A characterization of finite dimensional nilpotent Filippov algebras

“…So, we conclude β i,j,k = 0 for each 1 ≤ i < j < k ≤ 6, (i, j, k) = (1, 2, 3) , (4, 5, 6). Thus 1 ≤ i < j < k ≤ 6, (i, j, k) = (1, 2, 3), (4,5,6). Now, by choosing J = e 8 , we have dim (A/J ) 2 = 1.…”

“…In this case, according to the structure of A/I , we have α 0 = α i,j,k = 0. Therefore, the brackets of A are as follows: (4,5,6) . According to the above brackets and special Heisenberg n-Lie algebra, the above algebra is isomorphic to H (3, 1) ⊕ F (3).…”

On classification of (n+5)-dimensional nilpotent n-Lie algebra of class two

“…So, we conclude β i,j,k = 0 for each 1 ≤ i < j < k ≤ 6, (i, j, k) = (1, 2, 3) , (4, 5, 6). Thus 1 ≤ i < j < k ≤ 6, (i, j, k) = (1, 2, 3), (4,5,6). Now, by choosing J = e 8 , we have dim (A/J ) 2 = 1.…”

“…In this case, according to the structure of A/I , we have α 0 = α i,j,k = 0. Therefore, the brackets of A are as follows: (4,5,6) . According to the above brackets and special Heisenberg n-Lie algebra, the above algebra is isomorphic to H (3, 1) ⊕ F (3).…”

On classification of (n+5)-dimensional nilpotent n-Lie algebra of class two

“…One can define the solvable ideal of a Filippov algebra, simple and semisimple Filippov algebras, etc., see [28]. Some properties of nilpotent Filippov algebras were studied in [15,16,21]. Two cohomological properties of semisimple Lie algebras also hold in the Filippov algebras case.…”

Degenerations of Filippov algebras

“…Theorem 3.1 [18]. Let A be a nilpotent n-Lie algebra of dimension d ¼ n þ k for 3 ≤ k ≤ n þ 1 such that A 2 ¼ Z ðAÞ and dimA2 ¼ 2.…”

On classification of (n + 6)-dimensional nilpotent n-Lie algebras of class 2 with n ≥ 4