Bernstein Theorems in an abstract setting
by
J. M. Almira
Departamento de Matemáticas. Universidad de Jaén
Coauthors: U. Luther (T.U. Chemnitz, Germany)

In 1912, S.N. Bernstein proved that for each null sequence {e_n} there exists a periodic function f such that its errors of best trigonometric polynomial approximation satisfy E_n(f)=e_n for all n. This result was proved by Timan for sequences of errors {E(f, X_n)}, where {X_n} is any chain of finite dimensional subspaces of a separable Banach space X. By the use of the Baire category theorem, Shapiro (see [2]) proved the existence of elements x in X such that E(x, X_n) =/= O(e_n) without assumptions on dim(X_n), and Albinus (see [1]) gave examples of metric spaces of measurable functions which admit a chain of finite dimensional subspaces {X_n} such that E(x, X_n) = O(e_n) for all f in X and a certain null sequence {e_n}. In this paper we will give new proofs of several of these results and we will also improve a few of them. For example, we will prove Bernstein's theorem in the Hilbert setting without assumptions on dim(X_n).

[1] Albinus, G., Remarks on a theorem of S.N. Bernstein, Studia Math. 38 (1970) 227-234.

[2] Shapiro, H., Some negative theorems of Approximation Theory, Michigan Math. J. 11 (1964) 211-217.

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Date received: April 6, 2000