Finite groups of low essential dimension
Informally, essential dimension is the minimal number of parameters required to define an algebraic object. This invariant has numerous connections to Galois cohomology, linear algebraic groups and birational geometry. In particular, the essential dimension of finite groups has connections to the...
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University of British Columbia
2011
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| Online Access: | http://hdl.handle.net/2429/35116 |
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ndltd-LACETR-oai-collectionscanada.gc.ca-BVAU.2429-351162014-03-26T03:37:49Z Finite groups of low essential dimension Duncan, Alexander Rhys Informally, essential dimension is the minimal number of parameters required to define an algebraic object. This invariant has numerous connections to Galois cohomology, linear algebraic groups and birational geometry. In particular, the essential dimension of finite groups has connections to the Noether problem, inverse Galois theory and the simplification of polynomials via Tschirnhaus transformations. This thesis studies finite groups of low essential dimension using methods from birational geometry. Specifically, the main results are a classification of finite groups of essential dimension 2, and a proof that the alternating and symmetric groups on 7 letters have essential dimension 4. 2011-06-03T19:08:19Z 2011-06-03T19:08:19Z 2011 2011-06-03T19:08:19Z 2011-11 Electronic Thesis or Dissertation http://hdl.handle.net/2429/35116 eng University of British Columbia |
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NDLTD |
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English |
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NDLTD |
| description |
Informally, essential dimension is the minimal number of parameters required to define an algebraic object. This invariant has numerous connections to Galois cohomology, linear algebraic groups and birational geometry. In particular, the essential dimension of finite groups has connections to the Noether problem, inverse Galois theory and the simplification of polynomials via Tschirnhaus transformations.
This thesis studies finite groups of low essential dimension using methods from birational geometry. Specifically, the main results are a classification of finite groups of essential dimension 2, and a proof that the alternating and symmetric groups on 7 letters have essential dimension 4. |
| author |
Duncan, Alexander Rhys |
| spellingShingle |
Duncan, Alexander Rhys Finite groups of low essential dimension |
| author_facet |
Duncan, Alexander Rhys |
| author_sort |
Duncan, Alexander Rhys |
| title |
Finite groups of low essential dimension |
| title_short |
Finite groups of low essential dimension |
| title_full |
Finite groups of low essential dimension |
| title_fullStr |
Finite groups of low essential dimension |
| title_full_unstemmed |
Finite groups of low essential dimension |
| title_sort |
finite groups of low essential dimension |
| publisher |
University of British Columbia |
| publishDate |
2011 |
| url |
http://hdl.handle.net/2429/35116 |
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AT duncanalexanderrhys finitegroupsoflowessentialdimension |
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