AbstractThis is an invitation to invariant theory of finite groups; a field where methods and results from a wide range of mathematics merge to form a new exciting blend. We use the particular problem of finding degree bounds to illustrate this
Let G be a linear algebraic group over a eld K of characteristic 0. An integer m is called a globa...
J. Kung and G.-C. Rota, in their 1984 paper, write: "Like the Arabian phoenix rising out of its ashe...
Automated invariant generation is a fundamental challenge in program analysis and verification, goin...
AbstractThis is an invitation to invariant theory of finite groups; a field where methods and result...
Cataloged from PDF version of article.Vector invariants of finite groups (see the introduction for d...
Computational invariant theory considers two problems in the representations of algebraic groups: co...
The Hilbert series and degree bounds play significant roles in computational invariant theory. In th...
This volume of expository papers is the outgrowth of a conference in combinatorics and invariant the...
Cataloged from PDF version of article.For a finite group G acting faithfully on a finite-dimensional...
Let V,W be representations of a cyclic group G of prime order p over a field k of characteristic p. ...
The main problem addressed in this dissertation is the problem of giving strong upper bounds on the ...
This book is about the computational aspects of invariant theory. Of central interest is the questio...
The history of invariant theory spans nearly a century and a half, with roots in certain problems fr...
AbstractWe consider linear representations of a finite group G on a finite dimensional vector space ...
peer reviewedWe announce the creation of a database of invariant rings. This database contains a lar...
Let G be a linear algebraic group over a eld K of characteristic 0. An integer m is called a globa...
J. Kung and G.-C. Rota, in their 1984 paper, write: "Like the Arabian phoenix rising out of its ashe...
Automated invariant generation is a fundamental challenge in program analysis and verification, goin...
AbstractThis is an invitation to invariant theory of finite groups; a field where methods and result...
Cataloged from PDF version of article.Vector invariants of finite groups (see the introduction for d...
Computational invariant theory considers two problems in the representations of algebraic groups: co...
The Hilbert series and degree bounds play significant roles in computational invariant theory. In th...
This volume of expository papers is the outgrowth of a conference in combinatorics and invariant the...
Cataloged from PDF version of article.For a finite group G acting faithfully on a finite-dimensional...
Let V,W be representations of a cyclic group G of prime order p over a field k of characteristic p. ...
The main problem addressed in this dissertation is the problem of giving strong upper bounds on the ...
This book is about the computational aspects of invariant theory. Of central interest is the questio...
The history of invariant theory spans nearly a century and a half, with roots in certain problems fr...
AbstractWe consider linear representations of a finite group G on a finite dimensional vector space ...
peer reviewedWe announce the creation of a database of invariant rings. This database contains a lar...
Let G be a linear algebraic group over a eld K of characteristic 0. An integer m is called a globa...
J. Kung and G.-C. Rota, in their 1984 paper, write: "Like the Arabian phoenix rising out of its ashe...
Automated invariant generation is a fundamental challenge in program analysis and verification, goin...