On Hom-$F$-manifold algebras and quantization

TL;DR

This paper introduces Hom-$F$-manifold algebras, generalizes related algebraic structures, develops their representation theory, and explores their deformations and quantization, linking algebraic structures to geometric concepts.

Contribution

It defines Hom-$F$-manifold algebras, extends the theory of Hom-pre-$F$-manifold algebras, and studies their deformations and quantization, broadening the understanding of algebraic structures related to $F$-manifolds.

Findings

Hom-$F$-manifold algebras are constructed via $ ext{ extbackslash}huaO$-operators.

Hom-$F$-manifold algebras serve as semi-classical limits of Hom-pre-$F$-manifold algebras.

Deformation theory of Hom-$F$-manifold algebras is developed using cohomology.

Abstract

The notion of a $F$-manifold algebras is an algebraic description of a $F$-manifold. In this paper, we introduce the notion of Hom-$F$-manifold algebras which is generalisation of $F$-manifold algebras and Hom-Poisson algebras. We develop the representation theory of Hom-$F$-manifold algebras and generalize the notion of Hom-pre-Poisson algebras by introducing the Hom-pre-$F$-manifold algebras which give rise to a Hom-$F$-manifold algebra through the sub-adjacent commutative Hom-associative algebra and the sub-adjacent Hom-Lie algebra. Using $\huaO$-operators on a Hom-$F$-manifold algebras we construct a Hom-pre-$F$-manifold algebras on a module. Then, we study Hom-pre-Lie formal deformations of commutative Hom-associative algebra and prove that Hom-$F$-manifold algebras are the corresponding semi-classical limits. Finally, we study Hom-Lie infinitesimal deformations and extension of Hom-pre-Lie $n$-deformation to Hom-pre-Lie $(n+1)$-deformation of a commutative Hom-associative algebra via cohomology theory.