Zigzag normalisation for associative $n$-categories
Abstract
The theory of associative -categories has recently been proposed as a strictly associative and unital approach to higher category theory. As a foundation for a proof assistant, this is potentially attractive, since it has the potential to allow simple formal proofs of complex high-dimensional algebraic phenomena. However, the theory relies on an implicit term normalisation procedure to recognize correct composites, with no recursive method available for computing it. Here we describe a new approach to term normalisation in associative -categories, based on the categorical zigzag construction. This radically simplifies the theory, and yields a recursive algorithm for normalisation, which we prove is correct. Our use of categorical lifting properties allows us to give efficient proofs of our results. This normalisation algorithm forms a core component of the proof assistant homotopy.io, and we illustrate our scheme with worked examples.
Keywords
Cite
@article{arxiv.2205.08952,
title = {Zigzag normalisation for associative $n$-categories},
author = {Lukas Heidemann and David Reutter and Jamie Vicary},
journal= {arXiv preprint arXiv:2205.08952},
year = {2022}
}