On the rates of pointwise convergence for Bernstein polynomials

Abstract

Let f be a real function defined on the interval [0,1] which is constant on (a,b)⊂ [0,1], and let Bnf be its associated nth Bernstein polynomial. We prove that, for any x∈ (a,b), |Bnf(x)-f(x)| converges to 0 as n→ ∞ at an exponential rate of decay. Moreover, we show that this property is no longer true at the boundary of (a,b). Finally, an extension to Bernstein-Kantorovich type operators is also provided

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