +2 more sources

On the modification of the Szaśz–Durrmeyer operators

Georgian Mathematical Journal, 2016
Abstract In this paper we consider the modification of Szász–Durrmeyer operators based on the Jain basis function. Voronovskaya-type estimates of point-wise convergence along with its quantitative version based on the weighted modulus of smoothness are given. Moreover, a direct approximation theorem for the operators is proved.
Aral, Ali, Deniz, Emre, Gupta, Vijay
openaire   +1 more source