Shape preserving properties of generalized Bernstein operators on Extended Chebyshev spaces

Abstract

We study the existence and shape preserving properties of a generalized Bernstein operator Bn fixing a strictly positive function f0, and a second function f1 such that f1/f0 is strictly increasing, within the framework of extended Chebyshev spaces Un. The first main result gives an inductive criterion for existence: suppose there exists a Bernstein operator Bn:C[a,b] Un with strictly increasing nodes, fixing f0, f1∈ Un. If Un⊂ Un + 1 and Un + 1 has a non-negative Bernstein basis, then there exists a Bernstein operator Bn+1:C[a,b] Un+1 with strictly increasing nodes, fixing f0 and f1. In particular, if % f0,f1,...,fn is a basis of Un such that the linear span of % f0,..,fk is an extended Chebyshev space over [ a,b] for each k=0,...,n, then there exists a Bernstein operator Bn with increasing nodes fixing f0 and f1. The second main result says that under the above assumptions the following inequalities hold Bnf≥ Bn+1f≥ f for all (f0,f1)-convex functions f∈ C[ a,b] . Furthermore, Bnf is (f0,f1)-convex for all (f0,f1)% -convex functions f∈ C[ a,b] . In the specific case of exponential polynomials we give alternative proofs of shape preserving properties by computing derivatives of the generalized Bernstein polynomials.