Nijenhuis pre-Lie bialgebras, Nijenhuis Lie bialgebras and \sss-equation (2508.02983v1)

Abstract: Two aspects on the important notion of pre-Lie algebras are pre-Lie bialgebras (or left-symmetric bialgebras) with motivation from para-K\"ahler Lie algebras, and Nijenhuis operators on pre-Lie algebras arising from their deformation theory. In this paper, we present a method to construct Nijenhuis operators on a pre-Lie algebras via pseudo-Hessian pre-Lie algebras. Next, we introduce the notion of Nijenhuis operators on pre-Lie coalgebras and give their constructions, one from a linearly compatible pre-Lie coalgebra structure, and one from pre-Lie bialgebras. We then obtain a bialgebraic structure on Nijenhuis pre-Lie algebras by using dual representations and study their relations with \sss-equations and $\mathcal{O}$-operators. Finally we prove that a Nijenhuis balanced pre-Lie bialgebra produces a Nijenhuis Lie bialgebra.