Gerardo Ariznabarreta, Manuel Mañas
Published 2015-03-16Version 1
Darboux transformations for polynomial perturbations of a real multivariate measure are found. The 1D Christoffel formula is extended to the multidimensional realm: multivariate orthogonal polynomials are expressed in terms of last quasi-determinants and sample matrices. The coefficients of these matrices are the original orthogonal polynomials evaluated at a set of nodes, which is supposed to be poised. A discussion for the existence of poised sets and geometrically poised sets is given in terms of algebraic varieties in the complex affine space.
Comments: arXiv admin note: text overlap with arXiv:1409.0570
Linear spectral transformations for multivariate orthogonal polynomials and multispectral Toda hierarchies
Complex Jacobi matrices generated by Darboux transformations
A semiclassical perspective on multivariate orthogonal polynomials
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