Bialgebras induced by special left Alia algebras

Abstract

Special left Alia algebras were introduced by Dzhumadil'daev in [J. Math. Sci. (N.Y.) 161(2009), 11-30] when studying the classification of algebras with skew-symmetric identity of degree 3. A special left Alia algebra (resp. coalgebra) (A, [,](f,g)) (resp. (A, (F,G))) is constructed by a commutative associative algebra (resp. cocommutative coassociative coalgebra) (A, ·) (resp. (A, δ)) together with two linear maps f, g: A A (resp. F, G: A A). We find that if ((A, ·), f) (resp. ((A, δ), F)) is a Nijenhuis associative algebra (resp. coassociative coalgebra) such that f g=g f (resp. F G=G F), then ((A, [,](f,g)), f) (resp. ((A, (F,G)), F)) is a Nijenhuis left Alia algebra (resp. coalgebra). A bialgebraic structure, named Nijenhuis associative D-bialgebra and denoted by ((A, ·, δ), f, F), for ((A, ·), f) and ((A, δ), F) was presented in [J. Algebra 639(2024), 150-186]. In this paper, we investigate the bialgebraic structure, named Nijenhuis left Alia bialgebra and denoted by ((A, [,], ), N, S), for a Nijenhuis left Alia algebra ((A, [,]), N) and a Nijenhuis left Alia coalgebra ((A, ), S), such that Nijenhuis special left Alia bialgebra ((A, [,](f,g), (F,G)), f, F) can be induced by Nijenhuis commutative cocommutative associative D-bialgebra ((A, ·, δ), f, F). We also provide a method to construct Nijenhuis operators on a left Alia algebra (resp. coalgebra).