Exact estimates of high-order derivatives in Sobolev spaces

Abstract

The paper describes the splines Qn,k(x,a), which for an arbitrary point a∈(0;1) and an arbitrary function y∈Wnp[0;1] set the relations y(k)(a)=∫01 y(n)(x)Q(n)n,k(x,a)dx. The relation of the Lp'[0;1] norm minimization for Q(n)n,k (1/ p+1/p'=1) with the problem of the best estimates of derivatives of y(k)(a)≤slant An,k,p(a)\|y(n)\|Lp[0;1], and also with the problem of finding the exact embedding constants of the Sobolev space Wnp[0;1] into the space Wk∞[0;1], n∈N, k=0,1,…, n-1. Exact embedding constants are found for k=n-1 and p=∞, as well as for all n∈N, k=0,1,…, n-1 and p=1.