Solvability and nilpotency of transposed Novikov-Poisson algebras
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Abstract
In this paper, we develop the theory of nilpotency and solvability for transposed Novikov-Poisson algebras.
We first establish several equivalent conditions for a dialgebra to be nilpotent, and show that the lower central series of a transposed Novikov-Poisson algebra $P$ admits a simplified form.
We then prove that $P$ is solvable if and only if it is right nilpotent, and also if and only if $P^2$ is nilpotent.
Moreover, we show that nilpotency (respectively, solvability) of a transposed Novikov-Poisson algebra is equivalent to nilpotency (respectively, solvability) of both its underlying commutative associative algebra and its underlying Novikov algebra.
Finally, we prove that Itô's theorem holds for transposed Novikov-Poisson algebras.