Matrices, Bratteli Diagrams and Hopf-Galois Extensions

Abstract

We show that the matrix embeddings in Bratteli diagrams are iterated direct sums of Hopf-Galois extensions (quantum principle bundles) for certain abelian groups. The corresponding strong universal connections are computed. We show that Mn(C) is a trivial quantum principle bundle for the Hopf algebra C[Zn × Zn] . We conclude with an application relating known calculi on groups to calculi on matrices.