Nijenhuis deformations of Poisson algebras and $F$-manifold algebras

TL;DR

This paper introduces NS-Poisson and NS-F-manifold algebras as generalizations of classical structures, exploring their deformations via Nijenhuis operators and their relations to existing algebraic frameworks.

Contribution

It defines NS-Poisson and NS-F-manifold algebras, linking them to Nijenhuis deformations and semi-classical limits, unifying various algebraic structures.

Findings

Nijenhuis operators deform Poisson algebras into NS-Poisson algebras

NS-algebra deformations lead to NS-Poisson structures

Nijenhuis deformations of F-manifold algebras produce NS-F-manifold algebras

Abstract

The notion of pre-Poisson algebras was introduced by Aguiar in his study of zinbiel algebras and pre-Lie algebras. In this paper, we first introduce NS-Poisson algebras as a generalization of both Poisson algebras and pre-Poisson algebras. An NS-Poisson algebra has an associated sub-adjacent Poisson algebra. We show that a Nijenhuis operator and a twisted Rota-Baxter operator on a Poisson algebra deforms the structure into an NS-Poisson algebra. The semi-classical limit of an NS-algebra deformation and a suitable filtration of an NS-algebra produce NS-Poisson algebras. On the other hand, F-manifold algebras were introduced by Dotsenko as the underlying algebraic structure of F-manifolds. We also introduce NS-F-manifold algebras as a simultaneous generalization of NS-Poisson algebras, F-manifold algebras and pre-F-manifold algebras. In the end, we show that Nijenhuis deformations of F-manifold algebras and the semi-classical limits of NS-pre-Lie algebra deformations have NS-F-manifold algebra structures.