Abstract:
We apply the $C^*$-algebraic formalism of topological $\mathrm{T}$-duality due to Mathai and Rosenberg to a broad class of topological spaces that include the torus bundles appearing in string theory compactifications with duality twists, such as nilmanifolds, as well as many other examples. We develop a simple procedure in this setting for constructing the $\mathrm{T}$-duals starting from a commutative $C^*$-algebra with an action of ${\mathbb R}^n$. We treat the general class of almost abelian solvmanifolds in arbitrary dimension in detail, where we provide necessary and sufficient criteria for the existence of classical $\mathrm{T}$-duals in terms of purely group theoretic data, and compute them explicitly as continuous-trace algebras with non-trivial Dixmier–Douady classes. We prove that any such solvmanifold has a topological $\mathrm{T}$-dual given by a $C^*$-algebra bundle of noncommutative tori, which we also compute explicitly. The monodromy of the original torus bundle becomes a Morita equivalence among the fiber algebras, so that these $C^*$-algebras rigorously describe the $\mathrm{T}$-folds from non-geometric string theory.
Keywords:noncommutative $C^*$-algebraic $\mathrm{T}$-duality, nongeometric backgrounds, Mostow fibration of almost abelian solvmanifolds, $C^*$-algebra bundles of noncommutative tori.