Results 281 to 290 of about 1,879,053 (313)

Exponential Kantorovich-Stancu operators

Bulletin of the Transilvania University of Brasov. Series III: Mathematics and Computer Science
In this paper we will obtain some Bernstein-Kantorovich operators modified in Stancu sense which preserve exponential function eμx, where μ > 0. Concerning these operators we prove they verify Korovkin’s theorem conditions and also that they approximate functions from a weighted Lp space.
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Order of Approximation for Exponential Sampling Type Neural Network Operators

Results in Mathematics, 2023
S. Bajpeyi
semanticscholar   +1 more source

Symmetric Composition of Exponential Type Operators

Journal of Fourier Analysis and Applications
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Qiuhui Chen, Tao Qian
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New exponential operation laws and operators for interval-valued q-rung orthopair fuzzy sets in group decision making process

Neural computing & applications (Print), 2021
Harish Garg
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Exponential and Trigonometric Operators

1997
Consider a Hermitian operator O. The exponential operator, $$ e^{i\mathcal{O}}=1+i\mathcal{O}+\frac{(i\mathcal{O})^{3}}{3!}+... $$ (45.1) forms a unitary (but non-Hermitian) operator. If the operator P commutes with the operator O, that is [O,P]= 0, then it also commutes with the exponential operator, so that $$ \mathcal{P}e^{i\mathcal{O}}
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Exponential Rank and Exponential Length of Operators on Hilbert C * - Modules

The Annals of Mathematics, 1993
\(S_ \infty\) désigne la classe des \(C^*\)-algèbres \(A\) simples, \(\sigma\)-unifères, possédant une projection infinie dans \(A\otimes K\); et \(C_ 0\) la classe des \(C^*\)-algèbres \(A\) \(\sigma\)-unifères, admettant une unité approchée formée de projections et telles que \([p]+ [r]= [q]+ [r]\) entraîne \([p]= [q]\) dans le semigroupe des classes
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Approximation by exponential sampling type neural network operators

Analysis and Mathematical Physics, 2021
S. Bajpeyi, ·. A. S. Kumar, spear-B A. Sathish Kumar   +2 more
semanticscholar   +1 more source

Approximation by Some Baskakov–Kantorovich Exponential-Type Operators

Bulletin of the Iranian Mathematical Society, 2021
Firat Ozsarac, Vijay Gupta, A. Aral
semanticscholar   +1 more source

Exponential Type Operators

2021
Vijay Gupta, Michael Th. Rassias
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Semi-exponential Post-Widder operators

Carpathian Journal of Mathematics
This paper focuses on the Post-Widder operators of semi-exponential type. We present an al ternative and straightforward approach using Laplace transforms to analyze these operators. Additionally, we derive specific results concerning various moduli of continuity.
Gupta, Vijay, Muraru, Carmen Violeta, Radu, Voichiţa Adriana   +2 more
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