2004 | OriginalPaper | Buchkapitel
Spherical Orthogonal Polynomials and Symbolic-Numeric Gaussian Cubature Formulas
verfasst von : Annie Cuyt, Brahim Benouahmane, Brigitte Verdonk
Erschienen in: Computational Science - ICCS 2004
Verlag: Springer Berlin Heidelberg
Enthalten in: Professional Book Archive
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It is well-known that the classical univariate orthogonal polynomials give rise to highly efficient Gaussian quadrature rules. We show how the classical orthogonal polynomials can be generalized to a multivariate setting and how this generalization leads to Gaussian cubature rules for specific families of multivariate polynomials.The multivariate homogeneous orthogonal functions that we discuss here satisfy a unique slice projection property: they project to univariate orthogonal polynomials on every one-dimensional subspace spanned by a vector from the unit hypersphere. We therefore call them spherical orthogonal polynomials.