From mboxrd@z Thu Jan 1 00:00:00 1970 X-Msuck: nntp://news.gmane.io/gmane.science.mathematics.categories/4612 Path: news.gmane.org!not-for-mail From: "Stephen Urban Chase" Newsgroups: gmane.science.mathematics.categories Subject: Re: Non-Cartesian Homological Algebra Date: Fri, 19 Sep 2008 15:53:13 -0400 (EDT) Message-ID: NNTP-Posting-Host: main.gmane.org Mime-Version: 1.0 Content-Type: text/plain;charset=iso-8859-1 Content-Transfer-Encoding: quoted-printable X-Trace: ger.gmane.org 1241020057 14039 80.91.229.2 (29 Apr 2009 15:47:37 GMT) X-Complaints-To: usenet@ger.gmane.org NNTP-Posting-Date: Wed, 29 Apr 2009 15:47:37 +0000 (UTC) To: categories@mta.ca Original-X-From: rrosebru@mta.ca Sat Sep 20 11:11:35 2008 -0300 Return-path: Envelope-to: categories-list@mta.ca Delivery-date: Sat, 20 Sep 2008 11:11:35 -0300 Original-Received: from Majordom by mailserv.mta.ca with local (Exim 4.61) (envelope-from ) id 1Kh357-0001MI-Eq for categories-list@mta.ca; Sat, 20 Sep 2008 11:05:05 -0300 Original-Sender: cat-dist@mta.ca Precedence: bulk X-Keywords: X-UID: 82 Original-Lines: 64 Xref: news.gmane.org gmane.science.mathematics.categories:4612 Archived-At: Here are some further remarks on the interesting concepts discussed in George's post and the replies to it. Incidentally, I prefer the term "non-commutative category theory" to "non-Cartesian ...", but that's a personal matter. If A is an algebra over a field k, then, in the context of the internal category theory introduced in Aguiar's 1997 thesis, an A-coring is simpl= y an internal category in the dual of the monoidal category Vec(k) of=20 k-spaces. On the other hand, the notion of internal category in Vec(k) itself includes (but is more general than) the small k-linear categories in Mitchell's 1972 paper, "Rings with Several Objects". I think it is useful to view these 2 concepts as special cases of the same general theory. Some of the constructions for corings in the book of Brzezinski and Wisbauer are special cases of categorical notions developed in Aguiar's thesis. Corings have been around for awhile, as Sweedler's original paper introducing them was published in 1975, and they appeared in at least a few other papers during the ensuing 20 years (e.g., Takeuchi's monograph on a Morita theory for monoidal categories of bimodules, which = I think was published in the Journal of the Math. Society of Japan).=20 Sweedler's version of Jacobson's theorem in his paper seems to be a sort of non-commutative analogue of the connection between equivalence relations and quotient spaces. Aguiar's framework is probably not general enough to cover some cases of interest. It may be that one should begin simply with a monad in an arbitrary bicategory, since at least a few of the basic concepts for internal categories can be developed in that setting. Taking the bicategory to be Vec(k) with a single object, the important notion of entwined structure, discussed in work of Caenepeel, Brzezinski, Pareigis, and others, then appears as a sort of distributive law, but relating a monad and a comonad rather than 2 monads. The theorem that an entwined structure is equivalent to a certain type of coring is then apparently an analogue of Beck's theorem. One would like the theory to include Takeuchi's notion of X-bialgebra (which generalizes concepts developed earlier by Sweedler and, independently, David Winter). However, to that end it appears useful to enrich the bicategory so that the 1-endomorphisms of an object (and 2-morphisms between them) constitute a 2-monoidal category in the sense of [M. Aguiar and S. Mahajan, Hopf Monoids in Species and Associated Hopf Algebras] (see Chapter 5, although most of that monograph, not yet completed, is on a quite different subject). There is a link to the monograph from Aguiar's website. He an= d I have had some discussions on these matters during the summer, but there is still much about this situation that we (or, at least, I) don't understand. Steve Chase