Bernstein Operators for Extended Chebyshev Systems

Abstract

Let Un⊂ Cn[ a,b] be an extended Chebyshev space of dimension n+1. Suppose that f0∈ Un is strictly positive and % f1∈ Un has the property that f1/f0 is strictly increasing. We search for conditions ensuring the existence of points % t0,...,tn∈ [ a,b] and positive coefficients α0,...,αn such that for all f∈ C[ a,b], the operator Bn:C[ a,b] Un defined by % Bnf=Σk=0nf(tk) αkpn,k satisfies % Bnf0=f0 and Bnf1=f1. Here it is assumed that % pn,k,k=0,...,n, is a Bernstein basis, defined by the property that each % pn,k has a zero of order k at a and a zero of order n-k at b.