最小立方规则和 Koornwinder 多项式

arXiv - MATH - Classical Analysis and ODEs Pub Date : 2024-07-13 DOI:arxiv-2407.09903

Yuan Xu

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引用次数: 0

摘要

Koornwinder 在其经典论文[5]中研究了由对称多项式派生的双变量正交多项式族。这个族具有一个罕见的性质，即度为 $n$ 的正交多项式有$n(n+1)/2$ 的实公共零点，这导致了最小立方规则理论中的重要实例。本文旨在介绍两变量的极小立方规则和源于 Koornwinder 多项式的例子，并将提供进一步的例子。

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Minimal cubature rules and Koornwinder polynomials

In his classical paper [5], Koornwinder studied a family of orthogonal polynomials of two variables, derived from symmetric polynomials. This family possesses a rare property that orthogonal polynomials of degree $n$ have $n(n+1)/2$ real common zeros, which leads to important examples in the theory of minimal cubature rules. This paper aims to give an account of the minimal cubature rules of two variables and examples originating from Koornwinder polynomials, and we will also provide further examples.

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arXiv - MATH - Classical Analysis and ODEs

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