Monomial basis in Korenblum type spaces of analytic functions

Abstract

It is shown that the monomials =(zn)n=0∞ are a Schauder basis of the Fr\'echet spaces A+-γ, \ γ ≥ 0, that consists of all the analytic functions f on the unit disc such that (1-|z|)μ|f(z)| is bounded for all μ > γ. Lusky L proved that is not a Schauder basis for the closure of the polynomials in weighted Banach spaces of analytic functions of type H∞. A sequence space representation of the Fr\'echet space A+-γ is presented. The case of (LB)-spaces A--γ, \ γ > 0, that are defined as unions of weighted Banach spaces is also studied.