On some sharp Landau--Kolmogorov--Nagy type inequalities in Sobolev spaces of multivariate functions

Abstract

For a function f from the Sobolev space W1,p(C) (C⊂Rd is an open convex cone), a sharp inequality that estimates \| f\|L∞ via the Lp-norm of its gradient and a seminorm of the function is obtained. With the help of this inequality, a sharp inequality is proved, which estimates the L∞-norm of the Radon--Nikodym derivative of a charge defined on Lebesgue measurable subsets of C via the Lp-norm of the gradient of this derivative and a seminorm of the charge. In the case, when C=R+m× Rd-m, 0 m d, we obtain inequalities that estimate the L∞-norm of a mixed derivative of a function f C R using its L∞-norm and the Lp-norm of the gradient of the function's mixed derivative.