C∞ Functions on the Stone-Cech Compactification of the Integers

Abstract

We construct an algebra A=∞ ∞( Z) of smooth functions which is dense in the pointwise multiplication algebra ∞( Z) of sup-norm bounded functions on the integers Z. The algebra A properly contains the sum of the algebra Ac=c∞( Z) and the ideal S( Z), where Ac is the algebra of finite linear combinations of projections in ∞( Z) and S( Z) is the pointwise multiplication algebra of Schwartz functions. The algebra A is characterized as the set of functions whose "first derivatives" vanish rapidly at each point in the Stone- Cech compactification of Z.