One Counterexample of Comonotone Approximation of 2π-periodic Function on Trigonometric Polynomials

Abstract

Let 2s points yi=-π y2s<…<y1<π be given. Using these points, we define the points yi for all integer indices i by the equality yi=yi+2s+2π. We shall write f∈(1)(Y) if f is a 2π-periodic function and f does not decrease on [yi, yi-1] if i is odd; and f does not increase on [yi, yi-1] if i is even. We denote En(1)(f;Y) the value of the best uniform comonotone approximation. In this article the following counterexample of comonotone approximation is proved. Example. For each k∈ N, k>3, and n∈ N there a function f(x):=f(x;s,Y,n,k) exists, such that f∈(1)(Y) C(1) and En(1)(f;Y)>BYn k3 -1 1nωk(f'; 1n), where BY=const, depending only on Y and k; ωk is the modulus of smoothness of order k, of f.