Weak identity arrows in higher categories
Abstract
There are a dozen definitions of weak higher categories, all of which loosen the notion of composition of arrows. A new approach is presented here, where instead the notion of identity arrow is weakened -- these are tentatively called fair categories. The approach is simplicial in spirit, but the usual simplicial category is replaced by a certain `fat' delta of `coloured ordinals', where the degeneracy maps are only up to homotopy. The first part of this exposition is aimed at a broad mathematical readership and contains also a brief introduction to simplicial viewpoints on higher categories in general. It is explained how the definition of fair -category is almost forced upon us by three standard ideas. The second part states some basic results about fair categories, and give examples. The category of fair 2-categories is shown to be equivalent to the category of bicategories with strict composition law. Fair 3-categories correspond to tricategories with strict composition laws. The main motivation for the theory is Simpson's weak-unit conjecture according to which -groupoids with strict composition laws and weak units should model all homotopy -types. A proof of a version of this conjecture in dimension 3 is announced, obtained in joint work with A. Joyal. Technical details and a fuller treatment of the applications will appear elsewhere.
Cite
@article{arxiv.math/0507116,
title = {Weak identity arrows in higher categories},
author = {Joachim Kock},
journal= {arXiv preprint arXiv:math/0507116},
year = {2010}
}
Comments
LaTeX, 40 pages. Uses Paul Taylor's diagrams, Peter Kabal's texdraw, and one eps figure. Does not compile with pdflatex. Version v3: expository improvements, more details on the Moore loop space example. 44 pages. Final version to appear in IMRN