Regular Hom-Lie structures on incidence algebras
We fully characterize regular Hom-Lie structures on the incidence algebra $I(X,K)$ of a finite connected poset $X$ over a field $K$. We prove that such a structure is the sum of a central-valued linear map annihilating the Jacobson radical of $I(X,K)$ with the composition of certain inner and multip...
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| Sprache: | eng |
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| Zusammenfassung: | We fully characterize regular Hom-Lie structures on the incidence algebra
$I(X,K)$ of a finite connected poset $X$ over a field $K$. We prove that such a
structure is the sum of a central-valued linear map annihilating the Jacobson
radical of $I(X,K)$ with the composition of certain inner and multiplicative
automorphisms of $I(X,K)$. |
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| DOI: | 10.48550/arxiv.2212.12591 |