Axioms, Vol. 14, Pages 790: Non-Global Lie Higher Derivations on Triangular Algebras Without Assuming Unity

Axioms doi: 10.3390/axioms14110790

Authors:
Xinfeng Liang
Yujiao Sun

This work establishes a unified structural theory for non-global Lie higher derivations on triangular algebras T, without assuming the existence of a unit element. The primary contribution is the introduction of extreme non-global Lie higher derivations and the proof that every non-global Lie higher derivation on T admits a unique decomposition into three components: a higher derivation, an extreme non-global Lie higher derivation, and a central map vanishing on all commutators [x,y], where x,y∈T satisfy xy=0. This general framework is then explicitly applied to describe such derivations on two significant classes of algebras: upper triangular matrix algebras over faithful algebras and over semiprime algebras. By encompassing both unital and non-unital cases within a single characterization, the theory developed here not only generalizes numerous earlier results but also substantially expands the scope of the existing research landscape.

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