Your search keyword '"17B25"' showing total 112 results

1. On intermediate exceptional series.

Author

Lee, Kimyeong, Sun, Kaiwen, and Wang, Haowu

Abstract

The Freudenthal–Tits magic square m (A 1 , A 2) for A = R , C , H , O of semi-simple Lie algebras can be extended by including the sextonions S . A series of non-reductive Lie algebras naturally appear in the new row associated with the sextonions, which we will call the intermediate exceptional series, with the largest one as the intermediate Lie algebra E 7 + 1 / 2 constructed by Landsberg–Manivel. We study various aspects of the intermediate vertex operator (super)algebras associated with the intermediate exceptional series, including rationality, coset constructions, irreducible modules, (super)characters and modular linear differential equations. For all g I belonging to the intermediate exceptional series, the intermediate VOA L 1 (g I) has characters of irreducible modules coinciding with those of the simple rational C 2 -cofinite W-algebra W - h ∨ / 6 (g , f θ) studied by Kawasetsu, with g belonging to the Cvitanović–Deligne exceptional series. We propose some new intermediate VOA L k (g I) with integer level k and investigate their properties. For example, for the intermediate Lie algebra D 6 + 1 / 2 between D 6 and E 7 in the subexceptional series and also in Vogel’s projective plane, we find that the intermediate VOA L 2 (D 6 + 1 / 2) has a simple current extension to a SVOA with four irreducible Neveu–Schwarz modules, and the supercharacters can be realized by a fermionic Hecke operator on the N = 1 Virasoro minimal model L (c 16 , 2 , 0) . We also provide some (super) coset constructions such as L 2 (E 7) / L 2 (D 6 + 1 / 2) and L 1 (D 6 + 1 / 2) ⊗ 2 / L 2 (D 6 + 1 / 2) . In the end, we find that the theta blocks associated with the intermediate exceptional series produce some new holomorphic Jacobi forms of critical weight and lattice index. [ABSTRACT FROM AUTHOR]

Published

2024

2. The compact exceptional Lie algebra $\mathfrak g^c_2$ as a twisted ring group

Author

Fontanals, Cristina Draper

Subjects

Mathematics - Rings and Algebras, Mathematical Physics, 17B25

Abstract

A new highly symmetrical model of the compact Lie algebra $\mathfrak{g}^c_2$ is provided as a twisted ring group for the group $\mathbb{Z}_2^3$ and the ring $\mathbb{R}\oplus\mathbb{R}$. The model is self-contained and can be used without previous knowledge on roots, derivations on octonions or cross products. In particular, it provides an orthogonal basis with integer structure constants, consisting entirely of semisimple elements, which is a generalization of the Pauli matrices in $\mathfrak{su}(2)$ and of the Gell-Mann matrices in $\mathfrak{su}(3)$. As a bonus, the split Lie algebra $\mathfrak{g}^*_2$ is also seen as a twisted ring group., Comment: 10 pages

Published

2023

3. On intermediate Lie algebra E7+1/2.

Author

Lee, Kimyeong, Sun, Kaiwen, and Wang, Haowu

Abstract

E 7 + 1 / 2 is an intermediate Lie algebra filling a hole between E 7 and E 8 in the Deligne–Cvitanović exceptional series. It was found independently by Mathur, Muhki, Sen in the classification of 2d RCFTs via modular linear differential equations (MLDE) and by Deligne, Cohen, de Man in representation theory. In this paper we propose some new vertex operator algebras (VOA) associated with E 7 + 1 / 2 and give some useful information at small levels. We conjecture that the affine VOA (E 7 + 1 / 2) k is rational if and only if the level k is at most 5, and provide some evidence from the viewpoint of MLDE. We propose a conjectural Weyl dimension formula for infinitely many irreducible representations of E 7 + 1 / 2 , which generates almost all irreducible representations of E 7 + 1 / 2 with level k ≤ 4 . More concretely, we propose the affine VOA E 7 + 1 / 2 at level 2 and the rank-two instanton VOA associated with E 7 + 1 / 2 . We compute the VOA characters and provide some coset constructions. These generalize the previous works of Kawasetsu for affine VOA E 7 + 1 / 2 at level 1 and of Arakawa–Kawasetsu at level - 5 . We then predict the conformal weights of affine VOA E 7 + 1 / 2 at level 3, 4, 5. [ABSTRACT FROM AUTHOR]

Published

2024

4. The Sub-Riemannian Geometry of Screw Motions with Constant Pitch.

Author

Hulett, Eduardo, Moas, Ruth Paola, and Salvai, Marcos

Abstract

We consider a family of Riemannian manifolds M such that for each unit speed geodesic γ of M there exists a distinguished bijective correspondence L between infinitesimal translations along γ and infinitesimal rotations around it. The simplest examples are R 3 , S 3 and hyperbolic 3-space, with L defined in terms of the cross product. More generally, M is a connected compact semisimple Lie group, or its non-compact dual, or Euclidean space acted on transitively by some group which is contained properly in the full group of rigid motions. Let G be the identity component of the isometry group of M. A curve in G may be thought of as a motion of a body in M. Given λ ∈ R , we define a left invariant distribution on G accounting for infinitesimal roto-translations of M of pitch λ . We give conditions for the controllability of the associated control system on G and find explicitly all the geodesics of the natural sub-Riemannian structure. We also study a similar system on R 7 ⋊ S O 7 involving the octonionic cross product. In an appendix we give a friendly presentation of the non-compact dual of a compact classical group, as a set of “small rotations”. [ABSTRACT FROM AUTHOR]

Published

2023

5. Lie algebra and Dynkin index.

Author

Luan, Yongzhi

Subjects

*LIE groups, *DYNKIN diagrams, *COMPUTER systems, *ALGEBRA

Abstract

The Lie algebra e 7 1 2 comes from P. Deligne's work on the exceptional series of Lie groups. Using the triality algebra, J. Landsberg and L. Manivel construct this Lie algebra in 2006. In this paper, we study the structure of e 7 1 2 following B. Gross and N. Wallach's work on the highest root and Heisenberg parabolic subalgebra. The process of removing the lowest root from the extended Dynkin diagram of E 8 will contribute to the components of e 7 1 2 . We also study the branching rule of e 7 1 2 to s l (3 , C) and g 2 . We use the computer algebra system SageMath to carry out the branching rule calculations. Then we calculate the Dynkin indices for e 7 1 2 . We find that the number 24 behaves like the 'dual Coxeter number' of e 7 1 2 . [ABSTRACT FROM AUTHOR]

Published

2023

6. Codes, S-structures, and exceptional Lie algebras

Author

Cunha, Isabel and Elduque, Alberto

Subjects

Mathematics - Rings and Algebras, 17B25

Abstract

The exceptional simple Lie algebras of types E7 and E8 are endowed with optimal $SL_2^n$-structures, and are thus described in terms of the corresponding coordinate algebras. These are nonassociative algebras which much resemble the so called code algebras., Comment: 13 pages. Some misprints corrected and extra comments added

Published

2018

7. On Dynkin Gradings in Simple Lie Algebras

Author

Elashvili, Alexander, Jibladze, Mamuka, Kac, Victor, Chambert-Loir, Antoine, Series Editor, Lu, Jiang-Hua, Series Editor, Ruzhansky, Michael, Series Editor, Tschinkel, Yuri, Series Editor, Gorelik, Maria, editor, Hinich, Vladimir, editor, and Melnikov, Anna, editor

Published

2019

8. A binary encoding of spinors and applications

Author

Arizmendi Gerardo and Herrera Rafael

Subjects

spin representation, clifford algebras, spinor representation, octonions, triality, 15a66, 15a69, 53c27, 17b10, 17b25, 20g41, Mathematics, QA1-939

Abstract

We present a binary code for spinors and Clifford multiplication using non-negative integers and their binary expressions, which can be easily implemented in computer programs for explicit calculations. As applications, we present explicit descriptions of the triality automorphism of Spin(8), explicit representations of the Lie algebras 𝔰𝔭𝔦𝔶 (8), 𝔰𝔭𝔦𝔶 (7) and 𝔤2, etc.

Published

2020

9. Integrable triples in semisimple Lie algebras.

Author

De Sole, Alberto, Jibladze, Mamuka, Kac, Victor G., and Valeri, Daniele

Abstract

We classify all integrable triples in simple Lie algebras, up to equivalence. The importance of this problem stems from the fact that for each such equivalence class one can construct the corresponding integrable hierarchy of bi-Hamiltonian PDE. The simplest integrable triple (f, 0, e) in sl 2 corresponds to the KdV hierarchy, and the triple (f , 0 , e θ) , where f is the sum of negative simple root vectors and e θ is the highest root vector of a simple Lie algebra, corresponds to the Drinfeld–Sokolov hierarchy. [ABSTRACT FROM AUTHOR]

Published

2021

10. Composition algebras and the two faces of $G_{2}$

Author

Boya, Luis J. and Campoamor-Stursberg, R.

Subjects

Mathematical Physics, 17B25

Abstract

We consider composition and division algebras over the real numbers: We note two r\^oles for the group $G_{2}$: as automorphism group of the octonions and as the isotropy group of a generic 3-form in 7 dimensions. We show why they are equivalent, by means of a regular metric. We express in some diagrams the relation between some pertinent groups, most of them related to the octonions. Some applications to physics are also discussed., Comment: 11 pages, 3 figures

Published

2009

11. Jordan gradings on exceptional simple Lie algebras

Author

Elduque, Alberto

Subjects

Mathematics - Rings and Algebras, 17B25

Abstract

Models of all the gradings on the exceptional simple Lie algebras induced by Jordan subgroups of their groups of automorphisms are provided., Comment: 10 pages

Published

2008

12. Gradings on symmetric composition algebras

Author

Elduque, Alberto

Subjects

Mathematics - Rings and Algebras, 17A75, 17B25

Abstract

The group gradings on the symmetric composition algebras over arbitrary fields are classified. Applications of this result to gradings on the exceptional simple Lie algebras are considered too., Comment: 37 pages

Published

2008

13. Cayley 4-form, comass, and triality isomorphisms

Author

Katz, Mikhail G. and Shnider, Steven

Subjects

Mathematics - Differential Geometry, Mathematics - Metric Geometry, Mathematics - Representation Theory, 53C23, 17B25

Abstract

Following an idea of Dadok, Harvey and Lawson, we apply the triality property of SO(8) to study the comass of certain self-dual 4-forms on R^8. In particular, we prove that the Cayley 4-form has comass 1 and that any self-dual 4-form realizing the maximal Wirtinger ratio is SO(8)-conjugate to the Cayley 4-form. We also use triality to prove that the stabilizer in SO(8) of the Cayley form is Spin(7). The results have applications in systolic geometry, calibrated geometry, and Spin(7) manifolds., Comment: 20 pages

Published

2008

14. Orthogonal involution on algebras of degree 16 and the Killing form of E8

Author

Garibaldi, Skip

Subjects

Mathematics - Rings and Algebras, 20G15, 11E88, 17B25

Abstract

We exploit various inclusions of algebraic groups to give a new construction of groups of type E8, determine the Killing forms of the resulting E8's, and define an invariant of central simple algebras of degree 16 with orthogonal involution "in I^3", equivalently, groups of type D8 with a half-spin representation defined over the base field. The determination of the Killing form is done by restricting the adjoint representation to various twisted forms of PGL2 and requires very little computation. An appendix by Kirill Zainoulline contains a type of "index reduction" result for groups of type D., Comment: Small revisions since v1

Published

2007

15. Vanishing of trace forms in low characteristics

Author

Garibaldi, Skip and Premet, Alexander

Subjects

Mathematics - Representation Theory, 20G05, 17B50, 17B25

Abstract

Every finite-dimensional representation of an algebraic group G gives a trace symmetric bilinear form on the Lie algebra of G. We give criteria in terms of root system data for the existence of a representation such that this form is nonzero or nondegenerate. As a corollary, we show that a Lie algebra of type E8 over a field of characteristic 5 does not have a so-called "quotient trace form", answering a question posed in the 1960s., Comment: Slightly revised since v3. Added short section 8 on Richardson's condition

Published

2007

16. The Structure of E6

Author

Wangberg, Aaron

Subjects

Mathematics - Rings and Algebras, Mathematical Physics, 17B25, 22E60

Abstract

We present the subalgebra structure of sl(3,O), a particular real form of E6 chosen for its relevance to particle physics through the connection between its associated Lie group SL(3,O) and generalized Lorentz groups. Given the complications related to the non-associativity of the octonions O and the restriction to working with a real form of E6, we find that the traditional methods used to study Lie algebras must be modified for our purposes. We use an explicit representation of the Lie group SL(3,O) to produce the multiplication table of the corresponding algebra sl(3,O). Both the multiplication table and the group are then utilized to find subalgebras of sl(3,O). In particular, we identify various subalgebras of the form sl(n, F) and su(n, F) within sl(3,O) and we also find algebras corresponding to generalized Lorentz groups. Methods based upon automorphisms of complex Lie algebras are developed to find less obvious subalgebras of sl(3,O). While we focus on the subalgebra structure of our real form of E6, these methods may also be used to study the subalgebra structure of any other real form of E6. A maximal set of simultaneously measurable observables in physics corresponds to a maximal set of Casimir operators in the Lie algebra. We not only identify six Casimir operators in E6, but produce a nested sequence of subalgebras and Casimir operators in E6 containing both su(3)+su(2)+u(1) corresponding to the Standard Model and the Lorentz group of special relativity., Comment: Ph. D. Dissertation. 204 pages, 37 figures; v2: fixed typos, restructured latex, added figures

Published

2007

17. S4-symmetry on the Tits construction of exceptional Lie algebras and superalgebras

Author

Elduque, Alberto and Okubo, Susumu

Subjects

Mathematics - Rings and Algebras, 17B25

Abstract

The classical Tits construction provides models of the exceptional simple Lie algebras in terms of a unital composition algebra and a degree three simple Jordan algebra. A couple of actions of the symmetric group of degree 4 on this construction are given. By means of these actions, the models provided by the Tits construction are related to models of the exceptional Lie algebras obtained from two different types of structurable algebras. Some models of exceptional Lie superalgebras are discussed too., Comment: 26 pages

Published

2006

18. The extended Freudenthal Magic Square and Jordan algebras

Author

Cunha, Isabel and Elduque, Alberto

Subjects

Mathematics - Rings and Algebras, 17B25

Abstract

The Lie superalgebras in the extended Freudenthal Magic Square in characteristic 3 are shown to be related to some known simple Lie superalgebras, specific to this characteristic, constructed in terms of orthogonal and symplectic triple systems, which are defined in terms of central simple degree three Jordan algebras., Comment: 23 pages

Published

2006

19. A class of continuous non-associative algebras arising from algebraic groups including $E_8$

Author

Maurice Chayet and Skip Garibaldi

Subjects

17B25, 17D99, 20G41, Mathematics, QA1-939

Abstract

We give a construction that takes a simple linear algebraic group G over a field and produces a commutative, unital, and simple non-associative algebra A over that field. Two attractions of this construction are that (1) when G has type $E_8$, the algebra A is obtained by adjoining a unit to the 3875-dimensional representation; and (2) it is effective, in that the product operation on A can be implemented on a computer. A description of the algebra in the $E_8$ case has been requested for some time, and interest has been increased by the recent proof that $E_8$ is the full automorphism group of that algebra. The algebras obtained by our construction have an unusual Peirce spectrum.

Published

2021

20. Low Degree Morphisms of E(5, 10)-Generalized Verma Modules.

Author

Cantarini, Nicoletta and Caselli, Fabrizio

Abstract

In this paper we face the study of the representations of the exceptional Lie superalgebra E(5,10). We recall the construction of generalized Verma modules and give a combinatorial description of the restriction to s l 5 of the Verma module induced by the trivial representation. We use this description to classify morphisms between Verma modules of degree one, two and three proving in these cases a conjecture given by Rudakov (8). A key tool is the notion of dual morphism between Verma modules. [ABSTRACT FROM AUTHOR]

Published

2020

21. The Lie algebra f4(Os) (split f4) with Mathematica

Author

Bjerregaard, Pablo Alberca and Gonzalez, Candido Martin

Subjects

Mathematics - Spectral Theory, 17B25, 17B40, 17C40, 68W30

Abstract

We present in this paper all the details for a complete description of the Lie algebra a in the split case at any characteristic. We finish with the determination of the expression of a generic element of this algebra. First of all is necessary to implement its quadratic Jordan structure (see the O. Loss' server http://mathematik.uibk.ac.at/jordan for our preprint). We write in this file only the computational details., Comment: Mathematica source file included

Published

2002

22. Kashiwara-Vergne-Rouviere methods for symmetric spaces

Author

Torossian, Charles

Subjects

Mathematics - Quantum Algebra, Mathematics - Representation Theory, 17B, 17B25, 22E, 53C35, 53D55

Abstract

This article follows our previous work on Campbell-Hausdorff formula. We study the case of symmetric spaces. We recover, by using a Kontsevich's deformation of the Baker-Campbell-Hausdorff formula, Rouviere's results on the convolution of invariant distributions, for solvable symmetric spaces and "very symmetric spaces"., Comment: 21 pages, 10 figures (erreurs typographiques corrigees + des rappels sur la quantification de M. Kontsevich)

Published

2002

23. The Irreducible Tensor Bases of Exceptional Lie Algebras 1. G2, F_4 and E_6

Author

Ruan, Dong, Sun, Hongzhou, and Han, QiZhi

Subjects

Mathematical Physics, Mathematics - Group Theory, 17B25, 17B10

Abstract

The irreducible tensor bases of exceptional Lie algebras G2, F4 and E6 are built by grouping their Cartan-Weyl bases according to the respective chains G2> SO(3) * SO(3), F4 > SO(3)*SO(3)*SO(3)*SO(3) and E6> SO(3)*SO(3)*SO(3)*SO(3). The explicit commutation relations of the irreducible tensor bases of these algebras are given also respectively., Comment: 19 Pages, LaTex

Published

2001

24. Affine connections on 3-Sasakian and manifolds.

Author

Draper, Cristina, Ortega, Miguel, and Palomo, Francisco J.

Abstract

The space of invariant affine connections on every 3-Sasakian homogeneous manifold of dimension at least seven is described. In particular, the subspace of invariant affine metric connections and the subclass with skew torsion are also determined. To this aim, an explicit construction of all 3-Sasakian homogeneous manifolds is exhibited. It is shown that the 3-Sasakian homogeneous manifolds which admit nontrivial Einstein with skew torsion invariant affine connections are those of dimension seven, that is, S 7 , R P 7 and the Aloff–Wallach space W 1 , 1 7 . On S 7 and R P 7 , the set of such connections is bijective to two copies of the conformal linear transformation group of the Euclidean space, while it is strictly bigger on W 1 , 1 7 . The set of invariant connections with skew torsion whose Ricci tensor satisfies that its eigenspaces are the canonical vertical and horizontal distributions, is fully described on 3-Sasakian homogeneous manifolds. An affine connection satisfying these conditions is distinguished, by parallelizing all the Reeb vector fields associated with the 3-Sasakian structure, which is also Einstein with skew torsion on the 7-dimensional examples. The invariant metric affine connections on 3-Sasakian homogeneous manifolds with parallel skew torsion have been found. Finally, some results have been adapted to the non-homogeneous setting. [ABSTRACT FROM AUTHOR]

Published

2020

25. Deformation Quantization on the Closure of Minimal Coadjoint Orbits

Author

Frønsdal, Christian

Subjects

Physics, Group Theory and Generalizations, Geometry, Statistical Physics, Mathematical and Computational Physics, 53D55, 13D03, 17B20, 17B25, 17B35

Abstract

We consider a complex simple Lie algebra $${\mathfrak{g}}$$ , with the action of its adjoint group. Among the three canonical nilpotent orbits under this action, the minimal orbit is the non zero orbit of smallest dimension. We are interested in equivariant deformation quantization: we construct $${\mathfrak{g}}$$ -invariant star-products on the minimal orbit and on its closure, a singular algebraic variety. We shall make use of Hochschild homology and cohomology, of some results about the invariants of the classical groups, and of some interesting representations of simple Lie algebras. To the minimal orbit is associated a unique, completely prime two-sided ideal of the universal enveloping algebra $${{\rm U}(\mathfrak{g})}$$ . This ideal is primitive and is called the Joseph ideal. We give explicit expressions for the generators of the Joseph ideal and compute the infinitesimal characters.

Published

2009

26. On Exceptional Vertex Operator (Super) Algebras

Author

Tuite, Michael P., Van, Hoang Dinh, Alladi, Krishnaswami, Series editor, Farkas, Hershel M., Series editor, Mason, Geoffrey, editor, Penkov, Ivan, editor, and Wolf, Joseph A., editor

Published

2014

27. Modular representations of exceptional supergroups.

Author

Cheng, Shun-Jen, Shu, Bin, and Wang, Weiqiang

Abstract

We classify the simple modules of the exceptional algebraic supergroups over an algebraically closed field of prime characteristic. [ABSTRACT FROM AUTHOR]

Published

2019

28. Filtrations in Semisimple Lie Algebras, III

Author

Passman, D. S., Van Huynh, Dinh, editor, and López-Permouth, Sergio R., editor

Published

2010

29. Irreducible Wakimoto-like Modules for the Lie Superalgebra D(2, 1;α).

Author

Cheng, Jin and Zeng, Zi Ting

Subjects

*LIE superalgebras, *MODULES (Algebra), *TENSOR algebra, *AUSDEHNUNGSLEHRE, *REPRESENTATIONS of algebras

Abstract

By using the idea of Wakimoto’s free field, we construct a class of representations for the Lie superalgebra D(2, 1; α) on the tensor product of a polynomial algebra and an exterior algebra involving one parameter λ. Then we obtain the necessary and sufficient condition for the representations to be irreducible. In fact, the representation is irreducible if and only if the parameter λ satisfies (λ+m)(λ−1+ααm)≠0 for any m ∈ ℤ+. [ABSTRACT FROM AUTHOR]

Published

2018

30. Notes on G2: The Lie algebra and the Lie group.

Author

Draper Fontanals, Cristina

Subjects

*LIE algebras, *LIE groups, *SYMMETRIC spaces, *CAYLEY numbers (Algebra), *LINEAR algebra

Abstract

These notes have been prepared for the Workshop on “(Non)-existence of complex structures on S 6 ”, celebrated in Marburg in March, 2017. The material is not intended to be original. It contains a survey about the smallest of the exceptional Lie groups: G 2 , its definition and different characterizations as well as its relationship to the spheres S 6 and S 7 . With the exception of the summary of the Killing–Cartan classification, this survey is self-contained, and all the proofs are provided. Although these proofs are well-known, they are scattered, some of them are difficult to find, and others require stronger background, while we will usually stick to linear algebra arguments. The approach is algebraical, working at the Lie algebra level most often. We analyze the complex Lie algebra (and group) of type G 2 as well as the two real Lie algebras of type G 2 , the split and the compact one. The octonion algebra will play its role, but it is not the starting point. Also, both the 3-forms approach and the spinorial approach are viewed and connected. Special emphasis is put on relating all the viewpoints by providing precise models. [ABSTRACT FROM AUTHOR]

Published

2018

31. Positive Systems of Kostant Roots.

Author

Dimitrov, Ivan and Roth, Mike

Abstract

Let $\mathfrak {g}$ be a simple complex Lie algebra and let $\mathfrak {t} \subset \mathfrak {g}$ be a toral subalgebra of $\mathfrak {g}$ . As a $\mathfrak {t}$ -module $\mathfrak {g}$ decomposes as where $\mathfrak {s} \subset \mathfrak {g}$ is the reductive part of a parabolic subalgebra of $\mathfrak {g}$ and $\mathcal {R}$ is the Kostant root system associated to $\mathfrak {t}$ . When $\mathfrak {t}$ is a Cartan subalgebra of $\mathfrak {g}$ the decomposition above is nothing but the root decomposition of $\mathfrak {g}$ with respect to $\mathfrak {t}$ ; in general the properties of $\mathcal {R}$ resemble the properties of usual root systems. In this note we study the following problem: 'Given a subset $\mathcal {S} \subset \mathcal {R}$ , is there a parabolic subalgebra $\mathfrak {p}$ of $\mathfrak {g}$ containing $\mathcal {M} = \oplus _{\nu \in \mathcal {S}} \mathfrak {g}^{\nu }$ and whose reductive part equals $\mathfrak {s}$ ?'. Our main results is that, for a classical simple Lie algebra $\mathfrak {g}$ and a saturated $\mathcal {S} \subset \mathcal {R}$ , the condition $(\text {Sym}^{\cdot }(\mathcal {M}))^{\mathfrak {s}} = \mathbb {C}$ is necessary and sufficient for the existence of such a $\mathfrak {p}$ . In contrast, we show that this statement is no longer true for the exceptional Lie algebras F,E,E, and E. Finally, we discuss the problem in the case when $\mathcal {S}$ is not saturated. [ABSTRACT FROM AUTHOR]

Published

2017

32. Méthodes de Kashiwara-Vergne-Rouviére pour les espaces symétriques

Author

Torossian, C., Bass, Hyman, editor, Oesterlé, Joseph, editor, Weinstein, Alan, editor, Delorme, Patrick, editor, and Vergne, Michèle, editor

Published

2004

33. Sextonions, Zorn matrices, and $$\mathbf {e}_{\mathbf{7} \frac{\mathbf{1}}{\mathbf{2}}}$$.

Author

Marrani, Alessio and Truini, Piero

Subjects

*LIE algebras, *MATRICES (Mathematics), *SEMISIMPLE Lie groups, *MAGIC squares, *EXCEPTIONAL Lie algebras

Abstract

By exploiting suitably constrained Zorn matrices, we present a new construction of the algebra of sextonions (over the algebraically closed field $$\mathbb {C}$$ ). This allows for an explicit construction, in terms of Jordan pairs, of the non-semisimple Lie algebra $$\mathbf {e}_{\mathbf{7} \frac{\mathbf{1}}{\mathbf{2}}}$$ , intermediate between $$\mathbf {e_7}$$ and $$\mathbf {e_8}$$ , as well as of all Lie algebras occurring in the sextonionic row and column of the extended Freudenthal Magic Square. [ABSTRACT FROM AUTHOR]

Published

2017

34. Gradings on Modules Over Lie Algebras of E Types.

Author

Draper, Cristina, Elduque, Alberto, and Kochetov, Mikhail

Abstract

For any grading by an abelian group G on the exceptional simple Lie algebra $\mathcal {L}$ of type E or E over an algebraically closed field of characteristic zero, we compute the graded Brauer invariants of simple finite-dimensional modules, thus completing the computation of these invariants for simple finite-dimensional Lie algebras. This yields the classification of finite-dimensional G-graded simple $\mathcal {L}$ -modules, as well as necessary and sufficient conditions for a finite-dimensional $\mathcal {L}$ -module to admit a G-grading compatible with the given G-grading on $\mathcal {L}$ . [ABSTRACT FROM AUTHOR]

Published

2017

35. On the construction of Lie-algebras of type $$E_6(K)$$ for fields K of characteristic two.

Author

Al-dhufeeri, Shuaa and Ata, Mashhour

Abstract

In this paper we give an elementery construction of the Lie algebras of type E6(K) for fields K of characteristic two. [ABSTRACT FROM AUTHOR]

Published

2017

36. Triality, characteristic classes, $$D_4$$ and $$G_2$$ singularities.

Author

Mikosz, Małgorzata and Weber, Andrzej

Subjects

*AUTOMORPHISM groups, *CHARACTERISTIC classes, *MATHEMATICAL singularities

Abstract

We recall the construction of triality automorphism of $$\mathfrak {so}(8)$$ given by E. Cartan and we give a matrix representation for the real form $$\mathfrak {so}(4,4)$$ . We compute the induced results on the characteristic classes. Paralelly we study the triality automorphism of the singularity $$D_4$$ (in Arnolds classification of smooth functions) and its miniversal deformation. The similarity with Lie theory leads us to a definition of $$G_2$$ singularity. [ABSTRACT FROM AUTHOR]

Published

2015

37. The closure diagram for nilpotent orbits of the split real form of E8

Author

Đoković Dragomir

Subjects

exceptional lie groups, adjoint action, closures of nilpotent orbits, normal triples, kostant-sekiguchi bijection, prehomogeneous vector spaces, 17b25, 17b45, Mathematics, QA1-939

Published

2003

38. On representations of the filiform Lie superalgebra [formula omitted].

Author

Wang, Qi, Chen, Hongjia, and Liu, Wende

Subjects

*LIE superalgebras, *NILPOTENT groups, *MODULES (Algebra), *GRASSMANN manifolds, *MATHEMATICAL analysis

Abstract

In this paper, we study the representations for the filiform Lie superalgebras L m , n , a particular class of nilpotent Lie superalgebras. We determine the minimal dimension of a faithful module over L m , n using the theory of linear algebra. In addition, using the method of Feingold and Frenkel (1985), we construct some finite and infinite dimensional modules over L m , n on the Grassmann algebra and the mixed Clifford–Weyl algebra. [ABSTRACT FROM AUTHOR]

Published

2015

39. A New Functor from E 6 -mod to E 7 -mod.

Author

Xu, Xiaoping

Subjects

FUNCTOR theory, LIE algebras, POLYNOMIALS, MODULES (Algebra), MATHEMATICAL analysis

Abstract

We find a new representation of the simple Lie algebra of typeE7on the polynomial algebra in 27 variables. Using this representation and Shen's idea of mixed product, we construct a new functor fromE6-ModtoE7-Mod. A condition for the functor to map a finite-dimensional irreducibleE6-module to an infinite-dimensional irreducibleE7-module is obtained. Our general framework also gives a direct polynomial extension from irreducibleE6-modules to irreducibleE7-modules, which can be used to derive Gel'fand–Zetlin bases forE7from those forE6that can be obtained from those forD5according to our earlier work. [ABSTRACT FROM AUTHOR]

Published

2015

40. Partial differential equation approach to E.

Author

Xu, Xiao

Subjects

*PARTIAL differential equations, *MATHEMATICAL decomposition, *POLYNOMIALS, *LIE algebras, *COMBINATORIAL identities, *PROOF theory

Abstract

By solving certain partial differential equations, we find the explicit decomposition of the polynomial algebra over the 56-dimensional basic irreducible module of the simple Lie algebra E into a sum of irreducible submodules. This essentially gives a partial differential equation proof of a combinatorial identity on the dimensions of certain irreducible modules of E. We also determine two three-parameter families of irreducible submodules in the solution space of Cartan's well-known fourth-order E-invariant partial differential equation. [ABSTRACT FROM AUTHOR]

Published

2015

41. S_4-symmetry on the Tits construction of exceptional Lie algebras and superalgebras

Author

Elduque, Alberto and Okubo, Susumu

Subjects

Structurable algebra, exceptional, Tits construction, Rings and Algebras (math.RA), General Mathematics, Lie algebra, FOS: Mathematics, superalgebra, Mathematics - Rings and Algebras, structurable algebra, 17B25, Superalgebra, Exceptional

Abstract

The classical Tits construction provides models of the exceptional simple Lie algebras in terms of a unital composition algebra and a degree three simple Jordan algebra. A couple of actions of the symmetric group of degree 4 on this construction are given. By means of these actions, the models provided by the Tits construction are related to models of the exceptional Lie algebras obtained from two different types of structurable algebras. Some models of exceptional Lie superalgebras are discussed too., Comment: 26 pages

Published

2021

42. Some Forms of Exceptional Lie Algebras.

Author

Faulkner, JohnR.

Subjects

MATHEMATICAL forms, LIE algebras, CUBES, RANKING (Statistics), PROJECTIVE modules (Algebra), MATHEMATICAL analysis

Abstract

Some forms of Lie algebras of typesE6,E7, andE8are constructed using the exterior cube of a rank 9 finitely generated projective module. [ABSTRACT FROM AUTHOR]

Published

2014

43. On the construction of Lie-algebras of type E 6 ( K ) for fields K of characteristic two

Author

Al-dhufeeri, Shuaa and Ata, Mashhour Bani

Published

2017

44. A binary encoding of spinors and applications

Author

Rafael Herrera and Gerardo Arizmendi

Subjects

Mathematics - Differential Geometry, spin representation, Pure mathematics, Binary number, 17b10, 53c27, Lie algebra, triality, QA1-939, FOS: Mathematics, Mathematics::Representation Theory, Spin-½, Physics, Triality, Spinor, clifford algebras, Automorphism, 15a69, 17b25, 15a66, octonions, Differential Geometry (math.DG), Multiplication, Binary code, Geometry and Topology, spinor representation, 20g41, Mathematics

Abstract

We present a binary code for spinors and Clifford multiplication using non-negative integers and their binary expressions, which can be easily implemented in computer programs for explicit calculations. As applications, we present explicit descriptions of the triality automorphism of $Spin(8)$, explicit representations of the Lie algebras $\mathfrak{spin}(8)$, $\mathfrak{spin}(7)$ and $\mathfrak{g}_2$, etc., We have corrected some typos, and added some comments and bibliographical references

Published

2019

45. Fine gradings on $\mathfrak{e}_6$

Author

Antonio Viruel and Cristina Draper

Subjects

Pure mathematics, Mathematics::Commutative Algebra, General Mathematics, Mathematics::Rings and Algebras, 010102 general mathematics, Graded ring, Zero (complex analysis), Mathematics - Rings and Algebras, 010103 numerical & computational mathematics, 17B25, 01 natural sciences, Graded algebra, maximal abelian diagonalizable group, exceptional Lie algebra, Rings and Algebras (math.RA), Mathematics::Quantum Algebra, 17B70, Lie algebra, FOS: Mathematics, 0101 mathematics, Algebraically closed field, Mathematics::Representation Theory, Grading (tumors), Mathematics

Abstract

There are fourteen fine gradings on the exceptional Lie algebra $\frak e_6$ over an algebraically closed field of zero characteristic. We provide their descriptions and a proof that they are all., 39 pages

Published

2016

46. Codes, S-structures, and exceptional Lie algebras

Author

Isabel Cunha and Alberto Elduque

Subjects

Algebra, Code (set theory), Simple (abstract algebra), Rings and Algebras (math.RA), General Mathematics, Lie algebra, FOS: Mathematics, Mathematics - Rings and Algebras, 17B25, Mathematics

Abstract

The exceptional simple Lie algebras of types E7 and E8 are endowed with optimal $SL_2^n$-structures, and are thus described in terms of the corresponding coordinate algebras. These are nonassociative algebras which much resemble the so called code algebras., Comment: 13 pages. Some misprints corrected and extra comments added

Published

2018

47. The Intermediate Vertex Subalgebras of the Lattice Vertex Operator Algebras

Author

Kawasetsu, Kazuya

Published

2014

48. COMPOSITION ALGEBRAS AND THE TWO FACES OF G2

Author

Rutwig Campoamor-Stursberg and Luis J. Boya

Subjects

Automorphism group, Pure mathematics, Physics and Astronomy (miscellaneous), Group (mathematics), Isotropy, FOS: Physical sciences, Mathematical Physics (math-ph), Division (mathematics), Composition (combinatorics), 17B25, Álgebra, Metric (mathematics), Algebra over a field, Mathematical Physics, Real number

Abstract

We consider composition and division algebras over the real numbers: We note two r\^oles for the group $G_{2}$: as automorphism group of the octonions and as the isotropy group of a generic 3-form in 7 dimensions. We show why they are equivalent, by means of a regular metric. We express in some diagrams the relation between some pertinent groups, most of them related to the octonions. Some applications to physics are also discussed., Comment: 11 pages, 3 figures

Published

2010

49. Invariant four-forms and symmetric pairs

Author

Moroianu, Andrei and Semmelmann, Uwe

Published

2013

50. Gradings on symmetric composition algebras

Author

Alberto Elduque

Subjects

Pure mathematics, Algebra and Number Theory, Mathematics::Commutative Algebra, Mathematics::Rings and Algebras, Mathematics - Rings and Algebras, 17A75, 17B25, Symmetric, Grading, Rings and Algebras (math.RA), Lie algebra, FOS: Mathematics, Composition algebra, Exceptional Lie algebra, Mathematics

Abstract

The group gradings on the symmetric composition algebras over arbitrary fields are classified. Applications of this result to gradings on the exceptional simple Lie algebras are considered too., 37 pages

Published

2009