A Chebyshev type alternation theorem for best approximation by a sum of two algebras
Abstract
Let X be a compact metric space, C(X) be the space of continuous real-valued functions on X, and A1, A2 be two closed subalgebras of C(X) containing constant functions. We consider the problem of approximation of a function f∈ C(X) by elements from A1+A2. We prove a Chebyshev type alternation theorem for a function u0∈ A1+A2 to be a best approximation to f.
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