F-algebroids and deformation quantization via pre-Lie algebroids

Abstract

In this paper, first we introduce a new approach to the notion of F-algebroids, which is a generalization of F-manifold algebras and F-manifolds, and show that F-algebroids are the corresponding semi-classical limits of pre-Lie formal deformations of commutative associative algebroids. Then we use the deformation cohomology of pre-Lie algebroids to study pre-Lie infinitesimal deformations and extension of pre-Lie n-deformations to pre-Lie (n+1)-deformations of a commutative associative algebroid. Next we develop the theory of Dubrovin's dualities of F-algebroids with eventual identities and use Nijenhuis operators on F-algebroids to construct new F-algebroids. Finally we introduce the notion of pre-F-algebroids, which is a generalization of F-manifolds with compatible flat connections. Dubrovin's dualities of pre-F-algebroids with eventual identities, Nijenhuis operators on pre-F-algebroids and their applications to integral systems are discussed.