Quantum Holonomies and the Heisenberg Group
Abstract
Quantum holonomies of closed paths on the torus T2 are interpreted as elements of the Heisenberg group H1. Group composition in H1 corresponds to path concatenation and the group commutator is a deformation of the relator of the fundamental group π1 of T2, making explicit the signed area phases between quantum holonomies of homotopic paths. Inner automorphisms of H1 adjust these signed areas, and the discrete symplectic transformations of H1 generate the modular group of T2.
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