An essential local geometric morphism which is not locally connected though its inverse image part is an exponential ideal

Richard Garner; Thomas Streicher

An essential local geometric morphism which is not locally connected though its inverse image part is an exponential ideal

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Abstract

We give examples of essential local geometric morphisms which are not locally connected although their inverse image parts give rise to exponential ideals.

Original language	English
Pages (from-to)	908-913
Number of pages	6
Journal	Theory and Applications of Categories
Volume	37
Issue number	26
Publication status	Published - 2021

Keywords

toposes
geometric morphisms
locally connected
hyperconnected
local

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http://www.tac.mta.ca/tac/volumes/37/26/37-26abs.htmlLicence: Unspecified

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title = "An essential local geometric morphism which is not locally connected though its inverse image part is an exponential ideal",

abstract = "We give examples of essential local geometric morphisms which are not locally connected although their inverse image parts give rise to exponential ideals.",

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author = "Richard Garner and Thomas Streicher",

year = "2021",

language = "English",

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pages = "908--913",

journal = "Theory and Applications of Categories",

issn = "1201-561X",

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AU - Streicher, Thomas

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KW - geometric morphisms

KW - locally connected

KW - hyperconnected

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JF - Theory and Applications of Categories

SN - 1201-561X

IS - 26

ER -

An essential local geometric morphism which is not locally connected though its inverse image part is an exponential ideal

Abstract

Keywords

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