Tham khảo Hàm số bậc năm

  • Charles Hermite, "Sur la résolution de l'équation du cinquème degré", Œuvres de Charles Hermite, t.2, pp. 5–21, Gauthier-Villars, 1908.
  • Felix Klein, Lectures on the Icosahedron and the Solution of Equations of the Fifth Degree, trans. George Gavin Morrice, Trübner & Co., 1888. ISBN 0-486-49528-0.
  • Leopold Kronecker, "Sur la résolution de l'equation du cinquième degré, extrait d'une lettre adressée à M. Hermite", Comptes Rendus de l'Académie des Sciences, t. XLVI, 1858 (1), pp. 1150–1152.
  • Blair Spearman and Kenneth S. Williams, "Characterization of solvable quintics x5 + ax + b, American Mathematical Monthly, Vol. 101 (1994), pp. 986–992.
  • Ian Stewart, Galois Theory 2nd Edition, Chapman and Hall, 1989. ISBN 0-412-34550-1. Discusses Galois Theory in general including a proof of insolvability of the general quintic.
  • Jörg Bewersdorff, Galois theory for beginners: A historical perspective, American Mathematical Society, 2006. ISBN 0-8218-3817-2. Chapter 8 (The solution of equations of the fifth degree tại Wayback Machine (lưu trữ 2010-03-31)) gives a description of the solution of solvable quintics x5 + cx + d.
  • Victor S. Adamchik and David J. Jeffrey, "Polynomial transformations of Tschirnhaus, Bring and Jerrard," ACM SIGSAM Bulletin, Vol. 37, No. 3, September 2003, pp. 90–94.
  • Ehrenfried Walter von Tschirnhaus, "A method for removing all intermediate terms from a given equation," ACM SIGSAM Bulletin, Vol. 37, No. 1, March 2003, pp. 1–3.
  • Daniel Lazard, "Solving quintics in radicals", in Olav Arnfinn Laudal, Ragni Piene, The Legacy of Niels Henrik Abel, pp. 207–225, Berlin, 2004, ISBN 3-540-43826-2, available at Lưu trữ 2005-01-06 tại Wayback Machine
  • Tóth, Gábor (2002), Finite Möbius groups, minimal immersions of spheres, and moduli