High degree quadrature rules with pseudorandom rational nodes
After introducing the definitions of positive, negative and companion rules, from a given pair of companion rules we construct a new rule with higher degree of precision The scheme is generalized giving rise to a transformation which we call the mean rule. We show that the mean rule is the best approximation, in the sense of least-squares, obtained from a linear combination of two rules of the same degree of precision. Finally, we show that a rule of degree 2k+1 can be constructed as linear combination of k+1 rules of degree one and rational pseudorandom nodes. Several worked examples are presented.
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