\lambda(a,b): = max_{a \leq x \leq b} sumⁿ_{k = 1} |\ell_k (x)|, -1 \leq a < b \leq 1. The present paper and a former paper by the first two authors [Acta Math. Acad. Sci. Hungar 32, 191-195 (1978; Zbl 391.41003)] deal with lower bound estimates of the function \lambda_n(x): = sumⁿ_{k = 0} |\ell_k(x)|. In the above mentioned paper it was shown that for any interval [a,b]\subseteq [-1,1] and arbitrary nodes x_k the inequality

holds for sufficiently large n depending only on the interval [a,b ]. This inequality was an improvement of Bernstein's \lambda_n (a,b) \geq c₁ log n, n \geq n₁ (a,b). A further improvement is shown in the present paper, namely a similar inequality is derived for every individual interval [a_n, b_n ]\subseteq [-1,1] and for all n without exception. The result states
Theorem. There exists an absolute positive constant c for which the inequality

In fact the authors show the sharpness, in a sense, of their estimate by showing that

Reviewer:  Z.Rubinstein (Haifa)
Classif.:  * 41A05 Interpolation
Citations:  Zbl 391.41003

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