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Abstract

The paper concerns best constants in Markov-type inequalities between the norm of a higher derivative of a polynomial and the norm of the polynomial itself. The norm of the polynomial and its derivative is taken in $L^{2}$ on the interval $(- 1, 1)$ with the weight ${(1 - t^{2})}^{α}$ and ${(1 - t^{2})}^{β}$ , respectively. Under the assumption that $β - α$ is larger than the order of the derivative, we determine the leading term of the asymptotics of the constants as the degree of the polynomial goes to infinity.

Keywords

Markov inequality Gegenbauer weight matrix norm

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Asymptotically sharp inequalities for polynomials involving mixed Gegenbauer norms

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