Abstract
A rigorous algebraic definition of noncommutative coverings is developed. In the case of commutative algebras this definition is equivalent to the classical definition of topological coverings of locally compact spaces. The theory has following nontrivial applications:• Coverings of continuous trace algebras,• Coverings of noncommutative tori,• Coverings of the quantum SU(2) group,• Coverings of foliations,• Coverings of isospectral deformations of Spin – manifolds.The theory supplies the rigorous definition of noncommutative Wilson lines.
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