No Jackson-type estimates for piecewise q-monotone, q3, trigonometric approximation

Abstract

We say that a function f∈ C[a,b] is q-monotone, q3, if f∈ Cq-2(a,b) and f(q-2) is convex in (a,b). Let f be continuous and 2π-periodic, and change its q-monotonicity finitely many times in [-π,π]. We are interested in estimating the degree of approximation of f by trigonometric polynomials which are co-q-monotone with it, namely, trigonometric polynomials that change their q-monotonicity exactly at the points where f does. Such Jackson type estimates are valid for piecewise monotone (q=1) and piecewise convex (q=2) approximations. However, we prove, that no such estimates are valid, in general, for co-q-monotone approximation, when q3.