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Main Author: Hora, Ryuya
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2503.04317
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author Hora, Ryuya
author_facet Hora, Ryuya
contents This paper introduces the notion of complete connectedness of a Grothendieck topos, defined as the existence of a left adjoint to a left adjoint to a left adjoint to the global sections functor, and provides many examples. Typical examples include presheaf topoi over a category with an initial object, such as the topos of sets, the Sierpiński topos, the topos of trees, the object classifier, the topos of augmented simplicial sets, and the classifying topos of many algebraic theories, such as groups, rings, and vector spaces. We first develop a general theory on the length of adjunctions between a Grothendieck topos and the topos of sets. We provide a site characterisation of complete connectedness, which turns out to be dual to that of local topoi. We also prove that every Grothendieck topos is a closed subtopos of a completely connected Grothendieck topos.
format Preprint
id arxiv_https___arxiv_org_abs_2503_04317
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Grothendieck topoi with a left adjoint to a left adjoint to a left adjoint to the global sections functor
Hora, Ryuya
Category Theory
18F10
This paper introduces the notion of complete connectedness of a Grothendieck topos, defined as the existence of a left adjoint to a left adjoint to a left adjoint to the global sections functor, and provides many examples. Typical examples include presheaf topoi over a category with an initial object, such as the topos of sets, the Sierpiński topos, the topos of trees, the object classifier, the topos of augmented simplicial sets, and the classifying topos of many algebraic theories, such as groups, rings, and vector spaces. We first develop a general theory on the length of adjunctions between a Grothendieck topos and the topos of sets. We provide a site characterisation of complete connectedness, which turns out to be dual to that of local topoi. We also prove that every Grothendieck topos is a closed subtopos of a completely connected Grothendieck topos.
title Grothendieck topoi with a left adjoint to a left adjoint to a left adjoint to the global sections functor
topic Category Theory
18F10
url https://arxiv.org/abs/2503.04317