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GMD

I’m always
extremely slow to pick up a trend (let alone a hype), in mathematics as
well as in real life. It took me over a year to know of the existence of
_blogs_ and to realize that they were a much easier way to
maintain a webpage than manually modifying HTML-pages. But, eventually I
sometimes get there, usually with the help of the mac-dev-center. So, once again,
I read their gettings things done with your mac article long after it was
posted and completely unaware of the Getting Things Done (or GTD) hype.

At first, it just
sounds as one of those boring managament-nonsense-peptalk things (and
probably that is precisely what it generically is). Or what do you think
about the following resume from Getting
started with ‘Getting things done’
:

  1. identify all the
    stuff in your life that isnÕt in the right place (close all open
    loops)
  2. get rid of the stuff that isnÕt yours or you donÕt
    need right now
  3. create a right place that you trust and that
    supports your working style and values
  4. put your stuff in the
    right place, consistently
  5. do your stuff in a way that honors
    your time, your energy, and the context of any given moment
  6. iterate and refactor mercilessly

But in fact there is
also some interesting material around at the 43 folders website which bring this
management-talk closer to home such as the How does a
nerd hack GTD?
post.

Also of interest are his findings after
a year working with the GTD setup. These are contained in three posts :
A Year
of Getting Things Done: Part 1, The Good Stuff
, followed by A Year of
Getting Things Done: Part 2, The Stuff I Wish I Were Better At
to
end with A Year of
Getting Things Done: Part 3, The Future of GTD?
. If these three
postings don’t get you intrigued, nothing else will.

So, is
there something like _GMD : Getting Mathematics Done_? Clearly, I
don’t mean getting theorems proved, that’s a thing of a few seconds of
inspiration and months to fill in the gaps. But, perhaps all this GTD
and the software mentioned can be of some help to manage the
everyday-workflow of mathematicians, such as checking the arXiv and the
web, maintaining an email-, pdf- and BiBTeX-database, drafting papers,
books and courses etc.

In the next few weeks I’ll try out some
of the tricks. Probably another way to state this is the question “which
Apps will survive Tiger?” Now that it is official that Tiger (that is, Mac
10.4 to non-apple eaters) will be released by the end of the month it is
time to rethink which of the tools I really like to keep and which is
just useless garbage I picked up along the road. For example, around
this time last year I had a Perl
phase
and bought half a meter or so of O’Reilly Perl-books. And yes
I did write a few simple scripts, some useful such as my own arXiv RSS-feeds,
some not so useful as a web-spider I wrote to check on changes in the
list of hamepages of people working in non-commutative algebra and
geometry. A year later I realize I’ll never become a Perl Monk. So from now on I want to
make my computer-life as useful and easy as possible, relying on wizards
to provide me with cool software to use and help me enjoy mathematics
even more. I’ll keep you posted how my GMD-adventure goes.

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home jukebox


I am trying to put all our music onto one old iMac to make a
HomeJukeBox but ran into an annoying problem. I discovered a pile of 70
Audio-CDs which PD1 ripped away
from home (and more importantly,
away
from internet-access) so if you feed them to iTunes they
only display Track01, Track02 etc. that is, _no_ songtitles,
_no_ artist name, _no_ album information etc. making them
pretty useless for my purposes. Fortunately PD1 wrote on each CD the
Artist and Album names giving me at least a fighting chance to get all
information. Here is how I managed to do this without too much typing
(probably there are other and better methods around but as I am still
waiting for my copy of iPod and
iTunes Hacks
to arrive and as I am not the world most adventurous
person I prefer to stick with the first method I tried that
worked).\\r\\nI had a look at the huge collection of Doug's
AppleScripts for iTunes
and found on his 'internet-section'
the script CDDB Safari Kit v2.2.1 which he describes as
\\r\\n

These two AppleScripts, “CDDB
Safari” and “CDDB Tracks to iTunes via Safari”, assist
in finding and retrieving Album track names, Album, Artist, and Year
from Gracenote's CDDB website using Apple's Safari browser.

\\r\\nAs this is pretty much what I want, I downloaded
these 2 AppleScripts and put them into my
~Library/iTunes/Scripts folder (you probably will have
to create the Scripts folder) making them available from the Script-menu
in iTunes. \\r\\nNow, insert a CD and double-click on its icon in iTunes
so that its Track 01 Track 02 etc. appear in a separate window. Single
click on a Track to get it marked and then open the CDDB
Safari
script from the iTunes-script-menu. A pop-up menu
appears asking you what info you like to find. Click on Album or Artist
to mark them and then click on the highlighted Search
CDDB
button and Safari will take you to the Gracenote: Search CDDB site.
Fill in either Artist name or Album name and hit Search. If you are
lucky a list of all song-titles will appear or (in case their are
several options) a list of all relevant Artist/Album combinations from
which you have to click the relevant one and you will get the
songtitle-list. Go back to iTunes and open the CDDB Tracks to
iTunes via Safari
script again from the iTunes-script-menu. You
will be guided through the process : it will collect the song-titles and
ask you to use them or not and afterwards it will also ask you to add
Artist-Album-Year info as well, single click on all info you want to
include and press Yes and thank the Script for all its work. Close the
iTunes window and drag the CD icon (which now has the appropriate name)
to the desired playlist and all lost information is regained! There are
a few caveats : check whether the number of songtitles on the
Gracenote-page matches that on your CD and pray that PD1 has not made
her personal sublist of tracks… further some extremely alternative
CDs are not in the database (out of the 50 I tried so far only one
failed) and finally there seems to be a problem with French accents.

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Jacobian update

One way to increase the blogshare-value of this site might be to
give readers more of what they want. In fact, there is an excellent
guide for those who really want to increase traffic on their site
called 26
Steps to 15k a Day
. A somewhat sobering suggestion is rule S :

“Think about what people want. They
aren't coming to your site to view “your content”,
they are coming to your site looking for “their
content”.”

But how do we know what
people want? Well, by paying attention to Google-referrals according
to rule U :

“The search engines will
tell you exactly what they want to be fed – listen closely, there is
gold in referral logs, it's just a matter of panning for
it.”

And what do these Google-referrals
show over the last couple of days? Well, here are the top recent
key-words given to Google to get here :

13 :
carolyn dean jacobian conjecture
11 : carolyn dean jacobian

9 : brauer severi varieties
7 : latexrender

7 : brauer severi
7 : spinor bundles
7 : ingalls
azumaya
6 : [Unparseable or potentially dangerous latex
formula Error 6 ]
6 : jacobian conjecture carolyn dean

See a pattern? People love to hear right now about
the solution of the Jacobian conjecture in the plane by Carolyn Dean.
Fortunately, there are a couple of things more I can say about this
and it may take a while before you know why there is a photo of Tracy
Chapman next to this post…

First, it seems I only got
part of the Melvin Hochster
email
. Here is the final part I was unaware of (thanks to not even wrong)

Earlier papers established the following: if
there is
a counterexample, the leading forms of $f$ and $g$
may
be assumed to have the form $(x^a y^b)^J$ and $(x^a
y^b)^K$,
where $a$ and $b$ are relatively prime and neither
$J$
nor $K$ divides the other (Abhyankar, 1977). It is known
that
$a$ and $b$ cannot both be $1$ (Lang, 1991) and that one
may
assume that $C[f,g]$ does not contain a degree one
polynomial
in $x, y$ (Formanek, 1994).

Let $D_x$ and $D_y$ indicate partial differentiation with respect

to $x$ and $y$, respectively. A difficult result of Bass (1989)

asserts that if $D$ is a non-zero operator that is a polynomial

over $C$ in $x D_x$ and $y D_y$, $G$ is in $C[x,y]$ and $D(G)$

is in $C[f,g]$, then $G$ is in $C[f,g]$.

The proof
proceeds by starting with $f$ and $g$ that give
a
counterexample, and recursively constructing sequences of
elements and derivations with remarkable, intricate and
surprising relationships. Ultimately, a contradiction is
obtained by studying a sequence of positive integers associated
with the degrees of the elements constructed. One delicate
argument shows that the sequence is bounded. Another delicate
argument shows that it is not. Assuming the results described
above, the proof, while complicated, is remarkably self-contained
and can be understood with minimal background in algebra.

  • Mel Hochster

Speaking about the Jacobian
conjecture-post at not even wrong and
the discussion in the comments to it : there were a few instances I
really wanted to join in but I'll do it here. To begin, I was a
bit surprised of the implicit attack in the post

Dean hasn't published any papers in almost 15 years and is
nominally a lecturer in mathematics education at Michigan.

But this was immediately addressed and retracted in
the comments :

Just curious. What exactly did
you mean by “nominally a lecturer”?
Posted by mm
at November 10, 2004 10:54 PM

I don't know
anything about Carolyn Dean personally, just that one place on the
Michigan web-site refers to her as a “lecturer”, another
as a “visiting lecturer”. As I'm quite well aware from
personal experience, these kinds of titles can refer to all sorts of
different kinds of actual positions. So the title doesn't tell you
much, which is what I was awkwardly expressing.
Posted by Peter
at November 10, 2004 11:05 PM

Well, I know a few things
about Carolyn Dean personally, the most relevant being that she is a
very careful mathematician. I met her a while back (fall of 1985) at
UCSD where she was finishing (or had finished) her Ph.D. If Lance
Small's description of me would have been more reassuring, we
might even have ended up sharing an apartment (quod non). Instead I
ended up with Claudio
Procesi
… Anyway, it was a very enjoyable month with a group
of young starting mathematicians and I fondly remember some
dinner-parties we organized. The last news I heard about Carolyn was
10 to 15 years ago in Oberwolfach when it was rumoured that she had
solved the Jacobian conjecture in the plane… As far as I recall,
the method sketched by Hochster in his email was also the one back
then. Unfortunately, at the time she still didn't have all pieces
in place and a gap was found (was it by Toby Stafford? or was it
Hochster?, I forgot). Anyway, she promptly acknowledged that there was
a gap.
At the time I was dubious about the approach (mostly
because I was secretly trying to solve it myself) but today my gut
feeling is that she really did solve it. In recent years there have
been significant advances in polynomial automorphisms (in particular
the tame-wild problem) and in the study of the Hilbert scheme of
points in the plane (which I always thought might lead to a proof) so
perhaps some of these recent results did give Carolyn clues to finish
off her old approach? I haven't seen one letter of the proof so
I'm merely speculating here. Anyway, Hochster's assurance that
the proof is correct is good enough for me right now.
Another
discussion in the NotEvenWrong-comments was on the issue that several
old problems were recently solved by people who devoted themselves for
several years solely to that problem and didn't join the parade of
dedicated follower of fashion-mathematicians.

It is remarkable that the last decade has seen great progress in
math (Wiles proving Fermat's Last Theorem, Perelman proving the
Poincare Conjecture, now Dean the Jacobian Conjecture), all achieved
by people willing to spend 7 years or more focusing on a single
problem. That's not the way academic research is generally
structured, if you want grants, etc. you should be working on much
shorter term projects. It's also remarkable that two out of three
of these people didn't have a regular tenured position.

I think particle theory should learn from this. If
some of the smarter people in the field would actually spend 7 years
concentrating on one problem, the field might actually go somewhere
instead of being dead in the water
Posted by Peter at November
13, 2004 08:56 AM

Here we come close to a major problem of
today's mathematics. I have the feeling that far too few
mathematicians dedicate themselves to problems in which they have a
personal interest, independent of what the rest of the world might
think about these problems. Far too many resort to doing trendy,
technical mathematics merely because it is approved by so called
'better' mathematicians. Mind you, I admit that I did fall in
that trap myself several times but lately I feel quite relieved to be
doing just the things I like to do no matter what the rest may think
about it. Here is a little bit of advice to some colleagues : get
yourself an iPod and take
some time to listen to songs like this one :

Don't be tempted by the shiny apple
Don't you eat
of a bitter fruit
Hunger only for a taste of justice

Hunger only for a world of truth
'Cause all that you have
is your soul

from Tracy Chapman's All
that you have is your soul

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