Failure of Approximation of Odd Functions by Odd Polynomials

Abstract

We construct a Hilbert holomorphic function space H on the unit disk such that the polynomials are dense in H, but the odd polynomials are not dense in the odd functions in H. As a consequence, there exists a function f in H that lies outside the closed linear span of its Taylor partial sums sn(f), so it cannot be approximated by any triangular summability method applied to the sn(f). We also show that there exists a function f in H that lies outside the closed linear span of its radial dilates fr, ~r<1.