Adelic versions of the Weierstrass approximation theorem

Abstract

Let E=Πp∈PEp be a compact subset of Z=Πp∈PZp and denote by C(E,Z) the ring of continuous functions from E into Z. We obtain two kinds of adelic versions of the Weierstrass approximation theorem. Firstly, we prove that the ring IntQ(E,Z):=\f(x)∈Q[x] ∀ p∈P,\;\;f(Ep)⊂eq Zp\ is dense in the direct product Πp∈P C(Ep,Zp)\, for the uniform convergence topology. Secondly, under the hypothesis that, for each n≥ 0, \#(Epp)>n for all but finitely many p, we prove the existence of regular bases of the Z-module IntQ(E,Z), and show that, for such a basis \fn\n≥ 0, every function in Πp∈PC(Ep,Zp) may be uniquely written as a series Σn≥ 0cn fn where cn∈Z and n ∞cn 0.