On One Problem of Optimization of Approximate Integration
Abstract
It is proved that interval quadrature formula of the form q(f)=Σk=1nck 12h∫xk-hxk+hf(t)dt (ck∈ , \, x1+h<x2-h<x2+h<...<xn-h<xn+h<x1+2π -h) with equal ck and equidistant xk is optimal among all such formulas for the class K*F1 of convolutions of a CVD-kernel K with functions from the unite ball of the space L1 of 2π-periodic integrable functions.
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