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    • CommentRowNumber1.
    • CommentAuthorTodd_Trimble
    • CommentTimeSep 19th 2011

    I added a comment to the end of the discussion at predicative mathematics to the effect that free small-colimit completions of toposes are examples of locally cartesian closed pretoposes that are generally not toposes.

    • CommentRowNumber2.
    • CommentAuthorTodd_Trimble
    • CommentTimeSep 19th 2011
    • (edited Sep 19th 2011)

    In fact, there could be some interesting stability theorems here. For one, if CC is a complete and cocomplete Π\Pi-pretopos, then we have an evident functor Δ:SetC\Delta: Set \to C and I believe

    • CΔC \downarrow \Delta is also a complete and cocomplete Π\Pi-pretopos.

    (Note: it may be shown that CΔC \downarrow \Delta, for CC an \infty-lextensive category, is the free small-coproduct completion of CC.) Furthermore, if E exE_{ex} denotes the ex/lex completion, then

    • E exE_{ex} is a complete and cocomplete Π\Pi-pretopos if EE is.

    One import of this is that the free small-colimit completion Colim(C)Colim(C), for CC a complete and cocomplete Π\Pi-pretopos, is equivalent to (CΔ) ex(C \downarrow \Delta)_{ex}, which by the above is also a complete and cocomplete Π\Pi-pretopos.

    Furthermore, I conjecture that the above stability theorems carry over to Π\Pi-WW-pretoposes in place of Π\Pi-pretoposes. These constructions seem to give interesting ways of constructing lots of non-topos examples.

    • CommentRowNumber3.
    • CommentAuthorTobyBartels
    • CommentTimeSep 19th 2011

    Cool!

    • CommentRowNumber4.
    • CommentAuthorTodd_Trimble
    • CommentTimeSep 20th 2011

    If you have a left exact (or even pullback-preserving) comonad on a pretopos, is the category of coalgebras also a pretopos? Same question for Π\Pi-pretoposes.

    • CommentRowNumber5.
    • CommentAuthorTodd_Trimble
    • CommentTimeSep 21st 2011
    • (edited Sep 21st 2011)

    My question in 4 is in fact an incredibly easy ’yes’ (on both counts). Well, certainly the pretopos part is: all the axioms of a pretopos are in terms of colimits and pullbacks. If G:EEG: E \to E is a pullback-preserving comonad, then the underlying functor U:Coalg GEU: Coalg_G \to E preserves and reflects colimits and pullbacks, and this means that the pretopos axioms hold on Coalg GCoalg_G if they hold on EE. Nothing could be simpler.

    (It makes me suspect that a very easy conceptual proof of the lex comonad theorem for toposes might be available if we ’define’ a topos to be a lex total category, which is not too far off from the truth for Grothendieck toposes.)

    The analogous result for Π\Pi-pretoposes is also pretty easy if you quote the result (say from the Elephant) that if EE is locally cartesian closed, then so is Coalg GCoalg_G. (I am defining a Π\Pi-pretopos to be a cocomplete LCC pretopos; it is easy to see that a Π\Pi-pretopos is also complete.)

    I have been writing all this down on my web page here, including proofs of my assertions in 2 above (I haven’t tackled WW-types yet). Some of it might be a bit clunky. But the basic upshot is that the free small-colimit cocompletion of a Π\Pi-pretopos is also a Π\Pi-pretopos (and almost never a topos). It bothers me though that all this is a bit abstract; I’m having trouble picturing the nature of these constructions.