Bernstein operators for exponential polynomials

Abstract

Let L be a linear differential operator with constant coefficients of order n and complex eigenvalues λ0,...,λn. Assume that the set Un of all solutions of the equation Lf=0 is closed under complex conjugation. If the length of the interval [ a,b] is smaller than π /Mn, where Mn:= \| Im% λj| :j=0,...,n\ , then there exists a basis pn,k%, k=0,...n, of the space Un with the property that each pn,k has a zero of order k at a and a zero of order n-k at b, and each % pn,k is positive on the open interval (a,b) . Under the additional assumption that λ0 and λ1 are real and distinct, our first main result states that there exist points % a=t0<t1<...<tn=b and positive numbers α0,..,αn%, such that the operator equation* Bnf:=Σk=0nαkf(tk) pn,k(x) equation* satisfies Bneλjx=eλjx, for j=0,1. The second main result gives a sufficient condition guaranteeing the uniform convergence of Bnf to f for each f∈ C[ a,b] .