categories - Category Theory list
 help / color / mirror / Atom feed
* Name for not-quite-additive categories
@ 2012-01-06 19:04 Michael Barr
  2012-01-07  2:02 ` George Janelidze
                   ` (3 more replies)
  0 siblings, 4 replies; 5+ messages in thread
From: Michael Barr @ 2012-01-06 19:04 UTC (permalink / raw)
  To: Categories list

Has anyone settled on a term to describe categories (such as commutative
monoids) in which finite sums and products coincide but are not quite
additive?  I guess they are commutative monoid enriched.

Michael

-- 
Any society that would give up a little liberty to gain a little
security will deserve neither and lose both.

             Benjamin Franklin


[For admin and other information see: http://www.mta.ca/~cat-dist/ ]


^ permalink raw reply	[flat|nested] 5+ messages in thread
* Re: Name for not-quite-additive categories
  2012-01-06 19:04 Name for not-quite-additive categories Michael Barr
@ 2012-01-07  2:02 ` George Janelidze
  2012-01-07  8:02 ` Robin Houston
                   ` (2 subsequent siblings)
  3 siblings, 0 replies; 5+ messages in thread
From: George Janelidze @ 2012-01-07  2:02 UTC (permalink / raw)
  To: Michael Barr, Categories list

Everything I say below is known, old, and contains no results that are mine.
In fact it goes back to Mac Lane's "Duality for Groups", even though not
everything is explicit there. So, I omitted proofs - but I shall gladly
recall any of them if anyone is interested.

1. Let us call a category pointed if it is enriched in POINTED SETS. Such an
enrichment is unique if it exists - even if the category does not have
initial (=terminal) object.

2. When C is pointed, for every two objects X and Y in C, we can obviously
define the canonical morphism I : X+Y --> XxY from the coproduct X+Y to the
product XxY (assuming or not that + and x are "chosen"). When C has binary
products and binary coproducts we say that they coincide if all such
canonical morphisms are isomorphisms.

3. The following conditions on a pointed category C are equivalent:

(a) C has binary products and binary coproducts (let us assume "not
chosen"), and they coincide;

(b) C has binary products and, for every product diagram

X <--p-- Z --q--> Y,

there exist morphisms i : X --> Z and j : Y --> Z forming a coproduct
diagram and satisfying the equalities

pi = 1, qj = 1, pj = 0, qi = 0.

(c) C has binary products and admits an enrichment in COMMUTATIVE MONOIDS.

(d) C has binary products and admits a unique enrichment in COMMUTATIVE
MONOIDS.

(e) C admits an enrichment in COMMUTATIVE MONOIDS and, for every two objects
X and Y in C, there exist a diagram of the form

X <--p-- Z --q--> Y

    --i-->      <--j--

with pi = 1, qj = 1, pj = 0, qi = 0, and ip+jq = 1.

(One can also add the conditions dual to (b)-(d), require uniqueness of the
enrichment in (e), and deduce associativity and commutativity of the
"hom-unitary-magmas" from other axioms of course).

As I understand, the question is, how to call a pointed category with finite
products satisfying the equivalent conditions (a)-(e) above. For instance
Freyd and Scedrov call it "half-additive" in their book, and I don't know
any better name.

George

--------------------------------------------------
From: "Michael Barr" <barr@math.mcgill.ca>
Sent: Friday, January 06, 2012 9:04 PM
To: "Categories list" <categories@mta.ca>
Subject: categories: Name for not-quite-additive categories

> Has anyone settled on a term to describe categories (such as commutative
> monoids) in which finite sums and products coincide but are not quite
> additive?  I guess they are commutative monoid enriched.
>
> Michael
>
> --
> Any society that would give up a little liberty to gain a little
> security will deserve neither and lose both.
>
>             Benjamin Franklin


[For admin and other information see: http://www.mta.ca/~cat-dist/ ]


^ permalink raw reply	[flat|nested] 5+ messages in thread
* Re: Name for not-quite-additive categories
  2012-01-06 19:04 Name for not-quite-additive categories Michael Barr
  2012-01-07  2:02 ` George Janelidze
@ 2012-01-07  8:02 ` Robin Houston
  2012-01-07  8:04 ` rlk
  2012-01-07 11:29 ` Prof. Peter Johnstone
  3 siblings, 0 replies; 5+ messages in thread
From: Robin Houston @ 2012-01-07  8:02 UTC (permalink / raw)
  To: Michael Barr; +Cc: Categories list

The term semiadditive has been used for at least 45 years[1], and is still in use today[2]. It's not used all that often, but it has a good pedigree and  is unambiguous.

Robin

1. Barry Mitchell, Theory of Categories, 1965, section 1.18

2. http://ncatlab.org/nlab/show/biproduct#semiadditive_categories_11


On 6 Jan 2012, at 19:04, Michael Barr <barr@math.mcgill.ca> wrote:

> Has anyone settled on a term to describe categories (such as commutative
> monoids) in which finite sums and products coincide but are not quite
> additive?  I guess they are commutative monoid enriched.
> 
> Michael
> 
> -- 
> Any society that would give up a little liberty to gain a little
> security will deserve neither and lose both.
> 
>           Benjamin Franklin


[For admin and other information see: http://www.mta.ca/~cat-dist/ ]


^ permalink raw reply	[flat|nested] 5+ messages in thread
* Re: Name for not-quite-additive categories
  2012-01-06 19:04 Name for not-quite-additive categories Michael Barr
  2012-01-07  2:02 ` George Janelidze
  2012-01-07  8:02 ` Robin Houston
@ 2012-01-07  8:04 ` rlk
  2012-01-07 11:29 ` Prof. Peter Johnstone
  3 siblings, 0 replies; 5+ messages in thread
From: rlk @ 2012-01-07  8:04 UTC (permalink / raw)
  To: Michael Barr; +Cc: Categories list

Michael Barr writes:
  > Has anyone settled on a term to describe categories (such as commutative
  > monoids) in which finite sums and products coincide but are not quite
  > additive?  I guess they are commutative monoid enriched.
  >
  > Michael

I've been writing of direct sums when sums and products coincide and then of
categories with direct sums.

-- Bob


[For admin and other information see: http://www.mta.ca/~cat-dist/ ]


^ permalink raw reply	[flat|nested] 5+ messages in thread
* Re: Name for not-quite-additive categories
  2012-01-06 19:04 Name for not-quite-additive categories Michael Barr
                   ` (2 preceding siblings ...)
  2012-01-07  8:04 ` rlk
@ 2012-01-07 11:29 ` Prof. Peter Johnstone
  3 siblings, 0 replies; 5+ messages in thread
From: Prof. Peter Johnstone @ 2012-01-07 11:29 UTC (permalink / raw)
  To: Michael Barr; +Cc: Categories list

"Semi-additive" seems a good enough name to me.

Peter Johnstone

On Fri, 6 Jan 2012, Michael Barr wrote:

> Has anyone settled on a term to describe categories (such as commutative
> monoids) in which finite sums and products coincide but are not quite
> additive?  I guess they are commutative monoid enriched.
>
> Michael
>
> --
> Any society that would give up a little liberty to gain a little
> security will deserve neither and lose both.
>
>            Benjamin Franklin


[For admin and other information see: http://www.mta.ca/~cat-dist/ ]


^ permalink raw reply	[flat|nested] 5+ messages in thread
end of thread, other threads:[~2012-01-07 11:29 UTC | newest]

Thread overview: 5+ messages (download: mbox.gz / follow: Atom feed)
-- links below jump to the message on this page --
2012-01-06 19:04 Name for not-quite-additive categories Michael Barr
2012-01-07  2:02 ` George Janelidze
2012-01-07  8:02 ` Robin Houston
2012-01-07  8:04 ` rlk
2012-01-07 11:29 ` Prof. Peter Johnstone

This is a public inbox, see mirroring instructions
for how to clone and mirror all data and code used for this inbox;
as well as URLs for NNTP newsgroup(s).