Projective representations of Hecke groups from Topological quantum field theory
Abstract
We construct projective (unitary) representations of Hecke groups from the vector spaces associated with the Witten-Reshetikhin-Turaev topological quantum field theory of higher genus surfaces. In particular, we generalize the modular data of Temperley-Lieb-Jones modular categories. We also study some properties of the representation. We show the image group of the representation is infinite at low levels in genus 2 by explicit computations. We also show the representation is reducible with at least three irreducible summands when the level equals 4l+2 for l≥ 1.
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