Minimal Cubature rules and polynomial interpolation in two variables

Abstract

Minimal cubature rules of degree 4n-1 for the weight functions W,, 12(x,y) = |x+y|2+1 |x-y|2+1 ((1-x2)(1-y2)) 12 on [-1,1]2 are constructed explicitly and are shown to be closed related to the Gaussian cubature rules in a domain bounded by two lines and a parabola. Lagrange interpolation polynomials on the nodes of these cubature rules are constructed and their Lebesgue constants are determined.