Hom-groups, representations and homological algebra

Hassanzadeh, Mohammad

doi:10.4064/cm7560-8-2018

Cited by 9 publications

(10 citation statements)

References 6 publications

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“…Throughout this paper, we consider regular Hom-groups that is the case when the structure map is invertible, and this notion can be traced back to Caenepeel and Goyvaerts's pioneering work [3]. The axioms in the following definition of Hom-group is different from the one in [7,8,13]. However, we show that if the structure map is invertible, then some axioms in the original definition are redundant and can be obtained from the Hom-associativity condition.…”

Section: Hom-groupsmentioning

confidence: 99%

“…He also proved Lagrange's theorem for finite Hom-groups in [8]. The recent developments on Hom-groups (see [7,8,13]) make it natural to study Hom-Lie groups and to explore the relationship between Hom-Lie groups and Hom-Lie algebras.…”

Section: Introductionmentioning

confidence: 99%

“…Moreover, one can associate a Hom-group to any Hom-Lie algebra by considering group-like elements in its universal enveloping algebra. Recently, M. Hassanzadeh developed representations and a (co)homology theory for Hom-groups in [7]. He also proved Lagrange's theorem for finite Hom-groups in [8].…”

Section: Introductionmentioning

confidence: 99%

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Hom-Lie Algebras and Hom-Lie Groups, Integration and Differentiation

Jiang

Mishra

Sheng³

2020

SIGMA

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In this paper, we introduce the notion of a (regular) Hom-Lie group. We associate a Hom-Lie algebra to a Hom-Lie group and show that every regular Hom-Lie algebra is integrable. Then, we define a Hom-exponential (Hexp) map from the Hom-Lie algebra of a Hom-Lie group to the Hom-Lie group and discuss the universality of this Hexp map. We also describe a Hom-Lie group action on a smooth manifold. Subsequently, we give the notion of an adjoint representation of a Hom-Lie group on its Hom-Lie algebra. At last, we integrate the Hom-Lie algebra (gl(V),[.,.],Ad), and the derivation Hom-Lie algebra of a Hom-Lie algebra.

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Section: Hom-groupsmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

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Hom-Lie Algebras and Hom-Lie Groups, Integration and Differentiation

Jiang

Mishra

Sheng³

2020

SIGMA

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“…One can associate a Hom-group to any Hom-Lie algebra by considering group-like elements in its universal enveloping algebra. Recently, M. Hassanzadeh developed representations and a (co)homology theory for Hom-groups in [7]. He also proved Lagrange's theorem for finite Hom-groups in [8].…”

Section: Introductionmentioning

confidence: 99%

Free Hom-groups, Hom-rings and Semisimple modules

Basdouri¹,

Chouaibi²,

Makhlouf³

et al. 2021

Preprint

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The purpose of this paper is to introduce and study a Hom-type generalization of rings. We provide their basic properties and and some key constructions. Furthermore, we consider modules over Hom-rings and characterize the category of simple modules and simple Hom-rings. In addition, we extend some classical results and concepts of groups to Hom-groups. We construct free regular Hom-group using Super-Leaf weighted trees and discuss Normal Hom-subgroups, abelianization of regular Hom-group, universality of tensor product of Hom-groups and simple Hom-groups.

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“…It is shown that a Homassociative algebra gives rise to a Hom-Lie algebra using the commutator. Since then, various Hom-analogues of some classical algebraic structures have been introduced and studied intensively, such as Hom-coalgebras, Hom-bialgebras and Hom-Hopf algebras [24,25], Hom-groups [26,27], Hom-Hopf modules [28], Hom-Lie superalgebras [29,30], generalize Hom-Lie algebras [31], and Hom-Poisson algebras [32].…”

Section: Introductionmentioning

confidence: 99%