Spahn Pi-closure (changes)

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Definition

Let $\dagger$ be a monad on a topos $H$ . A morphism $f:X\to Y$ is called $\dagger$ -closed if

\array{ X&\to &\dagger X \\ \downarrow^f &&\downarrow^{\dagger f} \\ Y&\to& \dagger Y }

is a pullback square.

The class of $\dagger$ -closed morphisms satisfies the following closure properties:

(1) Every equivalence is $\dagger$ -closed.

(2) The composite of two $\dagger$ -closed morphisms is $\dagger$ -closed.

(3) The left cancellation property is satisfied: If $h=g\circ f$ and $h$ and $g$ are $\dagger$ -closed, then so is $f$ .

(4) Any retract of a $\dagger$ -closed morphism is $\dagger$ -closed.

(5) The class is closed under pullbacks which are preserved by $\dagger$ .

Last revised on December 2, 2012 at 23:46:24. See the history of this page for a list of all contributions to it.