Surgery in colored tensor models
Abstract
Rooted in group field theory and matrix models, random tensor models are a recent background-invariant approach to quantum gravity in arbitrary dimensions. Colored tensor models (CTM) generate random triangulated orientable (pseudo)-manifolds. We analyze, in low dimensions, which known spaces are triangulated by specific CTM interactions. As a tool, we develop the graph-encoded surgery that is compatible with the structure of quantum field theory and use it to prove that a single model, the complex -interaction in rank-, generates all orientable -bordisms, thus, in particular, also all orientable, closed surfaces. We show that certain quartic rank- CTM, the -theory, has as boundary sector all closed, possibly disconnected, orientable surfaces. Hence all closed orientable surfaces are cobordant via manifolds generated by the -theory.
Cite
@article{arxiv.1608.00246,
title = {Surgery in colored tensor models},
author = {Carlos I. Pérez-Sánchez},
journal= {arXiv preprint arXiv:1608.00246},
year = {2017}
}
Comments
31 pages, 12 TikZ-figures and TikZ-graphs. v3: Simplified proofs in Sec. 4