A Geometric Approach to Noncommutative Principal Torus Bundles

Abstract

A (smooth) dynamical system with transformation group Tn is a triple (A,Tn,α), consisting of a unital locally convex algebra A, the n-torus Tn and a group homomorphism α:Tn→(A), which induces a (smooth) continuous action of Tn on A. In this paper we present a new, geometrically oriented approach to the noncommutative geometry of principal torus bundles based on such dynamical systems. Our approach is inspired by the classical setting: In fact, after recalling the definition of a trivial noncommutative principal torus bundle, we introduce a convenient (smooth) localization method for noncommutative algebras and say that a dynamical system (A,Tn,α) is called a noncommutative principal Tn-bundle, if localization leads to a trivial noncommutative principal Tn-bundle. We prove that this approach extends the classical theory of principal torus bundles and present a bunch of (non-trivial) noncommutative examples.