Joel D. Hamkins
Affiliations: | City University of New York, New York, NY, United States |
Area:
MathematicsGoogle:
"Joel Hamkins"Children
Sign in to add trainee| Bokai Yao | grad student | Notre Dame (Philosophy Tree) | |
| George Leibman | grad student | 2004 | CUNY |
| Jonas Reitz | grad student | 2006 | CUNY |
| Victoria Gitman | grad student | 2007 | CUNY |
| Thomas A. Johnstone | grad student | 2007 | CUNY |
| Jason A. Schanker | grad student | 2011 | CUNY |
| Brent Cody | grad student | 2012 | CUNY |
| Norman L. Perlmutter | grad student | 2013 | CUNY |
BETA: Related publications
See more...
Publications
|
You can help our author matching system! If you notice any publications incorrectly attributed to this author, please sign in and mark matches as correct or incorrect. |
| Gitman V, Hamkins JD, Holy P, et al. (2020) The Exact Strength Of The Class Forcing Theorem Journal of Symbolic Logic. 1-37 |
| Barton N, Caicedo AE, Fuchs G, et al. (2020) Inner-model reflection principles Studia Logica. 108: 573-595 |
| Hamkins JD, Linnebo Ø. (2019) The modal logic of set-theoretic potentialism and the potentialist maximality principles Review of Symbolic Logic. 1-36 |
| Habič ME, Hamkins JD, Klausner LD, et al. (2019) Set-Theoretic Blockchains Archive For Mathematical Logic. 58: 965-997 |
| Gitman V, Hamkins JD. (2019) A model of the generic Vopěnka principle in which the ordinals are not Mahlo Archive For Mathematical Logic. 58: 245-265 |
| Dorais FG, Hamkins JD. (2019) When does every definable nonempty set have a definable element Mathematical Logic Quarterly. 65: 407-411 |
| Fuchs G, Gitman V, Hamkins JD. (2018) Ehrenfeucht's lemma in set theory Notre Dame Journal of Formal Logic. 59: 355-370 |
| Enayat A, Hamkins JD. (2018) ZFC proves that the class of ordinals is not weakly compact for definable classes Journal of Symbolic Logic. 83: 146-164 |
| Hamkins JD, Johnstone TA. (2017) Strongly uplifting cardinals and the boldface resurrection axioms Archive For Mathematical Logic. 56: 1115-1133 |
| Fuchs G, Gitman V, Hamkins JD. (2017) Incomparable ω1 -like models of set theory Mathematical Logic Quarterly. 63: 66-76 |