Quantum hyperbolic geometry
Abstract
We construct a new family, indexed by the odd integers , of -dimensional quantum field theories called {\it quantum hyperbolic field theories} (QHFT), and we study its main structural properties. The QHFT are defined for (marked) -bordisms supported by compact oriented 3-manifolds with a properly embedded framed tangle and an {\it arbitrary} -character of (covering, for example, the case of hyperbolic cone manifolds). The marking of QHFT bordisms includes a specific set of parameters for the space of pleated hyperbolic structures on punctured surfaces. Each QHFT associates in a constructive way to any triple with marked boundary components a tensor built on the matrix dilogarithms, which is holomorphic in the boundary parameters. We establish {\it surgery formulas} for QHFT partitions functions and describe their relations with the {\it quantum hyperbolic invariants} of \cite{BB1,BB2} (either defined for unframed links in closed manifolds and characters trivial at the link meridians, or hyperbolic {\it cusped} 3-manifolds). For every -character of a punctured surface, we produce new families of conjugacy classes of "moderately projective" representations of the mapping class groups.
Cite
@article{arxiv.math/0611504,
title = {Quantum hyperbolic geometry},
author = {Stephane Baseilhac and Riccardo Benedetti},
journal= {arXiv preprint arXiv:math/0611504},
year = {2014}
}
Comments
40 pages, 19 figures; contains and supercedes our previous paper math.GT/0409282