Localization in Homotopy Type Theory
Abstract
We study localization at a prime in homotopy type theory, using self maps of the circle. Our main result is that for a pointed, simply connected type , the natural map induces algebraic localizations on all homotopy groups. In order to prove this, we further develop the theory of reflective subuniverses. In particular, we show that for any reflective subuniverse , the subuniverse of -separated types is again a reflective subuniverse, which we call . Furthermore, we prove results establishing that is almost left exact. We next focus on localization with respect to a map, giving results on preservation of coproducts and connectivity. We also study how such localizations interact with other reflective subuniverses and orthogonal factorization systems. As key steps towards proving the main theorem, we show that localization at a prime commutes with taking loop spaces for a pointed, simply connected type, and explicitly describe the localization of an Eilenberg-Mac Lane space with abelian. We also include a partial converse to the main theorem.
Cite
@article{arxiv.1807.04155,
title = {Localization in Homotopy Type Theory},
author = {J. Daniel Christensen and Morgan Opie and Egbert Rijke and Luis Scoccola},
journal= {arXiv preprint arXiv:1807.04155},
year = {2020}
}
Comments
32 pages; to appear in Higher Structures; v4 contains a minor correction compared to published version