正交多项式与扩散算子

Annales de la Faculté des sciences de Toulouse : Mathématiques Pub Date : 2013-09-22 DOI:10.5802/afst.1693

D. Bakry, S. Orevkov, M. Zani

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引用次数: 10

摘要

我们要描述三元组(\Omega， (g)， \mu)，其中(g)是与定义在R^d的定域\Omega上的某个对称二阶微分算子L相关的(co)度规，使得L在L＿2(\mu)的正交多项式的基础上是可展开的，并且\mu是某个可容许测度。到仿射变换为止，我们在二维空间中找到了11个紧定义域，并给出了一些非紧定义域的情况。

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Orthogonal polynomials and diffusion operators

We want to describe the triplets (\Omega, (g), \mu) where (g) is the (co)metric associated to some symmetric second order differential operator L defined on the domain \Omega of R^d and such that L is expandable on a basis of orthogonal polynomials of L_2(\mu), and \mu is some admissible measure. Up to affine transformation, we find 11 compact domains in dimension 2, and also give some non--compact cases in this dimension.

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Annales de la Faculté des sciences de Toulouse : Mathématiques

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