Scopus
YÖKSİS DOI Eşleşti
SJR Q1
Iterated Boolean Sums of Bernstein Type Operators
Numerical Functional Analysis and Optimization · Eylül 2020
YÖKSİS Kayıtları
Iterated Boolean Sums of Bernstein Type Operators
NUMERICAL FUNCTIONAL ANALYSIS AND OPTIMIZATION · 2020 SCI-Expanded
Prof. Dr. TUNCER ACAR →
YÖKSİS Kayıtları — ISSN Eşleşmesi
Iterated Boolean Sums of Bernstein Type Operators
2020 ISSN: 0163-0563 SCI-Expanded
Prof. Dr. TUNCER ACAR →
Approximation by Sampling Durrmeyer Operators in Weighted Space of Functions
2022 ISSN: 0163-0563 SCI-Expanded Q2
Arş. Gör. METİN TURGAY →
Approximation by sampling Durrmeyer operators in weighted space of functions
2022 ISSN: 0163-0563 SCI-Expanded Q2
Prof. Dr. TUNCER ACAR →
Bivariate Bernstein Chlodovsky operators preserving exponential functions and their convergence properties
2024 ISSN: 0163-0563 SCI-Expanded Q3
Prof. Dr. TUNCER ACAR →
Makale Bilgileri
ISSN01630563
Yayın TarihiEylül 2020
Cilt / Sayfa41 · 1515-1527
Scopus ID2-s2.0-85087117457
Özet
The approximation of functions using linear positive operators is affected by saturation. The quality of approximation offered by iterated Boolean sums increases with the regularity of the function. We present some qualitative and quantitative results concerning the approximation by such Boolean sums. The general results are illustrated by examples.
Yazarlar (3)
1
Tuncer Acar
2
Ali Aral
ORCID: 0000-0002-2024-8607
3
Ioan Raşa
Anahtar Kelimeler
Bernstein polynomials
Boolean sums
iterated operators
Kurumlar
Kirikkale Üniversitesi
Kirikkale Turkey
Selçuk Üniversitesi
Selçuklu Turkey
Universitatea Tehnica din Cluj-Napoca
Cluj Napoca Romania
Scimago Dergi (ISSN Eşleşmesi)
Numerical Functional Analysis and Optimization
Q1
SJR Skoru0,659
H-Index57
YayıncıTaylor and Francis Ltd.
ÜlkeUnited States
Control and Optimization (Q1)
Analysis (Q2)
Computer Science Applications (Q2)
Signal Processing (Q2)
Metrikler
5
Atıf
3
Yazar
3
Anahtar Kelime