On the rank varieties and Jordan types of a class of simple modules
Fix a finite group G and an algebraically closed field F of characteristic p. For an FG-module M, the complexity of M is the rate of growth of a minimal projective resolution of M which is a cohomological invariant of M. The rank varieties introduced by Carlson are defined for modules for elementary...
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Nanyang Technological University
2024
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sg-ntu-dr.10356-1736942024-04-09T03:58:58Z On the rank varieties and Jordan types of a class of simple modules Wang, Jialin Lim Kay Jin School of Physical and Mathematical Sciences LimKJ@ntu.edu.sg Mathematical Sciences Representation theory Symmetric group Algebraic geometry Fix a finite group G and an algebraically closed field F of characteristic p. For an FG-module M, the complexity of M is the rate of growth of a minimal projective resolution of M which is a cohomological invariant of M. The rank varieties introduced by Carlson are defined for modules for elementary abelian p-groups and can be extended to modules for G by looking at the restriction to elementary abelian subgroups of G. Moreover, the dimension of the rank variety gives the complexity of the module. In this thesis, I discuss some basic properties of rank varieties and complexities and then review some known results on the complexities of some simple modules for symmetric groups and finite general linear groups. Doctor of Philosophy 2024-03-25T01:42:19Z 2024-03-25T01:42:19Z 2024 Thesis-Doctor of Philosophy Wang, J. (2024). On the rank varieties and Jordan types of a class of simple modules. Doctoral thesis, Nanyang Technological University, Singapore. https://hdl.handle.net/10356/173694 https://hdl.handle.net/10356/173694 10.32657/10356/173694 en This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License (CC BY-NC 4.0). application/pdf Nanyang Technological University |
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Mathematical Sciences Representation theory Symmetric group Algebraic geometry Wang, Jialin On the rank varieties and Jordan types of a class of simple modules |
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Fix a finite group G and an algebraically closed field F of characteristic p. For an FG-module M, the complexity of M is the rate of growth of a minimal projective resolution of M which is a cohomological invariant of M. The rank varieties introduced by Carlson are defined for modules for elementary abelian p-groups and can be extended to modules for G by looking at the restriction to elementary abelian subgroups of G. Moreover, the dimension of the rank variety gives the complexity of the module. In this thesis, I discuss some basic properties of rank varieties and complexities and then review some known results on the complexities of some simple modules for symmetric groups and finite general linear groups. |
| author2 |
Lim Kay Jin |
| author_facet |
Lim Kay Jin Wang, Jialin |
| format |
Thesis-Doctor of Philosophy |
| author |
Wang, Jialin |
| author_sort |
Wang, Jialin |
| title |
On the rank varieties and Jordan types of a class of simple modules |
| title_short |
On the rank varieties and Jordan types of a class of simple modules |
| title_full |
On the rank varieties and Jordan types of a class of simple modules |
| title_fullStr |
On the rank varieties and Jordan types of a class of simple modules |
| title_full_unstemmed |
On the rank varieties and Jordan types of a class of simple modules |
| title_sort |
on the rank varieties and jordan types of a class of simple modules |
| publisher |
Nanyang Technological University |
| publishDate |
2024 |
| url |
https://hdl.handle.net/10356/173694 |
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1800916256795131904 |