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Voronovskaja Type Approximation Theorem for q-Szasz–Schurer Operators
2016In 2011, Ozarslan (Miscolc Math Notes, 12:225–235, 2011) introduced the q-Szasz–Schurer operators and investigated their approximation properties. In the present paper, we state the Voronovskaja-type asymptotic formula for q-analogue of Szasz–Schurer operators.
Tuba Vedi, Mehmet Ali Özarslan
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Statistical Convergence via q-Calculus and a Korovkin’s Type Approximation Theorem
Axioms, 2022Mohammad Ayman Mursaleen +1 more
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A Quantitative Variant of Voronovskaja's Theorem for King-Type Operators
2019In this note we establish a quantitative Voronovskaja theorem for modified Bernstein polynomials using the first order Ditzian-Totik modulus of smoothness.
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Derivatives of symplectic eigenvalues and a Lidskii type theorem
Canadian Journal of Mathematics, 2022Tanvi Jain
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Korovkin type theorem for Bernstein–Kantorovich operators via power summability method
Analysis and Mathematical Physics, 2020Naim Braha
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Weighted statistical convergence and its application to Korovkin type approximation theorem
Applied Mathematics and Computation, 2012Vatan Karakaya, Müzeyyen Ertürk
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An improved Razumikhin-type theorem and its applications
IEEE Transactions on Automatic Control, 1994Bugong Xu
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A formulation of the fractional Noether-type theorem for multidimensional Lagrangians
Applied Mathematics Letters, 2012Agnieszka B Malinowska
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