Quantisation of super Teichmueller theory

Quantisation of super Teichmueller theory

We construct a quantisation of the Teichmueller spaces of super Riemann surfaces using coordinates associated to ideal triangulations of super Riemann surfaces. A new feature is the non-trivial dependence on the choice of a spin structure which can be encoded combinatorially in a certain refinement...

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Hauptverfasser: Aghaei, Nezhla, Pawelkiewicz, Michal, Teschner, Joerg
Format: Artikel
Sprache:eng
Schlagworte:
Mathematics - Mathematical Physics
Mathematics - Quantum Algebra
Physics - High Energy Physics - Theory
Physics - Mathematical Physics
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Zusammenfassung:We construct a quantisation of the Teichmueller spaces of super Riemann surfaces using coordinates associated to ideal triangulations of super Riemann surfaces. A new feature is the non-trivial dependence on the choice of a spin structure which can be encoded combinatorially in a certain refinement of the ideal triangulation. By constructing a projective unitary representation of the groupoid of changes of refined ideal triangulations we demonstrate that the dependence of the resulting quantum theory on the choice of a triangulation is inessential.
DOI:10.48550/arxiv.1512.02617