* Re: module for a category
@ 2003-08-25 17:55 Stefan Forcey
2003-08-27 14:11 ` RJ Wood
0 siblings, 1 reply; 4+ messages in thread
From: Stefan Forcey @ 2003-08-25 17:55 UTC (permalink / raw)
To: categories
What you are looking for may be similar to something I queried Ross Street in regard to earlier this summer.
I'll save him some time by putting here the relevant part of his response.
> I think the one you first
>mention is what we have been calling V-actegories. Benabou looked at
>these rather than (as well as?) V-categories in the early days of
>monoidal categories. Pareigis also made use of them. More recently,
>publications of Paddy McCrudden involve them. There is a close
>connection with V-categories. A V-module V x A --> A in this sense
>for which we have a parametrized adjoint V(x,[a,b]) =~ A(x.a,b)
>makes A a V-category with V-valued hom [a,b].
>
>Conversely, a tensored V-category becomes such a V-module.
I recommend the work of McCrudden, who has developed among other things a
descent theoretic approach to the tensor product of V-actegories.
There is also resource in the work of Harald Lindner.
His paper, Enriched Categories and Enriched Modules, in Cahiers, Vol XXII-2 (1981)
develops morphisms between enriched categories and actegories, which he calls modules.
I'm curious about why it is that I have never seen his work referenced.
Paul B Levy writes:
>
> Hi
>
> Is there a standard reference for the notion of "left module for a
> category"? (or right module, or bimodule)
>
> Is there any reference in the setting of ordinary categories rather than
> (or as well as) enriched categories or bicategories?
>
> Thanks
> Paul
>
>
>
>
>
^ permalink raw reply [flat|nested] 4+ messages in thread
* Re: module for a category
2003-08-25 17:55 module for a category Stefan Forcey
@ 2003-08-27 14:11 ` RJ Wood
0 siblings, 0 replies; 4+ messages in thread
From: RJ Wood @ 2003-08-27 14:11 UTC (permalink / raw)
To: categories
Here is another twist on this circle of ideas which appeared in the
introductory chapter of my 1976 thesis. Robin Cockett and I are
working on a redevelopment of it.
For monoidal (V,\ten, i), (promonoidal V will suffice) consider Brian Day's
convolution (closed) monoidal structure on set^{V^op}. If A is a
set^{V^op} category, it is helpful to think of A(-,-):A^op x A ---> set^{V^op}
as A(-,-,-):A^op x V^op x A ---> set with the interpretation that A(a,v,b)
provides a set of `v-indexed families' of arrows from a to b. The
composite of a v-indexed family (v;f):a--->b with a w-indexed family
(w;g):b--->c is a w\ten v family (w\ten v;gf):a--->c. Of course it may
happen that for each a,b in A, A(a,-,b) is representable, by an object
A[a,b] in V. In this case each (v;f):a--->b takes the form
f:v--->A[a,b]. If for each a in A, and each v in V, A(a,v,-) is representable,
by an object a.v in A, then the (v;f):a--->b take the form
f:a.v--->b. Note that the identity a.v--->a.v considered as a v-indexed
family (v,j):a--->a.v can be construed as a family of `sum-injections'
for the `multiple' a.v. (Asking for a representing object {v,b} for
A(-,v,b) leads to dual considerations.) Simultaneous representability in
a,b and a,v is equivalent to the notion of `tensored V-category' mentioned
below.
In part this work was motivated by questions raised by Linton in `The
multilinear Yoneda lemmas' SLN 195, 209--229, and also pursued by
Reynolds in his 1973 Wesleyan thesis. For example, if A is a V-category
and M is a V-actegory, in the nomenclature below, what is a V-functor
A--->M, a V-functor M--->A? The familial approach, suggested by the
1970s work of Benabou, Pare/Schumacher, Rosebrugh and others provides
a straightforward intuitive answer. For general set^{V^op}-categories
A and M, the data for a set^{V^op}-functor F:A--->M sends, for each v in V,
each v-indexed family (v;f):a--->b to a v-indexed family (v;Ff):Fa--->Fb.
Each representability possibility for A and B allows for a compact presentation
of the data. When A is a V-category then it suffices to know F on
the generic families g:A[a,b]--->A[a,b]. In other words, one requires
(A[a,b];Fg):Fa--->Fb. If M is also a V-category then Fg is what is
usually denoted F_{a,b}:A[a,b]--->M[Fa,Fb], the effect of F on homs,
but if M is a V-actegory it will take the form Fa.A[a,b]--->Fb. If
A is a V-actegory then it suffices to know F on the generic
(v,j):a--->a.v. For M a V-category we have Fj:v--->M[Fa,F(a.v)], while
for M also a V-actegory we have Fj:Fa.v--->F(a.v), a form called `tensorial
strength' by Anders Kock in a seeries of papers about mononoidal monads.
In fact the 3x3 possibilities for `strengths' can be tabulated easily using
these considerations: Write 1) for `powers' {v,b}, 2) for homs [a,b] and
3) for `multiples' a.v. Then the i,j th entry below provides the form of
strength for a set^{V^op}-functor F:A--->M where A is of type i) and
M is of type j)
1) 2) 3)
1) F{v,b}--->{v,Fb} v--->M[F{v,b},Fb] F{v,b}.v--->Fb
2) Fa--->{A[a,b],Fb} A[a,b]--->M[Fa,Fb] Fa.A[a,b]--->Fb
3) Fa--->{v,F(a.v)} v--->M[Fa,F(a.v)] Fa.v--->F(a.v)
Best regards
RJ Wood
> What you are looking for may be similar to something I queried Ross Street in regard to earlier this summer.
> I'll save him some time by putting here the relevant part of his response.
>
> > I think the one you first
> >mention is what we have been calling V-actegories. Benabou looked at
> >these rather than (as well as?) V-categories in the early days of
> >monoidal categories. Pareigis also made use of them. More recently,
> >publications of Paddy McCrudden involve them. There is a close
> >connection with V-categories. A V-module V x A --> A in this sense
> >for which we have a parametrized adjoint V(x,[a,b]) =~ A(x.a,b)
> >makes A a V-category with V-valued hom [a,b].
> >
> >Conversely, a tensored V-category becomes such a V-module.
>
> I recommend the work of McCrudden, who has developed among other things a
> descent theoretic approach to the tensor product of V-actegories.
> There is also resource in the work of Harald Lindner.
> His paper, Enriched Categories and Enriched Modules, in Cahiers, Vol XXII-2 (1981)
> develops morphisms between enriched categories and actegories, which he calls modules.
> I'm curious about why it is that I have never seen his work referenced.
>
> Paul B Levy writes:
> >
> > Hi
> >
> > Is there a standard reference for the notion of "left module for a
> > category"? (or right module, or bimodule)
> >
> > Is there any reference in the setting of ordinary categories rather than
> > (or as well as) enriched categories or bicategories?
> >
> > Thanks
> > Paul
^ permalink raw reply [flat|nested] 4+ messages in thread
* Re: module for a category
2003-08-19 14:24 Paul B Levy
@ 2003-08-21 11:51 ` Ronnie Brown
0 siblings, 0 replies; 4+ messages in thread
From: Ronnie Brown @ 2003-08-21 11:51 UTC (permalink / raw)
To: categories
The following has a treatment of modules over groupoids, and the treatment
for categories is presumably similar.
(with P.J. HIGGINS), ``Crossed complexes and chain complexes
with operators'', {\em Math. Proc. Camb. Phil. Soc.} 107 (1990)
33-57.
Ronnie Brown
http://www.bangor.ac.uk/~mas010/
Paul B Levy wrote:
>
> Hi
>
> Is there a standard reference for the notion of "left module for a
> category"? (or right module, or bimodule)
>
> Is there any reference in the setting of ordinary categories rather than
> (or as well as) enriched categories or bicategories?
>
> Thanks
> Paul
--
^ permalink raw reply [flat|nested] 4+ messages in thread
* module for a category
@ 2003-08-19 14:24 Paul B Levy
2003-08-21 11:51 ` Ronnie Brown
0 siblings, 1 reply; 4+ messages in thread
From: Paul B Levy @ 2003-08-19 14:24 UTC (permalink / raw)
To: categories
Hi
Is there a standard reference for the notion of "left module for a
category"? (or right module, or bimodule)
Is there any reference in the setting of ordinary categories rather than
(or as well as) enriched categories or bicategories?
Thanks
Paul
^ permalink raw reply [flat|nested] 4+ messages in thread
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