Interpolation by Linear Functions on an n-Dimensional Ball

Abstract

By B=B(x(0);R) we denote the Euclidean ball in Rn given by the inequality \|x-x(0)\|≤ R. Here x(0)∈ Rn, R>0, \|x\|:=(Σi=1n xi2)1/2. We mean by C(B) the space of continuous functions f:B R with the norm \|f\|C(B):=x∈ B|f(x)| and by 1( Rn) the set of polynomials in n variables of degree ≤ 1, i.e., linear functions on Rn. Let x(1), …, x(n+1) be the vertices of n-dimensional nondegenerate simplex S⊂ B. The interpolation projector P:C(B) 1( Rn) corresponding to S is defined by the equalities Pf(x(j))=f(x(j)). We obtain the formula to compute the norm of P as an operator from C(B) into C(B) via x(0), R and coefficients of basic Lagrange polynomials of S. In more details we study the case when S is a regular simplex inscribed into Bn=B(0,1).