On Sharp Estimates of Derivatives of Even Order

Abstract

The norms of embedding operators of Sobolev spaces n2[0;1]k∞[0;1] (0≤slant k≤slant n-1) are considered. The least possible quantities A2n,k(x) in the inequalities |f(k)(x)|2≤slant A2n,k(x)\|f(n)\|2L2[0;1] are studied. On the basis of the relations between the A2n,k(x) and the antiderivatives of the Legendre polynomials, the properties of the maxima of the functions A2n,k(x) are established. It is shown that, for all~k, the global maximum of the function A2n,k on the closed interval [0;1] is the maximum point nearest to the midpoint of the interval; in particular, for even~k, x=1/2 is such a point. For the parameter~k of even order, an explicit formula for the norms of the embedding operators is obtained.