Geodesic
An Extremal Property of Chebyshev Polynomials
Trudy Matematicheskogo Instituta imeni V.A. Steklova, Studies on function theory and differential equations, Tome 248 (2005), pp. 237-249.

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For any integer $k\ge 1$, in the metric of weighted classes $L^2(\omega )$, sharp two-sided inequalities of the form $\gamma _k\bigl |\int G^{(k)}(x) \nu _k(x)\,dx\bigr |^2\le \bigl [\mathrm {dist}_{L^2(\omega )}(G,\mathcal P_{k-1})\bigr ]^2\le \gamma _k\int \bigl |G^{(k)}(x)\bigr |^2\nu _k(x)\,dx$ are obtained for the distance between an element $G$ and the subspace $\mathcal P_{k-1}$ of all polynomials of degree ${\le }\,k-1$; these inequalities reduce to equalities for Chebyshev-type polynomials of degree $k$. On the real axis with $\omega (x)=\nu _k(x)=\frac {1}{\sqrt {2\pi }}\,e^{-x^2/2}$ and $\gamma _k=1/k!$, a precise extension of the Chernoff inequality ($k=1$) is obtained for all $k\ge 1$. 
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     author = {V. D. Stepanov},
     title = {An {Extremal} {Property} of {Chebyshev} {Polynomials}},
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     url = {http://geodesic.mathdoc.fr/item/TM_2005_248_a21/}
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V. D. Stepanov. An Extremal Property of Chebyshev Polynomials. Trudy Matematicheskogo Instituta imeni V.A. Steklova, Studies on function theory and differential equations, Tome 248 (2005), pp. 237-249. http://geodesic.mathdoc.fr/item/TM_2005_248_a21/

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