Is he not the celebrated author of The Dynamics of an Asteroid, a book which ascends to such rarefied heights of pure mathematics that it is said that there was no man in the scientific press capable of criticizing it?
Participants in the "Sherlockian game", where Sherlock Holmes fans elaborate on elements within Doyle's stories, have suggested other details about The Dynamics of an Asteroid.
Related real works
In 1809, Carl Friedrich Gauss wrote a ground-breaking treatise[2] on the dynamics of an asteroid (Ceres). However, Gauss's method was understood immediately and is still used today.[3]
Two decades before Arthur Conan Doyle's writing, the Canadian-American dynamic astronomer Simon Newcomb had published a series of books analyzing motions of planets in the solar system.[4] The notoriously spiteful Newcomb could have been an inspiration for Professor Moriarty.[5]
An example of mathematics too abstruse to be criticized is the letters of Srinivasa Ramanujan, sent to several mathematicians at the University of Cambridge in 1913.[6] Only one of these mathematicians, G. H. Hardy, even recognized their merit. Despite being experts in the branches of mathematics used, he and J. E. Littlewood added that many of them "defeated me completely; I had never seen anything in the least like them before." It has taken over a century for this work to be understood; the last sub-field[7] (and the last problem of the last sub-field[8]) have been referred to as The Final Problem in explicit reference to the Sherlock Holmes story. Holmes only states that "it is said" (emphasis added) that no one in the scientific press was capable of criticizing Moriarty's work; he stops short of recognizing the claim as indisputably accurate.
Similarly, when it was jocularly suggested to Arthur Eddington in 1919 that he was one of only three people in the world who understood Albert Einstein's theory of relativity, Eddington quipped that he could not think who the third person was.[9]
Discussion of possible book contents
Doyle provided no indication of the contents of Dynamics other than its title. Speculation about its contents published by later authors includes:
"The Ultimate Crime", short story by Isaac Asimov, in More Tales of the Black Widowers,[10] and republished in Sherlock Holmes through Time and Space.[11]
In the novel Spider-Man: The Revenge of the Sinister Six, by Adam-Troy Castro, a veiled reference is made to Moriarty and his Dynamics. Here the work is said to still be the authority on orbital bombardment.
Physicist Alejandro Jenkins in 2013 suggested chaos theory, an esoteric branch of mathematics whose association with asteroid dynamics was not appreciated by real-world mathematicians until the work of Henri Poincaré in 1890.[14][15][16]
In "His Last Vow", the final episode of series 3 of the BBC television series Sherlock, Sherlock's mother, M.L. Holmes, is shown to have written a lengthy textbook with the title The Dynamics of Combustion, a reference to this book.
In "Henny Penny the Sky Is Falling", the 100th episode of the CBS television series Elementary, the plot evolves around a fictional paper with the title Miscalculating Near-Earth Asteroids and the Threat to Human Existence.
The pastiche novel Professor Moriarty: The Hound of the D'Urbervilles by film critic and horror novelist Kim Newman includes a chapter parodying both "The Adventure of the Red-Headed League" and H. G. Wells's novel The War of the Worlds, in which an arrogant former student of Moriarty's named Nevil Airey-Stent publicly rubbishes The Dynamics of an Asteroid to prove that it is indeed susceptible to criticism, prompting an enraged Moriarty to orchestrate an elaborate plan to drive Stent insane by convincing him that he has been contacted by visitors from the planet Mars.
In the 2017 mobile game Fate/Grand Order, Moriarty's Noble Phantasm is called The Dynamics of an Asteroid. During the Shinjuku Pseudo-Singularity, his goal is to destroy the Earth following the theory developed in this book using the asteroid 101955 Bennu as the "bullet," and the abilities of the Phantom Spirit of der Freischütz to guarantee it will destroy the Earth.
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Teets, Donald; Whitehead, Karen (April 1999). "The discovery of Ceres: How Gauss became famous". Mathematics Magazine. 72 (2): 83–93. doi:10.1080/0025570X.1999.11996710. JSTOR2690592.
^
Marsden, B. (1981). "Newcomb, Simon". In Gillespie, C.C. (ed.). Dictionary of Scientific Biography. Vol. 10. New York, NY: Charles Screibner's Sons. pp. 33–36. ISBN0-684-16970-3.
^Watson, G. N. (2001). "The final problem: an account of the mock theta functions". Ramanujan: essays and surveys. pp. 325–34.
^Berndt, Bruce C., Junxian Li, and Alexandru Zaharescu (2019). "The final problem: an identity from Ramanujan's lost notebook". Journal of the London Mathematical Society. 100 n (2): 568–591.{{cite journal}}: CS1 maint: multiple names: authors list (link)
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Diacu, Florin; Holmes, Philip (1996). Celestial Encounters: The origins of chaos and stability. Princeton University Press.
^"Sherlock Holmes and the Three-Body Problem". Mathematics Today. Institute of Mathematics & its applications. February 2014. CiteSeerX10.1.1.672.4223.
