K-theory of Etesi C*-algebras

Abstract

We study the C*-algebra EM of a smooth 4-dimensional manifold M introduced by G\'abor Etesi. It is proved that the EM is a stationary AF-algebra. We calculate the topological and smooth invariants of M in terms of the K-theory of the C*-algebra EM. Using Gompf's Stable Diffeomorphism Theorem, it is shown that all smoothings of M form a torsion abelian group. The latter is isomorphic to the Brauer group of a number field associated to the K-theory of EM.