On the continuity in q of the family of the limit q-Durrmeyer operators
Demonstratio MathematicaThis study deals with the one-parameter family {Dq}q∈[0,1]{\left\{{D}_{q}\right\}}_{q\in \left[0,1]} of Bernstein-type operators introduced by Gupta and called the limit qq-Durrmeyer operators.
Yılmaz Övgü Gürel +2 more
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Propofol versus placebo (with rescue with ketamine) before less invasive surfactant administration: study protocol for a multicenter, double-blind, placebo controlled trial (PROLISA). [PDF]
BMC Pediatr, 2020 Chevallier M +4 more
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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 +1 more
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Szász-Durrmeyer operators involving Boas-Buck polynomials of blending type. [PDF]
J Inequal Appl, 2017 Sidharth M, Agrawal PN, Araci S.
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Approximation for Modified Baskakov Durrmeyer Type Operators
Rocky Mountain Journal of Mathematics, 2009 The article is devoted to approximation by the following operators that are a certain type of Baskakov-Durrmeyer operators. For \(x\in[0,\infty)\) and \(\alpha>0\), \[ B_{n,\alpha}(f,x)= \sum_{k=1}^\infty p_{n,k,\alpha}(x) \int_0^\infty b_{n,k,\alpha}(t)f(t)\,dt +(1+\alpha x)^{-n/\alpha}f(0)= \int_0^\infty W_{n,\alpha}(x,t)f(t)\,dt, \] where \[ \begin ...
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Durrmeyer type Lototsky-Chlodowsky operators
FilomatIn this paper, we present a introduction to Durrmeyer type Lototsky-Chlodowsky operators. We explore their approximation properties within a weighted function space. Subsequently, we derive the rates of convergence utilizing the second modulus of continuity. Moreover, we investigate the convergence rates in the L1 space.
Serin Kutlu +2 more
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On approximation by Stancu variant of Bernstein-Durrmeyer-type operators in movable compact disks
Demonstratio MathematicaIn this study, we introduce a kind of Stancu variant of the complex Bernstein-Durrmeyer-type operators in movable compact disks. Their approximation properties for analytic functions in the movable compact disks are investigated.
Yu Danshegn, Pang Zhaojun
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Quantitative-Voronovskaya and Grüss-Voronovskaya type theorems for Szász-Durrmeyer type operators blended with multiple Appell polynomials. [PDF]
J Inequal Appl, 2017 Neer T, Agrawal PN.
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Approximation by ( p , q ) -Lupaş-Schurer-Kantorovich operators. [PDF]
J Inequal Appl, 2018 Kanat K, Sofyalıoğlu M.
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Shape-preserving properties of a new family of generalized Bernstein operators. [PDF]
J Inequal Appl, 2018 Cai QB, Xu XW.
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