More on the Density of Analytic Polynomials in Abstract Hardy Spaces

Abstract

Let \Fn\ be the sequence of the Fej\'er kernels on the unit circle T. The first author recently proved that if X is a separable Banach function space on T such that the Hardy-Littlewood maximal operator M is bounded on its associate space X', then \|f*Fn-f\|X 0 for every f∈ X as n∞. This implies that the set of analytic polynomials PA is dense in the abstract Hardy space H[X] built upon a separable Banach function space X such that M is bounded on X'. In this note we show that there exists a separable weighted L1 space X such that the sequence f*Fn does not always converge to f∈ X in the norm of X. On the other hand, we prove that the set PA is dense in H[X] under the assumption that X is merely separable.