Conformal nets II: conformal blocks
Abstract
Conformal nets provide a mathematical formalism for conformal field theory. Associated to a conformal net with finite index, we give a construction of the `bundle of conformal blocks', a representation of the mapping class groupoid of closed topological surfaces into the category of finite-dimensional projective Hilbert spaces. We also construct infinite-dimensional spaces of conformal blocks for topological surfaces with smooth boundary. We prove that the conformal blocks satisfy a factorization formula for gluing surfaces along circles, and an analogous formula for gluing surfaces along intervals. We use this interval factorization property to give a new proof of the modularity of the category of representations of a conformal net.
Cite
@article{arxiv.1409.8672,
title = {Conformal nets II: conformal blocks},
author = {Arthur Bartels and Christopher L. Douglas and André Henriques},
journal= {arXiv preprint arXiv:1409.8672},
year = {2017}
}
Comments
Updated to published version