A family of minimal cubature rules is established on an unbounded domain, which is the first such family known on unbounded domains. The nodes of such cubature rules are common zeros of certain orthogonal polynomials on the unbounded domain, which are also constructed.
Minimal Cubature rules and polynomial interpolation in two variables
Minimal Cubature rules and polynomial interpolation in two variables II
On the existence of orthogonal polynomials for oscillatory weights on a bounded interval
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