Robert R. Kallman
Affiliations: | University of North Texas, Denton, TX, United States |
Area:
MathematicsGoogle:
"Robert Kallman"Children
Sign in to add traineeMichael K. Rees | grad student | 2001 | University of North Texas |
Alexandru G. Atim | grad student | 2008 | University of North Texas |
Alexander P. McLinden | grad student | 2010 | University of North Texas |
Matthew R. Farmer | grad student | 2011 | University of North Texas |
We'am M. Jasim | grad student | 2011 | University of North Texas |
Samuel P. McWhorter | grad student | 2014 | University of North Texas |
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Publications
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Al-Tameemi WM, Kallman RR. (2016) The natural semidirect product Rn ⋊ G(n) is algebraically determined Topology and Its Applications. 199: 70-83 |
Cohen MP, Kallman RR. (2016) Openly Haar null sets and conjugacy in Polish groups Israel Journal of Mathematics. 215: 1-30 |
COHEN MP, KALLMAN RR. (2015) \text{PL}:{+}(I) is not a Polish group Ergodic Theory and Dynamical Systems |
Al-Tameemi WM, Kallman RR. (2014) Algebraically determined semidirect products Topology and Its Applications. 175: 43-48 |
Cohen MP, Kallman RR. (2014) A conjecture of Gleason on the foundations of geometry Topology and Its Applications. 161: 279-289 |
Atim AG, Kallman RR. (2012) The infinite unitary and related groups are algebraically determined Polish groups Topology and Its Applications. 159: 2831-2840 |
Kallman RR, McLinden AP. (2012) The Polish Lie ring of vector fields on a smooth manifold is algebraically determined Topology and Its Applications. 159: 2743-2756 |
Kallman RR, McLinden AP. (2010) The Poincaré and related groups are algebraically determined Polish groups Collectanea Mathematica. 61: 337-352 |
Kallman RR. (2000) Every reasonably sized matrix group is a subgroup of S |
Kallman RR. (1986) Uniqueness results for homeomorphism groups Transactions of the American Mathematical Society. 295: 389-396 |