Estimates of the orthogonal polynomials with weight \(\exp (-x^ m)\), m an even positive integer (Q1089480)
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scientific article; zbMATH DE number 4004624
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Estimates of the orthogonal polynomials with weight \(\exp (-x^ m)\), m an even positive integer |
scientific article; zbMATH DE number 4004624 |
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Estimates of the orthogonal polynomials with weight \(\exp (-x^ m)\), m an even positive integer (English)
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1986
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This note announces an inequality for the polynomials of the title, indeed \[ p_ n(x)^ 2\leq A \exp (x^ m)/(x^ 2_{\ln}-x^ 2)^{1/2} \] when \(| x| \leq x_{\ln}\). Here \(x_{\ln}\) is the largest zero of the degree n orthogonal polynomial \(p_ n\), and A is a constant independent of n. The proof depends on the behavior of a differential equation associated with \(p_ n\).
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