Quadrature as a least-squares and minimax problem

Abstract

The vector of weights of an interpolatory quadrature rule with n preassigned nodes is shown to be the least-squares solution ω of an overdetermined linear system here called the fundamental system of the rule. It is established the relation between ω and the minimax solution z of the fundamental system, and shown the constancy of the ∞-norms of the respective residual vectors which are equal to the principal moment of the rule. Associated to ω and z we define several parameters, such as the angle of a rule, in order to assess the main properties of a rule or to compare distinct rules. These parameters are tested for some Newton-Cotes, Fejér, Clenshaw-Curtis and Gauss-Legendre rules.