The Lototsky Transform and Bernstein Polynomials

J. P. King

doi:10.4153/CJM-1966-011-1

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The Bernstein polynomials

associated with a function f denned on [0, 1] have been the subject of much recent research and have been generalized in several directions (1 ; 2 ; 5). The generalized Lototsky or [F, dn] matrix (3) has also been the subject of extensive research.

References

1. Cheney, E. W. and Sharma, A., Bernstein power series, Can. J. Math., 16 (1964), 241–252.Google Scholar

2. Gergen, J. J., Dressel, F. G., and Purcell, W. H. Jr., Convergence of extended Bernstein polynomials in the complex plane, Pacific J. Math., 13 (1963), 1171–1180.Google Scholar

3. Jakimovski, A., A generalization of the Lototsky method of summability, Michigan Math. J., (1959), 277–290.Google Scholar

4. Korovkin, P., Linear operators and approximation theory (translated from Russian edition of 1959, Delhi, 1960).Google Scholar

5. Meyer-König, W. and Zeller, K., Bernsteinsche Potenzreihen, Studia Math., 19 (1960), 89–94.Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

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Schempp, Walter 1971. Zur Lototsky ? Transformation �ber kompakten R�umen von Wahrscheinlichkeitsmassen. Manuscripta Mathematica, Vol. 5, Issue. 3, p. 199.

Eisenberg, Sheldon and Wood, Bruce 1972. Approximation of analytic functions by Bernstein-type operators. Journal of Approximation Theory, Vol. 6, Issue. 3, p. 242.

Swetits, J. and Wood, B. 1973. On a Class of Positive Linear Operators. Canadian Mathematical Bulletin, Vol. 16, Issue. 4, p. 557.

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Garrancho, P. Cárdenas-Morales, D. and Aguilera, F. 2011. On asymptotic formulae via summability. Mathematics and Computers in Simulation, Vol. 81, Issue. 10, p. 2174.

Dikmen, Akif Barbaros and Lukashov, Alexey 2013. WITHDRAWN: Weighted approximation by analogues of Bernstein operators for rational functions. Journal of Mathematical Analysis and Applications,

Dikmen, A. B. and Lukashov, A. 2014. Weighted Approximation by Analogues of Bernstein Operators for Rational Functions. Acta Mathematica Hungarica, Vol. 143, Issue. 2, p. 439.

Cárdenas-Morales, Daniel and Garrancho, Pedro 2016. Mathematical Analysis, Approximation Theory and Their Applications. Vol. 111, Issue. , p. 463.

Dikmen, Akif Barbaros and Lukashov, Alexey 2016. Generating functions method for classical positive operators, their q-analogues and generalizations. Positivity, Vol. 20, Issue. 2, p. 385.

Xu, Xiao-Wei Zeng, Xiao-Ming and Goldman, Ron 2017. Shape preserving properties of univariate Lototsky–Bernstein operators. Journal of Approximation Theory, Vol. 224, Issue. , p. 13.

Goldman, Ron Xu, Xiao-Wei and Zeng, Xiao-Ming 2018. Applications of the Shorgin Identity to Bernstein Type Operators. Results in Mathematics, Vol. 73, Issue. 1,

Xu, Xiao-Wei and Goldman, Ron 2019. On Lototsky–Bernstein operators and Lototsky–Bernstein bases. Computer Aided Geometric Design, Vol. 68, Issue. , p. 48.

Popa, Dumitru 2020. Intermediate Voronovskaja type results for the Lototsky–Bernstein type operators. Revista de la Real Academia de Ciencias Exactas, Físicas y Naturales. Serie A. Matemáticas, Vol. 114, Issue. 1,

Popa, Dumitru 2021. The Korovkin Parabola Envelopes Method and Voronovskaja-Type Results. Mediterranean Journal of Mathematics, Vol. 18, Issue. 4,

Abel, Ulrich and Agratini, Octavian 2021. On the Durrmeyer-Type Variant and Generalizations of Lototsky–Bernstein Operators. Symmetry, Vol. 13, Issue. 10, p. 1841.

Khan, Asif Iliyas, Mohammad and Mursaleen, Mohammad 2023. Approximation of Lebesgue integrable functions by Bernstein-Lototsky-Kantorovich operators. Rendiconti del Circolo Matematico di Palermo Series 2, Vol. 72, Issue. 2, p. 1453.

Kumar, Ajay Senapati, Abhishek and Som, Tanmoy 2024. Convergence properties of new $$\alpha $$-Bernstein–Kantorovich type operators. Indian Journal of Pure and Applied Mathematics,

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