Conformal triple derivations and triple homomorphisms of Lie conformal algebras

Abstract

Let R be a finite Lie conformal algebra. In this paper, we first investigate the conformal derivation algebra CDer(R), the conformal triple derivation algebra CTDer(R) and the generalized conformal triple derivation algebra GCTDer(R). Mainly, we focus on the connections among these derivation algebras. Next, we give a complete classification of (generalized) conformal triple derivation algebras on all finite simple Lie conformal algebras. In particular, CTDer(R)= CDer(R), where R is a finite simple Lie conformal algebra. But for GCDer(R), we obtain a conclusion that is closely related to CDer(R). Finally, we introduce the definition of triple homomorphism of a Lie conformal algebra. Furthermore, triple homomorphisms of all finite simple Lie conformal algebras are also characterized.