Jackson's type estimate of nearly coconvex approximation

Abstract

Suppose that a continuous on the real axis 2π-periodic function f changes its convexity at 2s,\ s∈ N, points yi on each period: -π y2s<y2s-1<...<y1<π, and for the rest i∈ Z, the points yi are defined periodically. In the paper, for each n N, a trigonometric polynomial Pn of order cn is found such that: Pn has the same convexity as f, everywhere except, perhaps, the small neighborhoods of the yi: (yi-π/n,yi+π/n) and \|f-Pn\| c(s)\,ω4(f,π/n), where N is a constant depending only on i=1,...,2s\yi-yi+1\,\ c and c(s) are constants depending only on s,\ ω4(f,·) is the modulus of continuity of the 4-th order of the function f, and \|·\| is the max-norm.