Add to ORKGMany problems in equivariant bifurcation theory involve the computation of invariant functions and equivariant mappings for the action of a torus group. We discuss general methods for finding these based on some elementary considerations related to toric geometry, a powerful technique in algebraic geometry. This approach leads to interesting combinatorial questions about cones in lattices, which lead to explicit calculations of minimal generating sets of invariants, from which the equivariants are easily deduced. We also describe the computation of Hilbert series for torus invariants and equivariants within the same combinatorial framework. As an example, we apply these methods to the interaction of two linear modes of a Euclidean-invariant...
We treat equivariant completions of toric contraction morphisms as an application of the toric Mori ...
A family of polynomial differential systems describing the behavior of a chemical reaction network w...
AbstractToric dynamical systems are known as complex balancing mass action systems in the mathematic...
This paper is about algorithmic invariant theory as it is required within equivariant dynamical syst...
AbstractThis paper is about algorithmic invariant theory as it is required within equivariant dynami...
Here, the study of torus actions on topological spaces is presented as a bridge connecting combinato...
Our primary aim is to develop a theory of equivariant genera for stably complex manifolds equipped...
This book presents a new degree theory for maps which commute with a group of symmetries. This degre...
In symmetric bifurcation theory it is often necessary to describe the restrictions of equivariant ma...
AbstractIn symmetric bifurcation theory it is often necessary to describe the restrictions of equiva...
This book starts with an overview of the research of Gröbner bases which have many applications in v...
Let $S$ be the affine plane regarded as a toric variety with an action of the 2-dimensional torus $T...
Invariant tori of dynamical systems occur both in the dissipative and in the conservative context. ...
(Under the direction of William A. Graham) We give explicit formulas for torus-equivariant fundament...
A family of polynomial differential systems describing the behavior of a chemical reaction network w...
We treat equivariant completions of toric contraction morphisms as an application of the toric Mori ...
A family of polynomial differential systems describing the behavior of a chemical reaction network w...
AbstractToric dynamical systems are known as complex balancing mass action systems in the mathematic...
This paper is about algorithmic invariant theory as it is required within equivariant dynamical syst...
AbstractThis paper is about algorithmic invariant theory as it is required within equivariant dynami...
Here, the study of torus actions on topological spaces is presented as a bridge connecting combinato...
Our primary aim is to develop a theory of equivariant genera for stably complex manifolds equipped...
This book presents a new degree theory for maps which commute with a group of symmetries. This degre...
In symmetric bifurcation theory it is often necessary to describe the restrictions of equivariant ma...
AbstractIn symmetric bifurcation theory it is often necessary to describe the restrictions of equiva...
This book starts with an overview of the research of Gröbner bases which have many applications in v...
Let $S$ be the affine plane regarded as a toric variety with an action of the 2-dimensional torus $T...
Invariant tori of dynamical systems occur both in the dissipative and in the conservative context. ...
(Under the direction of William A. Graham) We give explicit formulas for torus-equivariant fundament...
A family of polynomial differential systems describing the behavior of a chemical reaction network w...
We treat equivariant completions of toric contraction morphisms as an application of the toric Mori ...
A family of polynomial differential systems describing the behavior of a chemical reaction network w...
AbstractToric dynamical systems are known as complex balancing mass action systems in the mathematic...