John M. Voight, Ph.D.
Affiliations: | 2005 | University of California, Berkeley, Berkeley, CA, United States |
Area:
Algebraic number theory, AlgorithmsGoogle:
"John Voight"Parents
Sign in to add mentor| Hendrik W. Lenstra | grad student | 2005 | UC Berkeley | |
| (Quadratic forms and quaternion algebras: Algorithms and arithmetic.) | ||||
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Publications
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| Doran CF, Kelly TL, Salerno A, et al. (2020) Hypergeometric decomposition of symmetric K3 quartic pencils. Research in the Mathematical Sciences. 7: 7 |
| Park J, Poonen B, Voight J, et al. (2019) A heuristic for boundedness of ranks of elliptic curves Journal of the European Mathematical Society. 21: 2859-2903 |
| Musty M, Schiavone S, Sijsling J, et al. (2019) A Database of Belyi Maps Arxiv: Number Theory. 2: 375-392 |
| Brumer A, Pacetti A, Poor C, et al. (2019) On the paramodularity of typical abelian surfaces Algebra & Number Theory. 13: 1145-1195 |
| Linowitz B, Stover M, Voight J. (2019) Commensurability Classes of Fake Quadrics Selecta Mathematica-New Series. 25: 1-39 |
| Dummit DS, Voight J. (2018) The 2‐Selmer group of a number field and heuristics for narrow class groups and signature ranks of units Proceedings of the London Mathematical Society. 117: 682-726 |
| Costa E, Mascot N, Sijsling J, et al. (2018) Rigorous Computation Of The Endomorphism Ring Of A Jacobian Ieee Communications Magazine. 88: 1303-1339 |
| Clark PL, Voight J. (2017) Algebraic curves uniformized by congruence subgroups of triangle groups Transactions of the American Mathematical Society. 371: 33-82 |
| Booker AR, Sijsling J, Sutherland AV, et al. (2016) A database of genus-2 curves over the rational numbers Lms Journal of Computation and Mathematics. 19: 235-254 |
| Nugent S, Voight J. (2016) On the arithmetic dimension of triangle groups Ieee Communications Magazine. 86: 1979-2004 |