On Some Estimate for the Norm of an Interpolation Projector
Abstract
Let Qn=[0,1]n be the unit cube in Rn and let C(Qn) be a space of continuous functions f:Qn R with the norm \|f\|C(Qn):=x∈ Qn|f(x)|. By 1( Rn) denote a set of polynomials of degree ≤ 1, i.e., a set of linear functions on Rn. The interpolation projector P:C(Qn) 1( Rn) with the nodes x(j)∈ Qn is defined by the equalities Pf(x(j))= f(x(j)), j=1, …, n+1. Let \|P\|Qn be the norm of P as an operator from C(Qn) to C(Qn). If n+1 is an Hadamard number, then there exists a nondegenerate regular simplex having the vertices at vertices of Qn. We discuss some approaches to get inequalities of the form ||P||Qn≤ cn for the norm of the corresponding projector P.
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