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In this paper, we introduce a new family of generalized Bernstein operators based on q integers, called (α,q)$(\alpha,q)$-Bernstein operators, denoted by Tn,q,α(f)$T_{n,q,\alpha}(f)$. We investigate a Kovovkin-type approximation theorem, and obtain… Click to show full abstract
In this paper, we introduce a new family of generalized Bernstein operators based on q integers, called (α,q)$(\alpha,q)$-Bernstein operators, denoted by Tn,q,α(f)$T_{n,q,\alpha}(f)$. We investigate a Kovovkin-type approximation theorem, and obtain the rate of convergence of Tn,q,α(f)$T_{n,q,\alpha}(f)$ to any continuous functions f. The main results are the identification of several shape-preserving properties of these operators, including their monotonicity- and convexity-preserving properties with respect to f(x)$f(x)$. We also obtain the monotonicity with n and q of Tn,q,α(f)$T_{n,q,\alpha}(f)$.
Journal Title: Journal of Inequalities and Applications
Year Published: 2018
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