Invariant And Covariant Rings Of Finite Pseudo Reflection Groups
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Reflection Groups and Invariant Theory
Author | : Richard Kane |
Publisher | : Springer Science & Business Media |
Total Pages | : 382 |
Release | : 2013-03-09 |
Genre | : Mathematics |
ISBN | : 1475735421 |
Reflection groups and invariant theory is a branch of mathematics that lies at the intersection between geometry and algebra. The book contains a deep and elegant theory, evolved from various graduate courses given by the author over the past 10 years.
Invariant Theory of Finite Groups
Author | : Mara D. Neusel |
Publisher | : American Mathematical Soc. |
Total Pages | : 384 |
Release | : 2010-03-08 |
Genre | : Mathematics |
ISBN | : 0821849816 |
The questions that have been at the center of invariant theory since the 19th century have revolved around the following themes: finiteness, computation, and special classes of invariants. This book begins with a survey of many concrete examples chosen from these themes in the algebraic, homological, and combinatorial context. In further chapters, the authors pick one or the other of these questions as a departure point and present the known answers, open problems, and methods and tools needed to obtain these answers. Chapter 2 deals with algebraic finiteness. Chapter 3 deals with combinatorial finiteness. Chapter 4 presents Noetherian finiteness. Chapter 5 addresses homological finiteness. Chapter 6 presents special classes of invariants, which deal with modular invariant theory and its particular problems and features. Chapter 7 collects results for special classes of invariants and coinvariants such as (pseudo) reflection groups and representations of low degree. If the ground field is finite, additional problems appear and are compensated for in part by the emergence of new tools. One of these is the Steenrod algebra, which the authors introduce in Chapter 8 to solve the inverse invariant theory problem, around which the authors have organized the last three chapters. The book contains numerous examples to illustrate the theory, often of more than passing interest, and an appendix on commutative graded algebra, which provides some of the required basic background. There is an extensive reference list to provide the reader with orientation to the vast literature.
Invariants for Actions of Finite Groups on Rings
Author | : Foster Christopher Zalar |
Publisher | : |
Total Pages | : 0 |
Release | : 2023 |
Genre | : Group theory |
ISBN | : |
If a group Î3 acts on a ring R then the ring of invariants RÎ3 is the set of all elements in R that are not changed by the action of Î3. In this paper we recall a few general results from invariant theory and give explicit examples of computations that can be done. More precisely, we compute the ring of invariants and the Hilbert series for the action of cyclic group Cn and the dihedral group Dn on C[X1, X2]. We also investigate the action of S4 on C[Xij1 9́Þ i
Reflection Groups and Invariant Theory
Author | : Kane |
Publisher | : Wiley-Interscience |
Total Pages | : 400 |
Release | : 2003-01-01 |
Genre | : |
ISBN | : 9780471298168 |
Homological Properties of Invariant Rings of Finite Groups
Author | : Fawad Hussain |
Publisher | : |
Total Pages | : 139 |
Release | : 2011 |
Genre | : Algebra |
ISBN | : |
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 second case 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. We generalize 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.