Landau-Kolmogorov inequality

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Landau-Kolmogorov inequality is an inequality between different derivatives of a function. There are many inequalities holding this name (sometimes they are also called Kolmogorov type inequalities), common formula is:

$\|f^{(k)}\|_{L_q(T)} \le K \cdot \|f\|^\alpha_{L_p(T)} \cdot \|f^{(n)}\|^{1-\alpha}_{L_r(T)}$ , where $(1\le k < n)$ .

Here all three norms can be different from each other (from $L 1$ to $L_\infty$ ), giving different inequalities. These inequalities also can be written for function spaces on axis, semiaxis or closed segment (it is denoted by $T$ )—it also gives bunch of different inequalities. These inequalities are still intensively studied. Most honourable results are those where exact value of minimal constant $K = K T (n, k, q, p, r)$ is found.

[edit] History

Inequality of this type was firstly established by Hardy, Littlewood and Polya. Some exact constants ( $K_{R_+}(2, 1, \infty, \infty, \infty) = 2$ ) were found by Landau in:

E. Landau, “Ungleichungen fũr zweimal differenzierbar Funktionen”, Proc. London Math. Soc., 13 (1913), 43–49.

Kolmogorov obtained one of the most outstanding results in this field, with all three norms equal to $L_\infty$ , he found $K_{R}(n, k, \infty, \infty, \infty)$ .

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Category: Inequalities

Landau-Kolmogorov inequality

From Wikipedia, the free encyclopedia

[edit] History

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