Crossed simplicial groups and structured surfaces
Abstract
We propose a generalization of the concept of a Ribbon graph suitable to provide combinatorial models for marked surfaces equipped with a G-structure. Our main insight is that the necessary combinatorics is neatly captured in the concept of a crossed simplicial group as introduced, independently, by Krasauskas and Fiedorowicz-Loday. In this context, Connes' cyclic category leads to Ribbon graphs while other crossed simplicial groups naturally yield different notions of structured graphs which model unoriented, N-spin, framed, etc, surfaces. Our main result is that structured graphs provide orbicell decompositions of the respective G-structured moduli spaces. As an application, we show how, building on our theory of 2-Segal spaces, the resulting theory can be used to construct categorified state sum invariants of G-structured surfaces.
Cite
@article{arxiv.1403.5799,
title = {Crossed simplicial groups and structured surfaces},
author = {Tobias Dyckerhoff and Mikhail Kapranov},
journal= {arXiv preprint arXiv:1403.5799},
year = {2021}
}
Comments
86 pages, v2: revised version