A complete extension of the Bernstein-Weierstrass Theorem to the infinite interval (-?, +?) via Chlodovsky polynomials

Karslı, Harun2023-12-202023-12-202022Karsli, H. (2022). A complete extension of the Bernstein–Weierstrass Theorem to the infinite interval (-∞,+∞) via Chlodovsky polynomials. Advances in Operator Theory, 7(2), 15.2662-20092538-225Xhttp://dx.doi.org/10.1007/s43036-021-00178-7https://hdl.handle.net/20.500.12491/11908In the present paper, we consider the very recently introduced Chlodovsky operators on the real line by Abel and Karsli (Mediterr J Math 17:201, 2020). We study some approximation properties of these new operators, which include the rate of convergence and a Voronovskaya type theorem.eninfo:eu-repo/semantics/closedAccessChlodovsky PolynomialsRate of ConvergenceModulus of ContinuityPeetre K-FunctionalLipschitz SpaceVoronovskaya Type TheoremA complete extension of the Bernstein-Weierstrass Theorem to the infinite interval (-?, +?) via Chlodovsky polynomialsArticle10.1007/s43036-021-00178-7721222-s2.0-85123076436Q3WOS:000743524700001N/A