Alfred George Greenhill Explained

Sir Alfred George Greenhill (29 November 1847 in London – 10 February 1927 in London), was a British mathematician.

George Greenhill was educated at Christ's Hospital School and from there he went to St John's College, Cambridge in 1866. In 1876, Greenhill was appointed professor of mathematics at the Royal Military Academy (RMA) at Woolwich, London, UK. He held this chair until his retirement in 1908, when he was knighted.

His 1892 textbook on applications of elliptic functions is of acknowledged excellence. He was one of the world's leading experts on applications of elliptic integrals in electromagnetic theory.[1]

He was a Plenary Speaker of the ICM in 1904 at Heidelberg[2] (where he also gave a section talk)[3] and an Invited Speaker of the ICM in 1908 at Rome, in 1920 at Strasbourg,[4] and in 1924 at Toronto.

Greenhill formula

In 1879 Greenhill calculated complicated twist rate formulas for rifled artillery by approximating the projectile as an elongated ellipsoid of rotation in incompressible fluid (which, as he couldn't have known back then, assumes subsonic flight).[5] [6] Later, English ballistician F. W. Jones simplified it for typical bullet lengths into a rule of thumb for calculating the optimal twist rate for lead-core bullets.[7] This shortcut uses the bullet's length, needing no allowances for weight or nose shape.[8] The eponymous Greenhill formula, still used today, is:

\mathrm = \frac \times \sqrt

where:

The original value of C was 150, which yields a twist rate in inches per turn, when given the diameter D and the length L of the bullet in inches. This works to velocities of about 840 m/s (2800 ft/s); above those velocities, a C of 180 should be used. For instance, with a velocity of 600 m/s (2000 ft/s), a diameter of 0.5inches and a length of 1.5inches, the Greenhill formula would give a value of 25, which means 1 turn in 25inches.

Recently, Greenhill formula has been supplemented with Miller twist rule.

Textbooks

External links

Notes and References

  1. Greenhill, Alfred George. The elliptic integral in electromagnetic theory. Bull. Amer. Math. Soc.. 1907. 8. 4. 447–534. 1500798. 10.1090/s0002-9947-1907-1500798-2. free.
  2. Book: The Mathematical Theory of the Top considered historically by A. G. Greenhill. 100–108. Verhandlungen des dritten internationalen Mathematiker-Kongresses in Heidelberg von 8. bis 13. August 1904. ICM proceedings . Leipzig. B. G. Teubner. 1905. https://babel.hathitrust.org/cgi/pt?id=miun.aag4063.0004.001;view=1up;seq=114.
  3. Book: Teaching of mechanics by familiar applications on a large scale by A. G. Greenhill. 582–585. Verhandlungen des dritten internationalen Mathematiker-Kongresses in Heidelberg von 8. bis 13. August 1904. ICM proceedings . Leipzig. B. G. Teubner. 1905. https://babel.hathitrust.org/cgi/pt?id=miun.aag4063.0004.001&view=1up&seq=600.
  4. Book: http://www.mathunion.org/ICM/ICM1920/Main/icm1920.0636.0655.ocr.pdf. 636–655. 1921. Compte rendu du Congrès international des mathématiciens tenu à Strasbourg du 22 au 30 Septembre 1920. The Fourier and Bessel Functions contrasted by G. Greenhill.
  5. Miller . Donald G. . November 2006 . Where did Greenhill's twist rule come from? . International Journal of Impact Engineering . 32 . 11 . 1786–1799 . 10.1016/j.ijimpeng.2005.06.001 . 0734-743X.
  6. Greenhill . A. G. . 1880 . On the Rotation Required for the Stability of an Elongated Projectile . Van Nostrand's Engineering Magazine . 23 . 211-214.
  7. https://dds.crl.edu/item/286938
  8. Mosdell, Matthew. The Greenhill Formula. Web site: Archived copy . 2009-08-19 . dead . https://web.archive.org/web/20110718205935/http://www.mamut.net/MarkBrooks/newsdet35.htm . 2011-07-18 . (Accessed 2009 AUG 19)
  9. Harkness, J.. James Harkness (mathematician). Review: The Applications of Elliptic Functions by Alfred George Greenhill. Bull. Amer. Math. Soc.. 1893. 2. 7. 151–157. 10.1090/s0002-9904-1893-00129-8. free.
  10. Wilson, Edwin Bidwell. Edwin Bidwell Wilson. Review: Report on Gyroscopic Theory by Sir G. Greenhill. Bull. Amer. Math. Soc.. 1917. 23. 5. 241–244. 10.1090/s0002-9904-1917-02930-8. free.