Your search keyword '"Solvable Lie algebra"' showing total 105 results

1. Solvable Lie algebras derived from Lie hyperalgebras.

Author

Safa, Hesam and Norouzi, Morteza

Abstract

AbstractRecently we have investigated Lie algebras and abelian Lie algebras derived from Lie hyperalgebras using the fundamental relations L and A, respectively. In the present paper, continuing this method we obtain solvable Lie algebras from Lie hyperalgebras by Sn-relations. We show that ∩n≥1Sn* is the smallest equivalence relation on a Lie hyperalgebra such that the quotient structure is a solvable Lie algebra. We also provide some necessary and sufficient conditions for transitivity of the relation Sn using the notion of Sn-part. [ABSTRACT FROM AUTHOR]

Published

2024

2. Strong Kähler with torsion solvable lie algebras with codimension 2 nilradical.

Author

Brienza, Beatrice and Fino, Anna

Subjects

*TORSION, *COMPACTING, *CLASSIFICATION, *LIE algebras

Abstract

In this paper, we study strong Kähler with torsion (SKT) and generalized Kähler structures on solvable Lie algebras with (not necessarily abelian) codimension 2 nilradical. We treat separately the case of J$J$‐invariant nilradical and non‐J$J$‐invariant nilradical. A classification of such SKT Lie algebras in dimension 6 is provided. In particular, we give a general construction to extend SKT nilpotent Lie algebras to SKT solvable Lie algebras of higher dimension, and we construct new examples of SKT and generalized Kähler compact solvmanifolds. [ABSTRACT FROM AUTHOR]

Published

2024

3. Stretched non-positive Weyl connections on solvable Lie groups.

Author

Bocheński, Maciej, Jastrzȩbski, Piotr, and Tralle, Aleksy

Abstract

We determine the structure of solvable Lie groups endowed with invariant stretched non-positive Weyl connections and find classes of solvable Lie groups admitting and not admitting such connections. In dimension 4 we fully classify solvable Lie groups which admit invariant SNP Weyl connections. [ABSTRACT FROM AUTHOR]

Published

2024

4. Open orbits and primitive zero ideals for solvable Lie algebras.

Author

Baklouti, Ali and Ishi, Hideyuki

Subjects

*ORBITS (Astronomy), *FROBENIUS algebras, *LIE algebras, *ALGEBRA

Abstract

The aim of the paper is to provide a characterization criterion of exponential solvable Frobenius Lie algebras (having open coadjoint orbits), in terms of primitive ideals of the associated enveloping algebra. In the case of complex solvable Lie algebras, we also show that an algebraic adjoint orbit is open if and only if the associated primitive ideal through the Dixmier map is trivial. [ABSTRACT FROM AUTHOR]

Published

2024

5. Ideals and conjugacy classes in solvable Lie algebras.

Author

Ali, Sajid, Azad, Hassan, Biswas, Indranil, and Mahomed, Fazal M.

Subjects

*CONJUGACY classes, *LIE algebras

Abstract

A constructive procedure is given to determine all ideals of a finite-dimensional solvable Lie algebra. This is used in determining all conjugacy classes of subalgebras of a given finite-dimensional solvable Lie algebra. [ABSTRACT FROM AUTHOR]

Published

2023

6. Study on Poisson Algebra and Automorphism of a Special Class of Solvable Lie Algebras.

Author

Yu, Demin, Jiang, Chan, and Ma, Jiejing

Subjects

*POISSON algebras, *LIE algebras, *AUTOMORPHISM groups, *SUBGROUP growth, *SOLVABLE groups, *MORPHISMS (Mathematics)

Abstract

We define a four-dimensional Lie algebra g in this paper and then prove that this Lie algebra is solvable but not nilpotent. Due to the fact that g is a Lie algebra, ∀ x , y ∈ g , [ x , y ] = − [ y , x ] , that is, the operation [ , ] has anti symmetry. Symmetry is a very important law, and antisymmetry is also a very important law. We studied the structure of Poisson algebras on g using the matrix method. We studied the necessary and sufficient conditions for the automorphism of this class of Lie algebras, and give the decomposition of its automorphism group by A u t (g) = G 3 G 1 G 2 G 3 G 4 G 7 G 8 G 5 , or A u t (g) = G 3 G 1 G 2 G 3 G 4 G 7 G 8 G 5 G 6 , or A u t (g) = G 3 G 1 G 2 G 3 G 4 G 7 G 8 G 5 G 3 , where G i is a commutative subgroup of A u t (g) . We give some subgroups of g's automorphism group and systematically studied the properties of these subgroups. [ABSTRACT FROM AUTHOR]

Published

2023

7. New Class of Locally Conformal Kähler Manifolds.

Author

Nour, Oubbiche, Gherici, Beldjilali, Habib, Bouzir, and Adel, Delloum

Abstract

The purpose of this paper is to introduce a new class of locally conformal Kähler manifolds which will generalize the Vaisman manifold. Then, some basic properties of this class is discussed, also the existence of such manifolds is shown with concrete examples. As an application, we study such structures on four-dimensional solvable Lie algebra. [ABSTRACT FROM AUTHOR]

Published

2023

8. A COMPUTATIONAL APPROACH FOR THE CLASSIFICATIONS OF ALL POSSIBLE DERIVATIONS OF NILSOLITONS IN DIMENSION 9.

Author

KADIOGLU, Hulya

Subjects

*NILPOTENT Lie groups, *LIE algebras, *LIE groups, *GROUP algebras, *TOPOLOGICAL spaces, *ENGINEERING mathematics

Abstract

In mathematics and engineering, a manifold is a topological space that locally resembles Euclidean space near each point. Defining the best metric for these manifolds have several engineering and science implications from controls to optimization for generalized inner product applications of Gram Matrices that appear in these applications. These smooth geometric manifold applications can be formalized by Lie Groups and their Lie Algebras on its infinitesimal elements. Nilpotent matrices that are matrices with zero power with left-invariant metric on Lie group with non-commutative properties namely non-abelian nilsoliton metric Lie algebras will be the focus of this article. In this study, we present an algorithm to classify eigenvalues of nilsoliton derivations for 9-D non-abelian nilsoliton metric Lie algebras with non-singular Gram matrices. [ABSTRACT FROM AUTHOR]

Published

2022

9. On Maximal Extensions of Nilpotent Lie Algebras.

Author

Gorbatsevich, V. V.

Subjects

*LIE algebras, *LOGICAL prediction

Abstract

Extensions of finite-dimensional nilpotent Lie algebras, in particular, solvable extensions, are considered. Some properties of maximal extensions are proved. A counterexample to L. Šnobl's conjecture concerning the uniqueness of maximal solvable extensions is constructed. [ABSTRACT FROM AUTHOR]

Published

2022

10. On the Method of Differential Invariants for Solving Higher Order Ordinary Differential Equations.

Author

Sinkala, Winter and Kakuli, Molahlehi Charles

Subjects

*DIFFERENTIAL invariants, *LIE groups, *LIE algebras, *GENERATORS of groups, *ORDINARY differential equations, *SOLVABLE groups

Abstract

There are many routines developed for solving ordinary differential Equations (ODEs) of different types. In the case of an nth-order ODE that admits an r-parameter Lie group (3 ≤ r ≤ n) , there is a powerful method of Lie symmetry analysis by which the ODE is reduced to an (n − r) th-order ODE plus r quadratures provided that the Lie algebra formed by the infinitesimal generators of the group is solvable. It would seem this method is not widely appreciated and/or used as it is not mentioned in many related articles centred around integration of higher order ODEs. In the interest of mainstreaming the method, we describe the method in detail and provide four illustrative examples. We use the case of a third-order ODE that admits a three-dimensional solvable Lie algebra to present the gist of the integration algorithm. [ABSTRACT FROM AUTHOR]

Published

2022

11. Study on Poisson Algebra and Automorphism of a Special Class of Solvable Lie Algebras

Author

Demin Yu, Chan Jiang, and Jiejing Ma

Subjects

Poisson algebra, solvable Lie algebra, isomorphism, isomorphic group, Mathematics, QA1-939

Abstract

We define a four-dimensional Lie algebra g in this paper and then prove that this Lie algebra is solvable but not nilpotent. Due to the fact that g is a Lie algebra, ∀x,y∈g,[x,y]=−[y,x], that is, the operation [,] has anti symmetry. Symmetry is a very important law, and antisymmetry is also a very important law. We studied the structure of Poisson algebras on g using the matrix method. We studied the necessary and sufficient conditions for the automorphism of this class of Lie algebras, and give the decomposition of its automorphism group by Aut(g)=G3G1G2G3G4G7G8G5, or Aut(g)=G3G1G2G3G4G7G8G5G6, or Aut(g)=G3G1G2G3G4G7G8G5G3, where Gi is a commutative subgroup of Aut(g). We give some subgroups of g’s automorphism group and systematically studied the properties of these subgroups.

Published

2023

12. On Ricci negative derivations.

Author

Gutiérrez, María Valeria

Subjects

*LIE algebras, *OPEN spaces, *SOLVABLE groups

Abstract

Given a nilpotent Lie algebra, we study the space of all diagonalizable derivations such that the corresponding one-dimensional solvable extension admits a left-invariant metric with negative Ricci curvature. Lauret and Will have conjectured that such a space coincides with an open and convex subset of derivations defined in terms of the moment map for the variety of nilpotent Lie algebras. We prove the validity of the conjecture in dimensions ≤ 5, as well as for Heisenberg Lie algebras and standard filiform Lie algebras. [ABSTRACT FROM AUTHOR]

Published

2022

13. 一类可解保积 Hom-李代数的确定.

Author

李小朝 and 胡余旺

Abstract

Copyright of Journal of Xinyang Normal University Natural Science Edition is the property of Journal of Xinyang Normal University Editorial Office and its content may not be copied or emailed to multiple sites or posted to a listserv without the copyright holder's express written permission. However, users may print, download, or email articles for individual use. This abstract may be abridged. No warranty is given about the accuracy of the copy. Users should refer to the original published version of the material for the full abstract. (Copyright applies to all Abstracts.)

Published

2021

14. On the Method of Differential Invariants for Solving Higher Order Ordinary Differential Equations

Author

Winter Sinkala and Molahlehi Charles Kakuli

Subjects

ordinary differential equation, lie symmetry analysis, solvable lie algebra, differential invariant, reduction of order, Mathematics, QA1-939

Abstract

There are many routines developed for solving ordinary differential Equations (ODEs) of different types. In the case of an nth-order ODE that admits an r-parameter Lie group (3≤r≤n), there is a powerful method of Lie symmetry analysis by which the ODE is reduced to an (n−r)th-order ODE plus r quadratures provided that the Lie algebra formed by the infinitesimal generators of the group is solvable. It would seem this method is not widely appreciated and/or used as it is not mentioned in many related articles centred around integration of higher order ODEs. In the interest of mainstreaming the method, we describe the method in detail and provide four illustrative examples. We use the case of a third-order ODE that admits a three-dimensional solvable Lie algebra to present the gist of the integration algorithm.

Published

2022

15. Local derivations on Solvable Lie algebras.

Author

Ayupov, Sh. A. and Khudoyberdiyev, A. Kh.

Subjects

*LIE algebras, *ALGEBRA, *NILPOTENT Lie groups

Abstract

We show that in the class of solvable Lie algebras there exist algebras which admit local derivations which are not ordinary derivation and also algebras for which every local derivation is a derivation. We found necessary and sufficient conditions under which any local derivation of solvable Lie algebras with abelian nilradical and one-dimensional complementary space is a derivation. Moreover, we prove that every local derivation on a finite-dimensional solvable Lie algebra with model nilradical and maximal dimension of complementary space is a derivation. [ABSTRACT FROM AUTHOR]

Published

2021

16. Locally conformally Kähler structures on four-dimensional solvable Lie algebras

Author

Angella Daniele and Origlia Marcos

Subjects

locally conformally kähler, solvable lie algebra, 53b35, 53a30, 22e25, Mathematics, QA1-939

Abstract

We classify and investigate locally conformally Kähler structures on four-dimensional solvable Lie algebras up to linear equivalence. As an application we can produce many examples in higher dimension, here including lcK structures on Oeljeklaus-Toma manifolds, and we also give a geometric interpretation of some of the 4-dimensional structures in our classification.

Published

2019

17. Solvability of Poisson algebras.

Author

Siciliano, Salvatore and Usefi, Hamid

Subjects

*POISSON algebras, *LIE algebras, *POISSON processes, *ASSOCIATIVE rings

Abstract

Let P be a Poisson algebra with a Lie bracket { , } over a field F of characteristic p ≥ 0. In this paper, the Lie structure of P is investigated. In particular, if P is solvable with respect to its Lie bracket, then we prove that the Poisson ideal J of P generated by all elements { { { x 1 , x 2 } , { x 3 , x 4 } } , x 5 } with x 1 , ... , x 5 ∈ P is associative nilpotent of index bounded by a function of the derived length of P. We use this result to further prove that if P is solvable and p ≠ 2 , then the Poisson ideal { P , P } P is nil. [ABSTRACT FROM AUTHOR]

Published

2021

18. Derived Subalgebra and Solvability of Finite Dimensional Lie Algebra.

Author

Meng, Wei and Yao, Hailou

Subjects

*LIE algebras, *DEFINITIONS

Abstract

Let F be a field of algebraically closed and L be a finite dimensional Lie algebra over field F . L ′ = [ L , L ] denotes the derived subalgebra of L. Following the analogy with group theory, we define the subalgebra D(L) of L to be the intersection of the normalizer of the derived subalgebras of all subalgebras of L. In a Lie algebra L, this is an ideal of L, allowing the definition of the ascending series: set D 0 (L) = 0 , D i + 1 (L) / D i (L) = D (L / D i (L)) for i ≥ 1 , D ∞ (L) denotes the terminal term of the ascending series. It is proved that L is solvable if and only if L = D ∞ (L) . [ABSTRACT FROM AUTHOR]

Published

2020

19. Solvable symmetric Poisson algebras and their derived lengths.

Author

Siciliano, Salvatore

Subjects

*POISSON algebras, *LIE algebras, *POISSON'S equation

Abstract

Let L be a Lie algebra over a field of positive characteristic and let S (L) and s (L) denote, respectively, the symmetric Poisson algebra and the truncated symmetric Poisson algebra of L. As a natural continuation of the work by Monteiro Alves and Petrogradsky in [9] , we investigate the structure of L when S (L) or s (L) is solvable. We first disprove a conjecture stated in [9] about solvability of S (L) (and s (L)) in characteristic 2. Next, the derived lengths of s (L) are studied. In particular, we provide bounds for the derived lengths of s (L) , establish when s (L) is metabelian, and characterize truncated symmetric Poisson algebras of minimal derived length. [ABSTRACT FROM AUTHOR]

Published

2020

20. Locally conformally Kähler structures on four-dimensional solvable Lie algebras.

Author

Angella, Daniele and Origlia, Marcos

Subjects

KAHLERIAN manifolds, LIE algebras, FOUR-manifolds (Topology), MATHEMATICAL equivalence, MATHEMATICAL symmetry

Abstract

We classify and investigate locally conformally Kähler structures on four-dimensional solvable Lie algebras up to linear equivalence. As an application we can produce many examples in higher dimension, here including lcK structures on Oeljeklaus-Toma manifolds, and we also give a geometric interpretation of some of the 4-dimensional structures in our classification. [ABSTRACT FROM AUTHOR]

Published

2020

21. Determinants and characteristic polynomials of Lie algebras.

Author

Hu, Zhiguang and Zhang, Philip B.

Subjects

*POLYNOMIALS, *LIE algebras, *IRREDUCIBLE polynomials, *LINEAR algebra, *MATRICES (Mathematics)

Abstract

Abstract For an s -tuple A = (A 1 , ... , A s) of square matrices of the same size, the (joint) determinant of A and the characteristic polynomial of A are defined by det ⁡ (A) (z) = det ⁡ (z 1 A 1 + z 2 A 2 + ⋯ + z s A s) and p A (z) = det ⁡ (z 0 I + z 1 A 1 + z 2 A 2 + ⋯ + z s A s) , respectively. This paper calculates determinant of the finite dimensional irreducible representations of sl (2 , F) , which is either zero or a product of some irreducible quadratic polynomials. Moreover, it shows that a finite dimensional Lie algebra is solvable if and only if the characteristic polynomial is completely reducible. [ABSTRACT FROM AUTHOR]

Published

2019

22. SOLVABLE LIE ALGEBRAS OF DERIVATIONS OF RANK ONE.

Author

Petravchuk, A. and Sysak, K.

Abstract

Let K be a field of characteristic zero, A = K[x1, . . ., xn] the polynomial ring and R = K(x1, .. ., xn) the field of rational functions in n variables over K. The Lie algebra Wn (K) of all K-derivations on A is of great interest since its elements may be considered as vector fields on Kn with polynomial coefficients. If L is a subalgebra of Wn (K), then one can define the rank rkA L of L over A as the dimension of the vector space RL over the field R. Finite dimensional (over K) subalgebras of Wn (K) of rank 1 over A were studied by the first author jointly with I. Arzhantsev and E. Makedonskiy. We study solvable subalgebras L of Wn (K) with rkA L = 1, without restrictions on dimension over K. Such Lie algebras are described in terms of Darboux polynomials. [ABSTRACT FROM AUTHOR]

Published

2019

23. Computing abelian subalgebras for linear algebras of upper-triangular matrices from an algorithmic perspective

Author

Ceballos Manuel, Núñez Juan, and Tenorio Ángel F.

Subjects

maximal abelian dimension, solvable lie algebra, algorithm, primary 17b30, 68w30, secondary 17-08, Mathematics, QA1-939

Abstract

In this paper, the maximal abelian dimension is algorithmically and computationally studied for the Lie algebra hn, of n×n upper-triangular matrices. More concretely, we define an algorithm to compute abelian subalgebras of hn besides programming its implementation with the symbolic computation package MAPLE. The algorithm returns a maximal abelian subalgebra of hn and, hence, its maximal abelian dimension. The order n of the matrices hn is the unique input needed to obtain these subalgebras. Finally, a computational study of the algorithm is presented and we explain and comment some suggestions and comments related to how it works.

Published

2016

24. Nilpotency degree of the nilradical of a solvable Lie algebra on two generators and uniserial modules associated to free nilpotent Lie algebras

Author

Leandro Cagliero, Fernando Levstein, and Fernando Szechtman

Subjects

Solvable Lie algebra, Pure mathematics, Algebra and Number Theory, 010102 general mathematics, Subalgebra, purl.org/becyt/ford/1.1 [https], Triangular matrix, NILPOTENCY CLASS, 01 natural sciences, FREE ℓ-STEP NILPOTENT LIE ALGEBRA, INDECOMPOSABLE, purl.org/becyt/ford/1 [https], Nilpotent Lie algebra, Nilpotent, 0103 physical sciences, Lie algebra, UNISERIAL, 010307 mathematical physics, 0101 mathematics, Algebraically closed field, Indecomposable module, Mathematics

Abstract

Given a sequence d~ = (d1, . . . , dk) of natural numbers, we consider the Lie subalgebra h of gl(d, F), where d = d1 + · · · + dk and F is a field of characteristic 0, generated by two block upper triangular matrices D and E partitioned according to d~, and study the problem of computing the nilpotency degree m of the nilradical n of h. We obtain a complete answer when D and E belong to a certain family of matrices that arises naturally when attempting to classify the indecomposable modules of certain solvable Lie algebras. Our determination of m depends in an essential manner on the symmetry of E with respect to an outer automorphism of sl(d). The proof that m depends solely on this symmetry is long and delicate. As a direct application of our investigations on h and n we give a full classification of all uniserial modules of an extension of the free ℓ-step nilpotent Lie algebra on n generators when F is algebraically closed. Fil: Cagliero, Leandro Roberto. Consejo Nacional de Investigaciones Científicas y Técnicas. Centro Científico Tecnológico Conicet - Córdoba. Centro de Investigación y Estudios de Matemática. Universidad Nacional de Córdoba. Centro de Investigación y Estudios de Matemática; Argentina Fil: Levstein, Fernando. Consejo Nacional de Investigaciones Científicas y Técnicas. Centro Científico Tecnológico Conicet - Córdoba. Centro de Investigación y Estudios de Matemática. Universidad Nacional de Córdoba. Centro de Investigación y Estudios de Matemática; Argentina Fil: Szechtman, Fernando. University Of Regina; Canadá

Published

2021

25. On generalized [formula omitted]-structures and [formula omitted]-duality.

Author

del Barco, Viviana and Grama, Lino

Subjects

*G-structures, *MANIFOLDS (Mathematics), *DIFFERENTIAL geometry, *DIMENSIONAL analysis, *MATHEMATICAL formulas

Abstract

This is a short note on generalized G 2 -structures obtained as a consequence of a T -dual construction given in del Barco et al. (2017). Given classical G 2 -structure on certain seven dimensional manifolds, either closed or co-closed, we obtain integrable generalized G 2 -structures which are no longer a usual one, and with non-zero three form in general. In particular we obtain manifolds admitting closed generalized G 2 -structures not admitting closed (usual) G 2 -structures. [ABSTRACT FROM AUTHOR]

Published

2018

26. On the generalized moment separability theorem for type 1 solvable Lie groups.

Author

Abdelmoula, Lobna, Baklouti, Ali, and Bouaziz, Yasmine

Subjects

*INVARIANTS (Mathematics), *MATHEMATICAL analysis, *LIE algebras, *NUMERICAL analysis, *X-ray diffraction

Abstract

Let G be a type 1 connected and simply connected solvable Lie group. The generalized moment map for π in G ^ {\widehat{G}} , the unitary dual of G, sends smooth vectors of the representation space of π to 𝒰 ⁢ (𝔤) * {{\mathcal{U}(\mathfrak{g})}^{*}} , the dual vector space of 𝒰 ⁢ (𝔤) {\mathcal{U}(\mathfrak{g})}. The convex hull of the image of the generalized moment map for π is called its generalized moment set, denoted by J ⁢ (π) {J(\pi)}. We say that G ^ {\widehat{G}} is generalized moment separable when the generalized moment sets differ for any pair of distinct irreducible unitary representations. Our main result in this paper provides a second proof of the generalized moment separability theorem for G. [ABSTRACT FROM AUTHOR]

Published

2018

27. On the nilpotent residuals of all subalgebras of Lie algebras.

Author

Meng, Wei and Yao, Hailou

Abstract

Let N denote the class of nilpotent Lie algebras. For any finite-dimensional Lie algebra L over an arbitrary field F, there exists a smallest ideal I of L such that L/I ∈ N. This uniquely determined ideal of L is called the nilpotent residual of L and is denoted by LN. In this paper, we define the subalgebra S(L) = ∩H≤LIL(HN). Set S0(L) = 0. Define Si+1(L)/Si(L) = S(L/Si(L)) for i > 1. By S∞(L) denote the terminal term of the ascending series. It is proved that L = S∞(L) if and only if LN is nilpotent. In addition, we investigate the basic properties of a Lie algebra L with S(L) = L. [ABSTRACT FROM AUTHOR]

Published

2018

28. Simply transitive NIL-affine actions of solvable Lie groups

Author

Jonas Deré and Marcos Origlia

Subjects

Mathematics - Differential Geometry, Solvable Lie algebra, Transitive relation, Pure mathematics, Applied Mathematics, General Mathematics, 010102 general mathematics, Lie group, Geometric Topology (math.GT), Group Theory (math.GR), Characterization (mathematics), 01 natural sciences, Mathematics - Geometric Topology, Nilpotent, Morphism, Differential Geometry (math.DG), 0103 physical sciences, Simply connected space, Lie algebra, FOS: Mathematics, 010307 mathematical physics, 0101 mathematics, Mathematics - Group Theory, Mathematics

Abstract

Every simply connected and connected solvable Lie group $G$ admits a simply transitive action on a nilpotent Lie group $H$ via affine transformations. Although the existence is guaranteed, not much is known about which Lie groups $G$ can act simply transitive on which Lie groups $H$. So far the focus was mainly on the case where $G$ is also nilpotent, leading to a characterization depending only on the corresponding Lie algebras and related to the notion of post-Lie algebra structures. This paper studies two different aspects of this problem. First, we give a method to check whether a given action $\rho: G \to \operatorname{Aff}(H)$ is simply transitive by looking only at the induced morphism $\varphi: \mathfrak{g} \to \operatorname{aff}(\mathfrak{h})$ between the corresponding Lie algebras. Secondly, we show how to check whether a given solvable Lie group $G$ acts simply transitive on a given nilpotent Lie group $H$, again by studying properties of the corresponding Lie algebras. The main tool for both methods is the semisimple splitting of a solvable Lie algebra and its relation to the algebraic hull, which we also define on the level of Lie algebras. As an application, we give a full description of the possibilities for simply transitive actions up to dimension $4$., Comment: 22 pages, 8 tables. Comments are welcome

Published

2021

29. Simple restricted modules for the Heisenberg-Virasoro algebra

Author

Dongfang Gao

Subjects

Solvable Lie algebra, Pure mathematics, Algebra and Number Theory, 010102 general mathematics, Block (permutation group theory), 01 natural sciences, Simple (abstract algebra), 0103 physical sciences, Lie algebra, Virasoro algebra, 010307 mathematical physics, 0101 mathematics, Algebra over a field, Simple module, Mathematics

Abstract

We use simple modules over the finite-dimensional solvable Lie algebras to construct many simple restricted modules over the Heisenberg-Virasoro algebra L . These modules contain the highest weight modules and Whittaker modules. Then we precisely characterize the simple restricted modules over L under certain conditions. We know that simple modules over the two dimensional non-abelian Lie algebra are classified by R. Block in [10] . We also give a complete classification of simple modules for a three dimensional solvable Lie algebra.

Published

2021

30. A Classification of Line Bundles over a Scheme

Author

Kheiri, Hossein, Rahmati, Farhad, and Etemad, Azam

Published

2020

31. On a locally nilpotent radical Jacobson for special Lie algebras

Subjects

Solvable Lie algebra, Pure mathematics, General Mathematics, Subalgebra, Lie algebra, Locally nilpotent, Jacobson radical, Noncommutative geometry, Levi decomposition, Reductive Lie algebra, Mathematics

Abstract

In the paper investigates the possibility of homological description of Jacobson radical and locally nilpotent radical for Lie algebras, and their relation with a $$PI$$ - irreducibly represented radical, and some properties of primitive Lie algebras are studied. We prove an analog of The F. Kubo theorem for almost locally solvable Lie algebras with a zero Jacobson radical. It is shown that the Jacobson radical of a special almost locally solvable Lie algebra $$L$$ over a field $$F$$ of characteristic zero is zero if and only if the Lie algebra $$L$$ has a Levi decomposition $$L=S\oplus Z(L)$$, where $$Z(L)$$ is the center of the algebra $$L$$, $$S$$ is a finite-dimensional subalgebra $$L$$ such that $$J(L)=0$$. For an arbitrary special Lie algebra $$L$$, the inclusion of $$IrrPI(L)\subset J(L)$$ is shown, which is generally strict. An example of a Lie algebra $$L$$ with strict inclusion $$J(L)\subset IrrPI(L)$$ is given. It is shown that for an arbitrary special Lie algebra $$L$$ over the field $$F$$ of characteristic zero, the inclusion of $$N (L)\subset IrrPI(L)$$, which is generally strict. It is shown that most Lie algebras over a field are primitive. An example of an Abelian Lie algebra over an algebraically closed field that is not primitive is given. Examples are given showing that infinite-dimensional commutative Lie algebras are primitive over any fields; a finite-dimensional Abelian algebra of dimension greater than 1 over an algebraically closed field is not primitive; an example of a non-Cartesian noncommutative Lie algebra is primitive. It is shown that for special Lie algebras over a field of characteristic zero $$PI$$-an irreducibly represented radical coincides with a locally nilpotent one. An example of a Lie algebra whose locally nilpotent radical is neither locally nilpotent nor locally solvable is given. Sufficient conditions for the primitiveness of a Lie algebra are given, and examples of primitive Lie algebras and non-primitive Lie algebras are given.

Published

2021

32. (CO)HOMOLOGY OF POSET LIE ALGEBRAS.

Author

LAMPRET, LEON and VAVPETIČ, ALEŠ

Subjects

*HOMOLOGY theory, *PARTIALLY ordered sets, *LIE algebras, *HEISENBERG model, *TORSION theory (Algebra)

Abstract

We investigate (co)homological properties of Lie algebras that are constructed from a finite poset: the solvable class gl≺ and the nilpotent class gl≺. We confirm the conjecture [8, 1.16(1), p. 141] that says: every prime power pr ≤ n - 2 appears as torsion in H*(niln; Z), and every prime power pr ≤ n - 1 appears as torsion in H*(soln; Z). If ≺ is a bounded poset, then the (co)homology of gl ≺ is torsion-convex, i.e., if it contains ptorsion, then it also contains p'-torsion for every prime p' < p. We obtain new explicit formulas for the (co)homology of some families over arbitrary fields. Among them are the solvable non-nilpotent analogs of the Heisenberg Lie algebras from [2], the 2-step Lie algebras from [1], strictly block-triangular Lie algebras, etc. The combinatorics of how the resulting generating functions are obtained are interesting in their own right. All this is done by using AMT (algebraic Morse theory [9, 12, 8]). This article serves as a source of examples of how to construct useful acyclic matchings, each of which in turn induces compelling combinatorial problems and solutions. It also enables graph theory to be used in homological algebra. [ABSTRACT FROM AUTHOR]

Published

2017

33. Minimal faithful upper-triangular matrix representations for solvable Lie algebras.

Author

Ceballos, M., Núñez, J., and Tenorio, Á.F.

Subjects

*SYMBOLIC computation, *ISOMORPHISM (Mathematics), *REPRESENTATION theory, *VARIATIONAL principles, *LIE algebras, *EXISTENCE theorems

Abstract

The existence of matrix representations for any given finite-dimensional complex Lie algebra is a classic result on Lie Theory. In particular, such representations can be obtained by means of an isomorphic matrix Lie algebra consisting of upper-triangular square matrices. Unfortunately, there is no general information about the minimal order for the matrices involved in such representations. In this way, our main goal is to revisit, debug and implement an algorithm which provides the minimal order for matrix representations of any finite-dimensional solvable Lie algebra when inserting its law, as well as returning a matrix representative of such an algebra by using the minimal order previously computed. In order to show the applicability of this procedure, we have computed minimal representatives not only for each solvable Lie algebra with dimension less than 6 , but also for some solvable Lie algebras of arbitrary dimension. [ABSTRACT FROM AUTHOR]

Published

2017

34. A Classification of Line Bundles over a Scheme

Author

Farhad Rahmati, Hossein Kheiri, and Azam Etemad

Subjects

Solvable Lie algebra, Pure mathematics, General Mathematics, 010102 general mathematics, General Physics and Astronomy, General Chemistry, 01 natural sciences, Representation theory, Mathematics::Algebraic Geometry, Scheme (mathematics), Lie algebra, Line (geometry), Decomposition (computer science), General Earth and Planetary Sciences, 0101 mathematics, General Agricultural and Biological Sciences, Mathematics::Symplectic Geometry, Mathematics

Abstract

In this paper, we attempt to indicate the links between representations over a Lie algebra and line bundles over a scheme. Our hypothesis is that we can make a correspondence between representations of a solvable Lie algebra and line bundles. Finally, we study the decomposition of these bundles by using the representation theory over solvable Lie algebras.

Published

2020

35. Nilpotent decomposition of solvable Lie algebras

Author

Liqun Qi

Subjects

Solvable Lie algebra, Pure mathematics, Applied Mathematics, General Mathematics, Mathematics::Rings and Algebras, Quotient algebra, Mathematics - Rings and Algebras, Commutative Algebra (math.AC), Mathematics - Commutative Algebra, Central series, Nilpotent Lie algebra, Nilpotent, Rings and Algebras (math.RA), Lie algebra, FOS: Mathematics, Abelian group, Mathematics::Representation Theory, Semisimple Lie algebra, Mathematics

Abstract

Semisimple Lie algebras have been completely classified by Cartan and Killing. The Levi theorem states that every finite dimensional Lie algebra is isomorphic to a semidirect sum of its largest solvable ideal and a semisimple Lie algebra. These focus the classification of solvable Lie algebras as one of the main challenges of Lie algebra research. One approach towards this task is to take a class of nilpotent Lie algebras and construct all extensions of these algebras to solvable ones. In this paper, we propose another approach, i.e., to decompose a solvable nonnilpotent Lie algebra to two nilpotent Lie algebras which are called the left and right nilpotent algebras of the solvable algebra. The right nilpotent algebra is the smallest ideal of the lower central series of the solvable algebra, while the left nilpotent algebra is the factor algebra of the solvable algebra and its right nilpotent algebra. We show that the solvable algebras are decomposable if its left nilpotent algebra is an Abelian algebra of dimension higher than one and its right algebra is an Abelian algebra of dimension one. We further show that all the solvable algebras are isomorphic if their left nilpotent algebras are Heisenberg algebras of fixed dimension and their right algebras are Abelian algebras of dimension one., arXiv admin note: text overlap with arXiv:1901.10687

Published

2020

36. Solvable Lie Algebras of Derivations of Rank One

Author

A. P. Petravchuk and Kateryna Sysak

Subjects

Solvable Lie algebra, Pure mathematics, Rank (linear algebra), Polynomial ring, Lie algebra, Derivation, Mathematics

Published

2019

37. (Co)homology of Lie algebras via algebraic Morse theory.

Author

Lampret, Leon and Vavpetič, Aleš

Subjects

*HOMOLOGY theory, *LIE algebras, *MORSE theory, *DIFFERENTIABLE manifolds, *MATRICES (Mathematics), *HOMOLOGICAL algebra

Abstract

The fundamental theorem of cancellation AMT [4] and [11] , which is the algebraic generalization of discrete Morse theory [2] for simplicial complexes and smooth Morse theory [10] for differentiable manifolds, is discussed in the context of general chain complexes of free modules. The Chevalley (co)homology table of a Lie algebra is often a tremendous beast. Using AMT, we compute the homology of the Lie algebra of all triangular matrices sol n over Q or Z p for large enough primes p . We determine the column and row in the table of H k ( sol n ; Z ) where the p -torsion first appears. Module H k ( sol n ; Z p ) is expressed by the homology of a chain subcomplex for the Lie algebra of all strictly triangular matrices nil n , using the Künneth formula. All conclusions are accompanied by computer experiments. Then we generalize some results to Lie algebras of (strictly) triangular matrices gl n ≺ and gl n ⪯ with respect to any partial ordering ⪯ on [ n ] . We determine the multiplicative structure of H ⁎ ( gl n ⪯ ) w.r.t. the cup product over fields of zero or sufficiently large characteristic, the result being the exterior algebra. Matchings used here can be analogously defined for other Lie algebra families and in other (co)homology theories; we collectively call them normalization matchings . They are useful for theoretical as well as computational purposes. [ABSTRACT FROM AUTHOR]

Published

2016

38. Solvable Indecomposable Extensions of Two Nilpotent Lie Algebras.

Author

Shabanskaya, A.

Subjects

SOLVABLE groups, GROUP extensions (Mathematics), NILPOTENT Lie groups, MATHEMATICAL sequences, RING theory

Abstract

A pair of sequences of nilpotent Lie algebras denoted byNn, 7andNn, 16are introduced. Here,ndenotes the dimension of the algebras that are defined forn ≥ 6; the first terms in the sequences are denoted by 6.7 and 6.16, respectively, in the standard list of six-dimensional Lie algebras. For each of them, all possible solvable extensions are constructed so thatNn, 7andNn, 16serve as the nilradical of the corresponding solvable algebras. The construction continues Winternitz’ and colleagues’ program of investigating solvable Lie algebras using special properties rather than trying to extend one dimension at a time. [ABSTRACT FROM PUBLISHER]

Published

2016

39. Solvable extensions of negative Ricci curvature of filiform Lie groups.

Author

Nikolayevsky, Y.

Subjects

*LIE algebras, *NILPOTENT Lie groups, *GRAM-Schmidt process, *EUCLIDEAN geometry, *LINEAR equations, *MATHEMATICAL inequalities

Abstract

We give necessary and sufficient conditions of the existence of a left-invariant metric of strictly negative Ricci curvature on a solvable Lie group the nilradical of whose Lie algebra is a filiform Lie algebra . It turns out that such a metric always exists, except for in the two cases, when is one of the algebras of rank two, or , and is a one-dimensional extension of , in which cases the conditions are given in terms of certain linear inequalities for the eigenvalues of the extension derivation. [ABSTRACT FROM AUTHOR]

Published

2016

40. Locally conformally Kähler structures on four-dimensional solvable Lie algebras

Author

Daniele Angella and Marcos Origlia

Subjects

Mathematics - Differential Geometry, Physics, Solvable Lie algebra, Pure mathematics, 53a30, 53b35, Lie algebra, QA1-939, locally conformally kähler, 22e25, Geometry and Topology, solvable lie algebra, 53B35, 53A30, 22E25, Mathematics

Abstract

We classify and investigate locally conformally K\"ahler structures on four-dimensional solvable Lie algebras up to linear equivalence. As an application we can produce many examples in higher dimension, here including lcK structures on Oeljeklaus-Toma manifolds, and we also give a geometric interpretation of some of the $4$-dimensional structures in our classification., Comment: Minor modifications added to the second version. To appear in Complex Manifolds

Published

2019

41. Local derivations on Solvable Lie algebras

Author

A. Kh. Khudoyberdiyev and Sh. A. Ayupov

Subjects

Solvable Lie algebra, Pure mathematics, Class (set theory), Algebra and Number Theory, Lie algebra, 010103 numerical & computational mathematics, Derivation, 0101 mathematics, 01 natural sciences, Mathematics

Abstract

We show that in the class of solvable Lie algebras there exist algebras which admit local derivations which are not ordinary derivation and also algebras for which every local derivation is a deriv...

Published

2019

42. Jordan–Chevalley Decomposition in Lie Algebras

Author

Fernando Szechtman and Leandro Cagliero

Subjects

Solvable Lie algebra, REPRESENTATION, Pure mathematics, Matemáticas, SOLVABLE LIE ALGEBRA, General Mathematics, 010102 general mathematics, 01 natural sciences, Matemática Pura, 0103 physical sciences, Lie algebra, JORDAN-CHEVALLEY DECOMPOSITION, 010307 mathematical physics, 0101 mathematics, Jordan–Chevalley decomposition, CIENCIAS NATURALES Y EXACTAS, Mathematics

Abstract

We prove that if $\mathfrak{s}$ is a solvable Lie algebra of matrices over a field of characteristic 0 and $A\in \mathfrak{s}$ , then the semisimple and nilpotent summands of the Jordan–Chevalley decomposition of $A$ belong to $\mathfrak{s}$ if and only if there exist $S,N\in \mathfrak{s}$ , $S$ is semisimple, $N$ is nilpotent (not necessarily $[S,N]=0$ ) such that $A=S+N$ .

Published

2019

43. On solvable Lie groups of negative Ricci curvature.

Author

Nikolayevsky, Y. and Nikonorov, Yu.

Abstract

We study solvable Lie groups which admit a left-invariant metric of strictly negative Ricci curvature. We obtain necessary and sufficient conditions of the existence of such a metric for Lie groups the nilradical of whose Lie algebra is either abelian or Heisenberg or standard filiform and discuss some open questions. [ABSTRACT FROM AUTHOR]

Published

2015

44. Numerical Experiment on Optimal Control for the Dubins Car Model

Author

Matej Rajchl, Marek Stodola, and Stanislav Frolík

Subjects

Solvable Lie algebra, 0209 industrial biotechnology, 02 engineering and technology, Fixed point, Optimal control, Manifold, 020901 industrial engineering & automation, Homogeneous space, 0202 electrical engineering, electronic engineering, information engineering, Tangent space, Applied mathematics, 020201 artificial intelligence & image processing, Vector field, Configuration space, Mathematics

Abstract

This paper deals with optimal control of the Dubins car model, whose configuration space is three dimensional smooth manifold. There are computed vector fields that generate solvable Lie algebra isomorphically equivalent to tangent space in each point of the manifold. Then an optimal control problem for finding the shortest curve between two points on the manifold is formulated. The problem is analytically solved for the nilpotent approximation of the fields and fixed points of the symmetries are found. To these fixed points multiple optimal trajectories can lead. The problem is also solved by using numerical simulations and these are compared with the analytical solutions.

Published

2021

45. Codimension Growth for Weak Polynomial Identities, and Non-integrality of the PI Exponent

Author

David Levi da Silva Macedo and Plamen Koshlukov

Subjects

Solvable Lie algebra, Pure mathematics, Polynomial, Lie algebra, Zero (complex analysis), Field (mathematics), Codimension, Type (model theory), Variety (universal algebra), Mathematics

Abstract

Let K be a field of characteristic zero. We study the asymptotic behavior of the codimensions for polynomial identities of representations of Lie algebras, also called weak identities. These identities are related to pairs of the form (A, L) where A is an associative enveloping algebra for the Lie algebra L. First we obtain a characterization of ideals of weak identities with polynomial growth of the codimensions in terms of their cocharacter sequence. Moreover we obtain examples of pairs that generate varieties of pairs of almost polynomial growth. Second we show that any variety of pairs of associative type is generated by the Grassmann envelope of a finitely generated superpair. As a corollary we obtain that any special variety of pairs which does not contain pairs of type (R, sl2), consists of pairs with a solvable Lie algebra. Here sl2 denotes the Lie algebra of the 2 × 2 traceless matrices. Finally we give an example of a pair that contradicts a conjecture due to Amitsur.

Published

2020

46. $\frac{1}{2}$-derivations of Lie algebras and transposed Poisson algebras

Author

Viktor Lopatkin, Bruno Leonardo Macedo Ferreira, and Ivan Kaygorodov

Subjects

Solvable Lie algebra, Pure mathematics, Algebra and Number Theory, Applied Mathematics, 010102 general mathematics, Witt algebra, Mathematics - Rings and Algebras, 01 natural sciences, Superalgebra, 010101 applied mathematics, Computational Mathematics, Nilpotent, Rings and Algebras (math.RA), Lie algebra, FOS: Mathematics, Virasoro algebra, Geometry and Topology, 0101 mathematics, Abelian group, Analysis, Mathematics, Poisson algebra

Abstract

A relation between $$\frac{1}{2}$$ -derivations of Lie algebras and transposed Poisson algebras has been established. Some non-trivial transposed Poisson algebras with a certain Lie algebra (Witt algebra, the algebra $${\mathcal {W}}(a,-1)$$ , the thin Lie algebra and a solvable Lie algebra with abelian nilpotent radical) have been done. In particular, we have developed an example of the transposed Poisson algebra with associative and Lie parts isomorphic to the Laurent polynomials and the Witt algebra. On the other side, it has been proved that there are no non-trivial transposed Poisson algebras with a Lie algebra part isomorphic to a semisimple finite-dimensional algebra, a simple finite-dimensional superalgebra, the Virasoro algebra, $$N=1$$ and $$N=2$$ superconformal algebras, or a semisimple finite-dimensional n-Lie algebra.

Published

2020

47. On generalized G2-structures and T-duality

Author

Viviana del Barco and Lino Grama

Subjects

Solvable Lie algebra, T-duality, Integrable system, 010308 nuclear & particles physics, 010102 general mathematics, Structure (category theory), General Physics and Astronomy, 01 natural sciences, Dual (category theory), Combinatorics, 0103 physical sciences, Geometry and Topology, 0101 mathematics, Mathematical Physics, Mathematics

Abstract

This is a short note on generalized G 2 -structures obtained as a consequence of a T -dual construction given in del Barco et al. (2017). Given classical G 2 -structure on certain seven dimensional manifolds, either closed or co-closed, we obtain integrable generalized G 2 -structures which are no longer a usual one, and with non-zero three form in general. In particular we obtain manifolds admitting closed generalized G 2 -structures not admitting closed (usual) G 2 -structures.

Published

2018

48. Parafree metabelian Lie algebras which are determined by parafree Lie algebras

Author

Zehra Velioğlu

Subjects

Solvable Lie algebra, Parafree Lie algebras,metabelian Lie algebras,solvable Lie algebras, Nilpotent, Pure mathematics, Intersection, Series (mathematics), Lie algebra, General Medicine, Term (logic), Algebra over a field, Mathematics

Abstract

Let L be a Lie algebra. Denote by δ^{k}(L) the k-th term of the derived series of L and by Δ_{w}(L) the intersection of the ideals I of L such that L/I is nilpotent. We prove that if P is a parafree Lie algebra, then the algebra Q=(P/δ^{k}(P))/Δ_{w}(P/δ^{k}(P)), k≥2 is a parafree solvable Lie algebra. Moreover we show that if Q is not free metabelian, then P is not free solvable for k=2.

Published

2018

49. On the nilpotent residuals of all subalgebras of Lie algebras

Author

Wei Meng and Hailou Yao

Subjects

Combinatorics, Solvable Lie algebra, Nilpotent, Series (mathematics), 010102 general mathematics, Lie algebra, Subalgebra, Field (mathematics), 010103 numerical & computational mathematics, Ideal (ring theory), 0101 mathematics, 01 natural sciences, Mathematics

Abstract

Let $$\mathcal{N}$$ denote the class of nilpotent Lie algebras. For any finite-dimensional Lie algebra L over an arbitrary field $$\mathbb{F}$$ , there exists a smallest ideal I of L such that L/I ∈ $$\mathcal{N}$$ . This uniquely determined ideal of L is called the nilpotent residual of L and is denoted by L $$\mathcal{N}$$ . In this paper, we define the subalgebra S(L) = ∩H≤LIL(H $$\mathcal{N}$$ ). Set S0(L) = 0. Define Si+1(L)/Si(L) = S(L/Si(L)) for i > 1. By S∞(L) denote the terminal term of the ascending series. It is proved that L = S∞(L) if and only if L $$\mathcal{N}$$ is nilpotent. In addition, we investigate the basic properties of a Lie algebra L with S(L) = L.

Published

2018

50. Solvable Lie Algebras of Vector Fields and a Lie's Conjecture

Author

Janusz Grabowski and Katarzyna Grabowska

Subjects

Mathematics - Differential Geometry, Pure mathematics, FOS: Physical sciences, Group Theory (math.GR), 01 natural sciences, 0103 physical sciences, Lie algebra, FOS: Mathematics, Ideal (order theory), 0101 mathematics, Mathematical Physics, Mathematics, Solvable Lie algebra, (primary) 17B30 17B66 (secondary) 57R25 57S20, Conjecture, 010102 general mathematics, Mathematical Physics (math-ph), Foliation, Nilpotent Lie algebra, Nilpotent, Differential Geometry (math.DG), Vector field, 010307 mathematical physics, Geometry and Topology, Mathematics - Group Theory, Analysis

Abstract

We present a local and constructive differential geometric description of finite-dimensional solvable and transitive Lie algebras of vector fields. We show that it implies a Lie's conjecture for such Lie algebras. Also infinite-dimensional analytical solvable and transitive Lie algebras of vector fields whose derivative ideal is nilpotent can be adapted to this scheme.

Published

2019