On Properties of a Regular Simplex Inscribed into a Ball

Abstract

Let B be a Euclidean ball in Rn and let C(B) be a space of~continuous functions f:B R with the uniform norm \|f\|C(B):=x∈ B|f(x)|. By 1( Rn) we mean a set of polynomials of degree ≤ 1, i.e., a set of linear functions upon Rn. The interpolation projector P:C(B) 1( Rn) with the nodes x(j)∈ B is defined by the equalities Pf(x(j))= f(x(j)), j=1, …, n+1. The norm of P as an operator from C(B) to C(B) can be calculated by the formula \|P\|B=x∈ BΣ |λj(x)|. Here λj are the basic Lagrange polynomials corresponding to the n-dimensional nondegenerate simplex S with the vertices x(j). Let P be a projector having the nodes in the vertices of a regular simplex inscribed into the ball. We describe the points y∈ B with the property \|P\|B=Σ |λj(y)|. Also we formulate a geometric conjecture which implies that \|P\|B is equal to the minimal norm of an interpolation projector with nodes in B. We prove that this conjecture holds true at least for n=1,2,3,4. Keywords: regular simplex, ball, linear interpolation, projector, norm