Constant connections, quantum holonomies and the Goldman bracket

INFN Sezione di Torino; Italy (2) Instituto Superior Tecnico; J.E.Nelson (1); Lisbon; Portugal); R.F.Picken (2) ((1) University of Turin

arxiv: math-ph/0412007 · v3 · submitted 2004-12-02 · 🧮 math-ph · gr-qc· hep-th· math.MP

Constant connections, quantum holonomies and the Goldman bracket

J.E.Nelson (1) , R.F.Picken (2) ((1) University of Turin , INFN Sezione di Torino , Italy (2) Instituto Superior Tecnico , Lisbon , Portugal) This is my paper

classification 🧮 math-ph gr-qchep-thmath.MP

keywords quantumconstantbracketconnectionsgoldmanareaassignedconsequence

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In the context of (2+1)--dimensional quantum gravity with negative cosmological constant and topology R x T^2, constant matrix--valued connections generate a q--deformed representation of the fundamental group, and signed area phases relate the quantum matrices assigned to homotopic loops. Some features of the resulting quantum geometry are explored, and as a consequence a quantum version of the Goldman bracket is obtained

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Constant connections, quantum holonomies and the Goldman bracket

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