On the comparison of trigonometric convolution operators with their discrete analogues for Riemann integrable functions (Q1277347)

For a bounded \(2\pi\)-periodic function \(f\) and a positive number \(\delta\), let \(M(f,x,\delta)=\sup\{| f(u)| : | u-x| \leq \delta\}\). The \(\delta\)-norm \(| | f| | _{\delta}\) is defined as the upper Riemann integral of \(f\) on \([0, 2\pi]\). This paper concerns the comparison of approximation behavior of trigonometric convolutions and their discretizations. The authors prove that, under suitable conditions, the relevant errors in \(\delta\)-norm are equivalent. It is an extension of a well-known fact that is established for continuous functions in uniform norm.