Second order difference equations and discrete orthogonal polynomials of two variables

Abstract

The second order partial difference equation of two variables u:= A1,1(x) 1 ∇1 u + A1,2(x) 1 ∇2 u + A2,1(x) 2 ∇1 u + A2,2(x) 2 ∇2 u & + B1(x) 1 u + B2(x) 2 u = λ u, is studied to determine when it has orthogonal polynomials as solutions. We derive conditions on so that a weight function W exists for which W u is self-adjoint and the difference equation has polynomial solutions which are orthogonal with respect to W. The solutions are essentially the classical discrete orthogonal polynomials of two variables.

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