Explicit Form Of Extremal Functions In The Embedding Constant Problem For Sobolev SpacesI

Abstract

The embedding constants of the Sobolev spaces Wn2[0;1] Wk∞[0; 1] (0≤slant k ≤slant n-1) are studied. A relation of the embedding constants with the norms of the functionals f f(k)(a) in the space Wn2[0;1] is given. An explicit form of the functions gn;k∈ Wn2[0;1] on which these functionals attain their norm is found. These functions are also to be extremal for the embedding constants. A relation of the embedding constants to the Legendre polynomials is put forward. A detailed study is made of the embedding constants with k = 3 and k = 5: we found explicit formulas for extreme points, calculate global maximum points, and give the values of the sharp embedding constants. A link between the embedding constants and some class of spectral problems with distribution coefficients is discovered.