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In this article by means of shifted knots properties, we introduce a new type of coupled Bernstein operators for Bézier basis functions. First, we construct the operators based on shifted knots properties of Bézier basis functions then investigate the Korovkin's theorem, establish a local approximation theorem, and provide a convergence theorem for Lipschitz continuous functions and Peetre's K -functional. In addition, we also obtain an asymptotic formula of the type Voronovskaja.
Mursaleen et al. (Mon,) studied this question.
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