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15 results on '"Mancini, Manuel"'

1. Non-nilpotent Leibniz algebras with one-dimensional derived subalgebra

Author

Di Bartolo, Alfonso, La Rosa, Gianmarco, and Mancini, Manuel

Subjects
Mathematics - Rings and Algebras, 16W25, 17A32, 17B30, 17B40, 20M99, 22A30
Abstract

In this paper we study non-nilpotent non-Lie Leibniz $\mathbb{F}$-algebras with one-dimensional derived subalgebra, where $\mathbb{F}$ is a field with $\operatorname{char}(\mathbb{F}) \neq 2$. We prove that such an algebra is isomorphic to the direct sum of the two-dimensional non-nilpotent non-Lie Leibniz algebra and an abelian algebra. We denote it by $L_n$, where $n=\dim_{\mathbb{F}} L_n$. This generalizes the result found in [11], which is only valid when $\mathbb{F}=\mathbb{C}$. Moreover, we find the Lie algebra of derivations, its Lie group of automorphisms and the Leibniz algebra of biderivations of $L_n$. Eventually, we solve the coquecigrue problem for $L_n$ by integrating it into a Lie rack., Comment: Final version, accepted for publication

Published
2023
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2. Weak representability of actions of non-associative algebras

Author

Brox, Jose, García-Martínez, Xabier, Mancini, Manuel, Van der Linden, Tim, and Vienne, Corentin

Subjects
Mathematics - Category Theory, Mathematics - Rings and Algebras, 08A35, 08C05, 16B50, 16W25, 17A32, 17A36, 18C05, 18E13
Abstract

We study the categorical-algebraic condition that internal actions are weakly representable (WRA) in the context of varieties of (non-associative) algebras over a field. Our first aim is to give a complete characterization of action accessible, operadic quadratic varieties of non-associative algebras which satisfy an identity of degree two and to study the representability of actions for them. Here we prove that the varieties of two-step nilpotent (anti-)commutative algebras and that of commutative associative algebras are weakly action representable, and we explain that the condition (WRA) is closely connected to the existence of a so-called amalgam. Our second aim is to work towards the construction, still within the context of algebras over a field, of a weakly representing object $E(X)$ for the actions on (or split extensions of) an object $X$. We actually obtain a partial algebra $E(X)$, which we call external weak actor of $X$, together with a monomorphism of functors ${\operatorname{SplExt}(-,X) \rightarrowtail \operatorname{Hom}(U(-),E(X))}$, which we study in detail in the case of quadratic varieties. Furthermore, the relations between the construction of the universal strict general actor $\operatorname{USGA}(X)$ and that of $E(X)$ are described in detail. We end with some open questions., Comment: Major update of the case of commutative associative algebras. Smaller changes throughout the text

Published
2023

3. Isotopisms of nilpotent Leibniz algebras and Lie racks

Author

La Rosa, Gianmarco, Mancini, Manuel, and Nagy, Gábor P.

Subjects
Mathematics - Rings and Algebras, 17A32, 17A36, 17B30, 20M99, 22A30
Abstract

In this paper we study the isotopism classes of two-step nilpotent algebras. We show that every nilpotent Leibniz algebra $\mathfrak{g}$ with $\operatorname{dim}[\mathfrak{g},\mathfrak{g}]=1$ is isotopic to the Heisenberg Lie algebra or to the Heisenberg algebra $\mathfrak{l}_{2n+1}^{J_1}$, where $J_1$ is the $n \times n$ Jordan block of eigenvalue 1. We also prove that two such algebras are isotopic if and only if the Lie racks integrating them are isotopic. This gives the classification of Lie racks whose tangent space at the unit element is a nilpotent Leibniz algebra with one-dimensional commutator ideal. Eventually, we introduce new isotopism invariants for Leibniz algebras and Lie racks., Comment: Final version, accepted for publication

Published
2023
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4. On the representability of actions of Leibniz algebras and Poisson algebras

Author

Cigoli, Alan S., Mancini, Manuel, and Metere, Giuseppe

Subjects
Mathematics - Category Theory, Mathematics - Rings and Algebras, 08C05, 18E13, 16B50, 17A36, 16W25, 17A32, 17B63
Abstract

In a recent paper, motivated by the study of central extensions of associative algebras, George Janelidze introduces the notion of weakly action representable category. In this paper, we show that the category of Leibniz algebras is weakly action representable and we characterize the class of acting morphisms. Moreover, we study the representability of actions of the category of Poisson algebras and we prove that the subvariety of commutative Poisson algebras is not weakly action representable., Comment: Final version, accepted for publication

Published
2023
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5. Derivations of two-step nilpotent algebras

Author

La Rosa, Gianmarco and Mancini, Manuel

Subjects
Mathematics - Rings and Algebras, 15B30, 16W25, 17A32, 17A36, 17B40
Abstract

In this paper we study the Lie algebras of derivations of two-step nilpotent algebras. We obtain a class of Lie algebras with trivial center and abelian ideal of inner derivations. Among these, the relations between the complex and the real case of the indecomposable Heisenberg Leibniz algebras are thoroughly described. Finally we show that every almost inner derivation of a complex nilpotent Leibniz algebra with one-dimensional commutator ideal, with three exceptions, is an inner derivation., Comment: Final version, accepted for publication

Published
2023
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6. Biderivations of low-dimensional Leibniz algebras

Author

Mancini, Manuel

Subjects
Mathematics - Rings and Algebras, 15B30, 16W25, 17A32, 17A36, 17B40
Abstract

In this paper we give a complete classification of the Leibniz algebras of biderivations of right Leibniz algebras of dimension up to three over a field $\mathbb{F}$, with $\operatorname{char}(\mathbb{F})\neq 2$. We describe the main properties of such class of Leibniz algebras and we also compute the biderivations of the four-dimensional Dieudonn\'e Leibniz algebra $\mathfrak{d}_1$. Eventually we give an algorithm for finding derivations and anti-derivations of a Leibniz algebra as pair of matrices with respect to a fixed basis., Comment: Conference paper. Final version, accepted for publication

Published
2022
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7. Two-step nilpotent Leibniz algebras

Author

Mancini, Manuel and La Rosa, Gianmarco

Subjects
Mathematics - Rings and Algebras, 17A32, 22A30, 20M99
Abstract

In this paper we give a complete classification of two-step nilpotent Leibniz algebras in terms of Kronecker modules associated with pairs of bilinear forms. In particular, we describe the complex and the real case of the indecomposable Heisenberg Leibniz algebras as a generalization of the classical $(2n+1)-$dimensional Heisenberg Lie algebra $\mathfrak{h}_{2n+1}$. Then we use the Leibniz algebras - Lie local racks correspondence proposed by S. Covez to show that nilpotent real Leibniz algebras have always a global integration. As an application, we integrate the indecomposable nilpotent real Leibniz algebras with one-dimensional commutator ideal. We also show that every Lie quandle integrating a Leibniz algebra is induced by the conjugation of a Lie group and the Leibniz algebra is the Lie algebra of that Lie group., Comment: Final version, accepted for publication

Published
2021
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10. Isotopisms of nilpotent Leibniz algebras and Lie racks.

Author

La Rosa, Gianmarco, Mancini, Manuel, and Nagy, Gábor P.

Subjects
NILPOTENT Lie groups, LIE algebras, ALGEBRA, EIGENVALUES
Abstract

In this paper we study the isotopism classes of two-step nilpotent algebras. We show that every nilpotent Leibniz algebra g with dim [ g , g ] = 1 is isotopic to the Heisenberg Lie algebra or to the Heisenberg algebra l 2 n + 1 J 1 , where J1 is the n × n Jordan block of eigenvalue 1. We also prove that two such algebras are isotopic if and only if the Lie racks integrating them are isotopic. This gives the classification of Lie racks whose tangent space at the unit element is a nilpotent Leibniz algebra with one-dimensional commutator ideal. Eventually, we introduce new isotopism invariants for Leibniz algebras and Lie racks. [ABSTRACT FROM AUTHOR]

Published
2024
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13. Weak representability of actions of non-associative algebras

Author

García-Martínez, Xabier, Mancini, Manuel, Van der Linden, Tim, and Vienne, Corentin

Subjects
Rings and Algebras (math.RA), FOS: Mathematics, 08A35, 08C05, 16B50, 16W25, 17A32, 17A36, 18C05, 18E13, Mathematics - Category Theory, Category Theory (math.CT), Mathematics - Rings and Algebras
Abstract

We study the categorical-algebraic condition that internal actions are weakly representable (WRA) in the context of varieties of (non-associative) algebras over a field. It is known that such a variety is action accessible if and only if it is algebraically coherent, and it is also known that (both) these conditions are implied by (WRA) in this context. Our first aim is to separate them, by giving examples of action accessible varieties which do not satisfy (WRA): we prove that the varieties of commutative associative algebras, of Jacobi-Jordan algebras and of anti-commutative anti-associative algebras (over a field of characteristic different from 2) are such. Thus we answer a question asked by George Janelidze. We further show that amongst quadratic varieties of (anti-)commutative algebras, these are the only examples. Our second aim is to work towards the construction, still within the context of algebras over a field, of a weakly representing object $E(X)$ for the actions on (or split extensions of) an object $X$. We actually obtain a partial algebra $E(X)$, which we call external weak actor of $X$, together with a monomorphism of functors $SplExt(-,X) \to Hom(-,E(X))$, which we study in detail in the case of quadratic varieties. We end with some open questions.

Published
2023
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