134
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When I was a young and impressionable graduate student at Princeton, we scared each other with the story of a Final Public Oral, where Jack Milnor was dragged in against his will to sit on a committee, and noted that the class of topological spaces discussed by the speaker consisted of finite spaces. I had assumed this was an "urban legend", but then at a cocktail party, I mentioned this to a faculty member, who turned crimson and said that this was one of his students, who never talked to him, and then had to write another thesis (in numerical analysis, which was not very highly regarded at Princeton at the time). But now, I have talked to a couple of topologists who should have been there at the time of the event, and they told me that this was an urban legend at their time as well, so maybe the faculty member was pulling my leg.

So, the questions are: (a) any direct evidence for or against this particular disaster? (b) what stories kept you awake at night as a graduate student, and is there any evidence for or against their truth?

EDIT (this is unrelated, but I don't want to answer my own question too many times): At Princeton, there was supposedly an FPO in Physics, on some sort of statistical mechanics, and the constant $k$ appeared many times. The student was asked:

Examiner: What is $k?$

Student: Boltzmann's constant.

Examiner: Yes, but what is the value?

Student: Gee, I don't know...

Examiner: OK, order of magnitude?

Student: Umm, don't know, I just know $k\dots$

The student was failed, since he was obviously not a physicist.

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    $\begingroup$ Since every finite CW complex is weakly homotopically equivalent to a finite topological space, that does not sound so bad... :) $\endgroup$ Jan 24, 2011 at 20:54
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    $\begingroup$ Perhaps not an urban legend per se, but when I was learning algebra, my professor, in an attempt to impress upon us the necessity of checking that certain maps are well-defined, told us the story of a classmate of his who got several years into his Ph.D. thesis before realizing that the maps he was investigating weren't well defined. Horrified, we asked him if this was true. "No" he said, "but that's one lie you'll never forget!" $\endgroup$ Jan 24, 2011 at 21:04
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    $\begingroup$ Mathematical urban legends have been collected by Steven Krantz in the book, Mathematical Apochrypha (and I think there's a second volume). A few refer to the thesis defense. $\endgroup$ Jan 24, 2011 at 23:18
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    $\begingroup$ Though this question and its answers are very entertaining, I think it is a little unfair to close other questions as "offtopic" which are even closer to mathematical research as this one ... $\endgroup$ Jan 25, 2011 at 8:54
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    $\begingroup$ I have to agree with Martin. This is a very entertaining thread but it seems quite outside the mandate of MO. $\endgroup$ Jan 26, 2011 at 16:30

69 Answers 69

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This happened just last year, but it certainly deserves to be included in the annals of mathematical legends:

A graduate student (let's call him Saeed) is in the airport standing in a security line. He is coming back from a conference, where he presented some exciting results of his Ph.D. thesis in Algebraic Geometry. One of the people whom he met at his presentation (let's call him Vikram) is also in the line, and they start talking excitedly about the results, and in particular the clever solution to problem X via blowing up eight points on a plane.

They don't notice other travelers slowly backing away from them.

Less than a minute later, the TSA officers descend on the two mathematicians, and take them away. They are thoroughly and intimately searched, and separated for interrogation. For an hour, the interrogation gets nowhere: the mathematicians simply don't know what the interrogators are talking about. What bombs? What plot? What terrorism?

The student finally realizes the problem, pulls out a pre-print of his paper, and proceeds to explain to the interrogators exactly what "blowing up points on a plane" means in Algebraic Geometry.

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    $\begingroup$ Efim Zelmanov told a similar story: he was stopped by the KGB on his way to a conference and questioned at length about his books on "free groups" and "radicals". $\endgroup$
    – Jeff Strom
    Jan 31, 2011 at 20:20
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    $\begingroup$ Thank god the diligent TSA caught their nefarious scheme. $\endgroup$ Feb 3, 2011 at 17:33
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    $\begingroup$ I hope I'm not being a killjoy, but I've heard versions of this story so many times over the years that I'd be quite interested to find out if this one is alleged to be true and by whom. Do you know? $\endgroup$ Feb 27, 2011 at 20:32
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    $\begingroup$ Anna's story is about my officemate in grad school (who is a friend of Anna's brother, one of our classmates). He was flying from London to the US right after the waterbombing incident. He studies DP1's. They ended up strip searching him. Eventually he got through. $\endgroup$ Feb 27, 2011 at 21:42
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    $\begingroup$ Well, you know what they say about algebraic geometers: they blow up families, and then the come back afterwards to make sure that they're flat. $\endgroup$
    – Ben Webster
    Apr 28, 2011 at 22:25
147
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Since this has become a free-for-all, allow me to share an anecdote that I wouldn't quite believe if I hadn't seen it myself.

I attended graduate school in Connecticut, where seminars proceeded with New England gentility, very few questions coming from the audience even at the end. But my advisor Fred Linton would take me down to New York each week to attend Eilenberg's category theory seminars at Columbia. These affairs would go on for hours with many interruptions, particularly from Sammy who would object to anything said in less than what he regarded as the optimal way. Now Fred had a tendency to doze off during talks. One particular week a well-known category theorist (but I'll omit his name) was presenting some of his new results, and Sammy was giving him a very hard time. He kept saying "draw the right diagram, draw the right diagram." Sammy didn't know what diagram he wanted and he rejected half a dozen attempts by the speaker, and then at least an equal number from the audience. Finally, when it all seemed a total impasse, Sammy, after a weighty pause said "Someone, wake up Fred." So someone tapped Fred on the shoulder, he blinked his eyes and Sammy said, in more measured tones than before, "Fred, draw the right diagram." Fred looked up at the board, walked up, drew the right diagram, returned to his chair, and promptly went back to sleep. And so the talk continued.

Thank you all for your indulgence - I've always wanted to see that story preserved for posterity and now I have.

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  • $\begingroup$ David, do you remember what the topic was? $\endgroup$
    – Todd Trimble
    Apr 2, 2015 at 2:57
135
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Here's another great one: a certain well known mathematican, we'll call him Professor P.T. (these are not his initials...), upon his arrival at Harvard University, was scheduled to teach Math 1a (the first semester of freshman calculus.) He asked his fellow faculty members what he was supposed to teach in this course, and they told him: limits, continuity, differentiability, and a little bit of indefinite integration.

The next day he came back and asked, "What am I supposed to cover in the second lecture?"

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    $\begingroup$ A little more context from (the version I heard) of this one: the mathematician’s previous experience had been in the USSR — I think in Moscow. (This hopefully adds something useful without getting too specific…) $\endgroup$ Jan 25, 2011 at 16:57
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    $\begingroup$ This is really not specific, because in the USSR one was taught these concepts in school. $\endgroup$ Jan 25, 2011 at 17:05
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    $\begingroup$ well, and in large parts of the rest of europe, too. $\endgroup$ Apr 12, 2013 at 21:08
106
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Although David Hilbert was one of the first to deal seriously with infinite-dimensional complete inner product spaces, the practice of calling them after him was begun by others, supposedly without his knowledge. The story goes that one day a visitor came to Göttingen and gave a seminar about some theorem on "Hilbert spaces". At the end of the lecture, Hilbert raised his hand and asked, "What is a Hilbert space?"

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    $\begingroup$ This appears in Krantz's Mathematical Apocrypha Redux (the second edition of the book mentioned by Gerry Myerson in the comments). According to this version the speaker was von Neumann, the lecture occurred in 1929, and Hilbert is quoted as saying "Dr. von Neumann, ich möchte gern wissen, was ist dann eigentlich ein Hilbertscher Raum?" (The translation given: "Dr. von Neumann, I would very much like to know, what after all is a Hilbert space?") $\endgroup$ Jan 25, 2011 at 22:24
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    $\begingroup$ (By the way, I thought this book would be mostly funny stories, but it is full of sobering tidbits about how mathematicians were affected by anti-Semitism, the Nazis, the Great Depression, and McCarthyism. Interesting stuff.) $\endgroup$ Jan 25, 2011 at 22:39
  • $\begingroup$ There is another version of this story in which Weyl is the one being asked by Hilbert. $\endgroup$ Jan 26, 2011 at 11:24
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    $\begingroup$ In Emilio Segre's version of this (very popular) story, as recounted in Segre's <i>Autobiography</i>, the speaker was Enrico Fermi and the year was the late 1930's. "Fermi attended [Robert] Oppenheimer's seminars; coming out of one of them once, he said: 'Emilio, I must be getting senile. I went to a learned theoretical seminar and could not understand anything except the last words, which were "And this is Fermi's theory of beta decay."'" $\endgroup$ Feb 3, 2011 at 16:03
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    $\begingroup$ To this day, in the building in Göttingen in which Hilbert worked, there is an actual "Hilbert space" (the German mathematical word for space is "Raum" which also happens to be the German word for "room"). $\endgroup$
    – Lars
    Feb 17, 2011 at 9:20
102
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A legend that I heard from my father, who heard it from ... ... ...: Levi-Civita was teaching a course in a room on (what Americans call) the second floor of a building. One day, as a prank, his students "borrowed" a donkey from one of the fruit vendors on the street in front of the building. Somehow, they brought this donkey up the stairs into the lecture hall and had it standing there as Levi-Civita entered to begin his lecture. Levi-Civita set his notes down on the lectern, looked up at the class, commented "I see we have one more today," and proceeded with his lecture.

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Here is a story I heard many years ago, and have no confirmation of:

Apparently, there was Asst Professor X at a provincial department Y, and he was up for tenure. Professor X's advisor was a famous Japanese mathematician Z at an Ivy League school. Naturally, he was asked for a letter, which he duly sent. The letter said:

X has a very nice body of work, he proved the following interesting theorems, extended such and such results, used such and such techniques... and so on for two pages. The last sentence was: all in all, X is a very good second-rate mathematician.

The committee was mortified, but figured that the rest of the letter was so good, they should call Z, since maybe since English was not his native language... So, call they did, and the phone conversation went about the same as the letter: did this, improved that, ..., all in all a very good second-rate mathematician.

The committee then said: look, we don't understand why you say he is second-rate!!!

to which Z replied: well, I really can't understand why that would be a problem -- after all, you are a third rate department.

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    $\begingroup$ Who cares if it's true or false? That's what makes urban legends so fun! It's shocking, and yet we feel sure that somewhere some similar incident must have happened... $\endgroup$ Jan 31, 2011 at 20:58
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    $\begingroup$ Andre Weil's law of university hiring (according to Wikipedia, undocumented): "First rate people hire other first rate people. Second rate people hire third rate people." This always left me wondering, who hires the second rate people? Maybe Igor's story answers my question. $\endgroup$ Jan 31, 2011 at 22:34
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    $\begingroup$ "And third rate people hire fifth rate people." $\endgroup$ Feb 3, 2011 at 15:40
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    $\begingroup$ Ah, I understand. Nth-rate people are hired by mth-rate people, where m is the closest integer to n/phi. $\endgroup$ May 25, 2011 at 2:26
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    $\begingroup$ From the Chronicle of Higher Education: chronicle.com/article/You-Were-Too-Good-for-Us/46833 $\endgroup$ Jun 3, 2011 at 0:29
82
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The following story is a bit strange to be true, but we all believed it as students, and I think I still do believe that a somewhat weaker version of events must have indeed occurred.
Michael Maschler (most famous in Israel as author of the standard math textbooks for middle-schools and high-schools) was in the middle of teaching an undergraduate course- I think it was Linear Algebra- when one afternoon he walks into the lecture hall and announces the discovery of a new class of incredible Riemannian symmetric spaces with incredible properties, missed by Elie Cartan. The undergrads have no idea what he is on about; but the faculty all get very excited, and start sitting in on his Linear Algebra course. Ignoring the syllabus, Prof. Maschler begins to give lecture upon lecture about the new incredible symmetric spaces which he discovered. The excitement builds. Will he win a prize? Will he win the Fields Medal?...
And then, 3 lectures in, a student (some say it was Avinoam Mann, about whom many stories are told) gets up and asks, "Excuse me, sir. How can you distinguish your space from a sphere?"
Maschler turns to answer the "stupid question", but he freezes in mid-motion... Gradually, his face turns white. The lecture hall is so silent you can hear a pin drop. Finally, after what seems like an eternity, Prof. Maschler unfreezes. "By golly, a sphere it is," he murmurs in an undertone. And he picked the Linear Algebra textbook up from his desk, and resumed teaching where he had left off. The subject was never broached again.
And so, some Hebrew University students of my generation call spheres "Maschler spaces".

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I've heard that in the earliest days of communist Hungary, Pal Turan was stopped on the street by a patrol. These patrols were charged with collecting a quota of people to be shipped off to Siberia (Stalin was still in charge, and arbitrary punishment is a big part of inducing the Stockholm Syndrome). While being searched and interrogated for his "crimes", the policeman was surprised and impressed (and perhaps a bit intimidated himself) to find a reprint of a paper of Turan's published pre-war in a Soviet journal. Turan was allowed to go free. That day, he wrote a letter to Erdos beginning, "I have discovered a most wonderful new application of number theory..."

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    $\begingroup$ Turan was in forced labor camps during much of the second war. This sounds like an incident I read about that took place in one of those camps. I wonder if we haven't had a conflation of two dictatorships. $\endgroup$ Jan 28, 2011 at 22:06
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    $\begingroup$ Perhaps we should consider "urban legends" as parasites (or symbiotes) on the mathematical ecosystem. They certainly mutate and (as Gerry indicates) perhaps even have sex. $\endgroup$ Jan 28, 2011 at 22:37
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    $\begingroup$ I've tracked down the incident I read about. It's in Szego's preface to Hungarian Problem Book I, which was volume 11 in the New Mathematical Library. It's too long to write out here. Szego doesn't give a source, doesn't claim all the details are accurate, and doesn't name the mathematician. In short, X was in a forced labor camp circa 1940, the supervisor recognized his name from Hungarian problem-solving competitions, and gave him more lenient treatment. The story is also quoted in Rosemary Schmalz, Out Of The Mouths Of Mathematicians, MAA 1993 $\endgroup$ Jan 31, 2011 at 0:36
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    $\begingroup$ Now I have found an unimpeachable source for Szego's story; Turan himself wrote it up in "A note of welcome," J Graph Theory 1 (1977) 7-9. $\endgroup$ Jan 31, 2011 at 1:01
  • $\begingroup$ Here is the text from "A note of welcome". In September 1940 I was called in for the first time to labor-camp service. We were taken to Transylvania to work at railway building. Our main work was carrying railway ties. It was not very difficult work but a spectator could of course easily recognize that most of us-I was no exception-did it rather awkwardly. One of my more expert comrades said this at one occasion quite explicitly, even mentioning my name. An officer was standing nearby, watching our work. When hearing my name, he asked the comrade whether or not I was a mathematician. (Contd) $\endgroup$ Sep 11, 2013 at 0:11
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A wholly different set of "named urban legends" (in order of time):

Allegedly, Jacobi came to show Gauss his cool results on elliptic functions. Gauss' response was to open a drawer, point at a sheaf of papers, and say: that's great you are doing this! I have actually discovered these results a while ago, but did not think they were good enough to publish... To which Jacobi responded: Funny, you have published a lot worse results.

When the logician Carnap was immigrating to the US, he had the usual consular interview, where one of the questions was (and still is, I think): "Would you favor the overthrow of the US government by violence, or force of arms?". He thought for a while, and responded: "I would have to say force of arms..."

Finally, on the graduate experience front, it was rumored at Princeton that Bill Thurston's qualifying exams at Berkeley were held as his wife was in labor with his first child -- the department refused to change the date for such a minor reason! I have just asked him about this, and it's true...

EDIT A certain (now well-known) mathematician was a postdoc at IHES in the late 1980s. Call him R. R comes to lunch, and finds himself across the table from Misha Gromov. Gromov, very charmingly, asks him what he was working on. R tells him, Gromov has some comments, they have a good conversation, lunch is over. The next day R finds himself across from Gromov again. Misha's first question is: so, what are you working on now?

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    $\begingroup$ I'd never heard the Carnap story. It's reminiscent of Godel's US citizenship test. en.wikipedia.org/wiki/… $\endgroup$
    – Ed Dean
    Jan 25, 2011 at 4:35
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    $\begingroup$ Gauss was some 20 years older than Jacobi and was, well, Gauss. It would have take great nerve... $\endgroup$ Jan 25, 2011 at 4:45
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    $\begingroup$ The Thurston story is recounted in his interview in More Mathematical People. $\endgroup$
    – Todd Trimble
    Jan 25, 2011 at 9:05
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    $\begingroup$ Around the Jacobi/Gauß anecdote: the correspondence between Jacobi and Legendre is fascinating and worth reading. It's quite moving to see this old mathematician welcoming with enthusiasm the work of two younger ones (Jacobi and Abel) following the study of his favorite mathematical field. It's almost melodramatic, with episodes of anger against Gauß (Legendre has had his share of paternity disputes with him, for example regarding the quadratic reciprocity law or the law of least squares) or mourning after Abel died... $\endgroup$ Jan 25, 2011 at 16:22
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    $\begingroup$ ... And as usual with mathematical texts of this time, the elegance of the language is baffling. Particularly so if one remembers that Jacobi doesn't write in his mother tongue. $\endgroup$ Jan 25, 2011 at 16:24
73
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Another urban legend, which I've heard told about various mathematicians, and which Misha Polyak self-effacingly tells about himself (and therefore might even be true), is the following:

As a young postdoc, Misha was giving a talk at a prestigious US university about his new diagrammatic formula for a certain finite type invariant, which had 158 terms. A famous (but unnamed) mathematician was sitting, sleeping, in the front row. "Oh dear, he doesn't like my talk," thought Misha.
But then, just as Misha's talk was coming to a close, the famous professor wakes with a start. Like a man possessed, the famous professor leaps up out of his chair, and cries, "By golly! That looks exactly like the Grothendieck-Riemann-Roch Theorem!!!"
Misha didn't know what to say. Perhaps, in his sleep, this great professor had simplified Misha's 158 term diagrammatic formula for a topological invariant, and had discovered a deep mathematical connection with algebraic geometry? It was, after all, not impossible. Misha paced in front of the board silently, not knowing quite how to respond. Should he feign understanding, or admit his own ignorance? Finally, because the tension had become too great to bear, Misha asked in an undertone, "How so, sir?"
"Well," explained the famous professor grandly. "There's a left hand side to your formula on the left."
"Yes," agreed Misha meekly.
"And a right hand side to your formula on the right."
"Indeed," agreed Misha.
"And you claim that they are equal!" concluded the great professor. "Just like the Grothendieck-Riemann-Roch Theorem!"

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    $\begingroup$ This sounds like a whole generation of French-educated algebraists has never seen an equation in their whole life :D $\endgroup$ Jan 25, 2011 at 15:29
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    $\begingroup$ I guess nowadays one has the analogous "But that is a special case of the (coarse) Baum-Connes conjecture for (quantum) group(oid)s" ... $\endgroup$
    – Yemon Choi
    Jan 25, 2011 at 21:15
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    $\begingroup$ If my memory serves me correctly, Victor Ginzburg once said something like: "that's a Langlands correspondence, because it's a correspondence between two sets" in a seminar. $\endgroup$ Oct 7, 2013 at 7:53
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This story was told to me by my advisor.

A Ph.D. student in logic was having an extremely difficult time finishing his thesis and was starting to succumb to hopelessness. Every evening he would trudge home, open a beer, and sit down in front of the television. This was the 1960's. Evidently there was a running show called Whiz Kids that showcased the achievments of child prodigies; I'm imagining something of a Johnny Carson style setting involving banter with an unctuous host before a studio audience. One week, the young Harvey Friedman was on the show. The host asked Harvey what he had been up to recently, to which the latter responded that he had proved that "every end extension of a model of standard arithmetic has an elementary submodel such that..." and on to the technical details, much to the amusement of the studio audience. The student watching home at that moment realized: that closes precisely the gap I need to finish my thesis!

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    $\begingroup$ The version I heard of this story the show was the Guinness Book of World's Records show hosted by Flip Wilson. While I don't know if the story is true, I have seen a photo of Harvey with Flip Wilson. Also this show aired in 1970 which fits the time frame. $\endgroup$ Jan 25, 2011 at 17:24
  • $\begingroup$ Hi Dave, as you know, Anand is a good story teller. It struck me has having too many specific details to be entirely made up. Nevertheless, "urban legend" seems to me to be the best categorization. $\endgroup$
    – Jerry
    Jan 25, 2011 at 19:15
  • $\begingroup$ This Whiz Kids: en.wikipedia.org/wiki/Whiz_Kids_(TV_series) ? That was in the eighties… $\endgroup$
    – The User
    Jun 11, 2013 at 18:51
  • $\begingroup$ Maybe not such an urban legend: according to Ali Enayat, it was The Flip Wilson Show in 1971, and the PhD student was Joram Hirschfeld. See page 10 here: cage.ugent.be/programFriedman/slides/… Update: No, it was a show called The Record Makers, hosted by Flip Wilson. Air date: April 2, 1971 on NBC. See fultonhistory.com/newspaper%208/Schenectady%20NY%20Gazette/… $\endgroup$
    – Todd Trimble
    Apr 2, 2015 at 2:44
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This is a story that I heard from one of the postdocs from my university, which in turn heard it from one of the professor at the university (I didn't bother to verify with him as the source seems relatively reliable).

The said professor was a postdoc in some university in the USA a few decades ago, and he was teaching a basic course on group theory. One of the homework assignments had a question of the form:
"Let $G_1$ be the group $\ldots$, and $G_2$ be the group $\ldots$ Prove that $G_1$ and $G_2$ are isomorphic."

One of the papers submitted had an answer "We will show that $G_1$ is isomorphic..." and some nonsense, followed by "Now we'll show that $G_2$ is isomorphic..." and more nonsense.

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    $\begingroup$ I gave a homework problem, "Let $G_1$ be the group $\dots$, let $G_2$ be the group $\dots$. Are $G_1$ and $G_2$ isomorphic?" and was astonished to get the response, "$G_1$ is, but $G_2$ isn't." Are Asaf's story and mine isomorphic? $\endgroup$ Jan 31, 2011 at 22:39
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    $\begingroup$ @Gerry: Asaf's is, but yours isn't. $\endgroup$ Feb 1, 2011 at 1:20
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    $\begingroup$ You've been a lovely audience. Nate and I will be here all week. $\endgroup$ Feb 1, 2011 at 11:41
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    $\begingroup$ This is the same syntax as the joke "Oh Harry, if only we were married!" "We are, Sally... Oh, did you mean to each other?" $\endgroup$ Feb 1, 2011 at 14:30
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    $\begingroup$ Don't forget to tip your server! $\endgroup$ Feb 3, 2011 at 15:41
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Here is another scary example (known to be true, by way of two of the participants): a (then) young postdoc approached R. Langlands and A. Borel (this was in the late seventies), in the IAS tea room, and the following conversation ensued:

Postdoc: Do you guys know anything about automorphic forms?

B&L: Maybe

Postdoc: Well, can I ask a stupid question?

B&L: Well, you have already asked one.

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    $\begingroup$ The version in Milne's apocrypha (jmilne.org/math/apocrypha.html) is slightly different: $$ $$ A newly arrived member of the Institute for Advanced Study went up to two senior looking people and asked if either of them knew anything about representation theory. Being Borel and Langlands, they answered "yes". "Well," said the member, "do you mind if I ask you a stupid question?" "You already have" responded Langlands. $\endgroup$ Jan 24, 2011 at 22:37
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    $\begingroup$ The beauty of this story is that when you tell it to people, they all laugh but if you go one step further, they disagree on which of the two questions was stupid... $\endgroup$
    – fedja
    Jan 25, 2011 at 2:21
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    $\begingroup$ This story clearly comes in many variants. In my favorite, the Langlands retort to "do you mind if I ask you a stupid question" is "That's two already." $\endgroup$
    – Peter Woit
    Jan 25, 2011 at 3:35
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    $\begingroup$ In my first year I asked my professor in linear algebra, Schoenhage, whether he knew how to compute with large numbers (I was trying to write a program for testing the primality of Fibonacci numbers). $\endgroup$ Jan 25, 2011 at 6:58
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    $\begingroup$ I once gave a seminar, and in response to a question from an unknown audience member, launched into an exposition of Baas-Sullivan theory. The organiser gently interrupted me: "I don't think you've met Nils Baas ..." $\endgroup$ Jan 25, 2011 at 8:33
64
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At the Hebrew University, during a complex analysis course, the professor states and proves the famous "Liouville's theorem", that every entire bounded function is constant. One confused student, trying to get some general clarification, asks "maybe you can give an example?". The professor without hesitation answers "yes, Of course. 7" and continues... we all sat still trying not to laugh so that the confused student wan't be embarrassed, but he was still quite embarrassed though...

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This one happened - I was there (as an observer, not a principal). Only the names have been changed.

X was Professor A's first doctoral student, and their relations weren't good. Rumor had it that the first time A saw most of X's thesis was when X handed in the final draft.

By the rules, there had to be a non-mathematician on the thesis defense committee - let's call him Professor H. Professor H made a valiant effort to read the thesis, understandably didn't get very far, but decided he was going to ask a question at the defense, to justify his being there in the first place. So he says to X, I notice you didn't provide a proof of your Lemma 2.3.1 - how does it go? X says, well, 2.3.1 isn't my work, it's a well-known result of van der Corput.

This satisfies H, but A says, OK, it's a result of van der Corput - but, how do you prove it? Well, X was prepared to answer questions on his own work, but hadn't brushed up on all the previous work that his thesis rested on. He hummed and hawed, started to give a proof, got stuck - at which point A gave him a hint. Using the hint, X got a little farther, but got stuck again - so A gave him another hint. This went on for an excruciating fifteen minutes (which, I'm sure, felt like 15 years to X), until finally Professor N broke the tension by saying, say, just whose thesis defense is this anyway, X's or van der Corput's?

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When I was at the University of Oklahoma in the early '80s, we were all required to write a brief description of our research for the (rather conservative, this being Oklahoma) Board of Regents of the University. An colleague in algebra, perhaps hoping for more state support, wrote that he was studying "annihilating radical left ideals."

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    $\begingroup$ I think we've come some distance from "what stories kept you awake at night as a graduate student," but this reminds me that the Harvard course catalog, circa 1970, contained a math course described as "theory of blowing-up, with special attention to local problems." $\endgroup$ Jan 29, 2011 at 11:40
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    $\begingroup$ as an introduction to an integration technique, i remember my calculus professor saying something like "Much like the Republican party, our plan is to isolate the radical so we can get rid of it." $\endgroup$
    – Joey Hirsh
    Feb 3, 2011 at 3:31
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    $\begingroup$ A friend is studying Lie Algebras, and told me once that the opposition used his grant to criticizing the goverment for wasting money on the study of "Theory of Lies" $\endgroup$
    – Nick S
    Feb 3, 2011 at 16:16
60
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I have heard the following story from a few sources (among them, I think, an MO thread, possibly Terence Tao's blog, and Richard Lipton's blog), so it might even be true.

The story goes that once upon a time a student wrote his thesis on Hölder-continuous maps with $\alpha > 1$, since he had only seen the case $\alpha \le 1$ addressed in his books. The student proved many wonderful theorems about these maps and was very excited for his defense.

At his thesis defense, one of the examiners (is that the right word?) asked him to provide a nontrivial example of such a map. The student was flustered. As it turns out, all such maps are constant - no wonder the theorems were so nice.

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    $\begingroup$ That is a scary story: it paints a picture of mathematical education of extreme sadness! $\endgroup$ Jan 24, 2011 at 21:20
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    $\begingroup$ As I commented above, I heard the story (with Lipschitz instead of Holder) back in the 1950s, so it is a really old legend. $\endgroup$ Jan 24, 2011 at 22:46
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    $\begingroup$ I've heard this many times, and the question of which spaces these functions are defined on has always been omitted; presumably it is a manifold. I actually spend quite a lot of time working with non-trivial functions defined on compact totally disconnected spaces which are Hoelder with an exponent higher than $1$. $\endgroup$
    – Ian Morris
    Jan 25, 2011 at 10:26
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    $\begingroup$ By the way, in my version, the student was specifically studying the Banach space of such functions, and was eventually told that he was studying $\mathbb{R}$. $\endgroup$ Jan 27, 2011 at 0:58
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    $\begingroup$ I hear a similar story a few years ago, where a student proved exciting theorems about holomorphic functions with compact support. $\endgroup$
    – Orbicular
    May 23, 2011 at 22:12
58
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A certain Greek professor, let's call him AF, happened to have attended medical school in the US before becoming a professional mathematician.

He attended a talk by another mathematician, who claimed to have proved in N dimensions a result which AF had struggled to prove for N=2. Disconcerted, he spent the entirety of the talk constructing a counterexample to the speaker's result.

At the end of the talk, when questions were invited, AF walked up to the board and wrote down his counterexample. He turned around as he heard a loud thump from behind him. The speaker had fainted.

Undeterred, AF used his medical training to revive the speaker before returning to his seat.

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Some time in the early 90s Goro Shimura was giving a lecture course on algebraic number theory at the ENS in Paris. According to someone who was in the audience, one of the lectures started thus.

Let $a$ be a rational number. [Pause; the lecturer writes $a$ on the blackboard.] Is this clear? [Pause.] Do you follow me? [Long pause.]

Ok then. [Pause.] Let $\beta$ be an irrational number. [Pause; the lecturer writes $\beta$ on the blackboard.] Is this clear? [Pause.] Does everyone understand? [Long pause.]

Ok then. So consider a global field of prime characteristic and an automorphic representation of an algebraic group over its adelic ring. Now take the absolute Galois group and the category of perverse l-adic sheaves on ...

[The third phrase here is a random and probably inaccurate reconstruction, but I'm pretty sure the numbers were called $a$ and $\beta$.]

upd: I've emailed the person I heard this from and they provided the following version. It seems that I got everything wrong; apologies. Anyhow, the course took place at Jussieu, not ENS and began thus.

Professor Shimura:

Consider alpha algebraic number, writes alpha on the blackboard, pause (on the same line) now theta transcendental number, writes theta, pause (below the first line) f holomorphic function, writes f, pause (on the same second line below theta) g non-holomorphic function,
writes g, pause

long silence which I interpreted as "think deeply about the meaning of
this square"

Professor Shimura takes a deep breathe and in one sentence restarts:

Let f be a Siegel modular form of weight k and level N ....

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    $\begingroup$ This pattern of behavior occurs with surprising frequency. I have always found it very interesting. $\endgroup$ Jan 28, 2011 at 22:18
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    $\begingroup$ Sorry; (as you admit) automorphic representations and (especially) perverse $\ell$-adic sheaves does not sound like the Shimura I know, love and fear. I have two colleagues who are former students of the master: perhaps I should ask them to suggest something more plausible? $\endgroup$ Jan 29, 2011 at 0:25
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    $\begingroup$ Pete -- yes, by all means! The only thing I'm sure about, apart from the $a$ and the $\beta$, is that the level of difficulty increased rather steeply after the first two phrases. I've tried to convey this impression while adding some details for dramatic purposes (or else this wouldn't be much of an urban legend, would it?). On the other hand I can ask the person I heard it from (and who was sitting in that lecture) for a more accurate account. $\endgroup$
    – algori
    Jan 29, 2011 at 0:52
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    $\begingroup$ @algori: well, I didn't see your response until just now, so it's probably too late. But I forgot to mention that -- like any good urban legend -- in spirit your story rings true. As an undergraduate I remember marveling at how much time certain professors spent explaining the most trivial things, only to race through the hard stuff in a big ball of frenetic activity. And now, as an instructor, I see myself doing the same thing at times! I guess we think, "Well, I really don't want to lose anyone on the first day" and at some point we think that we've lost the people we're going to lose... $\endgroup$ Apr 17, 2011 at 8:31
  • $\begingroup$ This happens very often in text books ... $\endgroup$ May 23, 2011 at 22:07
55
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I have no idea whether this one is true - I heard it at Harvard, around 1970. The story goes that a PhD student was so sure no one would ever read his dissertation that he stuck in the middle of it an offer to send fifty dollars to the first five people who asked. Every few years he'd get a letter from someone who stumbled across the offer, and he'd pay out.

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    $\begingroup$ Something like this has certainly happened at least once, though the legend probably predates it: snopes.com/college/homework/foundcar.asp $\endgroup$ Jan 25, 2011 at 0:21
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    $\begingroup$ Coincidentally, I recently found forty dollars in the middle of a book on moduli spaces I had checked out from the library. $\endgroup$
    – zeb
    Jan 25, 2011 at 4:54
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    $\begingroup$ Visiting a friend's place in graduate school, I saw many brand new GTMs on his shelf. Or at least their condition was as good as new. Suspecting some of these books would remain unread for a while, I stuck a small note in one GTM which said "Today is [date here]. Let me know when you find this note. [Signature]" I heard from him a couple of years after he finishes grad school. $\endgroup$
    – KConrad
    Jan 25, 2011 at 6:04
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    $\begingroup$ Another story: suspecting students were not reading solutions I was writing to homework in an abstract algebra course, in the middle of one solution I inserted the sentence "I will give a free chocolate bar to the first person who reads this." Nobody claimed the chocolate bar. Or maybe I offered an orange? $\endgroup$
    – KConrad
    Jan 25, 2011 at 6:06
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    $\begingroup$ In the Caltech library there is a very big tome on combinatorics which I once idly opened at random. In it, I found a letter from an undergrad in the 1970s, who wrote this letter to posteriority saying that although he enjoyed working on his project, he was disheartened by the fact that nobody would probably ever care about it. $\endgroup$
    – jvkersch
    Apr 15, 2011 at 4:10
50
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George Mackey is reported to have been overheard saying "I'll write his thesis for him, but I'll be damned if I'm going to explain it to him."

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I am not sure where or when this happened, but I still think there may be some truth to the story.

Once someone from the engineering (or physics?) department of some university came to see Joseph Bernstein and asked if he knew a formula for a conformal mapping of the interior of a regular $n$-gon to the upper half-plane. Bernstein knew the formula, but decided to first ask what the person needed it for. The reply was: "Well, you see, what I really need is a formula for the unit disk, but that's probably too complicated, so I decided to find out the formula for the $n$-gon first and then take the limit."

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  • $\begingroup$ Ouch. Most of (the few) engineers I've met are much smarter than this. $\endgroup$ Apr 17, 2011 at 8:45
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    $\begingroup$ Pete -- I should have been more explicit: I've heard this story several years ago during a late night conversation in Bonn and I can not really vouch for the details. It may have been biology or chemistry or something else. The moral however is, if I may say so, that one should be careful when speaking to someone who is about to apply mathematics. That is, if this person says they need to be able to solve a particular (difficult or hopeless) problem, it may be worthwhile to ask again. $\endgroup$
    – algori
    Apr 17, 2011 at 9:21
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    $\begingroup$ @Pete: Engineers are smart, but you can't expect them to know all the math out there. In polynomial system solving, I've heard stories of engineers adding extra variables to lower the degrees of their equations. Anyone who is familiar with the complexity of Grobner bases will realize that this is not the way to go. But I'm sure it seemed to make sense at the time. $\endgroup$ Apr 27, 2011 at 15:34
  • $\begingroup$ @algori: Spending a lot of time in Bonn, I always heard this only as a joke, not an urban legend. $\endgroup$ Feb 28, 2013 at 18:41
45
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Not an urban legend: I was there.

Abhyankar was speaking at Mumford's seminar, so Zariski, though long-retired, came to hear his former student speak. Abhyankar began his talk by stating that he would only be working in characteristic 0.

Zariski interrupted to ask "Are there any additional difficulties in characteristic p?"

Abhyankar smiled and said "Only psychological difficulties."

Zariski turned to the audience and stated, most forcefully, "I have NEVER had psychological difficulties."

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    $\begingroup$ Another from the "I was there" file, Joel Hamkins may remember this from grad school: one Prof. (not J.) H. was lecturing on (related to Shelah's classification) something like omitting types, one of which was named p. H. said "but we can't do this, else it loses its p-ness and can't fork anymore". The class, not a mixed group, all laughed at this, and Prof. H. looked surprised. Some of us (Joel too, I think) later thought H. had worked that phrase in; it would be in character for H. (Joel, feel free to tell your view of it.) Gerhard "Don't Quote Me On This" Paseman, 2011.04.13 $\endgroup$ Apr 13, 2011 at 16:25
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    $\begingroup$ In a variation of the old "integral scheme of finite type over a field" story, I have actually seen Peter May answer the question "What's a ring?" with "Oh, a ring is just a Z-algebra." $\endgroup$ Apr 13, 2011 at 22:26
43
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Here's something that keeps me up at night:

During the Russian revolution, there is a story of a mathematician (I've heard Igor Tamm may be the one) who was mistaken by rebels to be a communist spy. He was promptly captured by a local gang and interrogated. When he said that he is a mathematician, the gang leader asked him to back up his claim by deriving the formula for the Taylor Remainder Theorem. He was warned that if he failed, he would be shot on the spot. After some sweating the mathematician finally derived the result. The gang leader was satisfied with the proof and let him go.

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    $\begingroup$ So that's why when I was a first year graduate student at Harvard, the question "state and prove Taylor's theorem" appeared on the written qualifying exam! I think the professor who put this on the exam (we all thought it was Andy Gleason) was skeptical about whether the graduate students knew freshman calculus properly. As it happens, I knew how to do this only because I had been teaching freshman calculus that semester. Otherwise, I would have had to do some sweating, too. $\endgroup$
    – Deane Yang
    Jan 25, 2011 at 17:45
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    $\begingroup$ According to Gamow, it was Tamm (references: books.google.com/… and springerlink.com/content/w0934gm403641227 ) $\endgroup$ Jan 25, 2011 at 18:47
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    $\begingroup$ For some reason I feel slightly wistful for a world (or a time) where gang leaders even knew there was such a thing as the Taylor Remainder Theorem ... $\endgroup$
    – Yemon Choi
    Jan 25, 2011 at 21:13
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    $\begingroup$ @Yemon: what makes you so sure that gang leaders today don’t know it? $\endgroup$ Jan 31, 2011 at 18:06
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    $\begingroup$ Russian math education is solid! even Gang leader know Taylor remainders... $\endgroup$
    – 36min
    Apr 15, 2011 at 1:21
43
votes
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Here is another story from Krantz's Mathematical Apocrypha Redux which I thought was quite funny.

One of the most common and popular Norbert Wiener (1894-1964) stories is of a student coming to Wiener after class and saying, "I really don't understand this problem that you discussed in class. Can you explain to me how to do it?" Wiener thought a moment, and wrote the answer (and only that) on the board. "Yes," said the student, "but I would really like to master the technique. Can you tell me the details?" Wiener bowed his head in thought, and again he wrote the answer on the board. In some torment, the student said, "But Professor Wiener, can't you show me how the problem is done?" To which Wiener is reputed to have replied, "But I've already shown you how to do the problem in two ways!"

Dick Swenson, who was at MIT in those days, tells this variant of the story: Wiener showed the kid the answer twice, as just indicated. Then the student said, "Oh, you mean...," and he wrote the answer (and only the answer) on the board. Wiener then said, "Ah, very nice. I hadn't thought of that approach."

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    $\begingroup$ I've heard a version of this story with von Neumann as protagonist. A student desperately trying to evaluate a definite integral at wit's end shows up at von Neumann's office for any suggestion of an approach. Von Neumann thinks for a few moments and tells him the value of the integral. The student, amazed and dismayed at the absence of any details, respectfully requests that von Neumann "explain it a different way." Von Neumann thinks some more and cheerfully announces that both ways yield the announced value. (I thought this story apocryphal even before hearing the Wiener version.) $\endgroup$
    – Greg Marks
    Jan 29, 2011 at 0:21
40
votes
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Oral maths exam for engineers, 1960s, Budapest. To prove: there are infinitely many prime numbers. Candidate shuffles in his chair, has no idea really. Professor tries to help: let's recall the definition of prime numbers. Let's talk about some examples. Etc etc. After 15 excruciating minutes, candidate summarizes progress thus: Professor, I now understand that all odd numbers are prime. But I still don't see why are there infinitely many...

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  • $\begingroup$ That's an old joke. $\endgroup$ May 24, 2011 at 15:07
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    $\begingroup$ I did say 1960s (-: $\endgroup$
    – Balazs
    May 25, 2011 at 6:27
39
votes
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Since the OP gave a physics example, here is another one, also at Princeton. Why are they always at Princeton? Student finishes his presentation on very mathematical aspects of string theory. An experimentalist on the committee asks him what he knows about the Higgs boson. He hems and haws and finally says "well, it was discovered a few years ago at Fermilab", Experimentalist: "Can you tell me the mass?" Student: "I think around 40 GeV."

This was more than 20 years ago and actually happened. I was there. The student passed, but the next year all Ph.D students working on string theory were required to take a course on the phenomenology of particle physics.

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    $\begingroup$ +1 for being there! On a related note I had a physics honours thesis defense panel which consisted mainly of experimentalists (optics, atmospheric physics etc) and my thesis was on a mathematical aspect of string theory. $\endgroup$
    – David Roberts
    Jan 24, 2011 at 23:49
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    $\begingroup$ I was at another final oral where an experimentalist brought a thin box filled with small rods, a partition that looked like / \ / \ / \ / \ / \ / \ / \ / \ / \ / \ / \ / \ / \ / \ dividing it into two sides but with gaps big enough for the rods to pass through, and a plexiglass top so you could see what was going on. Initially the rods were equally distributed, but after vigorous and random shaking by the student they all ended up on one side. The experimentalist then asked "Why doesn't this system violate the 2nd law of thermodynamics?" Those guys are tricky! $\endgroup$ Jan 25, 2011 at 1:01
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    $\begingroup$ Jeff -- that's interesting. So why doesn't it? $\endgroup$
    – algori
    Jan 25, 2011 at 6:36
  • $\begingroup$ I'm having trouble TeXing a more accurate drawing of the partition. To get a more accurate picture type "backslash underscore slash space" and repeat. This gives a partition which is not invariant under reflection, unlike my crude drawing above. It is now clearer why the rods can move more easily in one direction than the other, but of course this doesn't remove the conflict with the 2nd law. Continued in next comment. $\endgroup$ Jan 25, 2011 at 15:12
  • $\begingroup$ After some discussion amongst the committee members it was finally decided that this must be a boundary effect and that in the infinite volume thermodynamic limit one would find equal numbers of rods on both sides but with some inhomogeneity near the boundary. I haven't been able to find a detailed analysis of this system so I don't know if this is in fact the correct answer. $\endgroup$ Jan 25, 2011 at 15:14
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Somebody posted the following:

I have heard (from two sources) that at the University of Chicago a senior faculty member was temporarily banned from teaching undergraduate courses. The reason is that during a first semester undergraduate linear algebra course he did everything over the Quaternions.

This one isn't so much academically scary, but my advisor told me that it was always interesting riding to conferences with the above professor because he would refuse to defrost the windshield so that he could draw diagrams on it and do math while he was driving.

Now I have never taught linear algebra at Chicago, since as somebody else pointed out we have no undergraduate linear algebra courses, but in the 1960's and 1970's I did in fact drive to and from seminars and conferences at Northwestern seminars without defrosting the windshield in order to have a convenient blackboard. I recall that it worked very well.

Peter May

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    $\begingroup$ I've heard the non-defrosting story told about R H Bing, who did this during heavy snow while driving people to Chicago. $\endgroup$ Feb 6, 2011 at 3:44
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    $\begingroup$ Ooooh. Given the pretty drawings i've seen accompanying some of Bing's writing, it is probably a pity no one saved at least some of those windshields in a freezer! Welcome to MO, by the way, Prof. May :) $\endgroup$ Feb 6, 2011 at 3:49
  • $\begingroup$ Sounds silly—why quaternions? You can work using arbitrary skew fields. $\endgroup$
    – The User
    Jun 11, 2013 at 19:14
36
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Not a horror story. On the much nicer end of the spectrum, there is a well-known urban legend about a student unwittingly solving an open problem, thinking it was homework. Though details of the tale may vary, there is at least one instance where the urban legend is true, George Dantzig in 1939. The funniest part of the story is when Don Knuth apparently came to learn of this story through a sermon by an Indiana pastor!

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    $\begingroup$ In the Hebrew University, it is told about Avinoam Mann. $\endgroup$ Jan 25, 2011 at 2:43
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    $\begingroup$ At Princeton, it is told about (who else) Jack Milnor. The result is the "Fary-Milnor" theorem, on the total curvature of a knotted curve (there is an Annals paper to back up the story...) $\endgroup$
    – Igor Rivin
    Jan 25, 2011 at 2:45
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    $\begingroup$ The version I heard was that Milnor was late to class, and copied down several (open) problems written on the board that he thought were homework. At a later class he says, "That homework was hard! I only got 2 of them." $\endgroup$ Jan 25, 2011 at 3:25
  • $\begingroup$ Paul Cohen used to claim that the Bergman kernel was discovered this way (by Bergman). $\endgroup$
    – Dan Ramras
    Jan 25, 2011 at 4:06
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    $\begingroup$ The Huffman code story I heard is that in an information theory class, Huffman had a choice of writing a term paper or taking a final. His term paper was the discovery of an algorithm for finding optimal binary codes (i.e., Huffman codes). $\endgroup$
    – Peter Shor
    Jan 25, 2011 at 5:49
33
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Once during a mathematical conversation with a student, Alexander Grothendieck was asked to consider an example of a prime number.

"You mean an actual prime number?" The student replied, "Yes, an actual prime."

Grothendieck then said, "Alright then, take $57$".

-Taken from the Comme Appelé du Neant article in the Notices of the AMS

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    $\begingroup$ why, 57 is prime, up to multiplicative constants $\endgroup$ Feb 6, 2012 at 9:11

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