2004
DOI: 10.1016/j.aim.2003.08.015
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The Riemann–Hilbert approach to strong asymptotics for orthogonal polynomials on [−1,1]

Abstract: We consider polynomials that are orthogonal on [−1, 1] with respect to a modified Jacobi weight (1 − x) α (1 + x) β h(x), with α, β > −1 and h real analytic and stricly positive on [−1, 1]. We obtain full asymptotic expansions for the monic and orthonormal polynomials outside the interval [−1, 1], for the recurrence coefficients and for the leading coefficients of the orthonormal polynomials. We also deduce asymptotic behavior for the Hankel determinants and for the monic orthogonal polynomials on the interval… Show more

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Cited by 247 publications
(535 citation statements)
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“…Finally, the matching condition (8.5) in condition (4) of the RH problem for Q is satisfied by results of [41]. We have thus established the following.…”
Section: Casementioning
confidence: 69%
See 4 more Smart Citations
“…Finally, the matching condition (8.5) in condition (4) of the RH problem for Q is satisfied by results of [41]. We have thus established the following.…”
Section: Casementioning
confidence: 69%
“…Again, we may deform the contours ∆ ± 2 near 0 in such a way that f maps ∆ ± 2 ∩ B δ to the rays with angles 2π 3 and − 2π 3 , respectively. It follows from [41] that for any analytic prefactor E, we have that…”
Section: Casementioning
confidence: 99%
See 3 more Smart Citations