Module braces: relations between the additive and the multiplicative groups

Corso, Ilaria Del

doi:10.1007/s10231-023-01349-4

Annali di Matematica

2023

DOI: 10.1007/s10231-023-01349-4

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Module braces: relations between the additive and the multiplicative groups

Ilaria Del Corso

Abstract: In this paper, we define a class of braces that we call module braces or R-braces, which are braces for which the additive group has also a module structure over a ring R, and for which the values of the gamma functions are automorphisms of R-modules. This class of braces has already been considered in the literature in the case where the ring R is a field; we generalise the definition to any ring R, reinterpreting it in terms of the so-called gamma function associated with the brace, and prove that this class… Show more

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2024

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Cited by 2 publications

References 40 publications

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Deformed solutions of the Yang–Baxter equation associated to dual weak braces

Mazzotta,

Rybołowicz,

Stefanelli

2024

Annali di Matematica

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A recent method for acquiring new solutions of the Yang–Baxter equation involves deforming the classical solution associated with a skew brace. In this work, we demonstrate the applicability of this method to a dual weak brace $$\left( S,+,\circ \right) $$ S , + , ∘ and prove that all elements generating deformed solutions belong precisely to the set $$\mathcal {D}_r(S)=\{z \in S \mid \forall a,b \in S \, \, (a+b) \circ z = a\circ z-z+b \circ z\}$$ D r ( S ) = { z ∈ S ∣ ∀ a , b ∈ S ( a + b ) ∘ z = a ∘ z - z + b ∘ z } , which we term the distributor of S. We show it is a full inverse subsemigroup of $$\left( S, \circ \right) $$ S , ∘ and prove it is an ideal for certain classes of braces. Additionally, we express the distributor of a brace S in terms of the associativity of the operation $$\cdot $$ · , with $$\circ $$ ∘ representing the circle or adjoint operation. In this context, $$(\mathcal {D}_r(S),+,\cdot )$$ ( D r ( S ) , + , · ) constitutes a Jacobson radical ring contained within S. Furthermore, we explore parameters leading to non-equivalent solutions, emphasizing that even deformed solutions by idempotents may not be equivalent. Lastly, considering S as a strong semilattice $$[Y, B_\alpha , \phi _{\alpha ,\beta }]$$ [ Y , B α , ϕ α , β ] of skew braces $$B_\alpha $$ B α , we establish that a deformed solution forms a semilattice of solutions on each skew brace $$B_\alpha $$ B α if and only if the semilattice Y is bounded by an element 1 and the deforming element z lies in $$B_1$$ B 1 .

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Deformed solutions of the Yang–Baxter equation associated to dual weak braces

Mazzotta,

Rybołowicz,

Stefanelli

2024

Annali di Matematica

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On Fuchs' problem for finitely generated abelian groups: The small torsion case

Del Corso,

Stefanello

2024

Journal of London Math Soc

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A classical problem, raised by Fuchs in 1960, asks to classify the abelian groups which are groups of units of some rings. In this paper, we consider the case of finitely generated abelian groups, solving Fuchs' problem for such groups with the additional assumption that the torsion subgroups are small, for a suitable notion of small related to the Prüfer rank. As a concrete instance, we classify for each the realisable groups of the form . Our tools require an investigation of the adjoint group of suitable radical rings of odd prime power order appearing in the picture, giving conditions under which the additive and adjoint groups are isomorphic. In the last section, we also deal with some groups of order a power of 2, proving that the groups of the form are realisable if and only if or is a Fermat prime.

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Module braces: relations between the additive and the multiplicative groups

Cited by 2 publications

References 40 publications

Deformed solutions of the Yang–Baxter equation associated to dual weak braces

Deformed solutions of the Yang–Baxter equation associated to dual weak braces

On Fuchs' problem for finitely generated abelian groups: The small torsion case

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