Strong Asymptotics of Jacobi-Type Kissing Polynomials

Abstract

We investigate asymptotic behavior of polynomials pωn(z) satisfying varying non-Hermitian orthogonality relations ∫-11 xkpωn(x)h(x) ei ω xd x =0, k∈\0,…,n-1\, where h(x) = h*(x) (1 - x)α (1 + x)β, \ ω = λ n, \ λ ≥ 0 and h(x) is holomorphic and non-vanishing in a certain neighborhood in the plane. These polynomials are an extension of so-called kissing polynomials (α = β = 0) introduced in connection with complex Gaussian quadrature rules with uniform good properties in ω.

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