Diffusion orthogonal polynomials in 3-dimensional domains bounded by developable surfaces
Abstract
The following problem is studied: describe the triplets , , where is the (co)metric associated with the symmetric second order differential operator defined on a domain of and such that there exists an orthonormal basis of made of polynomials which are eigenvectors of , and the basis is compatible with the filtration of the space of polynomials with respect to some weighted degree. In a joint paper with D. Bakry and M. Zani this problem was solved in dimension 2 for the usual degree. In the author's subsequent paper this problem was solved in dimension 2 for any weighted degree. In the present paper this problem is solved in dimension 3 for the usual degree under the condition that contains a piece of a tangent developable surface. The proof is based on Pl\"ucker-like formulas in the form given by Ragni Piene. All the found solutions are generalized for any dimension.
Cite
@article{arxiv.2210.15100,
title = {Diffusion orthogonal polynomials in 3-dimensional domains bounded by developable surfaces},
author = {S. Yu. Orevkov},
journal= {arXiv preprint arXiv:2210.15100},
year = {2024}
}
Comments
29 pages