The goal of this dissertation is to introduce the notion of G-Frobenius manifolds for any finite group G. This work is motivated by the fact that any G-Frobenius algebra yields an ordinary Frobenius algebra by taking its G-invariants. We generalize this on the level of Frobenius manifolds. To define a G-Frobenius manifold as a braided-commutative generalization of the ordinary commutative Frobenius manifold, we develop the theory of G-braided spaces. These are defined as G-graded G-modules with certain braided-commutative rings of functions , generalizing the commutative rings of power series on ordinary vector spaces. As the genus zero part of any ordinary cohomological field theory of Kontsevich-Manin contains a Frobenius manifold, we sh...
. We construct a dGBV algebra from Dolbeault complex of any closed hyperkahler manifold. A Frobenius...
The moduli space of Frobenius manifolds carries a natural involutive symmetry, and a distinguished c...
Monoidal categories have proven to be especially useful in the analysis of both algebraic structures...
The goal of this dissertation is to introduce the notion of G-Frobenius manifolds for any finite gro...
This thesis concerns the relationship between G-Frobenius algebras (G-FAs) and Dω( k[G]), the twiste...
To Yu. I. Manin on the occasion of his 65th birthday The concept of a Frobenius manifold was introdu...
This dissertation explores the interplay between the Frobenius morphism and the geometry of algebrai...
Here we describe the Frobenius Manifold as a geometric reformulation of the solution space to the WD...
Orbit spaces of the reflection representation of finite irreducible Coxeter groups provide polynomia...
We extend the analytic theory of Frobenius manifolds to semisimple points with coalescing eigenvalue...
We construct an isomorphism of graded Frobenius algebras between the orbifold Chow ring of weighted ...
The orbits space of an irreducible linear representation of a finite group is a variety whose coordi...
Hurwitz spaces parameterizing covers of the Riemann sphere can be equipped with a Frobenius structur...
Thesis (Ph.D.)--University of Washington, 2020This thesis is dedicated to applications of symmetric ...
In this thesis, we study the integrability problem for G-structures. Broadly speaking, this is the p...
. We construct a dGBV algebra from Dolbeault complex of any closed hyperkahler manifold. A Frobenius...
The moduli space of Frobenius manifolds carries a natural involutive symmetry, and a distinguished c...
Monoidal categories have proven to be especially useful in the analysis of both algebraic structures...
The goal of this dissertation is to introduce the notion of G-Frobenius manifolds for any finite gro...
This thesis concerns the relationship between G-Frobenius algebras (G-FAs) and Dω( k[G]), the twiste...
To Yu. I. Manin on the occasion of his 65th birthday The concept of a Frobenius manifold was introdu...
This dissertation explores the interplay between the Frobenius morphism and the geometry of algebrai...
Here we describe the Frobenius Manifold as a geometric reformulation of the solution space to the WD...
Orbit spaces of the reflection representation of finite irreducible Coxeter groups provide polynomia...
We extend the analytic theory of Frobenius manifolds to semisimple points with coalescing eigenvalue...
We construct an isomorphism of graded Frobenius algebras between the orbifold Chow ring of weighted ...
The orbits space of an irreducible linear representation of a finite group is a variety whose coordi...
Hurwitz spaces parameterizing covers of the Riemann sphere can be equipped with a Frobenius structur...
Thesis (Ph.D.)--University of Washington, 2020This thesis is dedicated to applications of symmetric ...
In this thesis, we study the integrability problem for G-structures. Broadly speaking, this is the p...
. We construct a dGBV algebra from Dolbeault complex of any closed hyperkahler manifold. A Frobenius...
The moduli space of Frobenius manifolds carries a natural involutive symmetry, and a distinguished c...
Monoidal categories have proven to be especially useful in the analysis of both algebraic structures...