Generalized derivations of Complex ω-Lie Superalgebras

Abstract

~Let (g,~[-,-],~ω) be a finite-dimensional complex ω-Lie superalgebra. This paper explores the algbaraic structures of generalized derivation superalgebra GDer(g), compatatible generalized derivations algebra GDerω(g), and their subvarieties such as quasiderivation superalgebra QDer(g)( QDerω(g)), centroid Cent(g) ( Centω(g)) and quasicentroid QCent(g) ( QCentω(g)). We prove that GDerω(g) = QDerω(g) + QCentω(g). We also study the embedding question of compatible quasiderivations of ω-Lie superalgebras, demonstrating that QDerω(g) can be embedded as derivations in a larger ω-Lie superalgebra g and furthermore, we obtain a semidirect sum decomposition: Derω(g)=( QDerω(g)) ZDer(g), when the annihilator of g is zero. In particular, for the 3-dimensional complex ω-Lie superalgebra H, we explicitly calculate GDer(H), GDerω(H), QDer(H) and QDerω(H), and derive the Jordan standard forms of generic elements in these varieties.