On Landau -- Kolmogorov type inequalities for charges and their applications

Abstract

In this article we prove sharp Landau--Kolmogorov type inequalities on a class of charges defined on Lebesgue measurable subsets of a cone in Rd, d≥ 1, that are absolutely continuous with respect to the Lebesgue measure. In addition we solve the Stechkin problem of approximation of the Radon--Nikodym derivative of such charges by bounded operators and two related problems. As an application, we also solve these extremal problems on classes of essentially bounded functions f such that their distributional partial derivative ∂ d f∂ x1…∂ xd belongs to the Sobolev space W1,∞.