Project-Team:APICS

Inria | Raweb 2015 | Presentation of the Project-Team APICS | APICS Web Site


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Section: New Results

Orthogonal Polynomials

Participant : Laurent Baratchart.

We studied this year the asymptotic behavior of the orthonormal polynomials $P_{n}$ with respect to a non-negative weight $w$ on a simply connected planar domain $Ω$ :

\int_{Ω} P_{n} {\bar{P}}_{k} w d m = δ_{n, k},

with $δ_{n, k}$ the Kronecker symbol. We proved that if $Ω$ has boundary $\partial Ω$ of class $C^{1, α}$ , $α > 0$ , and if $w$ converges in some appropriate sense to a boundary function $w_{1} \in L^{p} (\partial Ω)$ while not vanishing “too much” at the boundary, then

P_{n} (z) = {(\frac{n + 1}{π})}^{1 / 2} z^{n} S_{w_{1}}^{-} (Φ (z)) Φ^{n} (z) Φ^{'} (z) {1 + o (1)}

outside the convex hull of $Ω$ , with $Φ$ the conformal map from the complement of $Ω$ onto the complement of the unit disk normalized so that $Φ^{'} (\infty) = \infty$ , and $S_{w_{1}}^{-}$ the so-called exterior Szegő function of $w_{1}$ .

This generalizes considerably known asymptotics on analytic domains with Hölder smooth non vanishing weights [10] . The proof rests on some Hardy space theory, conformal mapping and $\bar{\partial}$ techniques. An exposition of the result was given at the conference Orthogonal and Multiple Orthogonal Polynomials, August 9-14 2015, Oaxaca (Mexico). An article is being written to report on this result.

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