Direct Limits of Ad\`ele Rings and Their Completions

Abstract

The ad\`ele ring AK of a global field K is a locally compact, metrizable topological ring which is complete with respect to any invariant metric on AK. For a fixed global field F and a possibly infinite algebraic extension E/F, there is a natural partial ordering on \ AK:F⊂eq K⊂eq E\. Therefore, we may form the direct limit \[ AE = AK \] which provides one possible generalization of ad\`ele rings to arbitrary algebraic extensions E/F. In the case where E/F is Galois, we define an alternate generalization of the ad\`eles, denoted VE, to be a certain metrizable topological ring of continuous functions on the set of places of E. We show that VE is isomorphic to the completion of AE with respect to any invariant metric and use this isomorphism to establish several topological properties of AE.