The join construction
Abstract
In homotopy type theory we can define the join of maps as a binary operation on maps with a common co-domain. This operation is commutative, associative, and the unique map from the empty type into the common codomain is a neutral element. Moreover, we show that the idempotents of the join of maps are precisely the embeddings, and we prove the `join connectivity theorem', which states that the connectivity of the join of maps equals the join of the connectivities of the individual maps. We define the image of a map in via the join construction, as the colimit of the finite join powers of . The join powers therefore provide approximations of the image inclusion, and the join connectivity theorem implies that the approximating maps into the image increase in connectivity. A modified version of the join construction can be used to show that for any map in which is only assumed to be locally small, the image is a small type. We use the modified join construction to give an alternative construction of set-quotients, the Rezk completion of a precategory, and we define the -truncation for any . Thus we see that each of these are definable operations on a univalent universe for Martin-L\"of type theory with a natural numbers object, that is moreover closed under homotopy coequalizers.
Cite
@article{arxiv.1701.07538,
title = {The join construction},
author = {Egbert Rijke},
journal= {arXiv preprint arXiv:1701.07538},
year = {2017}
}