1. Wouter Castryck and John Voight, Nondegenerate curves of low genus over small finite fields, Arithmetic, Geometry, Cryptography and Coding Theory, Contemporary Mathematics, vol. 521, AMS, Providence, R.I., 2009, pp. 21–28.[arXiv]
  2. Lassina Dembele, Matthew Greenberg, and John Voight, Nonsolvable number fields ramified only at 3 and 5, preprint (2009), 18 pages.[arXiv]
  3. Matthew Greenberg and John Voight, Computing systems of Hecke eigenvalues associated to Hilbert modular forms, Math. Comp., to appear (2011), 21 pages.[arXiv]
  4. Markus Kirschmer and John Voight, Algorithmic enumeration of ideal classes for quaternion orders, SIAM J. Comput 39 (2010), no. 5, 1714–1747.
  5. John Voight, Quadratic Forms and Quaternion Algebras: Algorithms and Arithmetic, PhD Thesis, Berkeley, 2005.
  6. John Voight, Quadratic forms that represent almost the same primes, Math. Comp. 76 (2007), no. 259, 1589–1617 (electronic).[MR/arXiv]
  7. John Voight, Computing fundamental domains for Fuchsian groups, J. Théor. Nombres Bordeaux 21 (2009), no. 2, 469–491.[MR/link]
  8. John Voight, Shimura curves of genus at most two, Math. Comp. 78 (2009), no. 266, 1155–1172.[MR]
  9. John Voight, The gauss higher relative class number problem, Ann. Sci. Math. Québec Accepted (2009), 10 pages.[arXiv]
  10. John Voight, Identifying the matrix ring: Algorithms for quaternion algebras and quadratic forms, preprint (2010), 35 pages.[arXiv]