From mboxrd@z Thu Jan 1 00:00:00 1970 X-Msuck: nntp://news.gmane.io/gmane.science.mathematics.categories/2893 Path: news.gmane.org!not-for-mail From: Toby Bartels Newsgroups: gmane.science.mathematics.categories Subject: Internal anafunctors. Date: Wed, 23 Nov 2005 13:44:18 -0800 Message-ID: <20051123214418.GB10753@math-rs-n04.ucr.edu> NNTP-Posting-Host: main.gmane.org Mime-Version: 1.0 Content-Type: text/plain; charset=us-ascii X-Trace: ger.gmane.org 1241018967 6250 80.91.229.2 (29 Apr 2009 15:29:27 GMT) X-Complaints-To: usenet@ger.gmane.org NNTP-Posting-Date: Wed, 29 Apr 2009 15:29:27 +0000 (UTC) To: Categories List Original-X-From: rrosebru@mta.ca Thu Nov 24 15:59:15 2005 -0400 Return-path: Envelope-to: categories-list@mta.ca Delivery-date: Thu, 24 Nov 2005 15:59:15 -0400 Original-Received: from Majordom by mailserv.mta.ca with local (Exim 4.52) id 1EfNBI-00079N-ND for categories-list@mta.ca; Thu, 24 Nov 2005 15:54:56 -0400 Content-Disposition: inline Original-Sender: cat-dist@mta.ca Precedence: bulk X-Keywords: X-UID: 38 Original-Lines: 49 Xref: news.gmane.org gmane.science.mathematics.categories:2893 Archived-At: Has anybody worked out a theory of internal anafunctors? On the one hand, there is a notion of internal category, that is a category internal to some other category, such as (were these the first?) Ehresmann's differential categories. There are also (I assume that Ehresmann discussed these too) internal functors between these internal categories. In particular, one component of an internal functor from X to Y is a morphism from the object of objects of X to the object of objects of Y, just as one component of an ordinary functor from C to D is a function from the set of objects of C to the set of objects of D. On the other hand, Marco Makkai has argued that, if you don't believe in the axiom of choice (either because you disbelieve or wish to be agnostic), then you should use anafunctors (possibly always saturated) instead of functors in general category theory. In particular, an anafunctor from C to D does *not* necessarily include a function from the set of objects of C to the set of objects of D (although such a function does follow from the axiom of choice). Now, even if you believe in the axiom of choice, still there are many topoi in which choice does not hold. Yet Makkai's theory of anafunctors (being constructive) can be expressed in the internal language of a topos, so there is automatically a theory of internal anfunctor between internal categories in an arbitrary topos. (Arguably, this should be regarded as the right way to internalise category theory into a topos, or more generally to treat models of constructive category theory.) My question, then, is whether anybody has worked this out in arbitrary categories, or at least more generally than in topoi (for example, in an arbitrary site). In particular, has anybody worked out differentiable anafunctors between differentiable categories (internal to the category of differentiable spaces)? I am pretty sure that I know how to do this, and it will be used in my PhD dissertation. But I would prefer to give the proper credit, and even replace as many proofs as possible with citations to others' papers! ^_^ -- Toby Bartels