Simultaneous polynomial approximation in Beurling-Sobolev spaces via Blaschke products

Abstract

Assuming that φ(t)=o(t2) as t0, we establish a lemma on simultaneous polynomial approximation in Orlicz-Beurling-Sobolev spaces aφ. These spaces, endowed with the Luxemburg norm · φ, generalize the classical Beurling-Sobolev spaces ap for p>2. More precisely, we prove that for every >0, every v∈N and every function continuous on ∂D, there exist a polynomial P(z)=Σk=vd ak zk and a compact set K⊂∂D with m(K)>1- such that \[\|P\|φ and \|P-\|K.\] The proof relies on a result of independent interest describing the asymptotic behaviour of the Luxemburg norm \|Bk\|φ of powers of a finite Blaschke product B which is not a monomial. This behaviour is governed by the comparison between φ(t) and t2 near 0: the norms remain bounded when φ t2, tend to 0 when φ=o(t2), and diverge to +∞ when t2=o(φ(t)). A key ingredient in the proof is the qualitative limit j0|Bk(j)|0 as k∞. As an application of the simultaneous approximation lemma, we derive the existence of functions in aφ with universal properties, including Menshov universality of Taylor partial sums and universality with respect to radial boundary limits.