Approximation by polynomials with only real critical points
Abstract
We strengthen the Weierstrass approximation theorem by proving that any real-valued continuous function on an interval I ⊂ R can be uniformly approximated by a real-valued polynomial whose only (possibly complex) critical points are contained in I. The proof uses a perturbed version of the Chebyshev polynomials and an application of the Brouwer fixed point theorem.
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