Kenneth Goodearl
Affiliations: | Mathematics | University of California, Santa Barbara, Santa Barbara, CA, United States |
Area:
Algebra, Functional AnalysisGoogle:
"Kenneth Goodearl"Children
Sign in to add trainee| Katherine Crow | grad student | 2004 | UC Santa Barbara |
| Heidi A. Haynal | grad student | 2007 | UC Santa Barbara |
| Christopher R. Nowlin | grad student | 2010 | UC Santa Barbara |
| Andrew C. Jaramillo | grad student | 2014 | UC Santa Barbara |
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. |
| Goodearl K, Launois S, Lenagan TH. (2019) Tauvel’s height formula for quantum nilpotent algebras Communications in Algebra. 47: 4194-4209 |
| Goodearl KR, Yakimov MT. (2014) Quantum cluster algebras and quantum nilpotent algebras. Proceedings of the National Academy of Sciences of the United States of America. 111: 9696-703 |
| Goodearl KR, Yakimov MT. (2014) From quantum Ore extensions to quantum tori via noncommutative UFDs Advances in Mathematics |
| Goodearl KR, Launois S, Lenagan TH. (2011) Torus-invariant prime ideals in quantum matrices, totally nonnegative cells and symplectic leaves Mathematische Zeitschrift. 269: 29-45 |
| Goodearl KR, Launois S. (2011) The dixmier-moeglin equivalence and a Gel'fand-Kirillov problem for Poisson polynomial algebras Bulletin De La Societe Mathematique De France. 139: 1-39 |
| Aranda Pino G, Goodearl KR, Perera F. (2010) Non-simple purely infinite rings American Journal of Mathematics. 132: 563-610 |
| Goodearl KR, Letzter ES. (2009) Semiclassical limits of quantum affine spaces Proceedings of the Edinburgh Mathematical Society. 52: 387-407 |
| Goodearl KR, Zhang JJ. (2007) Homological properties of quantized coordinate rings of semisimple groups Proceedings of the London Mathematical Society. 94: 647-671 |
| Ara P, Goodearl KR, Pardo E. (2002) K0 of purely infinite simple regular rings K-Theory. 26: 69-100 |
| Goodearl KR, Wehrung F. (2001) Representations of distributive semilattices in ideal lattices of various algebraic structures Algebra Universalis. 45: 71-101 |