A weighted version of Ostrowsky inequality for mapping of Hölder type and applications in numerical analysis (Q2762822)

The classical inequality of A.~Ostrowski gives an estimate of the difference between the value of a function at a point and its mean value over the entire interval of definition. It applies primarily to those continuous functions \(f : [a,b]\rightarrow \mathbb{R}\) whose derivative on \((a,b)\) is bounded, but the argument works also in the case of Hölder continuous functions. Also clear is the fact that instead of the Lebesgue measure one can use only positive Radon measure. The paper under review illustrates these remarks for a variety of weighted measures (such as Legendre, Laguerre, Jacobi, etc.) and gives an application to numerical integration.