Please use this identifier to cite or link to this item: https://hdl.handle.net/10216/174498
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dc.creatorBarreiro, E
dc.creatorCalderón, AJ
dc.creatorSamuel A Lopes
dc.creatorSánchez, JM
dc.date.accessioned2026-06-04T01:31:46Z-
dc.date.available2026-06-04T01:31:46Z-
dc.date.issued2023
dc.identifier.issn0308-1087
dc.identifier.othersigarra:673642
dc.identifier.urihttps://hdl.handle.net/10216/174498-
dc.description.abstractWe consider a Leibniz algebra L = J circle plus D over an arbitrary base field F, being J the ideal generated by the products [x,x],x is an element of L. This ideal has a fundamental role in the study presented in our paper. A basis B = {v(i)}(i is an element of I) of L is called multiplicative if for any i,j is an element of I we have that [v(i), v(j)] is an element of Fv(k) for some k is an element of I. We associate an adequate graph Gamma (L, B) to L relative to B. By arguing on this graph we show that L decomposes as a direct sum of ideals, each one being associated to one connected component of Gamma(L, B). Also the minimality of L and the division property of L are characterized in terms of the weak symmetry of the defined subgraphs Gamma(L, B-J) and Gamma (L, B-D).
dc.language.isoeng
dc.rightsopenAccess
dc.titleLeibniz algebras and graphs
dc.typeArtigo em Revista Científica Internacional
dc.contributor.uportoFaculdade de Ciências
dc.identifier.doi10.1080/03081087.2022.2092048
dc.identifier.authenticusP-00W-SZ0
Appears in Collections:FCUP - Artigo em Revista Científica Internacional

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