From: <jvoosten@math.uu.nl>
To: categories@mta.ca
Subject: preprint: Filtered colimits in the effective topos
Date: Tue, 29 Jun 2004 17:52:49 +0200 (CEST) [thread overview]
Message-ID: <200406291552.RAA22755@kodder.math.uu.nl> (raw)
A 7-page paper entitled
Filtered colimits in the effective topos
can be downloaded from:
http://www.math.uu.nl/people/jvoosten/effcolim.ps.gz
Abstract: we are concerned with the problem whether there
is a small full dense subcategory in the effective topos
(which would give a nice embedding of Eff into a sheaf
topos).
Since this topos has enough projectives, we may assume that
such a category consists of the \lambda-small projectives
for some cardinal \lambda.
Basically, there are two theorems:
1. For \lambda regular, uncountable: the \lambda -small
projectives are dense, precisely if the constant objects
functor \nabla :Sets --> Eff preserves
\lambda-filtered colimits.
2. \nabla : Sets --> Eff does not preserve \omega _1-filtered
colimits (hence, by 1., the countable projectives are
not dense).
Jaap van Oosten
reply other threads:[~2004-06-29 15:52 UTC|newest]
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