Computational invariant theory considers two problems in the representations of algebraic groups: computing generators for rings of polynomial invariant functions, and determining whether two points lie in the same orbit. This thesis examines the complexity of these tasks. On the one hand, to count generating invariants for a semisimple group, choose an representation of highest weight w, and consider the irreducible representations of highest weight nw. As n goes to infinity, the cardinality of a minimal generating set grows faster than any polynomial in n. On the other hand, one can separate the orbits of any algebraic group action in polynomial time using "constructible" functions defined by straight line programs in the polynomial r...
This dissertation consists of two topics concerning algebraic and semi-algebraic invariants on quadr...
The invariant polynomials of discrete systems such as graphs, matroids, hyperplane arrangements, and...
We consider the classical problem of invariant generation for programs with polynomial assignments a...
Computational invariant theory considers two problems in the representations of algebraic groups: co...
The main problem addressed in this dissertation is the problem of giving strong upper bounds on the ...
An action of a group on a vector space partitions the latter into a set of orbits. We consider three...
One of the main goals of theoretical computer science is to prove limits on how efficiently certain ...
AbstractA polynomial invariant under the action of a finite group can be rewritten using generators ...
This book is about the computational aspects of invariant theory. Of central interest is the questio...
AbstractWe expound new approaches to the analysis of algebraic complexity based on synthetic and alg...
AbstractThis is an invitation to invariant theory of finite groups; a field where methods and result...
We consider the problem of computing succinct encodings of lists of generators for invariant rings f...
AbstractIn a representation of a linear algebraic group G, polynomial invariant functions almost alw...
The history of invariant theory spans nearly a century and a half, with roots in certain problems fr...
The subject matter for this series of lectures is algebraic geometry invariant theory and computatio...
This dissertation consists of two topics concerning algebraic and semi-algebraic invariants on quadr...
The invariant polynomials of discrete systems such as graphs, matroids, hyperplane arrangements, and...
We consider the classical problem of invariant generation for programs with polynomial assignments a...
Computational invariant theory considers two problems in the representations of algebraic groups: co...
The main problem addressed in this dissertation is the problem of giving strong upper bounds on the ...
An action of a group on a vector space partitions the latter into a set of orbits. We consider three...
One of the main goals of theoretical computer science is to prove limits on how efficiently certain ...
AbstractA polynomial invariant under the action of a finite group can be rewritten using generators ...
This book is about the computational aspects of invariant theory. Of central interest is the questio...
AbstractWe expound new approaches to the analysis of algebraic complexity based on synthetic and alg...
AbstractThis is an invitation to invariant theory of finite groups; a field where methods and result...
We consider the problem of computing succinct encodings of lists of generators for invariant rings f...
AbstractIn a representation of a linear algebraic group G, polynomial invariant functions almost alw...
The history of invariant theory spans nearly a century and a half, with roots in certain problems fr...
The subject matter for this series of lectures is algebraic geometry invariant theory and computatio...
This dissertation consists of two topics concerning algebraic and semi-algebraic invariants on quadr...
The invariant polynomials of discrete systems such as graphs, matroids, hyperplane arrangements, and...
We consider the classical problem of invariant generation for programs with polynomial assignments a...