EDP Sciences Journals List
  • French
  • English
Advanced Search
Subscriber Authentication Point
Home All issues Issue75 Article
Issue Quadrature
Number 75, Janvier-Mars 2010
Page(s) 10 - 18
Section Géométrie
DOI http://dx.doi.org/10.1051/quadrature/2009022
Published online 10 December 2009

References of  Quadrature n°75 (2010) 10–18
  1. R.A. Abdel-Baki, "One-parameter closed spherical motion and Holditch's Theorem", Sitzungsberichte. Abt II 214 (2005) 27–41.
  2. T.M. Apostol et M.A. Mnatsakanian, "Tangents and subtangents used to calculate areas", Am. Math. Mon. 109 (2002) 900–908. [CrossRef]
  3. J. Bertrand, Traité de Calcul Différentiel et de Calcul Intégral, Paris, Gauthier-Villars, 1870, reprint : Éditions Jacques Gabay.
  4. J. Bertrand, Traité de Calcul Différentiel et de Calcul Intégral, http://gallica.bnf.fr/ark:/12148/bpt6k99558p.
  5. Biographical History of Gonville and Caius College: 1349–1897, Volume II: Admissions 1713–1897, Cambridge University Press, 1898.
  6. P. Boulanger, "Les données inutiles", Dossier Pour la Science 59 (avril/juin 2008) 46–47.
  7. P.J. Bravo et J.-P. Truc, Construction de courbes planes, Éditions Nathan, 1984.
  8. A. Broman, "Holditch's Theorem", Math. Mag. 3 (1981) 99–108.
  9. W. Cieślak, S. Koshi et J. Zajak, "On integral formulas for convex domains", Acta Math. Hung. 62 (1993) 277–283. [CrossRef]
  10. R. Courant et F. John, Introduction to Calculus and Analysis II/2, Springer, 1989 (1re édition), 2000 (2nde édition).
  11. A. Craik, Mr Hopkins'men, Springer, 2007.
  12. Ch.-J. de la Vallée Poussin, Cours d'Analyse Infinitésimale, Tome 1, Gauthier-Villars, 1914 (3e édition).
  13. R. Estève, "Sur la formule d'Holditch et les applications qu'on peut en déduire", Nouvelles annales de mathématiques, Mai 1923, Gauthier-Villars et Cie.
  14. H. Holditch, On Rolling Curves, Cambridge Trans. Cam. Phil. Soc., 1839.
  15. H. Holditch, "Geometrical Theorem", Q. J. Pure Appl. Math. 2 (1858) 38.
  16. http://www.mathcurve.com/courbes2d/
  17. D. Riehl Leader, V. Morgan, P. Searby et C. Brooke, A History of the University of Cambridge, Volume III: 1750–1870, Cambridge University Press, 1997.
  18. S. Yüce et N. Kuruoglu, "The Holditch Sickles for the open Homothetic Motions", Appl. Math. E-notes 7 (2007) 175–178. [MathSciNet]



What is OpenURL?

The OpenURL standard is a protocol for transmission of metadata describing the resource that you wish to access. An OpenURL link contains article metadata and directs it to the OpenURL server of your choice. The OpenURL server can provide access to the resource and also offer complementary services (specific search engine, export of references...). The OpenURL link can be generated by different means.
  • If your librarian has set up your subscription with an OpenURL resolver, OpenURL links appear automatically on the abstract pages.
  • You can define your own OpenURL resolver with your EDPS Account. In this case your choice will be given priority over that of your library.
  • You can use an add-on for your browser (Firefox or I.E.) to display OpenURL links on a page (see http://www.openly.com/openurlref/). You should disable this module if you wish to use the OpenURL server that you or your library have defined.