English

Semidirect products in Universal Algebra

Rings and Algebras 2023-11-09 v1

Abstract

First of all, we recall the well known notion of semidirect product both for classical algebraic structures (like groups and rings) and for more recent ones (digroups, left skew braces, heaps, trusses). Then we analyse the concept of semidirect product for an arbitrary algebra AA in a variety V\cal{V} of type~F\cal{F}. An inner semidirect-product decomposition A=BωA=B \ltimes\omega of AA consists of a subalgebra BB of AA and a congruence ω\omega on AA such that BB is a set of representatives of the congruence classes of AA modulo ω\omega. An outer semidirect product is the restriction to BB of a functor from a suitable category CB\cal{C}_B containing BB, called the enveloping category of BB, to the category Set_* of pointed sets.

Keywords

Cite

@article{arxiv.2311.04321,
  title  = {Semidirect products in Universal Algebra},
  author = {Alberto Facchini and David Stanovský},
  journal= {arXiv preprint arXiv:2311.04321},
  year   = {2023}
}
R2 v1 2026-06-28T13:14:35.287Z