Semi-Associative $3$-Algebras (1907.01706v1)

Abstract: A new 3-ary non-associative algebra, which is called a semi-associative $3$-algebra, is introduced, and the double modules and double extensions by cocycles are provided. Every semi-associative $3$-algebra $(A, { , , })$ has an adjacent 3-Lie algebra $(A, [ , , ]c)$. From a semi-associative $3$-algebra $(A, {, , })$, a double module $(\phi, \psi, M)$ and a cocycle $\theta$, a semi-direct product semi-associative $3$-algebra $A\ltimes{\phi\psi} M $ and a double extension $(A\dot+A^*, { , , }_{\theta})$ are constructed, and structures are studied.