Interpolatory pointwise estimates for convex polynomial approximation

Abstract

This paper deals with approximation of smooth convex functions f on an interval by convex algebraic polynomials which interpolate f at the endpoints of this interval. We call such estimates "interpolatory". One important corollary of our main theorem is the following result on approximation of f∈ (2), the set of convex functions, from Wr, the space of functions on [-1,1] for which f(r-1) is absolutely continuous and \|f(r)\|∞ := ess\,supx∈[-1,1] |f(r)(x)| < ∞: For any f∈ Wr (2), r∈ N, there exists a number N= N(f,r), such that for every n N, there is an algebraic polynomial of degree n which is in (2) and such that \[ \| f-Pnr \|∞ ≤ c(r)nr \| f(r)\|∞ , \] where (x):= 1-x2. For r=1 and r=2, the above result holds with N=1 and is well known. For r 3, it is not true, in general, with N independent of f.