Orthogonal Laurent polynomials of two real variables

Abstract

In this paper we consider an appropriate ordering of the Laurent monomials xiyj, i,j ∈ Z that allows us to study sequences of orthogonal Laurent polynomials of the real variables x and y with respect to a positive Borel measure μ defined on R2 such that \ x=0 \ \ y=0 \ ∈ supp(μ). This ordering is suitable for considering the multiplication plus inverse multiplication operator on each varibale ( x+1x. and . y+1y), and as a result we obtain five-term recurrence relations, Christoffel-Darboux and confluent formulas for the reproducing kernel and a related Favard's theorem. A connection with the one variable case is also presented, along with some applications for future research.

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