List of examples of Stigler's law

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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

  • Bailey–Borwein–Plouffe formula was discovered by Simon Plouffe, who has since expressed regret at having to share credit for his discovery.
  • Bechdel test, a gender bias test for films popularised by and named after Alison Bechdel, creator of the comic strip Dykes to Watch Out For, despite her repeated insistence that the test was devised by her friend Liz Wallace.
  • Bell numbers have been studied since the 19th century and even medieval Japan, but are named after Eric Temple Bell who wrote about them in the 1930s.
  • Bellman–Ford algorithm for computing the shortest-length path, proposed by Alfonso Shimbel, who presented the algorithm in 1954, but named after Richard Bellman and Lester Ford Jr., who published equivalent forms in 1956 and 1958.
  • Benford's law, named after physicist Frank Benford, who stated it in 1938, although it had been previously stated by Simon Newcomb in 1881.
  • Bertrand's ballot theorem proved using André's reflection method, which states the probability that the winning candidate in an election stays in the lead throughout the count. It was first published by W. A. Whitworth in 1878, nine years before Joseph Louis François Bertrand; Désiré André's proof did not use reflection, though reflection is now the method commonly taught.
  • The Bessemer process was discovered by William Kelly in 1851. Henry Bessemer was the first to obtain a patent in 1855.[1][2]
  • The Bethe–Salpeter equation (named after Hans Bethe and Edwin Salpeter),[3] which describes the bound states of a two-body system in quantum field theoretical. The equation was first published by Yoichiro Nambu, but without derivation.[4]
  • Betteridge's law of headlines, stating that when a headline asks a (yes-no) question, the answer is no. Considered "an old truism among journalists", it was well known before Betteridge wrote about it in 2009.
  • Betz' law, which shows the maximum attainable energy efficiency of a wind turbine, was discovered first by Frederick W. Lanchester. It was subsequently independently rediscovered by Albert Betz and also Nikolai Zhukovsky.
  • The Bilinski dodecahedron appears in a 1752 book by John Lodge Cowley but is named after Stanko Bilinski, who rediscovered it in 1960.
  • The Black–Scholes model postulating a geometric Brownian motion as a model for stock market returns, credited to the 1973 academic papers of Fischer Black, Myron Scholes and Robert C. Merton, was first proposed by Paul Samuelson in 1965.
  • Blount's disease was described independently by C. Mau (1923) and Harald Nilsonne (1929), both writing in German, before it was described in English by Walter Putnam Blount (1937).
  • Bode's law of 1772, stating that the distances of the planets from the sun follow a simple arithmetical rule, was first stated by Johann Titius in 1766, not Johann Elert Bode.
  • The Bonferroni correction is named after Italian mathematician Carlo Emilio Bonferroni for its use of Bonferroni inequalities.[5] However, its development is often credited to Olive Jean Dunn, who described the procedure's application to confidence intervals.[6][7]
  • Boyce–Codd normal form, a normal form used in database normalization. Definition of what we now know as BCNF appeared in a paper by Ian Heath in 1971.[8] Date writes:

    "Since that definition predated Boyce and Codd's own definition by some three years, it seems to me that BCNF ought by rights to be called Heath normal form. But it isn't."[9]

  • Boyle's law, which stipulates the reciprocal relation between the pressure and the volume of a gas, was first noted by Richard Towneley and Henry Power. In France, the law is known as Mariotte's law, after Edme Mariotte, who published his results later than Boyle, but crucially added that the relation holds only when temperature is kept constant.
  • Bradley–Terry model, one of the most popular models for Pairwise comparison, first described by Ernst Zermelo in 1929.
  • Brayton Cycle, as quoted from Wikipedia itself: The engine cycle is named after George Brayton (1830–1892), the American engineer who developed it originally for use in piston engines, although it was originally proposed and patented by Englishman John Barber in 1791.
  • Brus equation named after Louis E. Brus. Proposed a few years earlier by Alexander Efros.
  • Burnside's lemma, a counting technique in group theory, was discovered by Augustin Louis Cauchy, or possibly others. William Burnside originally attributed it to Ferdinand Georg Frobenius. Ironically, Burnside made many original contributions to group theory, and Burnside's Lemma is sometimes jokingly referred to as "the lemma that is not Burnside's".
  • Buridan's ass originates from the Persian philosopher Al-Ghazali. The version popularised by Jean Buridan also does not include the eponymous donkey.

C

  • Cantor–Bernstein–Schröder theorem (also known by other variations, such as Schröder-Bernstein theorem) first proved by Richard Dedekind
  • Cantor set, discovered in 1874 by Henry John Stephen Smith and introduced by German mathematician Georg Cantor 1883.
  • Carmichael number: 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]
  • Cartan matrices, first investigated by Wilhelm Killing.
  • Cardano's formula, the solution to general cubic equations. Cardano stated that it was discovered by Scipione del Ferro, who passed the knowledge to his student Antonio Maria Fior. Around 1535 Niccolò Fontana Tartaglia learned of this from Fior and re-derived the formula for the cubic, which he later shared with Cardano.[11][12]
  • Cassegrain reflector, named after a design published in 1672 which has been attributed to Laurent Cassegrain,[13] but was already known to Bonaventura Cavalieri in 1632[14] and Marin Mersenne in 1636.[15]
  • Cartesian duality: Named for Rene Descartes, but Teresa of Avila and her contemporaries wrote about similar methods of philosophical exploration 8 to 10 years before Descartes was born.[16]
  • Cavendish balance for measuring the universal gravitational constant, first devised and constructed by John Michell.
  • Chandrasekhar limit, the mass upper limit of a white dwarf, was first derived by Wilhelm Anderson and E. C. Stoner, and later improved by Subrahmanyan Chandrasekhar.
  • Chebyshev's inequality guarantees that, for a wide class of probability distributions, no more than a certain fraction of values can be more than a certain distance from the mean. It was first formulated by his friend and colleague Irénée-Jules Bienaymé in 1853 and proved by Chebyshev in 1867.
  • Chernoff bound, a bound on the tail distribution of sums of independent random variables, named for Herman Chernoff but due to Herman Rubin.[17]
  • Cobb–Douglas, a production function named after Paul H. Douglas and Charles W Cobb, developed earlier by Philip Wicksteed.
  • Cooley–Tukey algorithm, named after J. W. Cooley and John Tukey, but invented 160 years earlier in 1805 by Carl Friedrich Gauss.
  • Curie point, a critical temperature of phase change in ferromagnetism, named for Pierre Curie, who reported it in his thesis in 1895, but the phenomenon was found by Claude Pouillet before 1832.[18]
  • Currying, a technique for transforming an n-arity function to a chain of functions. Named after Haskell Curry; first discovered by Moses Schönfinkel.

D

E

F

  • Farey sequence. Cauchy published the proof to a conjecture put forth by Farey. Unknown to both men, similar results had been published earlier by Charles Haros.
  • Fermat's Last Theorem. An unusual example in that it is named after Pierre de Fermat who proposed it three and a half centuries prior to its proof by Andrew Wiles.
  • Fermi's golden rule, a quantum mechanical calculation, was discovered by Paul Dirac.
  • The Fermi paradox, stated (in an unpublished work) by Konstantin Tsiolkovsky in 1933, long before Fermi. Tsiolkovsky, in turn, stated that others had already considered this question.
  • The Floyd–Warshall algorithm for finding shortest paths in a weighted graph is named after Robert Floyd and Stephen Warshall who independently published papers about it in 1962. However, Bernard Roy had previously published an equivalent algorithm in 1959.
  • The Fraunhofer lines in the solar spectrum were first noted by William Hyde Wollaston twelve years before they were rediscovered and studied systematically by Joseph von Fraunhofer.
  • Fresnel lens. The idea of creating a thinner, lighter lens by making it with separate sections mounted in a frame is often attributed to Georges-Louis Leclerc.
  • Frobenius elements in a Galois group of global fields were first created by Dedekind.
  • Fibonacci numbers. Fibonacci was not the first to discover the famous sequence. They existed in Indian mathematics since 200 BC (Fibonacci gave the series in 1202 AD).

G

H

I

J

  • Jacobson's organ was first discovered by Frederik Ruysch before 1732.
  • Jordan's Law (in the sense of sister species often being allopatric): Jordan himself gives Wagner credit for earlier observation of this pattern.
  • Joukowski transformation was first derived by Otto Blumenthal in 1913. Edit: A mere 3 years after Joukowski (who was actually Nikolay Zhukovsky), published it in 1910.[26]

K

L

  • L'Hôpital's rule to calculate the limit of quotient of functions at a point were both functions converge to 0 (or both converge to infinity) is named after Guillaume de l'Hôpital, but is generally believed to have been discovered by Johann Bernoulli.
  • Lamarckism is generally used to refer to the idea of inheritance of acquired characteristics or soft inheritance, but the idea predates Jean-Baptiste Lamarck and was not the central part of his theory of transmutation of species.
  • Lambert–Beer law was discovered by Pierre Bouguer.
  • Laplace–Runge–Lenz vector was first discovered as a conserved quantity by Jakob Hermann and Johann Bernoulli.
  • Leibniz formula for π was first discovered by 15th-century Indian mathematician Madhava of Sangamagrama, but it is named after Gottfried Leibniz after the latter discovered it independently 300 years later.
  • Lexis diagram is named for Wilhelm Lexis but was previously theorized by Gustav Zeuner and Otto Brasche.
  • The Liebig condenser, which Justus von Liebig popularized, was attributed to Göttling by Liebig himself, but had already been developed independently by Poisonnier, Weigel, and Gadolin.
  • Lhermitte's sign in neurology, the "barber chair phenomenon" was first described by Pierre Marie and Chatelin. French neurologist Jean Lhermitte published his first report three years later.
  • Linus's law: named for Linus Torvalds, but actually described by Eric S. Raymond in The Cathedral and the Bazaar.

M

  • Maxwell's equations. The modern form of the equations in their most common formulation is credited to Oliver Heaviside, based on James Clerk Maxwell's original work.
  • Madelung rule, describing the order in which electron orbitals are filled, named after Erwin Madelung but first discovered by Charles Janet.
  • Matthew effect, named by Robert K. Merton after the writer of the Gospel of Matthew quoting the words of Jesus.
  • Meadow's law, the formulation that one cot death in a family is tragic, two suspicious, and three murder, originally described by D.J. and V.J.M. Di Maio.
  • Metropolis–Hastings algorithm. The algorithm was named after Nicholas Metropolis, who was the director of the Theoretical Division of Los Alamos National Laboratory at the time of writing the paper Equation of State Calculations by Fast Computing Machines. However, Metropolis did not contribute to that study in any way, as confirmed by various sources. The research problem was proposed by Augusta H. Teller and solved by Marshall N. Rosenbluth and Arianna W. Rosenbluth. Furthermore, according to Roy Glauber and Emilio Segrè, the original algorithm was invented by Enrico Fermi and reinvented by Stan Ulam.
  • Moore's Law

N

  • Newton's first and second laws of mechanics were known and proposed in separate ways by Galileo, Hooke and Huygens before Newton did in his Philosophiæ Naturalis Principia Mathematica. Newton owns the discovery of only the third one.[27]
  • Norman's law, proposed by Donald Norman, is a general restatement of Stigler's Law, "No saying or pronouncement is named after its originator." This law was named for Norman as an example of Stigler's Law – which was, itself, not named after its originator.[28]
  • Norton's theorem was published in November 1926 by Hans Ferdinand Mayer and independently discovered by Edward Lawry Norton who presented it in an internal Bell Labs technical report, dated November 1926.
  • Nyquist-Shannon sampling theorem. The name Nyquist–Shannon sampling theorem honours Harry Nyquist and Claude Shannon, but the theorem was also previously discovered by E. T. Whittaker (published in 1915) and Shannon cited Whittaker's paper in his work. (from Wikipedia)

O

  • The Oort cloud around the Solar System was first postulated by Ernst Öpik in 1932 and independently introduced by Jan Oort in 1960.
  • Olbers' paradox was formulated by Kepler in the 17th century, long before Olbers was born.

P

  • Padé approximant: named after and developed by Henri Padé around 1890, but was first introduced by Ferdinand Georg Frobenius.
  • Pascal's triangle: studied by and named for Blaise Pascal, but constructed several times before him independently.
  • Pearson's Coefficient of Correlation: was originally derived by Auguste Bravais and published in 1846.[29][30]
  • Pell's equation, studied in ancient India but mistakenly attributed to John Pell by Leonhard Euler. Apparently Euler confused Lord Brouncker (first European mathematician to find a general solution of the equation) with Pell.
  • Penrose triangle, an impossible object first created by the Swedish artist Oscar Reutersvärd in 1934. The mathematician Roger Penrose independently devised and popularised it in the 1950s.
  • Petersen graph as an example in graph theory, put forward by Julius Petersen in 1898, though it previously appeared in a paper by A. B. Kempe (1886).
  • Pfizer vaccine, a COVID-19 mRNA vaccine developed by BioNTech. Due to its small size, BioNTech partnered with the pharmaceutical companies Pfizer and Fosun for support with clinical trials, logistics and manufacturing. The vaccine's clinical name is BNT162b2 and it is currently marketed under the name Comirnaty.
  • Platonic solids were described earlier by Theaetetus, and some of them even earlier, by the Pythagoreans.
  • Playfair's axiom, an alternative to Euclid's fifth postulate on parallel lines, first stated by Proclus in the 5th century AD but named after John Playfair after he included it in his 1795 book Elements of Geometry and credited it to William Ludlam.
  • Playfair cipher, invented by Charles Wheatstone in 1854, but named after Lord Playfair who promoted its use.
  • Poe's law, formally stated by Nathan Poe in 2005, but following Internet norms going back as far as Jerry Schwarz in 1983.
  • The Poincaré disk model and the Poincaré half-plane model of hyperbolic geometry are named after Henri Poincaré who studied them in 1882. However, Eugenio Beltrami published a paper on these models previously in 1868.
  • Poisson distribution: described by Siméon Denis Poisson in 1837, though the result had already been given in 1711-21 by Abraham de Moivre.
  • Poisson spot: 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.
  • Prim's algorithm, developed in 1930 by the Czech mathematician Vojtěch Jarník and independently rediscovered by Prim in 1957.
  • Prinzmetal angina, also known as variant angina, referring to angina (chest pain) caused by vasospasm of the coronary arteries. Described twice in the 1930s before being published by Prinzmetal in 1959.[32][33][34]
  • Pythagorean theorem, named after the mathematician Pythagoras, although it was known before him to Babylonian mathematicians (although it is not known if the Babylonians possessed a proof of the result; yet it is not known either whether Pythagoras proved the result).

R

  • The Reynolds number in fluid mechanics was introduced by George Stokes, but is named after Osborne Reynolds, who popularized its use.
  • Richards equation is attributed to Richards in his 1931 publication, but was earlier introduced by Richardson in 1922 in his book "Weather prediction by numerical process." (Cambridge University press. p. 262) as pointed out by John Knight and Peter Raats in "The contributions of Lewis Fry Richardson to drainage theory, soil physics, and the soil-plant-atmosphere continuum" EGU General Assembly 2016.
  • Russell's paradox is a paradox in set theory that Bertrand Russell discovered and published in 1901. However, Ernst Zermelo had independently discovered the paradox in 1899.

S

T

V

W

Y

  • Yagi–Uda antenna, a successful and popular beam antenna, whose primary inventor was Shintaro Uda, but which was popularized by, and formerly popularly named for, his collaborator Hidetsugu Yagi.

Z

  • Zipf's law states that given some corpus of natural language utterances, the frequency of any word is inversely proportional to its rank in the frequency table. The law is named after George Kingsley Zipf, an early twentieth century American linguist. Zipf popularized Zipf's law and sought to explain it, though he did not claim to have originated it.[37]

See also

References

  1. "Bessemer process". Encyclopædia Britannica. 2. 2005. pp. 168. 
  2. "Kelly, William". Encyclopædia Britannica. 6. 2005. pp. 791. 
  3. H. Bethe, E. Salpeter (1951). "A Relativistic Equation for Bound-State Problems". Physical Review 84 (6): 1232. doi:10.1103/PhysRev.84.1232. Bibcode1951PhRv...84.1232S. 
  4. Y. Nambu (1950). "Force Potentials in Quantum Field Theory". Progress of Theoretical Physics 5 (4): 614. doi:10.1143/PTP.5.614. 
  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. Dunn, Olive Jean (1958). "Estimation of the Means for Dependent Variables". Annals of Mathematical Statistics 29 (4): 1095–1111. doi:10.1214/aoms/1177706374. 
  7. Dunn, Olive Jean (1961). "Multiple Comparisons Among Means". Journal of the American Statistical Association 56 (293): 52–64. doi:10.1080/01621459.1961.10482090. http://sci2s.ugr.es/keel/pdf/algorithm/articulo/1961-Bonferroni_Dunn-JASA.pdf. 
  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. (2013). "Václav Šimerka: quadratic forms and factorization". LMS Journal of Computation and Mathematics 16: 118–129. doi:10.1112/S1461157013000065. 
  11. "Scipione Ferro | Italian mathematician". https://www.britannica.com/biography/Scipione-Ferro. 
  12. J. Stillwell, Mathematics and Its History, 3rd Ed, Springer,2010
  13. André Baranne and Françoise Launay, Cassegrain: a famous unknown of instrumental astronomy, Journal of Optics, 1997, vol. 28, no. 4, pp. 158-172(15)
  14. Stargazer, the Life and Times of the Telescope, by Fred Watson, p. 134
  15. Stargazer, p. 115.
  16. Mercer, Christia (25 September 2017). "Opinion | Descartes is Not Our Father". The New York Times. https://www.nytimes.com/2017/09/25/opinion/descartes-is-not-our-father.html. 
  17. Chernoff, Herman (2014). "A career in statistics". Past, Present, and Future of Statistics. CRC Press. p. 35. ISBN 9781482204964. http://nisla05.niss.org/copss/past-present-future-copss.pdf. 
  18. Grimmett, Geoffrey (2006). "Random‑Cluster Measures". The Random‑Cluster Model. Grundlehren der Mathematischen Wissenschaften (Springer) 333: 6. doi:10.1007/978-3-540-32891-9_1. ISBN 978-3-540-32891-9. ISSN 0072-7830. OCLC 262691034. https://books.google.com/books?id=UfvxyLIMalgC&pg=PA6. "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 [Claude] Pouillet....". 
  19. Lagrange, Joseph-Louis (1773). "Sur l'attraction des sphéroïdes elliptiques" (in fr). Mémoires de l'Académie de Berlin: 125. https://books.google.com/books?id=4XkAAAAAMAAJ&pg=PA619. 
  20. Duhem, Pierre (1891) (in fr). Leçons sur l'électricité et le magnétisme. Paris Gauthier-Villars. vol. 1, ch. 4, p. 22–23. https://archive.org/stream/leonssurllec01duheuoft#page/22/mode/2up.  shows that Lagrange has priority over Gauss. Others after Gauss discovered "Gauss' Law", too.
  21. Stargazer, the Life and Times of the Telescope, by Fred Watson, p. 134
  22. Stargazer, p. 115.
  23. Heath, Thomas (1921). A History of Greek Mathematics Volume II From Aristarchus to Dipohantus. Dover Books. p. 323. ISBN 0-486-24074-6. 
  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 (1998). Applications and explanations of Zipf's law. Joint conference on new methods in language processing and computational natural language learning: Association for Computational Linguistics. pp. 151–160. http://aclweb.org/anthology/W98-1218.