Product of formations of algebraic systems

Shemetkov, L. A.

doi:10.1007/bf01979024

Cited by 45 publications

(74 citation statements)

References 2 publications

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“…Subdirect products allow us to introduce the notion of formation of monoids, which is a particular case of the most general notion of formation of algebraic structures, introduced and studied by Shemetkov and Skiba in [26].…”

Section: Proposition 3 ([11 Proposition 31])mentioning

confidence: 99%

“…Formations of finite groups are important for a better understanding of the structure of finite groups, and the more general notion of formation of algebraic structures, introduced and studied by Shemetkov and Skiba in [26], plays a central role in universal algebra. Therefore it seems quite natural to seek an Eilenberg type theorem establishing a connection between formations of finite monoids and formations of regular languages, which are classes of regular languages closed under Boolean operations and derivatives with a weaker property on the closure under inverse monoid morphism.…”

Section: Introductionmentioning

confidence: 99%

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Formations of Monoids, Congruences, and Formal Languages

Ballester‐Bolinches

Llópez

Esteban‐Romero

et al. 2015

SACS

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The main goal in this paper is to use a dual equivalence in automata theory started in [25] and developed in [3] to prove a general version of the Eilenberg-type theorem presented in [4]. Our principal results confirm the existence of a bijective correspondence between three concepts; formations of monoids, formations of languages and formations of congruences. The result does not require finiteness on monoids, nor regularity on languages nor finite index conditions on congruences. We relate our work to other results in the field and we include applications to non-r-disjunctive languages, Reiterman's equational description of pseudovarieties and varieties of monoids.

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Section: Proposition 3 ([11 Proposition 31])mentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Formations of Monoids, Congruences, and Formal Languages

Ballester‐Bolinches

Llópez

Esteban‐Romero

et al. 2015

SACS

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“…This class was studied in [5]. The reader is also referred to [1,2,3,8,10,15,18,19] for other interesting related results.…”

Section: Theorem B Let G Be a Primitive Group Then Every Core-free mentioning

confidence: 99%

On the abnormal structure of finite groups

Ballester‐Bolinches¹,

Cossey²,

Esteban‐Romero³

2014

Rev. Mat. Iberoam.

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“…The symbol Að p À 1Þ denotes the formation of all abelian groups of exponent dividing p À 1; see [22].…”

Section: Preliminariesmentioning

confidence: 99%

On two questions of L. A. Shemetkov concerning hypercyclically embedded subgroups of finite groups

Skiba¹

2010

Journal of Group Theory

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Abstract. Let G be a finite group. A subgroup A of G is said to be S-quasinormal in G if AP ¼ PA for all Sylow subgroups P of G. The symbol H sG denotes the subgroup generated by all those subgroups of H which are S-quasinormal in G. A subgroup H is said to be S-supplemented in G if G has a subgroup T such that T V H c H sG and HT ¼ G; see [24].Theorem A. Let E be a normal subgroup of a finite group G. Suppose that for every non-cyclic Sylow subgroup P of E, either all maximal subgroups of P or all cyclic subgroups of P of prime order and order 4 are S-supplemented in G.

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Product of formations of algebraic systems

Cited by 45 publications

References 2 publications

Formations of Monoids, Congruences, and Formal Languages

Formations of Monoids, Congruences, and Formal Languages

On the abnormal structure of finite groups

On two questions of L. A. Shemetkov concerning hypercyclically embedded subgroups of finite groups

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