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* subculture
@ 2010-09-24 15:44 Eduardo J. Dubuc
  2010-09-25  0:38 ` subculture Ruadhai
                   ` (3 more replies)
  0 siblings, 4 replies; 23+ messages in thread
From: Eduardo J. Dubuc @ 2010-09-24 15:44 UTC (permalink / raw)
  To: Categories list

As evident from the subject, this personal answer to Toby Bartels is intended
to have general incumbency.

Dear Toby, thanks for this msage, i will try to explain:

Toby Bartels wrote:
  > Eduardo J. Dubuc wrote at first:
  >
  >> Dear Toby, your choice of example is very unfortunate. Mac Lane wrote that
category theory was invented to define functor, and that functor was invented
to define "natural" transformation.
  >
  > Yes, I know; that was quite deliberate.

Well, I said "unfortunate" for those that are in favor of introducing the name
"evil" (or any other name) as a definition of "not invariant under equivalence".
You see, this is because to introduce a name the property has to be important
enough and of frequent use. To sustain your case you should have given
examples of properties (or concepts) which not being very important and of
frequent use, have nevertheless an universally accepted proper name.

  > but beyond that I have no idea what upsets you,
  > and I'm not going to worry about it any more.

I appreciate that you had worried at some point, and I am glad you do not
worry any more.

I try to explain why I sounded upset with you in my last mail because it has a
general interest concerning the question of whether  we are a subculture or
part of the mainstream of mathematics.

   Recall that this was my only mail that concerns you in particular, and that
it was in response to a mail of you, and that it was that mail that I felt
upsetting.

I quote from it:

  > Shall we stop saying "natural" and say "invariant under composition"?
  > Or is that term allowed under the grandfather clause,

"the grandfather clause" is not something nice to qualify my sayings.

  > As a proud citizen of the Ghetto of Category Land,

sounds ironic and upsetting, showing that you were very upset that i consider
certain characteristics of our group proper of a ghetto, in the sense of
isolation from the world of real mathematics. Well, I do think that one of
these characteristics is the introduction of names and terminology in an
unjustified way.  Andre Joyal call it "a subculture" (well, he just said there
is a danger to become a subculture) which if you think a little, sounds better
than "ghetto", but it is as negatively strong or even worst.

I apologize to you for using that term that you had felt insulting (and I
imagine some others in the list may have felt so)

Your msage had an overall upsetting style, and I reacted accordingly.

All the best, no hard feelings from my part.  e.d.

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


^ permalink raw reply	[flat|nested] 23+ messages in thread
* Re: Not invariant but good
@ 2010-09-27  5:36 John Baez
  2010-09-28 23:11 ` Michael Shulman
  0 siblings, 1 reply; 23+ messages in thread
From: John Baez @ 2010-09-27  5:36 UTC (permalink / raw)
  To: categories, Peter Selinger

Peter wrote:


> In order to focus on the math and not on the terminology, let me today use
> the word "XXXX" instead of "evil".
>

Good.  I think you're secretly on my side, though, because you're using four
X's.

:-)


> I don't think the notion used in your examples is general enough. For
> example, fix some groupoid C, and consider the property of an object
> x: "x is isomorphic to exactly 3 objects of C".


What a fiendishly clever example!


> To me, this is clearly XXXX, because it is not invariant under equivalences
> of
>
C. Yet, according to the definition you used in this email, it extends
> to a functor C -> {F,T}, and therefore is non-XXXX.
>

True.

By the way, in case anyone out there forgets: "Extending to a functor C ->
{F,T}" was merely a pedantic way of saying "being a property of objects of C
that is invariant under isomorphisms" - a pedantic way that lets us easily
generalize this notion to "being a structure on objects of C that is
covariant under isomorphisms".  To generalize, we just replace {F,T} by Set.

It may not be clear to everybody why I like this pedantic approach, so I
should probably explain why.   A (-1)-category is a truth value, a
0-category is a set, and a 1-category is a category.  So, when we replace
{F,T} by Set, we are replacing the 0-category of (-1)-categories by the
1-category of 0-categories.   Since we are just increasing a certain
parameter by 1, it becomes easy to see how to continue this game
indefinitely.

For more details, try this:

http://arxiv.org/PS_cache/math/pdf/0608/0608420v2.pdf#page=12

For a property P of objects x of a category C, "being invariant under
>
  isomorphisms of objects in C" is strictly weaker than "being invariant
> under equivalences of C".


Yes.

Here's my rejoinder:

I had been fixing a groupoid C and asking whether a property of objects of
that category was invariant under isomorphisms.  When you say "x is
isomorphic to exactly 3 objects of C", you are actually treating C not as
fixed but as variable. The more things we let vary, the more invariance
properties we can demand!

In particular, there's a 2-groupoid Cat_* where an object is a "pointed
category" (C,x), that is, a category C with chosen object x.

I can treat "being an object x that is isomorphic to exactly 3 objects in C"
as a property of pointed categories.  And, I would call this property
evil... whoops, I mean XXXX... because it determines a function

Ob(Cat_*)  -> {F,T}

that does not extend to a 2-functor

Cat_* -> {F,T}

Again, this is just a pedantic way of saying what you're saying.  I'm just
trying to point out that I can fit it into my philosophy.


> I tried to give a more general and precise 2-categorical definition on
> the categories list on January 3, 2010, but I am not sure I got it
> quite right.


I remember enjoying that post, but I'll need to reread it to remember what
you said.


> I think it was Mark Weber who also pointed out, around
> the same time, that one person's XXXX concept is another person's
> non-XXXX concept - in a different 2-category.
>

Very much so!  And you've also noticed here that sometimes a property of
objects in a fixed category arises from a property of pointed categories....
so that we can take either a 1-categorical or a 2-categorical approach to
the XXXXness of this property.


> So I don't think it is correct to identify the concept of XXXX with
> "having to talk about equality".
>

I agree.  I take it as a *rule of thumb* that when somebody writes down a
property of categories that involves equations between objects, they're
running the risk that this property is not invariant under equivalence of
categories.   But I don't know the general theorems that make this rule of
thumb precise.

Can every property of categories that is invariant under equivalence be
expressed in some language that doesn't include equations between objects?
Or conversely? Or what precise conditions are needed to get theorems along
these lines?

Best,
jb


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


^ permalink raw reply	[flat|nested] 23+ messages in thread
* Re: Not invariant but good
@ 2010-10-01 12:36 Thomas Streicher
  0 siblings, 0 replies; 23+ messages in thread
From: Thomas Streicher @ 2010-10-01 12:36 UTC (permalink / raw)
  To: categories

Dear Michael,

> Does this clarify what I meant?

Yes, indeed that has been very helpful. 

> Perhaps "not well-behaved" was a poor choice of words since it implies
> a value judgement, but I think it is correct to say that in the
> absence of choice, category theory becomes very unfamiliar unless we
> replace functors with anafunctors.  For instance, if we insist on
> using only functors, then a category with finite products does not
> necessarily become a monoidal category, as there is no "product"
> functor from A×A to A.  Also, without choice the 2-category Cat using
> functors is not even a regular 2-category, let alone a 2-topos.  Since
> the defining characteristics of Set include that it is a well-pointed
> 1-topos, it seems unlikely to me that one will be able to get much of
> anywhere with a version of Cat that is not a 2-topos.

Well, but then we can work with categories with a chosen structure, e.g.
chosen products; that's what is recommended in the Elephant and it looks to
me as close to practice; it's very unlikely to have a nonconstructive proof
of existence of products.

Thomas



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


^ permalink raw reply	[flat|nested] 23+ messages in thread

end of thread, other threads:[~2010-10-03 22:10 UTC | newest]

Thread overview: 23+ messages (download: mbox.gz / follow: Atom feed)
-- links below jump to the message on this page --
2010-09-24 15:44 subculture Eduardo J. Dubuc
2010-09-25  0:38 ` subculture Ruadhai
2010-09-25 23:10   ` RE : categories: subculture Joyal, André
2010-09-26  2:43   ` subculture David Leduc
2010-09-26  3:19   ` subculture Fred Linton
     [not found]   ` <AANLkTikJoHkO2M_3hnrQqqFq2_N2T9i6KF2DRFbHTujP@mail.gmail.com>
2010-09-26  3:43     ` subculture Eduardo J. Dubuc
2010-09-25  4:01 ` Not invariant but good Joyal, André
     [not found] ` <B3C24EA955FF0C4EA14658997CD3E25E370F59BE@CAHIER.gst.uqam.ca>
2010-09-26  3:29   ` John Baez
2010-09-27  2:54     ` Peter Selinger
2010-09-27 15:55     ` RE : categories: " Joyal, André
2010-09-28  2:10       ` RE : " John Baez
2010-09-29 18:05         ` no joke Joyal, André
2010-09-30  2:53           ` John Baez
2010-09-28 10:18       ` RE : categories: Re: Not invariant but good Thomas Streicher
2010-09-29 21:25         ` Michael Shulman
2010-09-30  3:07           ` Richard Garner
2010-09-30 11:11           ` Thomas Streicher
2010-09-30 19:39             ` Michael Shulman
2010-09-30 11:34           ` Thomas Streicher
     [not found] ` <20101001092434.GA9359@mathematik.tu-darmstadt.de>
2010-10-03 22:10   ` Michael Shulman
2010-09-27  5:36 John Baez
2010-09-28 23:11 ` Michael Shulman
2010-10-01 12:36 Thomas Streicher

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