T-duality for circle bundles via noncommutative geometry

TL;DR

This paper extends topological T-duality to non-principal circle bundles using homotopy theory and noncommutative geometry, exploring K-theory and equivariant properties, including cases with singular fibers.

Contribution

It demonstrates that T-duality results for non-principal circle bundles can be recovered via homotopy-theoretic and noncommutative geometry methods, expanding previous work.

Findings

K-theory of crossed products by Isom(R) analyzed

Equivariant K-theory for Z/2 studied

Extensions to bundles with singular fibers achieved

Abstract

Recently Baraglia showed how topological T-duality can be extended to apply not only to principal circle bundles, but also to non-principal circle bundles. We show that his results can also be recovered via two other methods: the homotopy-theoretic approach of Bunke and Schick, and the noncommutative geometry approach which we previously used for principal torus bundles. This work has several interesting byproducts, including a study of the K-theory of crossed products by Isom(R), the universal cover of O(2), and some interesting facts about equivariant K-theory for Z/2. In the final section of this paper, these results are extended to the case of bundles with singular fibers, or in other words, non-free O(2)-actions.