Locally finite infinity-modules and weak Loday-Pirashvili modules over differential graded Lie algebras

Abstract

Motivated by recent developments of ∞-categorical theories related to differential graded (dg for short) Lie algebras, we develop a general framework for locally finite ∞-g-modules over a dg Lie algebra g. We show that the category of such locally finite ∞-g-modules is almost a model category in the sense of Vallette. As a homotopy theoretical generalization of Loday and Pirashvili's Lie algebra objects in the tensor category of linear maps, we further study weak Loday-Pirashvili modules consisting of ∞-morphisms from locally finite ∞-g-modules to the adjoint module g. From the category of such weak Loday-Pirashvili modules over g, we find a functor that maps to the category of Leibniz∞ algebras enriched over the Chevalley-Eilenberg dg algebra of g. This functor can be regarded as the homotopy lifting of Loday and Pirashvili's original method to realize Leibniz algebras from Lie algebra objects in the category of linear maps.