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Main Author: Martins-Ferreira, Nelson
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2408.08721
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author Martins-Ferreira, Nelson
author_facet Martins-Ferreira, Nelson
contents We introduce a novel concept of action for unitary magmas, facilitating the classification of various split extensions within this algebraic structure. Our method expands upon the recent study of split extensions and semidirect products of unitary magmas conducted by Gran, Janelidze, and Sobral. Building on their research, we explore split extensions in which the middle object does not necessarily maintain a bijective correspondence with the Cartesian product of its end objects. Although this phenomenon is not observed in groups or any associative semiabelian variety of universal algebra, it shares similarities with instances found in monoids through weakly Schreier extensions and certain exotic non-associative algebras, such as semi-left-loops. Our work seeks to contribute to the comprehension of split extensions in unitary magmas and may offer valuable insights for potential abstractions of categorical properties in more general contexts.
format Preprint
id arxiv_https___arxiv_org_abs_2408_08721
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Unitary magma actions
Martins-Ferreira, Nelson
Category Theory
20N05, 16W25, 18G15, 08A30, 08B25, 18G10, 18G15
We introduce a novel concept of action for unitary magmas, facilitating the classification of various split extensions within this algebraic structure. Our method expands upon the recent study of split extensions and semidirect products of unitary magmas conducted by Gran, Janelidze, and Sobral. Building on their research, we explore split extensions in which the middle object does not necessarily maintain a bijective correspondence with the Cartesian product of its end objects. Although this phenomenon is not observed in groups or any associative semiabelian variety of universal algebra, it shares similarities with instances found in monoids through weakly Schreier extensions and certain exotic non-associative algebras, such as semi-left-loops. Our work seeks to contribute to the comprehension of split extensions in unitary magmas and may offer valuable insights for potential abstractions of categorical properties in more general contexts.
title Unitary magma actions
topic Category Theory
20N05, 16W25, 18G15, 08A30, 08B25, 18G10, 18G15
url https://arxiv.org/abs/2408.08721