Uniform convergence for sequences of best Lp approximation

Abstract

Let f be a continuous monotone real function defined on a compact interval [a,b] of the real line. Given a sequence of partitions of [a,b], % n , n → 0, and given l≥ 0,m≥ 1, let Sml( n) be the space of all functions with the same monotonicity of f that are % n-piecewise polynomial of order m and that belong to the smoothness class Cl[a,b]. In this paper we show that, for any m≥ 2l+1, sequences of best Lp-approximation in Sml( n) converge uniformly to f on any compact subinterval of (a,b); sequences of best Lp-approximation in Sm0( n) converge uniformly to f on the whole interval [a,b] .