Date: Wed, 5 May 1999 10:56:27 +0200 From: Philippe Gaucher Subject: categories: question about weak omega category Bonjour, Let us call cubical omega-category a cubical complex with connections and operations +_j like in the paper "On the algebra of cube", Brown & Higgins or like in Al-Agl's PhD "Aspect of multiple categories". There is a conjecture which claims that the category of cubical omega-categories is equivalent to the category of globular omega-categories. If I understand correctly, the conjecture was proved in some richer framework but seems to be (in my knowledge) still open as stated above. My question is : is there a similar conjecture for weak omega-category ? Is there a notion of cubical weak omega-category somewhere in the literature and a notion of globular weak omega-category ? Any reference is welcome. I have found nothing with the usual research engine but maybe I did not use the good key-word. pg. Subject: Re: categories: question about weak omega category Date: Fri, 7 May 1999 10:51:00 +0100 (BST) From: Tom Leinster > There is a conjecture which claims that the category > of cubical omega-categories is equivalent to the category > of globular omega-categories. If I understand correctly, > the conjecture was proved in some richer framework > but seems to be (in my knowledge) still open as stated > above. > > My question is : is there a similar conjecture for > weak omega-category ? Is there a notion of cubical > weak omega-category somewhere in the literature > and a notion of globular weak omega-category ? There is certainly a notion of globular weak omega-category: in fact, there are at least two such. One is Batanin's, another is mine. (If you already have an early version of the preprint of mine cited below then it will say that the definition I present *is* Batanin's. He's since pointed out that it's different.) I've also sketched out how one might define weak cubical omega-category in a similar style, although there's one important hole in this which I haven't been able to fill. There have probably been other attempts to get a notion of weak cubical omega-category. I think that the conjecture you describe (for *weak* omega-categories) must be beyond our reach for a little while yet, if it's even plausible. One reason is that we have to say what the morphisms are in the category of weak [cubical] omega-categories. If you took the morphisms to be strict functors (i.e. those preserving composition on the nose) then I suspect the conjecture would fail. A more natural and plausible choice would be the weak functors (those maps preserving composition up to coherent equivalence). However, we seem not to understand weak functors very well at the moment. Batanin has a definition of weak functor for the notion of weak omega-category he presents, but I don't know that a similar thing has been done in the cubical context. So it may not even be possible to *formulate* the conjecture in today's language, let alone prove it. Tom References: M. Batanin, Monoidal globular categories as a natural environment for the theory of weak $n$-categories (1997). Advances in Mathematics 136, pp. 39--103. Also available via http://www-math.mpce.mq.edu.au/~mbatanin/papers.html Tom Leinster, Structures in higher-dimensional category theory (1998). Available via http://www.dpmms.cam.ac.uk/~leinster/ (chapter II is the relevant bit)