Slashdot Mirror
Russian May Have Solved Poincare Conjecture
nev4 writes "Reuters (via Yahoo News) reports that Grigori Perelman from St. Petersburg, Russia appears to have solved the Poincare Conjecture. The Poincare Conjecture is one of the 7 Millenium Problems (another is P vs NP, also covered on /. recently). Solving a Millenium Problem carries a reward of $1M, but apparently Perelman isn't interested..." nerdb0t provides some background in the form of this MathWorld page from 2003.
True math genius and the desire for money (and fame and babes, etc.) seem to be mutually exclusive traits and I think that's rather inspiring (and damned practical).
/. come form "anonymous cowards" sitting in their offices at MIT. What a god.
Take the case of Paul Erdos who was essentially homeless, but published over 1500 papers and is considered one of the all time greats in the field.
Perelman just casually posted his solution out to the web in much the same way that some of the most brilliant posts on
"...all the labours of the ages, all the devotion, all the inspiration, all the noonday brightness..." yada yada
Seems like a dup of a story posted in Dec 2003
1 /0 1/0035258&tid=134&tid=14
http://science.slashdot.org/article.pl?sid=04/0
First the Poincare Conjecture is solved, then perhaps the first ever duplicate on Slashdot?! This is a history date.
"There is good reason to believe that Perelman's approach is correct. But the trouble is, he won't talk to anybody about it and has shown no interest in the money," said Keith Devlin, Professor of Mathematics at Stanford University in California.
I'm always amazed how much free stuff is on the internet. Free million dollar solutions! Good luck with em!
Open Source Sushi
but it would take too much time to fit it in this post before everyone's surfing at 1 or higher.
- Ferblankie
1,000,000 USD is about equal to 560,000 GBP, not 5.6 million GBP.
English is easier said than done.
He's trying to integrate homeomorphic convergence using a Baxter-Bates supermodality, which Krause clearly explained is impossible for T(s) in a non-linear progression. Fantastic thought process on this complex differential geometric problem.
Just kidding! I have no clue what the hell this is. I got lost after the word conjecture.
They should give it to me so I can buy a 200,000,000 page Slashdot subscription.
I read all the links, and I'm pretty sure they were all in english, but I didn't understand a word of it. No wonder all the mathematicians are nuts.
(I wonder if this is what some of my non-engineering clients think of my work sometimes)
Is it just my observation, or are there way too many stupid people in the world?
His answer to the problem was "42".
- Greg
Start a happiness pandemic
In Soviet Russia, Poincare Conjecture solves YOU!
From the article:
...)
A reclusive Russian may have solved one of the world's toughest mathematics problems and stands to win $1 million (560 million pounds) -- but he doesn't appear to care.
Heh. Last I checked, $1 million dollars was not quite equal to 560 million (British) pounds. (560 thousand, sure
In an article on mathematics. Of all things.
Whocarés Conjecture If we stretch a g-string around the surface of somebody's buttocks, then we can shrink it down to a point by moving it slowly, without tearing it and without allowing it to leave the surface. On the other hand, if we imagine that the same g-string has somehow been stretched in the appropriate direction around someone's face, then there is no way of shrinking it to a point without breaking either the g-string or suffocating the person. We say the surface of the buttocks are "simply connected," but that the surface of the person's face is not. Whocares knew almost hundred years ago, knew that a well shaped pair of cheeks is essentially characterized by this property of simple connectivity, and asked the corresponding question for the rest fo the people still reading this, as to why they were doing so. This question turned out to be extraordinarily difficult, and slashdotters have been struggling with it ever since.
READY.
PRINT ""+-0
Who in Hell modded this insightfull? Flamebait or 'moronic joker' would be more appropriate...
Eureka Science News - automatically updated
According to the Guardian another clever Maths dude has proposed a solution to another of the 7 "million dollar" problems.
This particular problem has big implications for online cryptography as it deals with the distribution of prime numbers. Apparantly.
(I'm no mathematics person BTW.)
Why do people insist on spelling millennium with only one n?
math is hard
That's all.
Wake me when someone verifies his work. I can claim to solve anything, but it doesn't mean much unless the community says I'm right. Right off the bat it seems fishy: no journal submission, just a web post? No referee? And he's not answering questions about his work? He's either a genius or a nutcase, possibly both.
Quid festinatio swallonis est aetherfuga inonusti?
Africus aut Europaeus?
oh well.. he wouldn't care to post here, I guess. There are more interesting things around to do, for a methamatical genius, than to hang around with nerds. (btw, I love his books)
#
#\ @ ? Colonize Mars
#
- sm
I'm joking, but you're still an idiot.
"A language that doesn't affect the way you think about programming, is not worth knowing" - Alan Perlis
But there's a snag. He has simply posted his results on the Internet and left his peers to work out for themselves whether he is right -- something they are still struggling to do.
Okay, so tell me how this is any different from every l33t user that tells me how to get my dual flat panel setup working under Xandros without editing the X files manually? Sounds like these kids just tried their hands at mathematics, too.
What's your damage, Heather?
...we must not have a poincare conjecture gap!
It is not that de Branges is unqualified: he settled Bieberbach's Conjecture. Interestingly, much of the validation of de Branges work on Bieberbach's Conjecture was done by a team at the Steklov Institute, referred to in the MathWorld link in the article.
This is a technical paper, which is a continuation of math.DG/0211159. Here we construct Ricci flow with surgeries and verify most of the assertions, made in section 13 of that e-print; the exceptions are (1) the statement that manifolds that can collapse with local lower bound on sectional curvature are graph manifolds - this is deferred to a separate paper, since the proof has nothing to do with the Ricci flow, and (2) the claim on the lower bound for the volume of maximal horns and the smoothness of solutions from some time on, which turned out to be unjustified and, on the other hand, irrelevant for the other conclusions.
Indeed. Stalin was in fact a Georgian, not a Russian.
Emacs: for people who just never know when to
Nice subject line... But apparently not inspiring enough for you to post AC. :)
i rate this troll 7/10. a good attempt.
However you stated 'We say the surface of the buttocks are "simply connected"' buy that do you mean to ignore all the plumbing associated with the butt while recognizing the thru and thru nature of the mouth/nose hole.
I NEED more information. I'm strangely fascenated by the topography of butts. Perhaps I can get a grant.
John McAfee 'It was like that time I hired that Bangkok prostitute; to do my taxes, while I fucked my accountant'
This is one of those situations where it would have been more pretentious to post AC than to post under my own name (which I almost always do unless I'm faking a press release from a major company like Google). I am not worthy. I am also into money and babes. Go figger.
Actually, I'll come clean. I wrote a system to create fake weblogs. Unfortunately it seems to do some things which I don't fully understand (bugs) and it comes up with some really bizarre combinations of phrases I didn't even program in. So anyway.. there's actually a blog running which this thing posts to on a regular basis, but I thought it'd be funny to see what it had to say about this story. Not very much it seems..
You spelled "Millennium Problem" wrong twice!
The first investment worth making is in your own education.
The only other investment worth making is in the well being and betterment of others.
The first is only worth making if that is what it takes for you to realize the worth of the second.
Fight the good fight, that you may in good conscience be content among your fellows when all is won.
Flamebait it may be, but it is true. Russia's elite special forces were called into action, but were grossly unprepared and unorganized.
I'm tired of seeing these 'please make me famous even though I didn't really prove it' threads. The little boy has cried wolf too many times. We don't care unless it's really solved.
Editors, I'm talking to you.
I can't believe slashdot would run a story with that title. "Perelman May Have Solved Poincare Conjecture" would have been much more dignified. You would never see "Muppet May Have Solved Poincare Conjecture" would you? Please, Perelman is a mathematician first, Russian second.
I want a new world. I think this one is broken.
Who would have thought that those that worship islam would kill kids by shooting them in the back and laugh at them as the tortured them.
After all islam is the Religion of Peace (TM)
A Christian Scientist from Theale
Said, "Though I know that pain isn't real,
When I sit on a pin
And it punctures my skin
I dislike what I fancy I feel".
Oh! It's poincare... forget it...
Read my blog: HansMast.com
Remember, he is from Russia, and is a mathematician,not an economist or a surgeon; his salary must be only a few hundred dollars a month.
Right and Christianity along with practically all other organized religions have no twisted extremist factions and absolutely no blood on their hands. Fact is that there was a time when Muslims, Christians and Jews all lived in peace... look to Spanish history... medieval Spain, I believe. If you knew what you speak ill of, you'd realize that the true religion has become tainted and corrupted by its religious leaders looking for money and power. Please get educated, because it's people like you that allow intolerance to thrive and create the environments that feed fundamentalism.
Have you heard about the Inquisition ?
Yes, and we grew out of it.
It's well known that mathematicians and scientists are less productive past the age of 40 or so. The conventional wisdom is that they are simply getting old, but one article in Science News indicated that perhaps maried scientists were less productive, just like many criminals reform when they get maried. Perhaps Grigori Perelman knows this. One problem with my suggestion: The mechanism suggested by the article was that scientists are motivated by "babes" and that once they are maried they don't need more. So if Grigori is intentionally lying low, his carreer should still end.
Simon's Rock College
You ? If you are american, probably, your old relatives escaped from it.. :)
The purported proof of the Riemann conjecture was reported and discussed in June 2004 here on slashdot. Incidentally the comments contain what I feel is the funniest math-related lines I've ever heard: Riemann-chu, I prove you! (credit to foidulus).
Not really. There are already a lot of people who believe that the RH is likely to be true.
Just because the hypothesis hasn't been proven doesn't mean someone can't start working on an application that only works if it is true. I'm pretty sure there's guys already working under this assumption. Don't know anyone personally, but that's what I'm told.
Quantum computing is a nice, related example. When Shor came up with a factoring algorithm, no one had proven that quantum computing was possible. But that didn't stop him from working on his algorithm.
I think the article's intro is a sensational piece of crap. Until someone justifies the author's introduction paragraph, he (Tim Radford) has lost my respect.
The Poincare C. indeed is explained with apples and doughnuts.
"Grigori Perelman May Have Solved Poincare Conjecture"
I've noticed that these kinds of announcements often make a point of appending a nationality to the name of the person involved in the discovery. Surely this proof builds on mathematical knowledge from around the world. Or was Grigori Perelman standing solely on the shoulders of "fellow Russian" mathematicians? I highly doubt it...
maybe we should be looking for the monomania gene in all these 'idee fixee' folks...
every day http://en.wikipedia.org/wiki/Special:Random
But we grew out of it. It is the 21st century and they should be way more advanced than they are. But they are not becauase those in power are scared by educated followers. Look at the way the treat women and girls in their own countries like that 16 year old girl that was just hung in Iran or all the honor killings that happen because a woman was raped and that makes it her fault.
If they do not wish to be judeged by their actions...well tough shit.
there
is
no
spoon
(or text)
has it been 2 minutes yet?
No, we brought some of them over with us, (Pat Robinson, Raulph Reed, Others) ;->
http://www.wordiq.com/definition/Image:Perelman.jp g
The guy is a bit scary..
This is all very interesting and I like the way Perelman has gone about working out this whole genius and fame, and money. I wonder what if movie stars ever found out or the RIAA or the music industry, they might license him. Interestingly there was also a breakthrough in the Riemann Hypothesis, I wonder if anyone has ever heard of Louis de Branges de Bourcia at Purdue and his paper on the Riemann Hypothesis . The person who posted the news article did not tell use what Poincaré Conjecture is? Well this is slashdot not, mathdot :) { Just Kidding Dawgs, aite } . Anyway Perelman has a very ascetic way about him, maybe he sees beyond the materialsitic, and media oriented consuermism. Anyway interesting it is to see someone who sees beyond himself.
Just because google news bot picked this up don't make it that great of a post. It was known for the last 6 months that Perelman and colleagues had been working on this.
PS ::-
buying != happiness
Saw this at NYC Penn Station
{not a good sign}
Perelman was unemployed for 10 years while he worked on the problem. His last job was in the States in the early 90s, where he saved enough money to live in Russia for the whole time he worked.
So think about his perspective: he's a complete loner who was ignored by the mathematical community for 10 years! Now that he's going to be a "certified" genius (with the $1M prize) why exactly should he care.
Also, it's worth pointing out that like Wiles (who solved the Fermat Conjecture), Perelman's work develops a theory that has the Poincare conjecture as a corollary which is interesting but not of central importance.
I prefer to think of math as "the language of patterns" (with a lot of regional dialects).
Our ideas are the same up to an isomorphism.
Can someone explain this better? That link to the conjecture is plain awful.
Here are my questions (in parens):
If we stretch a rubber band around the surface of an apple, then we can shrink (huh? what do they mean by "shrink" here?) it (rubber band or apple?) down to a point by moving (huh? again, what does "move" mean here) it (rubber band or apple) slowly, without tearing it and without allowing it to leave the surface (okay, must mean rubber band doesn't leave the surface of the apple then?). On the other hand, if we imagine that the same rubber band has somehow been stretched in the appropriate direction (what direction would that be?) around a doughnut, then there is no way of shrinking it (rubber band again I assume) to a point without breaking either the rubber band or the doughnut. (why? the writer made a big leap here, but it's not obvious)
Post got just +funny and -overrated -troll... Someone balance the karma burn with +underrated or +insightful
or have family members kidnapped or some such.
Its no secret, ransom is big money.
I'm having a hard time imagining that a Russian would call someone with a Jewish last name Russian. :0) Russia is a heavily anti-semitic country.
Wasn't that written by Robert Ludlum?
Does anyone remember the book "Mathematics can be fun" maybe published some 40 years ago
which made learning mathematics as a kid absolutely wonderful ? Wonder if Grigori Perelman
is of any relation to the author of that book Yu Perelman ?
DO NOT PANIC
I want to meet the guy (or gal) who came up with a question worth $1 million!!!!
Fritz
__________
Huh?
If I'm not mistaken, the N-body problem was shown to have no solution in elementary functions like 100 years ago, or something like that. Possibly by someone really famous (as far as mathematicians go). He won a prize from a Danish king by doing so, as the king had made a contest to see who could solve it.
There are a number of reasons why these problems should have prize money attached to them without direct practical applications that are curreently known. First, their results are important from a purely mathematical standpoint. Second, the techniques that must be invented to solve these problems are important in their own right. Third, the mathematical problems that we can't find uses for now could very easily have applications in 100 years. Number theory is being applied to computers, group theory has practical uses now, and I'm sure that many other brahcnes of math have found applications after long periods of having little to no practical value.
What the fuck is up with the world and its instant gratification, "but what does it get me NOW" attitude these days? Oh, if only the 80s had never come....
I don't think that there's anything inherently honorable or dishonorable about taking the money. If he wants to take the money and blow it on hookers and Ferraris, that's just as honorable as getting satisfaction because your brain gives you some sweet endorphins because you think you've made the honorable statement that "I'm not about the money, I'm about the math".
The main problem with all of these solutions especially in math is that time is the largest factor in determining if the solution is correct. Give you 2 years and its marginally okay. Give you 40 and its accepted as a standard etc...
My UID is prime is yours?
http://www.newscientist.com/news/news.jsp?id=ns999 92143
So did the British man or the Russian solve it? April 02 newscientist has the same basic story with the names changed.
In Soviet Russia...
they prove conjectures.
HTH. HAND.
you have proven yourself wrong. You said, "knobs, 2xn's and locks are all addons", and as such the door is the only thing that can be slammed. seeing as how a door without hinges can't be shut, nor can a door without a knob (or latch) be shut, it is imporrsible to slam any door at all. However, since we commonly associate a slammed door with having these items, a slammed revolvoing door is allwed to slam against any external part.
Get me a meat pie floater!
I take it back. There are some times when you can mod a funny post 'insightful' -- it's funny because it's true...
... then maybe he should consider donating it to the town of Beslan. I'm sure they could use the help.
Now that's what I call altruism.
By summer it was all gone...now shesmovedon. --
My info is a few years out of date, but last I heard, having that kind of money in Russia required security guards for everyone you cared about more than the $.
AC !@ MIT
Agreed, but I believe the name is Stallman, not Erdos :-)
3.243F6A8885A308D313
First, their results are important from a purely mathematical standpoint
How? There are many branches of mathematics and mathematicians who deal in practical work and will decry the relevance of this type of work.
Second, the techniques that must be invented to solve these problems are important in their own right.
What new "techniques" were invented to (suposedly) solve this problem?
, the mathematical problems that we can't find uses for now could very easily have applications in 100 years
Such as? Any clues, ideas?
This sounds like a typical excuse for universities to get more grant (much of which is tax) money - delusions of practical application "if only we get just a little more money, we could do so much!" (the cries of which are repeated every year).
Number theory is being applied to computers, group theory has practical uses now, and I'm sure that many other brahcnes of math have found applications after long periods of having little to no practical value.
These all had practical value for a very long time. They were the base foundations for the research and development of what we have today. These ideas of stretching rubber bands around apples and doughnuts are nothing more than mental exercises for the mathematicians who simply want something challenging to do with their time, not something practical
you are a moron
For an accessible math article on this, try http://mathworld.wolfram.com/news/2003-04-15/poinc are/
This comment was written with the intention to opt out of advertising.
In Soviet Russia, proof conjectures you.
Differential geometry (the field Perelman is working in) was a prerequisite for the theory of General Relativity by Einstein. Einstein needed a way to mathematically describe curved space and how things move in curved space. Topology (the stuff with rubbers, apples and donuts) is a way to classify different kinds of shapes (i.e. when the details of the shape are not important). Because topology doesn't care about the exact shape (only the type of shape), all conclusions that are derived in topology are automatically applicable to all bodies with said shape. That way you get very powerful and fundamental insight into the properties of bodies (i.e. "what is the fundamental difference between an apple-shape and a donut-shape ?" some conclusions may be trivial, others are not).
Differential geometry can then be used to perform calculations for particular shapes, for example you can perform calculations on the surface of a sphere which is important in Geodesics (measurements of distances on the curved! surface of earth).
Um, just to point out, because this is a common mistake, but Thompson didn't pen the phrase "feed the body or the head will die". Not sure who said that.
But, Rob Marr coined the phrase 'Kill the body and head will die' in a horrible movie. Some info here.
I'm not sure the quote 'Kill the body and the head will die' is the quote you're looking for here for your argument, though.
J
The apple in question is the representation of a sphere. Its not two dimensional, but has only two sides if it is hollow (inside and outside, seperated by mass), pretend it is filled, and the sphere has one side.
A doughnut has only one side. Think about it. The outside is all one connected plane (think of a mobius twist, is technically a one sided object)
You are pretty stupid if you cant envision a rubber band wrapped around the donut (THROUGH THE HOLE!!!) in so that the rubber band is looped through the donut.
The apple also has only one side, but the nature of the sphere, allows the rubber band to contact it at any point, but slide off of the apple.
The donut, you can slide to any point, but not shrink the rubber band, nor enlarge the rubber band (sans any donut irregularities, which I will assume you have a perfectly shaped donut).
MOD PARENT UP!!! That was funny as hell.
What exactly does "wrap a rubber band around an apple and shrink it to a point" mean? Surely that would cut the apple in half?
LOL!!! You fool, you shrink is to a point without making a great circle.
what a twat.
i mean really, if you don't want the money, then take it and give it to charity .
Comment removed based on user account deletion
Hi, i'm a mathematician, i attendend one of the most "promising" talks by someone pretending to prove RH, and there was no reason to believe that he actually proved it. So please be sceptical when it comes about RH
:
RH seems to be one order of magnitude more difficult than the other 'Millenium problems'.
David Hilbert once said
"If I were to awaken after having slept for a thousand years, my first question would be: Has the Riemann hypothesis been proven?"
More specifically RH is about the structure of the set of prime numbers. One can formulate it as a statement on the distribution of prime numbers within the real numbers, but that's probably missing the point of the story. The set of prime numbers 'behaves' like the set of orbits of a dynamical system (a dyn. sys. is anything that evolves with time), and the real progress towards RH consists in attemps to concretely describe this dynamical system. See the work by Connes, Deninger... you have free papers on arXiv. If you want to have a look, I recommend especially the paper math.NT/9811068 on arXiv. here's an URL
http://www.arxiv.org/abs/math.NT/9811068
But the serious people like Connes don't pretend to solve RH. Actually most people don't expect it to be solved within decades from now.
War doesn't prove who's right, just who's left.
"True math genius and the desire for money (and fame and babes, etc.) seem to be mutually exclusive traits and I think that's rather inspiring (and damned practical)."
Looks like you read a book or two about Paul Erdos and then decided that all great mathematicians must fit that mold. However, there are plenty of great mathematicians that have cared about money. One that springs immediately to mind is Isacc Newton, who was master of the Royal Mint for crying out loud! I guarantee you that anyone with that job DOES pay at least some attention to money.
...when nobody's looking, just watching them struggling to check his solution... ;)
He knows the answer well, but won't reveal it out of malice.
What an asshole.
From the summary's Claymath link, emphasis mine:
Poincaré Conjecture
If we stretch a rubber band around the surface of an apple, then we can shrink it down to a point by moving it slowly, without tearing it and without allowing it to leave the surface. On the other hand, if we imagine that the same rubber band has somehow been stretched in the appropriate direction around a doughnut, then there is no way of shrinking it to a point without breaking either the rubber band or the doughnut. We say the surface of the apple is "simply connected," but that the surface of the doughnut is not. Poincaré, almost a hundred years ago, knew that a two dimensional sphere is essentially characterized by this property of simple connectivity, and asked the corresponding question for the three dimensional sphere (the set of points in four dimensional space at unit distance from the origin). This question turned out to be extraordinarily difficult, and mathematicians have been struggling with it ever since.
Oh no not again! Won't these people ever, ever learn?!
ALWAYS SPECIFY THE QUESTION.
"Ah, we got an answer, but it seems to be just... 42?"
How? There are many branches of mathematics and mathematicians who deal in practical work and will decry the relevance of this type of work.
The results of different mathematicians, some big and some small, are put together by the next generations of mathematicians to derive new results. Many people who deal with the practical are content to buil on fairly old results. They can decry all they want, but most likely even they use somee result which was initially a solution waiting for a problem. General relativity is a good example of mathematics that had no application at first. Einstein needed the tools of differential geometry (beyond just surfaces in 3 dimensions) to formulate and express the theory. I might needd to check my math history a bit, but I can't think of any major mathematics which were developed for a specific practical purpose since about Gauss. There have been serveral that have been applied, though.
What new "techniques" were invented to (suposedly) solve this problem?
I don't quite understand the details as I have only taken a single class in differential geometry and I don't think a paper has been released yet, but Perelman gave a lecture on his results at MIT and my unerstanding of it is: By doing something studying the Ricci flow in a new way, spawning some new field that I heard refered to as "Geometrization" or some such, he created a theory which solves a large class of problems. The poincare conjecture is just a special case of his theory.
In general, though, all the really hard problems in mathematics have spawned many theories and techniques as people attempted (and failed) to solve them. While Andrew Wiles proved and important conjecture in the process of proving Fermat's last theorem, 250 years of mathematicians created all sorts of wolderful results along the way. If I told you them, would you appreciate them, or even understand them?
They were the base foundations for the research and development of what we have today
And things like this will be the base foundations for the research and development of what we have tomorrow. But when things like that were being worked on, they had no practical use outside of mathematical puzzles and other bits of mathematics. I believe that Hardy once said that he loved number theory because he knew he was working on something with no applications. You don't know what results will be based upon this work and for you to use hindsight to justify the work that became important while dismissing all work that doesn't have immediately obvious applications is at the very least illogical. You don't know the future, and its pretty clear that you don't know the past. Don't pass judgement on a major achievement before it has hadd a chance to bear fruit.
Poincare Conjectures solve YOU. SCNR
You are forgetting that this is about an Apple, so obviously there's a Reality Distortion Field at play somewhere. Anything is possible. Including 2D fruit, 4D donuts, and G5 sunflowers. Oh wait, the last one isn't.
I wonder if this Russian fella used RDF as a factor in his equations?!
A better analogy would be to continuously move a circle on the surface until it becomes a point. In the case of a donut, you could draw the circle through the middle hole and around again, so you can't "shrink it to a point" my continuously moving it anywhere; it goes around the donut anywhere you put it. With a sphere, though, you can continuously move the circle to a "pole," where it becomes a point. This property is called simple connectivity.
It's pretty easy to see that all simply connected 2-manifolds (in 3 dimensions, at least) are homeomorphic to the shell of a sphere, i.e. they may be stretched and contorted to look like it. The question answered here is whether the same is true in the next dimension.
Karma: Bad (mostly due to all those "In Soviet Russia" jokes)
I normally roll my eyes in despair when somebody complains about politicial correctness gone mad (because normally the complainer is a little racist wishing for times gone by).
But now I am absolutely flabbergasted that somebody may find such title racist.
Honestly man, where is your common sense?
Russian is not used in a derogatory manner, don't be mentally anal retentive for goodness sake.
IANAL but write like a drunk one.
Find it in a dictionary, it may help your jokes in the future...
IANAL but write like a drunk one.
Seems to be not that easy stuff, if it takes a world full of Mathematicians two years to check a single proof...
Could be worse. Could be raining.
Well, there are actually differences between numbers in different languages: 1 Billion in english is 10^9, while 1 Billion in spanish is 10^12.
Cheers
DVD Ripping, Divx, VCD, SVCD under Linux
Mods:
You suck, this is not Flamebait. Someone mod me as flamebait, and mod this something Positive.. beacause I guarantee 95+% of slashdot does not understand the description.. As someone else earlier said, the page linked makes a HUGE leap, and doesn't take anyone with it, in the explanation of the conjecture.
"Champagne for my real friends - and real pain for my sham friends!" http://ericblade.postalboard.com/
http://www.findarticles.com/p/articles/mi_m1200/is _17_163/ai_101339488
The paper link is inside.
This sounds remarkably similar to an "Engineering vs Mathematics" argument that is heard in Universities all around the world. The mathematicians are not generally interested in solving real world problems. They are interested in generating math. Engineers are not interested in math, but need it to solve the 'real problems'.
Languages aren't inherently fast -- implementations are efficient
"Who would have thought that those that worship islam would kill kids by shooting them in the back and laugh at them as the tortured them. After all islam is the Religion of Peace (TM)" Well actually they do
"Who would have thought that those that worship islam would kill kids by shooting them in the back and laugh at them as the tortured them. After all islam is the Religion of Peace (TM)" Actually they don't worship Islam, they worship Allah.
I've solved it:
5 Riemann hypothesis Involving zeta functions, and an assertion that all "interesting" solutions to an equation lie on a straight line. It seems to be true for the first 1,500 million solutions, but does that mean it is true for them all?
Answer: NO it doesn't mean it's true for all of them. You would have to prove that.
Where do I get my money?
Karma police, I've given all I can, it's not enough, I've given all I can, but we're still on the payroll.
Extracted from: http://www.nacho.unicauca.edu.co/Maticias/0309ConP oi/0309ConPoi.htm
Translated for better reading (I use to speak spanish):
Robinson, S., Russian reports he has solved a celebrated math problem, New York Times, 15 April 2003, F3
In November, 2002 appeared a rumor on the Internet saying that the mathematician Russian Grigory Perelman, from the Institute Steklov of the Russian Academy of Sciences in Saint Petersburg, had published in arXiv a preprint presenting a proof of Poincaré's Conjecture.
Take a look at the picture in this document and perhaps you'll understand it better:
j ec ture/Official_Problem_Description.pdf
http://www.claymath.org/millennium/Poincare_Con
Best regards
PK
Uhm maybe that link describing the Ponticare conjecture described it incompletely, because the question as described is trivial to prove. I can see it geometrically.
Cut a 4 Sphere with a plane right down the center.
The cross section is a 3 sphere. Consider that section to be the section wrapped with your 3 sphere "rubber band".
Now move a short distance perpenducular to the this slice and take another slice. It will be a smaller sphere. You've just slide your "rubber band" down the apple a bit.
If you keep doing this the 3 sphere slices get small and smaller, converging to a point.
Viola, it's simply connected.
viola = musical instrument
voila = french word for "there you have it" or whatever
I understand that it's supposed to generate "good mathematics" that will supposedly help us solve practical problems eventually .. but why not offer the reward for actual practical mathematics
Because practical mathematics already has a monetary reward?
Languages aren't inherently fast -- implementations are efficient
If you're a math geek, you'll do things that let you sit down and work on problems.
If you're a sex fiend, you'll spend your time in the gym, and maybe convincing people to pay you hefty consulting fees to tell them things they already know.
If you're a musician, you'll be in a band, even if you'll never make more thana hundred bucks a gig.
If you want to be the richst man in the world, well, if I knew the answer to that I'd be the richest man in the world.
But if you're a guy who actually does like solving math problems, and someone comes along and offers you $1 million, it's probably pretty useless to you, sine it doesn't help you solve math problems.
(Ok, in reality, that's kinda short-sighted, as you could buy $1 million of computer time, but maybe he doesn't like computers.)
paintball
You just made all that up, didn't you?
paintball
So the Whocarés Conjecture is obviously hypothetical.
paintball
Somebody needs to slap this guy and scream "TAKE THE MILLION BUCKS!!!!"
I cannot stand people who rub a lamp, get a genie, and then can't think of anything they want.*
It's like buying the last orange cream soda in the Gobi Desert Gift Shop, deciding you don't want it, and pouring it out.
If you think the money can be put to better uses, well then DO THAT.
* I'm not implying that this was luck. This behavior is worse than when it's luck and you're unprepared.
At first glance I thought that a Russian had finally managed to read one of those holiday books and make sense of it... you know, those with titles like "The Bourne Identity", "The Omega Sanction"...
Donald 'Duck' Dunn: We had a band powerful enough to turn goat piss into gasoline.
I don't understand why all this fuss about the Poincare conjecture, the answer is pretty obvious.
If there's one thing I remember from 6th grade physics, that's Plonco's constant:
Plonco's constant is the number times which you have to multiply the result you obtained in order to get the correct result of the problem.
And if there's one thing I remember from 6th grade math, that't the Perfect Function (pf):
pf: All problems -> All results,
pf (problem data) = result.
The Poincare Conjecture (and every millenium problem for that matter) can easely be solved by applying the Perfect Function and then multiplying with Plonco's constant.
(Ok, in reality, that's kinda short-sighted, as you could buy $1 million of computer time, but maybe he doesn't like computers.)
Computer time will only help with P problems, or P elements of NP problems. Great mathematicians seem to be NP-solving machines. A hundred years of computing time on the best computer might releive some of their tedium but would actually have an insignificant impact on their ability to solve problems.
The rest of us lesser beings might consider spending out time building a super-high resolution MRI machine. We'd want to be able to image every atom in a person's brain and record a year's worth of data at something like 100k samples per second. The MRI should be light and comfortable so our test subject could wear it comfortably for that year.
Once the suerp-MRI machine is ready, we manufacture it into a comfortable yet stylish (to the eyes of mathematicians) hat, and invite a prize-winning mathematician to wear it for a year.
At the end of the year, we need to locate some prize-winning neuroscientists to help us decode our brain scans and prize-winning computer scientists to help us build it.
You're assuming that you have a 4-sphere and you try to prove simple connectivity. The conjecture is pretty much the opposite implication.
Just remember, it's from the Latin "annus", not "anus".
11.0010010000111111011010101000100010000101101000
I've just re-RTFA, and saw no new refs to anything from 2004 (care to quote what you're talking about?). Looks like a duplicate to me, although I am only for this kind of publicity for the proof - maybe another person would venture into verifying the proof based on this posting. Judging by the comments on this /. article, a lot of folks have seen the mention of Grisha's proof for the first time.
VKh
Off topic, I know, but wow...where do you live that you can have a $700/mo payment on a house? My husband and I rent a loft for just a little over that price! *is indeed willing to move!*
I sing the doggie electric!
Thanks xoran, that's helped quite a bit. I think the summary on that page does a very poor job of explaining the problem. I imagined wrapping a rubber band around the donut like this:
O o
the small o is the donut, hole facing you. The large O is the rubber band - put your face against the scree and cross your eyes until they merge for the interactive ascii art version. It didn't occur to me to loop the rubber band THROUGH the hole. How could you do that without destroying the donut first? It all sounded like madness.
P.S: Mods, I was being half serious, half humourous - I don't know where you got troll and flamebait from, but I would like to suggest getting laid. Thank you.
This sig is part of your complete breakfast.
In the good old days britain used the following system for large number naming:
10^(6*2^(n-1))= n=llion
so that
million = 10^6
billion = 10^12
trillion = 10^24
etc which has the advantage of making it easy to know whether you should say a million billion, a thousand trillion or a quadrillion. It is also far more economical with the use of names.
Official usage now is the much less pretty American usage 10^3(n+1) = n-llion so:
million = 10^6
billion = 10^9
trillion = 10^12
and so on.
In the financial world the word milliard still lives on in the abbreivated form "yard" or perhaps "'iard" to refer to a billion. It is quite disappointing when you learn that a trader talking about a yard of yen does not mean a three foot stack of bills.
One thing I don't get is why isn't there some software out there to verify the proofs? I mean math follows rules and these rules should be convertable into a piece of software, shouldn't they? So why do I always read that somebody might have proofed this and that, yet nobody has yet verified it and often there are even just a few people with enough knowledge to verify the proof at all so it takes quite some time until a proof get verified.
I am not talking about having a computer generate the proof itself, which can be difficult of course, I am just talking about verifing a given proof.
Don't waste your time/modpoints replying or modding a copy of this.
In one of the nations poorest states, in one of the hardest hit by loss of jobs recently, Lewis County, West Virginia. When I met and married my current wife 15 years ago, she had a house, on a 30 year contract at about 400 a month, doing that on a school teachers salary. When I finally got my own head above water financially (the 2nd ex left me a hell of a mess with the irs, but as a tv Chief Engineer, I made quite a bit more than she did teaching school) the first thing I did was refinance it for 7 years at 6%, at a hair under 700/mo. Been paid off now for about 7 or 8 years.
:)
West Virginia can use a few selected people who are willing to come here. Jobs can be had, but may not be everyones cups of tea. With oil back up, well drilling has started up again, which has taken up most of the slack from the closeier(sp) of several glass making operations due to far eastern imports cutting the market for our higher priced hand-blown products. Basicly, he who is willing to work, can usually find work. It may not be at what one would call the prevailing scale, but then neither is the cost of living here (older places in bad need of some sweat equity can be had for under $20k) other than its almost de-rigor for the first vehicle to be a 4wd. There is one thing we've got planty of, and thats hills. Right up in your face hills.
I seemed to have fit right in when I came here as I am essentially self-educated in electronics and have been making my living making electrons do interesting work since the late 1940's. My highest 'formal' education is the 8th grade. But in local tv broadcasting, I am a very big frog in a quite tiny pond, spending the last 20 years in that office/workshop. With all the perks added in, I was making more than $60k when I retired.
To give you an idea of the climate here for technical jobs, about 10 years ago I gave a 10 explanation of how tv works to a bunch of 8th graders touring the station as an end of the school year perk. I finished up by saying that my job keeping all this working was an interesting job, but that someday I would retire, and I wanted one of them to be nipping at my heels wanting to replace me. 30 some 8th graders laughed their collective asses off, they didn't understand that like shoveling shit out of the cowbarn, somebody has to do it. I'm an old Iowa farm kid, so I know about shoveling shit out of the cowbarn too. So I wrote that possibility off and never mentioned it again to an end of the school year tour group. AFIAC, it was their loss, not mine. I rather enjoyed being the old man on the mountain, the guru if you will, that when things went to hell, got the phone call. Of course, 2.5 years after I retired, I still do. No one knows that 40 year old GE transmitter (locally anyway) like I do. OTOH, I get paid to answer the phone too, which helps in the health insurance dept.
To put something in here thats not OT, I would hope that this russian does take the money, and that he has more sense than to turn into a russian version of Jack Whitaker, who won the lottery here for about 140 mill 2 years ago, and has had nothing but legal problems since. He's also been mugged & left for half dead several times since everyone knows he carries several hundred $K around with him as he frequents the bars. IMO, thats not what winning the lottery should be about.
The russian would be similarly targeted as one to be taken advantage of if he had that kind of money at his disposal. Because of this, he may see it as a less than ideal situation. If he was smart, he'ed open an account here, and have a regular funds transfer to there of maybe 1 or 2 hundred a month setup in perpetuity. That amount would go a long way in raising his standard of living I'm sure. As to how to assure he got it when the russion mafia probably owns the local bank there, I don't know.
Cheers, Gene
the article explains 1 million US dollars as being worth 560 million UK pounds....
it would seem that now is a good time for you US geeks to go on holiday to the UK - just in time for the LinuxWorld Expo in London, and at those rates a brand-new Mercedes-Benz would cost you about 95 bucks..
Hell, if you each donate a dollar, I could retire!
... for explaining the problem in 207 words.
Is one of them spelling millennium correctly ?
The n-sphere (which mathematicians generally denote by S^n) can be thought of as `all points in (n+1)-dimensional space which are at unit distance from the origin'. So S^2 is the surface of a solid 3-dimensional ball. This sometimes surprises people, who expect this to be S^3 but the key observation here is that the 2 refers to the intrinsic dimension of the object, rather than the extrinsic dimension of any space you might happen to put (`embed') the object in. The fact that we often think of the 2-sphere as being embedded in 3-dimensional space doesn't change the fact that it's inherently a 2-dimensional object. An ant wandering around on it still only has two degrees of freedom.
The 3-sphere (S^3) locally looks like ordinary, flat, Euclidean 3-space, but on a larger scale it kind of doubles back on itself - if you keep walking (or floating) in a `straight line' (well, actually the 3-dimensional analogue of a `great circle', but never mind) in any direction, then you'll eventually get back to where you started.
The Poincaré Conjecture says
This, by itself, isn't particularly enlightening to the non-topologist, but what it actually boils down to is:
What does this mean?
Well, an `n-manifold' is a space which locally looks like ordinary, flat, Euclidean n-dimensional space. So a 3-manifold is a space (like S^3) which locally looks like ordinary 3-space (but which might twist back on itself in a peculiar way on a larger scale).
`Closed' means that the 3-manifold doesn't have a boundary - no matter how far you walk, you're not going to run into a brick wall, or fall off the end. `Compact' is a bit more technical, but in this context essentially means you don't get odd shooting-off-to-infinity stuff you have to deal with.
And `simply-connected' means that the first homotopy group (the `fundamental group' of the space) is trivial. What that means is that any closed loop (of string, if you like), in the manifold, can be continuously shrunk down to a point. Here `continuous' means that you're not allowed to cut or glue the string while you're doing it.
To use a 2-dimensional analogy, the 2-sphere (the surface of the 3-dimensional ball, remember, or alternatively a British doughnut) is simply-connected, because given any closed loop in the surface, you can shrink it down to a point without it getting snagged on anything. Whereas the 2-torus (the surface of an American doughnut) isn't, because you can't shrink all closed loops down to a point - one which goes all the way round the central hole, for example, can't be shrunk.
Finally, `homeomorphic' is basically a technical word for `topologically equivalent' - we allow continuous deformations (stretching, twisting, etc, but not cutting or pasting), rotations, reflections, or any combination of these.
So, the (classical) Poincaré Conjecture is essentially a technical way of saying ``If it looks like a 3-sphere then, basically, it is''. (For certain definitions of `is', and `looks like'.)
The analogous conjecture in n-dimensional space is known to be true for n=1 (trivial), 2 (pretty simple), and 5 and above (the 5-dimensional case was proved by Zeeman, who is my PhD grandsupervisor - my supervisor was one of his students). The 4-dimensional case is weird, and there are three different forms to consider - the `piecewise linear' and `topological' cases have been proved, but the `smooth' case is still unproven.
As I understand it, what Perelman claims to have done is prove Thurston's Geometrisation Conjecture, which implies the Poincaré Conjecture as a special case - rather lik
Wasn't this an old Slashdot article?
1 2/30/century_old_math_problem_may_have_been_solved / The Yahoo article's pretty sparse, nothing's changed, and the Boston article's pretty sparse.
Here's a link to the article published in December 30, 2003:
http://www.boston.com/news/science/articles/2003/
Actually where the Steklov Institute of Mathematics is, St. Petersburg, is a beautiful city and he decided to return from the US to live there. Others would too, if it wasn't for the idiots currently running the country.
Lastly, it is useful to remind people that there are excellent mathematicians and software developers there and you don't always need to go to India for offshore solutions.
See my journal, I write things there
The work on the N-body problem was by ... Poincaré.
Is it just my impression, or Slashdot is highly allergic to accented letters?
It's Poincaré, not Poincare. Is it that difficult to respect international spellings?
...who wants to be a millionaire.
The author of the parent post claims to explain the conjecture from the point of view of a "MS Mathematics". This would be fine if the explanations had not been copied directly from MathWorld.
Quote from the parent post:
Now please compare this with the middle paragraph from http://mathworld.wolfram.com/PoincareConjecture.ht ml. The one that starts with "The n = 1 case of the generalized conjecture is trivial, the n = 2 case is classical (and was known even to 19th century mathematicians), [...]"
This is just an example. Other paragraphs can be found in MathWorld's pages about the Poincaré conjecture, definition of manifold and compact manifold, homeomorphic, etc.
Now I don't mind if some useful information is posted on Slashdot. But some obvious plagiarism like that without crediting any sources definitely deserves some Overrated treatment...
This is completely anecdotal, and in this case the expression "your mileage may vary" is especially apt, but the Dodge Caravan is the reason why I will probably never buy an American car. Or van, in this case. My family made the mistake of getting one several years ago. I believe it was a 1985 manual transmission (not many of those made, either). That piece of shit just kept falling apart, piece by piece. The interior plastic crap broke off at the slightest touch. The ceiling fell down (the cloth covering, that is). But the coup de grace happened at the most inopportune time. We were on a family trip, about 1000 miles from home, when the engine exploded. I don't know which part of it broke, but it sprayed oil all over the windshield while we were on the highway. Luckily my dad had plenty of spare oil, and for about 50 miles we would stop every 5 miles, wipe off the windshield enough to see, add another quart of oil, and get back on the highway going 35 mph.
That engine had less than 90k on it. My dad used that incident to illustrate the principle of "built-in obsolescence" and it's a lesson I never forgot. Since that point, my family has not purchased another American car. Exception: until very recently, there were no Japanese full-size trucks, so we did get a Ford F250 to haul building supplies. American trucks do seem slightly more sturdy than the cars. Now we get old Mercedes diesels. You can get one for less than $3000, and they'll run for up to half a million miles if you're careful. It sure seems like a more financially sound strategy than purchasing a Dodge Caravan for four times that amount.
That said, I wish you luck with your Dodge Caravan / Plymouth Voyager. Maybe we just got a lemon, but I've never seen a lemon Mercedes (or Honda, or Toyota, or Nissan . . . ).
Si la vida me da palo, yo la voy a soportar Si la vida me da palo, yo la voy a espabilar
The br prefix stands for british. The british of ye olden days themselves would not have used the br- prefix with the -illion suffix.
If this question interests you, you need to read Godel, Escher, Bach: The Eternal Golden Braid.
It's an awesome read, full of theory, exposition, and fables to explain the theory. The main idea behind the book is to explain Godel's proof that there are some things which are true but unproveable. There's a lot more to it, though, and it will stay with you for the rest of your life.
People, money is good. I repeat, money is good.
The only people who sit around talking about how bad money is are:
1. People who don't have any because they are lazy and not willing to put in the effort.
2. People who have it but didn't work for it and have the luxury of sitting around pontificating about a world they barely participate in. (ie. most of Hollywood)
It seems a pound can buy more than a dollar. British Pounds are like the US Dollars of 1984-1985:
Does this have any real world consequences? Like I know if P=NP and P ain't that bad, there could be dogs and cats living together, mass hysteria, giant marshmallow men in new york, etc... What about this?
Einstein's paper "On the electrodymanics of moving bodies" contains nothing new. It was actually Poincaré who was the first to correctly state the special theory of relativity (the transformation formulas were found by Woldemar Voigt in 1887, H.A. Lorentz in 1892, Sir Joseph Larmor and others)
...Il a commencé par admettre que la lumière a une vitesse constante, et en particulier que sa vitesse est la même dans toutes les directions. C'est là un postulat sans lequel aucune mesure de cette vitesse ne pourrait être tentée. Ce postulat ne pourra jamais être vérifié directment par l'expérience; il pourrait être contredit par elle, si les résultats des diverses mesures n'étaient pas concordants. Nous devons nous estimer hereux que cette contradiction n'ait pas lieu et que les petites discordances qui peuvent se produire puissent s'expliquer facilement. ...c'est que je veux retenir, c'est qu'il nous fournit une règle nouvelle pour la recherche de la simultanéité... Il est difficile de séparer le problème qualitatif de la simultanéité du problème quantitatif de la mesure du temps; soit qu'on se serve d'un chronomètre, soit qu'on ait à tenir compte d'une vitesse de transmission, comme celle de la lumière, car on ne saurait mesurer une pareille vitesse sans mesurer un temps. ...La simultanéité de deux événements, ou l'ordre de leur succession, l'égalité de deux durées, doivent être définies de telle sorte que l'énoncé des lois naturelles soit aussi simple que possible. En d'autres termes, toutes ces règles, toutes ces définitions ne sont que le fruit d'un opportunisme incoscient." (H. Poincaré, La mesure du temps, in Revue de métaphysique et de morale 6 (1898), pp. 1-13)
In 1898, Poincaré attacks the distinction Lorentz and Larmor make between "local time" and "universal time": "Nous n'avons pas l'intuition directe de l'égalité de deux intervalles de temps. Les personnes qui croient posséder cette intuition sont dupes d'une illusion... Le temps doit être défini de telle facon que les équations de la méquanique soient aussi simples que possible. En d'autres termes, il n'y a pas une manière de mesurer le temps qui soit plus vrai qu'une autre; celle qui est généralement adoptée est seulement plus commode.
In 1902, Poincare writes there is no absolute time and no absolute space: "1 Il n'y a pas d'espace absolu et nous ne concevons que des mouvements relatifs... 2 Il n'y a pas de temps absolu; dire que deux durées sont égales, c'est une assertion qui n'a par elle-même aucun sense et qui n'en peut acquérir un que par convention... 3 Non seulement nous n'avons pas l'intuition directe de l'égalité de deux durées, mais nous n'avons même pas celle de la simultanéité de deux événements qui se produisent sur des théâtres différents; c'est ce que j'ai expliqué dans un article intitulé la Mesure du temps; 4 Enfin notre géometrie euclidienne n'est elle-même qu'un sorte de convention de langage; nous porrions énoncer les faits mécaniques en les rapportant à un espace non euclidien qui serait un repère moins commode, mais tout aussi légitime que notre espace ordinaire; l'énoncé deviendrait ainsi beaucoup plus compliqué; mais il resterait possible. Ainsi l'espace absolu, le temps absolu, la géométrie même ne sont pas des conditions qui s'imposent à la mécanique; toutes ces choses ne preéexistent pas plus à la mécanique que la langue francaise ne préexiste logiquement aux vérités que l'on exprime en francais."(H. Poincaré, La science et l'hypothèse, 1902
-- Qu'est-ce que la propriété intellectuelle? It is thought control.
This sounds like a typical excuse for universities to get more grant (much of which is tax) money - delusions of practical application "if only we get just a little more money, we could do so much!" (the cries of which are repeated every year).
This is a valid concern, and you're certainly not the first person to voice it - indeed, it seems to have become not just ok, but actively encouraged for government education ministers to rant about how taxpayers' money is being wasted on frivolous matters (before getting into their chauffeur-driven Jaguars and heading off to sumptuous gourmet lunches).
It's something I've thought a lot about, myself - I've spent thousands and thousands of pounds of my own, hard-earned and carefully-saved money over the past eight years, funding myself through an MSc and then a PhD in pure mathematics. Not because I thought it would boost my salary, or anything, but because I wanted to learn more about something which interested me. I don't begrudge a penny or second of the money or time I spent doing it - it changed my life, it changed the way I think about everything, and I learned a lot of fascinating stuff along the way.
What it boils down to, I guess, is that if you want to live in a cultured, advanced society (and you should, if only because of the fringe benefits like the general population being healthier and longer-lived, and the crime rate being lower, and so on - but also because it makes life a lot more interesting) then you have to pay people to find out new stuff. Some of this will be practical things like engineering or applied science, some of it will be less practical stuff (like pure science or mathematical research) which might at some point turn out to have practical applications (and both mathematics and `blue-skies' scientific research has a pretty good record in this regard), and some of it will be entirely impractical stuff like art or music.
We simply can't rely on private corporations to fund this sort of stuff - with a few notable exceptions (such as Xerox PARC) they generally have an intensely short-term, practical viewpoint on research - if it's not going to start bringing in hard cash within a couple of years then they don't tend to bother. And there's no particular reason why they should - that's not what they're for.
So what does that leave? Charities and central government, basically. And central government means our tax money.
Do I begrudge my tax money being spent on dubious private finance deals where some private company profits immensely from knocking down a perfectly serviceable hospital, selling off the land, and building a new, smaller, less well-equipped hospital further away? Well yes, actually, I do. Quite a lot, in fact.
Am I irked that a phenomenal amount of UK taxpayers' money is being used to wage a dubious (and catastrophic) war halfway round the world, for the benefit of Texas oil-barons and the Halliburton board of directors? Very much so.
Do I begrudge the Arts Council using (a far tinier fraction of) my tax money to fund Damien Hirst to pickle a sheep's carcass in a tank of formaldehyde? Not for a second. I might think he's a nutter for doing it, and I might not necessarily want to see it when he's done it, but I'm glad to live in a civilisation where people are trying out things like that, for no other reason than they think it might look nice, or interesting, or encourage people to think or look at the world in a slightly different way.
Does a Mozart string quartet directly generate money? No - or at least not much, and not for very many people. But it enhances the world in so many ways, and inspires and motivates the people who listen to it. There are numerous anecdotal cases of important scientific insights being triggered by a piece of music or a painting.
Mathematics is a bit of a hybrid, really. It's `blue skies' research, done purely for its own sake, but it has an unreasonably good track record of turning out to be really useful someti
You are right and unfairly modded "flamebait", I've added you to my "friends" list... Kardamon.
That an article reporting on a mathematical problem being solved
= 85 7&ncid=757&e=10&u=/nm/20040906/od_uk_nm/oukoe_scie nce_maths
equates 1 million dollars = 560 Million pounds!
http://story.news.yahoo.com/news?tmpl=story&cid
Blarney Quality Restaurant, Plants
You're right because you can't see anything practical coming from it? *That* makes you right? Someone needs to take some logic courses.
this may also be of interest, it appears that/ 1157891
another one of the so called "millennium problems",
may have just been solved, that is Riemann
Hypothesis:-
http://www.vnunet.com/news
we are all lucky to live in such exciting times.
int factor(int prime, int* factors)
{
factors[0] = 1;
factors[1] = prime;
return 2;
}
Posting as anonymous - feel free to check and use my code. I'm not interested in the money.
Oh, I've followed your link and now I understand why you've been modded flamebait: this is just anti-semitic bullshit.
-- Qu'est-ce que la propriété intellectuelle? It is thought control.
I'm glad you've found a way to make it work for you.
But it's a precarious world.
For folks with less mental acuity in West Virginia, they'll spend less time enjoying the beautiful mountains and forests of the state and most of it underground mining coal.
Or making metal in a mill, surrounded by concrete, bad smells, and loud noises
Or on their feet making fast food or cashiering in a convenience store.
But I agree, the key to a lower stress life is to live well within your means.
"Provided by the management for your protection."
What's often overlooked in Maslow's heirarchy of needs is the fact that it is a heirarchy. In other words, it's all well and good to be self-actualized, but you need to have your rent and food bills covered first . You can't just skip from "poor starving genius huddled in an alley scrawling your brilliance in feces on the walls" to "self-actualized."
*I don't think money is BAD*
BUT, while some money is good more money can be almost useless. As a 24 year old making 46k a year who is having trouble finding things to spend money on I can say there is a threashold where it stops being more usefull.
Books LT 200$ a month
Food LT 300 $ a month
Car LT 400$ per month (I live 5 miles from work so it's cheep to have an old car.)
Rent + utils LT 900$ per month have a roomate I like
phone 30$ a month
Everything else LT 300$ a month.
Hmm, mabe I should put more than 8% into my 401k or something but I like having 4k in the bank. Hell mabe I should get my little sister a laptop I mean I got my mother one last year but kate say's she is happy with her desktop so what's the point? While I will soon start making mid 60's or more what am I going to do, dump the roomate and retire early or get a wife and kids?
O well not that far from my next review and if I only get 8k like that time I will probably walk and get a real job after having gotten that ever so important 2 year's exp after college. But, what do I say to those friends making 80k who say I could get you a job just send me my resume it's hard to be motivated when somedays you can't but think "I can finaly undersand my dad's old saying; 'I could do this or that and make a lot more money but what's wrong with 100k?' I mean shure he had kids but we could have made more and we spent more but what would have been the point?"
20% down on a $150,000 house results in a payment of $700/month at 5% on the remaining $130,000 to finance. 5% has been achievable recently, but a higher rate doesn't raise the payment *that* much. And you can buy plenty of fine houses for $150,000 (I am near Atlanta, which is hardly the cheapest area to shop for homes, and did fine at that price point in Gwinnett.)
My home loan is a "7/1 ARM" with a 4.75% rate locked in for 7 years - after which it will go up, but if I haven't moved by then I still come out ahead over the 30-year-fixed until 11 years into the loan. Today you can get a 30-year fixed loan at 6.5% APR, which only adds another $70/month over the 5% (5.875% interest = 6.5% APR after paying closing fees; first number offered up by first random bank I pulled up, shopping around may do better.)
If you can't swing the 20% down, cost goes up noticeably, chiefly due to needing a higher-rate second loan or else paying private mortgage insurance (which wastes roughly a car payment each month and so is best avoided).
It's doable for many people simply by cooking from scratch at home and driving used cars. Of course, many people aren't willing to do that.
If he truly had a brain in his head, he would accept the million and donate it to some organization/charity that needs it!
And I didn't know about any reward money. Am I really that far out of the loop?
I might needd to check my math history a bit, but I can't think of any major mathematics which were developed for a specific practical purpose since about Gauss.
Well, the Finite Element Method and the resulting analytical techniques were developed int he 1950's at the University of Washington. That type of analytical math is used for dynamic modeling of structures, fluids, electronics, and a few other things. It's calculus of variations at its core, but a more powerful technique in its field.
A better example would be statistics. Most any cutting edge physics involves statistics in some way. Statistics is also the basis for quantum mechanics.
As for Perelman's results, it can be summarized as follows:
Any 3-dimensional surface is made of a superposition of surfaces with loops, and those without loops. (Looped surfaces means that a coffee cup and a torus are the same.)
Out of all the 3-dimensional surfaces known, only the sphere is the simplest.
All surfaces in 3-dimensions consist of a sphere and any combination of looped surfaces. Open surfaces are not included in this new definition.
That last was Poincare's conjecture. Perelman proved that the simplest object in 3-dimensions is a sphere, and successively more complex surfaces are made of a sphere superposed with looped surfaces (donuts).
What this all means for the rest of us? Not much, other than physics has a more stable foundation in math (for 3-dimensions.)
Well, the technical/non-technical jobs thing isn't an issue, really, for me, nor if I can get a job there. I'm a trucker for a national company and they don't really care where I live -- it just changes where I go when I'm off. I'll have to check it out. Thanks for all the info! *off to ponder*
I sing the doggie electric!
Now that would be news, if a Muppet solved the Poincare Conjecture:)
I don't know about you but I am getting pretty sick of all these slams against Hollywood. I think unless you are ready to go out and try to make a movie as good as "The Dirty Dozen" or "Bullit" you should just pipe down.
Interesting reply. Let me give you something to think about. Concentrate on improving yourself, and let the salary be the vehicle that allows you to do that. I've been taking university courses for years just for the fun of it. I've taken everything from aeronautical engineering to women's literature to philosophy (to political science, history, psychology, sociology, blah blah blah). Money is freedom to constantly grow yourself.
Best of luck!
West Virginia has a lot going for it:
- It would be the largest state in the union if you flattened it out.
- Come down in ramp season for some fine cooking.
- Go white water rafting on the New, or rock climbing.
- has the finest people in the world, no lie.
I kept thinking about the rubber band stretched along the outside ring of the donut, not through the centre. Because it's common sense that you can't stretch a rubber band through the hole without braking it (or the donut) first.
So, now I know what they mean by "somehow been stretched in the appropriate direction around a doughnut".
Thanks! You should be writing the explanations for claymath.org.
A viola is NOT simply connected.
Actually, that's not a better analogy at all. That is a sucky and confusing analogy. How the hell do you move a circle until it becomes a point? I mean, WTF? Just stick to the damned rubber band story needleneck.
It's a much better analogy - he said you move the circle along the surface of the sphere until it becomes a point, like having a giant line drawn around the earth at the equator, then erased and redrawn at the tropic of cancer, then erased and redrawn northwards until it's wrapped around Rudolph. That makes a hell of a lot more sense than "shrinking a rubber band to a point" - if I had a rubber band the size of the Earth, there'd be a shitload of excess rubber bunching up by the time I got it to a pole. Shrinking it to a point doesn't easily invoke the image of rolling it along the surface.
of thoroughly exhausting all possibilities before you explain you method, let me point out one last detail.
"Think nothing is impossible? Try slamming a revolving door."
This was your original challenge, you didn't specify in what way or any restrictions. Therefore, all the solutions provided technichally fit your challenge, thus all were correct. Each time a new solution was provided you provided a new challenge involving more restrictions, so before you call everyone else's solution invalid, you shouold recognize that this was a result of your being incomplete in presenting the challege. That said, please enlighten us on how to slam a revolving door.
Get me a meat pie floater!
nor izza bassoon
ok (trying) to read and understand the millenium problems makes me feel dumb. but that aside what practical uses do any of these solutions or problems have?
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Note that if you take any 2d slices(where one dimension is the one not applicable to the rubber band) of the 3d sphere and rubber band converging, you'll notice two points converging... This might be over-simplification, but it appears a similar view would be applicable to your solution. So long as one of the dimensions of the 3-d "slice" contains the one the 3-d band is not in, all is well. I see no reason why this would not hold true for an apple of x dimensions, where the band around consists of x-1 dimensions.
Support more choices in goverment-Vote 3rd party.