Every Elementary Higher Topos has a Natural Number Object
Category Theory
2021-03-26 v4 Algebraic Topology
Abstract
We prove that every elementary -topos has a natural number object. We achieve this by defining the loop space of the circle and showing that we can construct a natural number object out of it. Part of the proof involves showing that various definitions of natural number objects (Lawvere, Freyd and Peano) agree with each other in an elementary -topos. As part of this effort we also study the internal object of contractibility in -categories, which is of independent interest. Finally, we discuss various applications of natural number objects. In particular, we use it to define internal sequential colimits in an elementary -topos.
Cite
@article{arxiv.1809.01734,
title = {Every Elementary Higher Topos has a Natural Number Object},
author = {Nima Rasekh},
journal= {arXiv preprint arXiv:1809.01734},
year = {2021}
}
Comments
32 Pages, final version, published in Theory and Applications of Categories