已收录 273081 条政策
 政策提纲
  • 暂无提纲
Homological properties of invariant rings of finite groups
[摘要] Let $V$ be a non-zero finite dimensional vector space over the finite field $F_q$. We take the left action of $G \le GL(V)$ on $V$ and this induces a right action of $G$ on the dual of $V$ which can be extended to the symmetric algebra $F_q[V]$ by ring automorphisms. In this thesis we find the explicit generators and relations among these generators for the ring of invariants $F_q[V]^G$. The main body of the research is in chapters 4, 5 and 6. In chapter 4, we consider three subgroups of the general linear group which preserve singular alternating, singular hermitian and singular quadratic forms respectively, and find rings of invariants for these groups. We then go on to consider,in chapter 5, a subgroup of the symplectic group. We take two special cases for this subgroup. In the first case we find the ring of invariants for this group. In the secondcase we progress to the ring of invariants for this group but the problem is still open. Finally, in chapter 6, we consider the orthogonal groups in even characteristic. Wegeneralize some of the results of [24]. This generalization is important because it will help to calculate the rings of invariants of the orthogonal groups over any finite field of even characteristic.
[发布日期]  [发布机构] University:University of Glasgow;Department:School of Mathematics and Statistics
[效力级别]  [学科分类] 
[关键词] QA Mathematics [时效性] 
   浏览次数:19      统一登录查看全文      激活码登录查看全文