Log24

In Scientific American  today —

For a more sophisticated approach to the phrase
“blocks in a box,” search for “the 759 blocks” and
then see box759.wordpress.com.

The mathematics there is based on an apparently
less  sophisticated example of “blocks in a box” —

See also Cube Space in this  journal.

An article in Scientific American  today suggests a review of posts
now tagged "Euclid vs. Woo" and "Trudeau vs. Euclid."

John Horgan in Scientific American  magazine on October 8, 2019 —

"In the early 1990s, I came to suspect that the quest
for a unified theory is religious rather than scientific.
Physicists want to show that all things came from
one thing:  a force, or essence, or membrane
wriggling in eleven dimensions, or something that
manifests perfect mathematical symmetry. In their
search for this primordial symmetry, however,
physicists have gone off the deep end . . . ."

Other approaches —

See "Story Theory of Truth" in this  journal and, from the November 2019  
Notices of the American Mathematical Society . . .

"Before time began, there was the Cube." — Optimus Prime

“… the Board of Education went as far as to redefine what science is: it’s no longer just a search for natural explanations for natural phenomena. Now it’s a search for… well, that’s a bit hard to say. Any sort of explanation, apparently. Pixies, ghosts, telekinesis, auras, ancient astronauts, excesses of choleric humor, they all seem to be fair game in the interest of ‘academic freedom.'”

“A teacher is an important role model for  demonstrating respect, sensitivity, and civility. Teachers should not ridicule, belittle or embarrass a student for expressing an alternative view or belief.”

“My wife took, unnoticed, this picture, unposed, of me in the act of writing a novel…. The date (discernible in the captured calendar) is February 27, 1929. The novel, Zashchita Luzhina (The Defense), deals with the defense invented by an insane chess player….”
— Vladimir Nabokov, note to photograph following page 256 in Speak, Memory: An Autobiography Revisited, Vintage International paperback, August 1989

— Quoted in The Matthias Defense

From a site titled Meaning of the Twentieth Century —

“Freeman Dyson has expressed some thoughts on craziness. In a Scientific American article called ‘Innovation in Physics,’ he began by quoting Niels Bohr. Bohr had been in attendance at a lecture in which Wolfgang Pauli proposed a new theory of elementary particles. Pauli came under heavy criticism, which Bohr summed up for him: ‘We are all agreed that your theory is crazy. The question which divides us is whether it is crazy enough to have a chance of being correct. My own feeling is that is not crazy enough.’ To that Freeman added: ‘When a great innovation appears, it will almost certainly be in a muddled, incomplete and confusing form. To the discoverer, himself, it will be only half understood; to everyone else, it will be a mystery. For any speculation which does not at first glance look crazy, there is no hope!’ “

— Kenneth Brower, The Starship and the Canoe, 1979, pp. 146, 147

It is my hope that the speculation, implied in The Matthias Defense, that the number 162 has astonishing mystical properties (as a page number, article number, etc.) is sufficiently crazy to satisfy Pauli and his friend Jung as well as the more conventional thinkers Bohr and Dyson.

— Log24.net, Feast of St. Mark, 2003

See also The Black Queen and The Eight.
 
In accordance with the theology of the previous entry, based on Zein’s list of the most common Chinese characters, here are some meanings of

[si4] {sì} /to watch/to wait/to examine/to spy/
[si4] {sì} /to seem/to appear/similar/like/to resemble/
[si4] {sì} /until/wait for/
[si4] {sì} /rhinoceros indicus/
[si4] {sì} /four/
[si4] {sì} /(surname)/wife of older brother/
[si4] {sì} /Buddhist temple/
[si4] {sì} /6th earthly branch/9-11 a.m./
[si4] {sì} /stream which returns after branching/
[si4] {sì} /place name/snivel/
[si4] {sì} /offer sacrifice to/
[si4] {sì} /hamper/trunk/
[si4] {sì} /plough/ploughshare/
[si4] {sì} /four (fraud-proof)/market/
[si4] {sì} /to feed/
[si4] {sì} /to raise/to rear/to feed/
[si4] {sì} /team of 4 horses/
[si4 bai3 wan4] {sì bǎi wàn} /four million/
[si4 bai3 yi4] {sì bǎi yì} /40 billion/
[si4 cao2] {sì cáo} /feeding trough/
[si4 cao3] {sì cǎo} /forage grass/
[si4 chu4] {sì chù} /all over the place/everywhere and all directions/
[si4 chuan1] {sì chuān} /Sichuan province, China/
[si4 chuan1 sheng3] {sì chuān shěng} /(N) Sichuan, a south west China province/
[si4 de5] {sì de} /seem as if/rather like/
[si4 fang1] {sì fāng} /four-way/four-sided/
[si4 fen1 zhi1 yi1] {sì fēn zhī yī} /one-quarter/
[si4 fu2] {sì fú} /servo/
[si4 fu2 qi4] {sì fú qì} /server (computer)/
[si4 ge4 xiao3 shi2] {sì gè xiǎo shí} /four hours/
[si4 hu5] {sì hu} /apparently/to seem/to appear/as if/seemingly/
[si4 hu5 hen3 an1 quan2] {sì hu hěn ān quán} /to appear (to be) very safe/
[si4 ji1] {sì jī} /to watch for one's chance/
[si4 ji4] {sì jì} /(n) the four seasons/
[si4 liao4] {sì liào} /feed/fodder/
[si4 lun2 ma3 che1] {sì lún mǎ chē} /chariot/
[si4 men2 jiao4 che1] {sì mén jiào chē} /sedan (motor car)/
[si4 mian4 ba1 fang1] {sì miàn bā fāng} /in all directions/all around/far and near/
[si4 mian4 ti3] {sì miàn tǐ} /tetrahedron/
[si4 miao4] {sì miào} /temple/monastery/shrine/
[si4 nian2] {sì nián} /four years/
[si4 nian2 qian2] {sì nián qián} /four years previously/
[si4 nian2 zhi4 de5 da4 xue2] {sì nián zhì de dà xué} /four-year university/
[si4 qian1] {sì qiān} /four thousand/4 000/
[si4 shi2] {sì shí} /forty/40/
[si4 shi2 duo1] {sì shí duō} /more than 40/
[si4 shi2 liu4] {sì shí liù} /forty six/46/
[si4 shi2 san1] {sì shí sān} /43/forty three/
[si4 shi4 er2 fei1] {sì shì ér fēi} /(saying) appeared right but actually was wrong/
[si4 tian1] {sì tiān} /four days/
[si4 xiao4 fei1 xiao4] {sì xiào fēi xiào} /(saying) resemble a smile yet not smile/
[si4 xue3] {sì xuě} /snowy/
[si4 yang3] {sì yǎng} /to raise/to rear/
[si4 yang3 zhe3] {sì yǎng zhě} /feeder/
[si4 yuan4] {sì yuàn} /cloister/
[si4 yue4] {sì yuè} /April/fourth month/
[si4 yue4 shi2 qi1 hao4] {sì yuè shí qī hào} /April 17/
[si4 zhi1] {sì zhī} /(n) the four limbs of the body/
[si4 zhou1] {sì zhōu} /all around/

— ktmatu.com Chinese-English dictionary

Drunk Bird

T. Charles Erickson
Shizuo Kakutani
in the 1980’s

Kakutani died yesterday.

“A drunk man will find his way home, but a drunk bird may get lost forever.”

— Shizuo Kakutani, quoted by J. Chang in Stochastic Processes (ps), p. 1-19.  Chang says the quote is from an R. Durrett book on probability.

Meaning:

A random walk in d dimensions is recurrent if d = 1 or d = 2, but transient if d is greater than or equal to 3.

From a web page on Kylie Minogue:

Turns out she’s a party girl
who loves Tequila:
“Time disappears with Tequila.  
  It goes elastic, then vanishes.”

Kylie sings
“Locomotion”

From a web page on Malcolm Lowry’s classic novel Under the Volcano: 

The day begins with Yvonne’s arrival at the Bella Vista bar in Quauhnahuac. From outside she hears Geoffrey’s familiar voice shouting a drunken lecture this time on the topic of the rule of the Mexican railway that requires that  “A corpse will be transported by express!” (Lowry, Volcano, p. 43).

For further literary details in memory of Shizuo Kakutani, Yale mathematician and father of book reviewer Michiko Kakutani, see

Santa Versus the Volcano.

Of course, Kakutani himself would probably prefer the anti-Santa, Michael Shermer.  For a refutation of Santa by this high priest of Scientism, see

Miracle on Probability Street

(Scientific American, July 26, 2004). 

The Proof and the Lie

A mathematical lie has been circulating on the Internet.

It concerns the background of Wiles’s recent work on mathematics related to Fermat’s last theorem, which involves the earlier work of a mathematician named Taniyama.

This lie states that at the time of a conjecture by Taniyama in 1955, there was no known relationship between the two areas of mathematics known as “elliptic curves” and “modular forms.”

The lie, due to Harvard mathematician Barry Mazur, was broadcast in a TV program, “The Proof,” in October 1997 and repeated in a book based on the program and in a Scientific American article, “Fermat’s Last Stand,” by Simon Singh and Kenneth Ribet, in November 1997.

“… elliptic curves and modular forms… are from opposite ends of the mathematical spectrum, and had previously been studied in isolation.”

— Site on Simon Singh’s 1997 book Fermat’s Last Theorem

“JOHN CONWAY: What the Taniyama-Shimura conjecture says, it says that every rational elliptic curve is modular, and that’s so hard to explain.

BARRY MAZUR: So, let me explain.  Over here, you have the elliptic world, the elliptic curves, these doughnuts.  And over here, you have the modular world, modular forms with their many, many symmetries.  The Shimura-Taniyama conjecture makes a bridge between these two worlds.  These worlds live on different planets.  It’s a bridge.  It’s more than a bridge; it’s really a dictionary, a dictionary where questions, intuitions, insights, theorems in the one world get translated to questions, intuitions in the other world.

KEN RIBET: I think that when Shimura and Taniyama first started talking about the relationship between elliptic curves and modular forms, people were very incredulous….”

— Transcript of NOVA program, “The Proof,” October 1997

The lie spread to other popular accounts, such as the column of Ivars Peterson published by the Mathematical Association of America:

“Elliptic curves and modular forms are mathematically so different that mathematicians initially couldn’t believe that the two are related.”

— Ivars Peterson, “Curving Beyond Fermat,” November 1999 

The lie has now contaminated university mathematics courses, as well as popular accounts:

“Elliptic curves and modular forms are completely separate topics in mathematics, and they had never before been studied together.”

— Site on Fermat’s last theorem by undergraduate K. V. Binns

Authors like Singh who wrote about Wiles’s work despite their ignorance of higher mathematics should have consulted the excellent website of Charles Daney on Fermat’s last theorem.

A 1996 page in Daney’s site shows that Mazur, Ribet, Singh, and Peterson were wrong about the history of the known relationships between elliptic curves and modular forms.  Singh and Peterson knew no better, but there is no excuse for Mazur and Ribet.

Here is what Daney says:

“Returning to the j-invariant, it is the 1:1 map betweem isomorphism classes of elliptic curves and C*. But by the above it can also be viewed as a 1:1 map j:H/r -> C.  j is therefore an example of what is called a modular function. We’ll see a lot more of modular functions and the modular group. These facts, which have been known for a long time, are the first hints of the deep relationship between elliptic curves and modular functions.”

“Copyright © 1996 by Charles Daney,
All Rights Reserved.
Last updated: March 28, 1996″

Update of Dec. 2, 2003

For the relationship between modular functions and modular forms, see (for instance) Modular Form in Wikipedia.

Some other relevant quotations:

From J. S. Milne, Modular Functions and Modular Forms:

“The definition of modular form may seem strange, but we have seen that such functions arise naturally in the [nineteenth-century] theory of elliptic functions.”

The next quote, also in a nineteenth-century context, relates elliptic functions to elliptic curves.

From Elliptic Functions, a course syllabus:

“Elliptic functions parametrize elliptic curves.”

Putting the quotes together, we have yet another description of the close relationship, well known in the nineteenth century (long before Taniyama’s 1955 conjecture), between elliptic curves and modular forms.

Another quote from Milne, to summarize:

“From this [a discussion of nineteenth-century mathematics], one sees that arithmetic facts about elliptic curves correspond to arithmetic facts about special values of modular functions and modular forms.”

Serge Lang apparently agrees:

“Elliptic functions parametrize elliptic curves, and the intermingling of the analytic and algebraic-arithmetic theory has been at the center of mathematics since the early part of the nineteenth century.”

— Editorial description of Lang’s Elliptic Functions (second edition, 1987)

Update of Dec. 3, 2003

“The theory of modular functions and modular forms, defined on the upper half-plane H and subject to appropriate tranformation laws with respect to the group Gamma = SL(2, Z) of fractional linear transformations, is closely related to the theory of elliptic curves, because the family of all isomorphism classes of elliptic curves over C can be parametrized by the quotient Gamma\H. This is an important, although formal, relation that assures that this and related quotients have a natural structure as algebraic curves X over Q. The relation between these curves and elliptic curves predicted by the Taniyama-Weil conjecture is, on the other hand, far from formal.”

— Robert P. Langlands, review of Elliptic Curves, by Anthony W. Knapp.  (The review  appeared in Bulletin of the American Mathematical Society, January 1994.)

Seek and Ye Shall Find:

On the Mystical Properties
of the Number 162

On this date in history:

May 22, 1942:  Unabomber Theodore John Kaczynski is born in the Chicago suburb of Evergreen Park, Ill., to Wanda Kaczynski and her husband Theodore R. Kaczynski, a sausage maker. His mother brings him up reading Scientific American.

From the June 2003 Scientific American:

“Seek and ye shall find.” – Michael Shermer

Here is a connection to runes:

Mayer, R.M., “Runenstudien,” Beiträge zur Geschichte der deutschen Sprache und Literatur 21 (1896): pp. 162 – 184.

Here is a connection to Athenian bastions from a UN article on Communist educational theorist Dimitri Glinos:

“Educational problems cannot be scientifically solved by theory and reason alone….” (D. Glinos (1882-1943), Dead but not Buried, Athens, Athina, 1925, p. 162)

“Schools are…. not the first but the last bastion to be taken by… reform….”

“…the University of Athens, a bastion of conservatism and counter-reform….”

I offer the above with tongue in cheek as a demonstration that mystical numerology may have a certain heuristic value overlooked by fanatics of the religion of Scientism such as Shermer.

For a more serious discussion of runes at the Acropolis, see the photo on page 16 of the May 15, 2003, New York Review of Books, illustrating the article “Athens in Wartime,” by Brady Kiesling.