List of examples of Stigler's law explained

Stigler's law concerns the supposed tendency of eponymous expressions for scientific discoveries to honor people other than their respective originators.

Examples include:

A

B

C

Václav Šimerka listed the first seven Carmichael numbers in 1885; they are named after Robert Daniel Carmichael who subsequently discovered the first one in 1910.[10]

Named for René Descartes, but Teresa of Avila and her contemporaries wrote about similar methods of philosophical exploration eight to ten years before Descartes was born.[16]

D

E

the "discovery" of the constant itself is credited to Jacob Bernoulli, but it is named after Leonhard Euler.

an equivalent formula was proved by Roger Cotes 30 years before Euler published his proof.

F

G

the property of infinite sets was known to Duns Scotus.

first described by Joseph Louis Lagrange in 1773, over half a century before Gauss.[19] [20]

first proved by Ostrogradsky in 1831.

the normal distribution was introduced by Abraham de Moivre in 1733, but named after Carl Friedrich Gauss who began using it in 1794.

was already in well-known textbooks such as Thomas Simpson's when Gauss in 1809 remarked that he used "common elimination."

named for Josiah Willard Gibbs who published in 1901. First discovered by Henry Wilbraham in 1851.

the theory was developed by Bruno Buchberger, who named them after his advisor, Wolfgang Gröbner.

H

I

J

K

invented by Charles Babbage who recorded it in his diary but didn't otherwise publish it.

invented by Élie Cartan

theoretically described by a number of astronomers before Gerard Kuiper; Kuiper theorized that such a belt no longer existed.

Johann Georg Zehfuss already in 1858 described the matrix operation we now know as the Kronecker product

L

named for Linus Torvalds, but actually described by Eric S. Raymond in The Cathedral and the Bazaar.

M

N

O

P

named after and developed by Henri Padé around 1890, but was first introduced by Ferdinand Georg Frobenius.

studied by and named for Blaise Pascal, but constructed several times before him independently.

was originally derived by Auguste Bravais and published in 1846.[29] [30]

described by Siméon Denis Poisson in 1837, though the result had already been given in 1711-21 by Abraham de Moivre.

predicted by Fresnel's theory of diffraction, named after Poisson, who ridiculed the theory, especially its prediction of the existence of this spot.[31] It is also called the Arago spot as François Arago observed it or the Fresnel bright spot after Augustin-Jean Fresnel's theory, though it had already been observed by Joseph-Nicolas Delisle and Giacomo F. Maraldi a century earlier.

R

S

T

V

W

Y

Z

See also

Notes and References

  1. Encyclopedia: Bessemer process . 2 . 168 . Encyclopædia Britannica . 2005.
  2. Encyclopedia: Kelly, William . 6 . 791 . Encyclopædia Britannica . 2005.
  3. H. Bethe, E. Salpeter . 1951 . A Relativistic Equation for Bound-State Problems . . 84 . 6 . 1232 . 10.1103/PhysRev.84.1232 . 1951PhRv...84.1232S .
  4. Y. Nambu . 1950 . Force Potentials in Quantum Field Theory . . 5 . 4 . 614 . 10.1143/PTP.5.614 . free .
  5. Bonferroni, C. E., Teoria statistica delle classi e calcolo delle probabilità, Pubblicazioni del R Istituto Superiore di Scienze Economiche e Commerciali di Firenze 1936
  6. Olive Jean . Dunn . Estimation of the Means for Dependent Variables . . 29 . 4 . 1095–1111 . 1958 . 2237135 . 10.1214/aoms/1177706374. free .
  7. Olive Jean . Dunn . Multiple Comparisons Among Means . . 56 . 293 . 52–64 . 1961 . 10.1080/01621459.1961.10482090 . 10.1.1.309.1277 .
  8. Heath, I. "Unacceptable File Operations in a Relational Database." Proc. 1971 ACM SIGFIDET Workshop on Data Description, Access, and Control, San Diego, California (November 11–12, 1971).
  9. Date, C.J. Database in Depth: Relational Theory for Practitioners. O'Reilly (2005), p. 142.
  10. Lemmermeyer . F. . Václav Šimerka: quadratic forms and factorization . LMS Journal of Computation and Mathematics . 2013 . 16 . 118–129 . 10.1112/S1461157013000065 . free.
  11. Web site: Scipione Ferro | Italian mathematician. 22 April 2024.
  12. J. Stillwell, Mathematics and Its History, 3rd Ed, Springer,2010
  13. http://www.ingenta.com/isis/searching/Expand/ingenta?pub=infobike://iop/jopt/1997/00000028/00000004/art00004 André Baranne and Françoise Launay, Cassegrain: a famous unknown of instrumental astronomy
  14. Stargazer, the Life and Times of the Telescope, by Fred Watson, p. 134
  15. Stargazer, p. 115.
  16. News: Opinion | Descartes is Not Our Father. The New York Times. 25 September 2017. Mercer. Christia.
  17. Book: Past, Present, and Future of Statistics . A career in statistics . 35 . CRC Press . Chernoff . Herman . Xihong . Lin . Christian . Genest . David L. . Banks . Geert . Molenberghs . David W. . Scott . Jane-Ling . Wang . Jane-Ling Wang . 2014 . 9781482204964 . http://nisla05.niss.org/copss/past-present-future-copss.pdf.
  18. Book: Grimmett, Geoffrey . https://books.google.com/books?id=UfvxyLIMalgC&pg=PA6 . The Random-Cluster Model . The Random‑Cluster Model . 333 . 2006 . 6 . https://web.archive.org/web/20160213172004/http://statslab.cam.ac.uk/~grg/books/rcm1-1.pdf . 2016-02-13 . live . Random-Cluster Measures . Geoffrey Grimmett . Springer . Grundlehren der Mathematischen Wissenschaften . 10.1007/978-3-540-32891-9_1 . 978-3-540-32891-9 . 0072-7830 . 2006925087 . 262691034 . 4105561W . There is a critical temperature for this phenomenon, often called the Curie point after Pierre Curie, who reported this discovery in his 1895 thesis ... In an example of Stigler’s Law ... the existence of such a temperature was discovered before 1832 by  Pouillet.... .
  19. Joseph-Louis Lagrange. Joseph-Louis. Lagrange. Sur l'attraction des sphéroïdes elliptiques. fr. Mémoires de l'Académie de Berlin. 125. 1773.
  20. Book: Duhem, Pierre. Pierre Duhem. Leçons sur l'électricité et le magnétisme. 1891. Paris Gauthier-Villars . vol. 1, ch. 4, p. 22–23. fr. shows that Lagrange has priority over Gauss. Others after Gauss discovered "Gauss's Law", too.
  21. Stargazer, the Life and Times of the Telescope, by Fred Watson, p. 134
  22. Stargazer, p. 115.
  23. Book: Heath . Thomas . A History of Greek Mathematics Volume II From Aristarchus to Dipohantus . 1921 . Dover Books . 0-486-24074-6 . 323.
  24. Hodrick, Robert, and Edward C. Prescott (1997), "Postwar U.S. Business Cycles: An Empirical Investigation," Journal of Money, Credit, and Banking, 29 (1), 1–16.
  25. Whittaker, E. T. (1923): On a new method of graduation, Proceedings of the Edinburgh Mathematical Association, 78, 81–89 – as quoted in Philips 2010
  26. E.B.Saff and A.D. Snider, Fundamentals of Complex Analysis, 3rd Ed. Prentice Hall, 2003
  27. Cf. Clifford A. Pickover, De Arquímides a Hawking,p. 137
  28. PhD-Design Discussion List, 7 January 2013, https://www.jiscmail.ac.uk/cgi-bin/webadmin?A2=ind1301&L=phd-design&D=0&P=11022
  29. Analyse Mathématique. Sur Les Probabilités des Erreurs de Situation d'un Point Mem. Acad. Roy. Sei. Inst. France, Sci. Math, et Phys., t. 9, p. 255-332. 1846
  30. Wright, S., 1921. Correlation and causation. Journal of agricultural research, 20(7), pp.557-585
  31. Physics, Robert Resnick, David Halliday, Kenneth S. Krane. volume 4, 4th edition, chapter 46
  32. Parkinson, J, Bedford, DE. Electrocardiographic changes during brief attacks of angina pectoris. Lancet 1931; 1:15.
  33. Brow, GR, Holman, DV. Electrocardiographic study during a paroxysm of angina pectoris. Am Heart J 1933; 9:259.
  34. Prinzmetal, M, Kennamer, R, Merliss, R, et al. A variant form of angina pectoris. Preliminary report. Am Heart J 1959; 27:375.
  35. For example Henry Dudeney noted in his 1917 Amusements in Mathematics solution 129 that Pell's equation was called that "apparently because Pell neither first propounded the question nor first solved it!"
  36. Grattan-Guinness, Ivor (1997): The Rainbow of Mathematics, pp. 563–564. New York, W. W. Norton.
  37. Powers . David M W . Applications and explanations of Zipf's law . 1998 . Joint conference on new methods in language processing and computational natural language learning . 151–160 . Association for Computational Linguistics.