Non-additive Lie centralizer of infinite strictly upper triangular matrices
author
Abstract:
Let $mathcal{F}$ be an field of zero characteristic and $N_{infty}(mathcal{F})$ be the algebra of infinite strictly upper triangular matrices with entries in $mathcal{F}$, and $f:N_{infty}(mathcal{F})rightarrow N_{infty}(mathcal{F})$ be a non-additive Lie centralizer of $N_{infty }(mathcal{F})$; that is, a map satisfying that $f([X,Y])=[f(X),Y]$ for all $X,Yin N_{infty}(mathcal{F})$. We prove that $f(X)=lambda X$, where $lambda in mathcal{F}$.
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Journal title
volume 08 issue 04
pages 251- 255
publication date 2019-12-01
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