Best approximations and moduli of smoothness of functions and their derivatives in Lp, 0<p<1

Abstract

Several new inequalities for moduli of smoothness and errors of the best approximation of a function and its derivatives in the spaces Lp, 0<p<1, are obtained. For example, it is shown that for any 0<p<1 and k,\,r∈ N one has ωr+k(f,)p≤ C(p,k,r)r+1p-1\(∫0ωk(f(r),t)ppt2-p dt\)1p, where the function f is such that f(r-1) is absolutely continuous. Similar inequalities are obtained for the Ditzian-Totik moduli of smoothness and the error of the best approximation of functions by trigonometric and algebraic polynomials and splines. As an application, positive results about simultaneous approximation of a function and its derivatives by the mentioned approximation methods in the spaces Lp, 0<p<1, are derived.