The degree-(n+1) polynomials are the most difficult C^(\,n + 1) functions to uniformly approximate with degree-n polynomials
classification
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keywords
boundsdegreedegree-errorpolynomialpolynomialswhenapproximate
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There exist well-known tight bounds on the error between a function $f \in C^{\,n + 1}([-1, 1])$ and its best polynomial approximation of degree $n$. We show that the error meets these bounds when and only when $f$ is a polynomial of degree $n + 1$.
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