Homogeneous Rota-Baxter operators on 3-Lie algebra Aω

Abstract

In the paper we study homogeneous Rota-Baxter operators with weight zero on the infinite dimensional simple 3-Lie algebra Aω over a field F ( ch F=0 ) which is realized by an associative commutative algebra A and a derivation and an involution ω ( Lemma lem:rbd3 ). A homogeneous Rota-Baxter operator on Aω is a linear map R of Aω satisfying R(Lm)=f(m)Lm for all generators of Aω, where f : Aω → F. We proved that R is a homogeneous Rota-Baxter operator on Aω if and only if R is the one of the five possibilities R01, R02,R03,R04 and R05, which are described in Theorem thm:thm1, thm:thm4, thm:thm01, thm:thm03 and thm:thm04. By the five homogeneous Rota-Baxter operators R0i, we construct new 3-Lie algebras (A, [ , , ]i) for 1≤ i≤ 5, such that R0i is the homogeneous Rota-Baxter operator on 3-Lie algebra (A, [ , , ]i), respectively.