Best Approximation-Preserving Operators over Hardy Space

Abstract

Let Tn be the linear Hadamard convolution operator acting over Hardy space Hq, 1 q∞. We call Tn a best approximation-preserving operator (BAP operator) if Tn(en)=en, where en(z):=zn, and if \|Tn(f)\|q En(f)q for all f∈ Hq, where En(f)q is the best approximation by algebraic polynomials of degree a most n-1 in Hq space. We give necessary and sufficient conditions for Tn to be a BAP operator over H∞. We apply this result to establish an exact lower bound for the best approximation of bounded holomorphic functions. In particular, we show that the Landau-type inequality | fn|+c| fN| En(f)∞, where c>0 and n<N, holds for every f∈ H∞ iff c12 and N 2n+1.