18 Orthogonal Polynomials Other Orthogonal Polynomials 18.31 Bernstein–Szegő Polynomials 18.33 Polynomials Orthogonal on the Unit Circle

§18.32 OP’s with Respect to Freud Weights

ⓘ

Keywords:: Freud, Freud weight function, orthogonal polynomials with Freud weights, weight functions
Referenced by:: §18.38(ii), Erratum (V1.0.1) for References
Permalink:: http://dlmf.nist.gov/18.32
Amendment (effective with 1.0.1):: References were added at the end of this section for more general Freud weights.
See also:: Annotations for Ch.18

A Freud weight is a weight function of the form

18.32.1		${w(x)=\exp\left(-Q(x)\right)},$
$-\infty<x<\infty$ ,
ⓘ Symbols: $\exp\NVar{z}$ : exponential function, $w(x)$ : weight function and $x$ : real variable Permalink: http://dlmf.nist.gov/18.32.E1 Encodings: TeX, pMML, png See also: Annotations for §18.32 and Ch.18

where $Q(x)$ is real, even, nonnegative, and continuously differentiable. Of special interest are the cases $Q(x)=x^{2m}$ , $m=1,2,\dots$ . No explicit expressions for the corresponding OP’s are available. However, for asymptotic approximations in terms of elementary functions for the OP’s, and also for their largest zeros, see Levin and Lubinsky (2001) and Nevai (1986). For a uniform asymptotic expansion in terms of Airy functions (§9.2) for the OP’s in the case $Q(x)=x^{4}$ see Bo and Wong (1999).

For asymptotic approximations to OP’s that correspond to Freud weights with more general functions $Q(x)$ see Deift et al. (1999a, b), Bleher and Its (1999), and Kriecherbauer and McLaughlin (1999).

© 2010–2020 NIST / Privacy Policy / Disclaimer / Feedback; Version 1.1.0; Release date 2020-12-15. A printed companion is available. 18.31 Bernstein–Szegő Polynomials 18.33 Polynomials Orthogonal on the Unit Circle