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Continuous cohesion over sets

Author: Menni, Matías
2014
 
Document type: Preprint

Abstract

A pre-cohesive geometric morphism p : E → S satisfies Continuity if the canonical p!(Xp ∗S) → (p!X) S is an iso for every X in E and S in S. We show that if S = Set and E is a presheaf topos then, p satisfies Continuity if and only if it is a quality type. Our proof of this characterization rests on a related result showing that Continuity and Sufficient Cohesion are incompatible for presheaf toposes. This incompatibility raises the question whether Continuity and Sufficient Cohesion are ever compatible for Grothendieck toposes. We show that the answer is positive by building some examples.

General information

Issue date: noviembre 2014
Document language: English
Journal: Theory and Applications of Categories; vol. 29, no. 20
Origin: Facultad de Ciencias Exactas
Others identifiers: hdl:11336/46008
ISSN: 1201-561X
Pages: 542-568
xmlui.dri2xhtml.METS-1.0.item-dc-subject: Axiomatic cohesion ; Topos
Subjects: Matemática

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Created: 2 de julio de 2020
Available since: 2 de julio de 2020
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