On the structures of split $δ$ Jordan-Lie algebras
arXiv:1411.6692 · doi:10.4134/BKMS.b160568
Abstract
We study the structures of arbitrary split $δ$ Jordan-Lie algebras with symmetric root systems. We show that any of such algebras $L$ is of the form $L = U + \sum\limits_{[j] \in Î/\sim}I_{[j]}$ with $U$ a subspace of $H$ and any $I_{[j]}$, a well described ideal of $L$, satisfying $[I_{[j]}, I_{[k]}] = 0$ if $[j]\neq [k]$. Under certain conditions, the simplicity of $L$ is characterized and it is shown that $L$ is the direct sum of the family of its minimal ideals, each one being a simple split $δ$ Jordan-Lie algebra with a symmetric root system and having all its nonzero roots connected.
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