Inverse Problems, Sobolev–Chebyshev Polynomials, and Asymptotics

Pub Date : 2024-04-06 DOI:10.1007/s11253-024-02281-3
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Abstract

Let (u, v) be a pair of quasidefinite and symmetric linear functionals with {Pn}n≥0 and {Qn}n≥0 as respective sequences of monic orthogonal polynomial (SMOP). We define a sequence of monic polynomials {Rn}n≥0 as follows:

\(\begin{array}{cc}\frac{{P}_{n+2}^{\mathrm{^{\prime}}}\left(x\right)}{n+2}+{b}_{n}\frac{{P}_{n}^{\mathrm{^{\prime}}}\left(x\right)}{n}-{Q}_{n+1}\left(x\right)={d}_{n-1}\left(x\right),& n\ge 1.\end{array}\)

We present necessary and sufficient conditions for {Rn}n≥0 to be orthogonal with respect to a quasidefinite linear functional w. In addition, we consider the case where {Pn}n≥0 and {Qn}n≥0 are monic Chebyshev polynomials of the first and second kinds, respectively, and study the relative outer asymptotics of Sobolev polynomials orthogonal with respect to the Sobolev inner product

\(\langle p,q\rangle s=\underset{-1}{\overset{1}{\int }}pq{\left(1-{x}^{2}\right)}^{-1/2}dx+{\uplambda }_{1}\underset{-1}{\overset{1}{\int }}{p}^{\mathrm{^{\prime}}}{q}^{\mathrm{^{\prime}}}{\left(1-{x}^{2}\right)}^{1/2}dx+{\uplambda }_{2}\underset{-1}{\overset{1}{\int }}{p}^{\mathrm{^{\prime}}\mathrm{^{\prime}}}{q}^{\mathrm{^{\prime}}\mathrm{^{\prime}}}d\mu \left(x\right),\)

where μ is a positive Borel measure associated with w and λ1, λ2 > 0; λ2 is a linear polynomial of λ1.

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逆问题、索博列夫-切比雪夫多项式和渐近性
设 (u, v) 是一对准无限对称线性函数,{Pn}n≥0 和 {Qn}n≥0 分别是单正交多项式(SMOP)序列。我们对一元多项式序列 {Rn}n≥0 的定义如下: \(\begin{array}{cc}\frac{{P}_{n+2}^{\mathrm{^{\prime}}}\left(x\right)}{n+2}+{b}_{n}\frac{{P}_{n}^{\mathrm{^{\prime}}}\left(x\right)}{n}-{Q}_{n+1}\left(x\right)={d}_{n-1}\left(x\right),& n\ge 1.\end{array}\) 我们提出了{Rn}n≥0 相对于准无限线性函数 w 正交的必要条件和充分条件。此外,我们还考虑了{Pn}n≥0和{Qn}n≥0分别是第一种和第二种单切比雪夫多项式的情况,并研究了关于索波列夫内积 \(\langle p.)正交的索波列夫多项式的相对外渐近线、q\rangle s=\underset{-1}{\overset{1}{\int }}pq{\left(1-{x}^{2}\right)}^{-1/2}dx+{\uplambda }_{1}\underset{-1}{\overset{1}{\int }}{p}^{\mathrm{^{\prime}}}{q}^{\mathrm{^{\prime}}}{\left(1-{x}^{2}\right)}^{1/2}dx+{\uplambda }_{2}\underset{-1}{\overset{1}{\int }}{p}^{\mathrm{^{\prime}}\mathrm{^{\prime}}}{q}^{\mathrm{^{\prime}}\mathrm{^{\prime}}}d\mu \left(x\right),\),其中 μ 是与 w 相关联的正 Borel 度量,λ1, λ2 >;0; λ2 是 λ1 的线性多项式。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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