Results 61 to 70 of about 348 (90)

Approximation by ( p , q ) -Lupaş-Schurer-Kantorovich operators. [PDF]

J Inequal Appl, 2018
Kanat K, Sofyalıoğlu M.
europepmc   +1 more source

Multivariate q-Bernstein-Schurer-Kantorovich Operators [PDF]

Journal of Mathematics and System Science, 2016
null D. K. Vishwakarma, null Artee, null Alok Kumar, null Ajay Kumar   +3 more
openaire   +1 more source

Uniform approximation by generalized $q$-Bernstein operators [PDF]

, 2016
Finta, Zoltan
core   +1 more source

Q-Bernstein-Schurer Operators on a Triangle with One Curved Side

International conference KNOWLEDGE-BASED ORGANIZATION
Abstract We construct q-Bernstein-Schurer type operators defined on a triangle with one curved side. They are extensions of the Bernstein-Schurer type operators, given by Schurer F., to the case of a curved domain. There are constructed the univariate q-Bernstein-Schurer type operators and their product operator and are studied some ...
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Approximation by complex Durrmeyer-Stancu type operators in compact disks [PDF]

Liang Zeng, Mei-Ying Ren, Xiao-Ming Zeng
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Abstracts of the XXV Congress of the International Society on Thrombosis and Haemostasis, June 20-25, 2015. [PDF]

J Thromb Haemost, 2015
europepmc   +1 more source

Security of image transfer and innovative results for (p,q)-Bernstein-Schurer operators

AIMS Mathematics
With the advent of quantum computing, traditional cryptography algorithms are at risk of being broken. Post-quantum encryption algorithms, developed to include mathematical challenges to make it impossible for quantum computers to solve problems, are constantly being updated to ensure that sensitive information is protected from potential threats.
Nazmiye Gonul Bilgin, Yusuf Kaya, Melis Eren   +2 more
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Bivariate q-Bernstein-Schurer-Kantorovich Operators

Results in Mathematics, 2014
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Zoltan Finta, A Sathish Kumar
exaly   +7 more sources

On q-analogue of Bernstein–Schurer–Stancu operators

Applied Mathematics and Computation, 2013
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Vijay Gupta, A Sathish Kumar
exaly   +3 more sources

Approximation properties of $$\mu $$-Bernstein–Schurer–Stancu operators

Bulletin of the Iranian Mathematical Society, 2023
The authors introduce the below operator which is called \(\mu\)-Bernstein-Schurer-Stancu operator from \(C[0,1]\) to \(C[0,1]\) \[ \overline{BSS}_{n}^{\alpha \beta}(g;y) = \sum_{k=0}^{n} g\left(\frac{k+\alpha}{n+\beta}\right) \overline{b}_{n,k}(\mu,y) \] where \(\alpha,\beta\) are real parameters and \begin{align*} \overline{b}_{m,0}(\mu,y) & =b_{m,0}(
Naim L Braha, Toufik Mansour
exaly   +3 more sources