Your search keyword '"Knibbeler, Vincent"' showing total 15 results

1. A classification of automorphic Lie algebras on complex tori

Author

Knibbeler, Vincent, Lombardo, Sara, and Oelen, Casper

Subjects

Mathematics - Rings and Algebras, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

We classify the automorphic Lie algebras of equivariant maps from a complex torus to $\mathfrak{sl}_2(\mathbb{C})$. For each case we compute a basis in a normal form. The automorphic Lie algebras correspond precisely to two disjoint families of Lie algebras parametrised by the modular curve of $\mathrm{PSL}_2(\mathbb{Z})$, apart from four cases, which are all isomorphic to Onsager's algebra., Comment: 36 pages. To appear in the Proceedings of the Edinburgh Mathematical Society

Published

2024

2. Computing equivariant matrices on homogeneous spaces for Geometric Deep Learning and Automorphic Lie Algebras

Author

Knibbeler, Vincent

Subjects

Mathematics - Representation Theory, Computer Science - Artificial Intelligence, 53Z50 (Primary) 68T07, 16Z05, 43A85 (Secondary)

Abstract

We develop an elementary method to compute spaces of equivariant maps from a homogeneous space $G/H$ of a Lie group $G$ to a module of this group. The Lie group is not required to be compact. More generally, we study spaces of invariant sections in homogeneous vector bundles, and take a special interest in the case where the fibres are algebras. These latter cases have a natural global algebra structure. We classify these automorphic algebras for the case where the homogeneous space has compact stabilisers. This work has applications in the theoretical development of geometric deep learning and also in the theory of automorphic Lie algebras., Comment: In this second version, the title is modified and two appendices are added, following the peer-review process

Published

2023

3. Polyhedral Groups in $G_2(\mathbb{C})$

Author

Knibbeler, Vincent, Lombardo, Sara, and Oelen, Casper

Subjects

Mathematics - Representation Theory, Mathematics - Group Theory, 20C15 (Primary) 20G41, 20B05 (Secondary)

Abstract

We classify embeddings of the finite groups $A_4$, $S_4$ and $A_5$ in the Lie group $G_2(\mathbb{C})$ up to conjugation., Comment: 6 pages. To appear in the Glasgow Mathematical Journal

Published

2022

4. Wild Local Structures of Automorphic Lie Algebras

Author

Duffield, Drew, Knibbeler, Vincent, and Lombardo, Sara

Subjects

Mathematics - Representation Theory

Abstract

We study automorphic Lie algebras using a family of evaluation maps parametrised by the representations of the associative algebra of functions. This provides a descending chain of ideals for the automorphic Lie algebra which is used to prove that it is of wild representation type. We show that the associated quotients of the automorphic Lie algebra are isomorphic to twisted truncated polynomial current algebras. When a simple Lie algebra is used in the construction, this allows us to describe the local Lie structure of the automorphic Lie algebra in terms of affine Kac-Moody algebras., Comment: 27 pages

Published

2020

5. Automorphic Lie Algebras and Cohomology of Root Systems

Author

Knibbeler, Vincent, Lombardo, Sara, and Sanders, Jan A.

Subjects

Mathematics - Rings and Algebras, Mathematical Physics, 17B05, 17B22, 17B65

Abstract

A cohomology theory of root systems emerges naturally in the context of Automorphic Lie Algebras, where it helps formulating some structure theory questions. In particular, one can find concrete models for an Automorphic Lie Algebra by integrating cocycles. In this paper we define this cohomology and show its connection with the theory of Automorphic Lie Algebras. Furthermore, we discuss its properties: we define the cup product, we show that it can be restricted to symmetric forms, that it is equivariant with respect to the automorphism group of the root system, and finally we show acyclicity at dimension two of the symmetric part, which is exactly what is needed to find concrete models for Automorphic Lie Algebras. Furthermore, we show how the cohomology of root systems finds application beyond the theory of Automorphic Lie Algebras by applying it to the theory of contractions and filtrations of Lie algebras. In particular, we show that contractions associated to Cartan $\mathbb{Z}$-filtrations of simple Lie algebras are classified by $2$-cocycles, due again to the vanishing of the symmetric part of the second cohomology group., Comment: 26 pages, standard LaTeX2e

Published

2015

6. Hereditary Automorphic Lie Algebras

Author

Knibbeler, Vincent, Lombardo, Sara, and Sanders, Jan A.

Subjects

Mathematical Physics, Mathematics - Commutative Algebra, Mathematics - Group Theory, Mathematics - Representation Theory, 13A50, 17B05, 17B65, 17B80

Abstract

We show that Automorphic Lie Algebras which contain a Cartan subalgebra with a constant spectrum, called hereditary, are completely described by 2-cocycles on a classical root system taking only two different values. This observation suggests a novel approach to their classification. By determining the values of the cocycles on opposite roots, we obtain the Killing form and the abelianisation of the Automorphic Lie Algebra. The results are obtained by studying equivariant vectors on the projective line. As a byproduct, we describe a method to reduce the computation of the infinite dimensional space of said equivariant vectors to a finite dimensional linear computation and the determination of the ring of automorphic functions on the projective line., Comment: 29 pages

Published

2015

7. Higher dimensional Automorphic Lie Algebras

Author

Knibbeler, Vincent, Lombardo, Sara, and Sanders, Jan A.

Subjects

Mathematical Physics, Mathematics - Rings and Algebras, Nonlinear Sciences - Exactly Solvable and Integrable Systems

Abstract

The paper presents the complete classification of Automorphic Lie Algebras based on $\mathfrak{sl}_n (\mathbb{C})$, where the symmetry group $G$ is finite and the orbit is any of the exceptional $G$-orbits in $\overline{\mathbb{C}}$. A key feature of the classification is the study of the algebras in the context of classical invariant theory. This provides on one hand a powerful tool from the computational point of view, on the other it opens new questions from an algebraic perspective, which suggest further applications of these algebras, beyond the context of integrable systems. In particular, the research shows that Automorphic Lie Algebras associated to the $\mathbb{T}\mathbb{O}\mathbb{Y}$ groups (tetrahedral, octahedral and icosahedral groups) depend on the group through the automorphic functions only, thus they are group independent as Lie algebras. This can be established by defining a Chevalley normal form for these algebras, generalising this classical notion to the case of Lie algebras over a polynomial ring., Comment: 43 pages, standard LaTeX2e

Published

2015

8. Invariants of Automorphic Lie Algebras

Author

Knibbeler, Vincent

Subjects

Mathematical Physics, Mathematics - Representation Theory, Nonlinear Sciences - Exactly Solvable and Integrable Systems, 17B65, 17B05 (Primary), 17B80 (Secondary)

Abstract

Automorphic Lie Algebras arise in the context of reduction groups introduced in the late 1970s in the field of integrable systems. They are subalgebras of Lie algebras over a ring of rational functions, defined by invariance under the action of a finite group, the reduction group. Since their introduction in 2005 a classification is pursued. Past work shows remarkable uniformity between the Lie algebras associated to different reduction groups. That is, many Automorphic Lie Algebras with nonisomorphic reduction groups are isomorphic. In this thesis we set out to find the origin of these observations by searching for properties that are independent of the reduction group, called invariants of Automorphic Lie Algebras. Several invariants are obtained and used to set up a structure theory for Automorphic Lie Algebras. This naturally leads to a cohomology theory for root systems. A first exploration of this structure theory narrows down the search for Automorphic Lie Algebras significantly. Various particular cases are fully determined by their invariants, including most of the previously studied Automorphic Lie Algebras, thereby providing an explanation for their uniformity. In addition, the structure theory advances the classification project. For example, it clarifies the effect of a change in pole orbit resulting in various new Cartan-Weyl normal form generators for Automorphic Lie Algebras. From a more general perspective, the success of the structure theory and root cohomology in absence of a field promises interesting theoretical developments for Lie algebras over a graded ring., Comment: 156 pages, PhD thesis, University of Northumbria at Newcastle, 2014

Published

2015

9. Computing equivariant matrices on homogeneous spaces for geometric deep learning and automorphic Lie algebras

Author

Knibbeler, Vincent, primary

Published

2024

10. Automorphic Lie Algebras with dihedral symmetry

Author

Knibbeler, Vincent, Lombardo, Sara, and Sanders, Jan A

Subjects

Nonlinear Sciences - Exactly Solvable and Integrable Systems, Mathematical Physics, Mathematics - Rings and Algebras

Abstract

The concept of Automorphic Lie Algebras arises in the context of reduction groups introduced in the early 1980s in the field of integrable systems. Automorphic Lie Algebras are obtained by imposing a discrete group symmetry on a current algebra of Krichever-Novikov type. Past work shows remarkable uniformity between algebras associated to different reduction groups. For example, if the base Lie algebra is $\mathfrak{sl}_2(\mathbb{C})$ and the poles of the Automorphic Lie Algebra are restricted to an exceptional orbit of the symmetry group, changing the reduction group does not affect the Lie algebra structure. In the present research we fix the reduction group to be the dihedral group and vary the orbit of poles as well as the group action on the base Lie algebra. We find a uniform description of Automorphic Lie Algebras with dihedral symmetry, valid for poles at exceptional and generic orbits., Comment: 20 pages, 5 tables, standard LaTeX2e

Published

2014

11. The laminations of a crystal near an anti-continuum limit

Author

Knibbeler, Vincent, Mramor, Blaz, and Rink, Bob

Subjects

Mathematics - Dynamical Systems, Mathematical Physics

Abstract

The anti-continuum limit of a monotone variational recurrence relation consists of a lattice of uncoupled particles in a periodic background. This limit supports many trivial equilibrium states that persist as solutions of the model with small coupling. We investigate when a persisting solution generates a so-called lamination and prove that near the anti-continuum limit the collection of laminations of solutions is homeomorphic to the (N-1)-dimensional simplex, with N the number of distinct local minima of the background potential. This generalizes a result by Baesens and MacKay on twist maps near an anti-integrable limit.

Published

2013

12. An elementary method to compute equivariant convolutional kernels on homogeneous spaces for geometric deep learning

Author

Knibbeler, Vincent

Subjects

FOS: Computer and information sciences, Artificial Intelligence (cs.AI), Computer Science - Artificial Intelligence, 53Z50 (Primary) 68T07, 16Z05, 43A85 (Secondary), FOS: Mathematics, Representation Theory (math.RT), Mathematics - Representation Theory

Abstract

We develop an elementary method to compute spaces of equivariant maps from a homogeneous space of a Lie group to a module of this group. The Lie group is not required to be compact. More generally we study spaces of invariant sections in homogeneous vector bundles, and take a special interest in the case where the fibres are algebras. This latter case has a natural global algebra structure. We classify the resulting automorphic algebras for the case where the homogeneous space has compact stabilisers. This work has applications in the theoretical development of geometric deep learning and also in the theory of automorphic Lie algebras., Comment: 15 pages

Published

2023

13. Higher-Dimensional Automorphic Lie Algebras

Author

Knibbeler, Vincent, primary, Lombardo, Sara, additional, and Sanders, Jan A., additional

Published

2016

14. Higher-Dimensional Automorphic Lie Algebras.

Author

Knibbeler, Vincent, Lombardo, Sara, and Sanders, Jan

Subjects

AUTOMORPHIC forms, LIE algebras, INVARIANT sets, CHEVALLEY groups, POLYNOMIAL rings

Abstract

The paper presents the complete classification of Automorphic Lie Algebras based on $${{\mathfrak {sl}}}_{n}(\mathbb {C})$$ , where the symmetry group G is finite and acts on $${{\mathfrak {sl}}}_n(\mathbb {C})$$ by inner automorphisms, $${{\mathfrak {sl}}}_n(\mathbb {C})$$ has no trivial summands, and where the poles are in any of the exceptional G-orbits in $$\overline{\mathbb {C}}$$ . A key feature of the classification is the study of the algebras in the context of classical invariant theory. This provides on the one hand a powerful tool from the computational point of view; on the other, it opens new questions from an algebraic perspective (e.g. structure theory), which suggest further applications of these algebras, beyond the context of integrable systems. In particular, the research shows that this class of Automorphic Lie Algebras associated with the $$\mathbb {T}\mathbb {O}\mathbb {Y}$$ groups (tetrahedral, octahedral and icosahedral groups) depend on the group through the automorphic functions only; thus, they are group independent as Lie algebras. This can be established by defining a Chevalley normal form for these algebras, generalising this classical notion to the case of Lie algebras over a polynomial ring. [ABSTRACT FROM AUTHOR]

Published

2017

15. Invariants of automorphic lie algebras

Author

Knibbeler, Vincent, Lombardo, Sara, and Sanders, Jan A.

Subjects

G100

Abstract

Automorphic Lie Algebras arise in the context of reduction groups introduced in the late 1970s [35] in the field of integrable systems. They are subalgebras of Lie algebras over a ring of rational functions, denied by invariance under the action of a finite group, the reduction group. Since their introduction in 2005 [29, 31], mathematicians aimed to classify Automorphic Lie Algebras. Past work shows remarkable uniformity between the Lie algebras associated to different reduction groups. That is, many Automorphic Lie Algebras with nonisomorphic reduction groups are isomorphic [4, 30]. In this thesis we set out to find the origin of these observations by searching for properties that are independent of the reduction group, called invariants of Automorphic Lie Algebras.\ud \ud The uniformity of Automorphic Lie Algebras with nonisomorphic reduction groups starts at the Riemann sphere containing the spectral parameter, restricting the finite groups to the polyhedral groups. Through the use of classical invariant theory and the properties of this class of groups it is shown that Automorphic Lie Algebras are freely generated modules over the polynomial ring in one variable. Moreover, the number of generators equals the dimension of the base Lie algebra, yielding an invariant. This allows the definition of the determinant of invariant vectors which will turn out to be another invariant. A surprisingly simple formula is given expressing this determinant as a monomial in ground forms.\ud \ud All invariants are used to set up a structure theory for Automorphic Lie Algebras. This naturally leads to a cohomology theory for root systems. A first exploration of this structure theory narrows down the search for Automorphic Lie Algebras signicantly. Various particular cases are fully determined by their invariants, including most of the previously studied Automorphic Lie Algebras, thereby providing an explanation for their uniformity.In addition, the structure theory advances the classification project. For example, it clarifies the effect of a change in pole orbit resulting in various new Cartan-Weyl normal form generators for Automorphic Lie Algebras. From a more general perspective, the success of the structure theory and root system cohomology in absence of a field promises interesting theoretical developments for Lie algebras over a graded ring.