A unified approach to some rigidity and stability problems in algebra

TL;DR

This paper applies algebraic deformation theory to classical problems in the rigidity and stability of Lie and associative algebras, providing new criteria and simplified proofs for existing results.

Contribution

It introduces a unified algebraic framework using Maurer-Cartan elements to analyze deformation and stability problems in Lie and associative algebras.

Findings

Criteria for local surjectivity of Maurer-Cartan maps

Simplified proof of deformation equivalence for unital associative algebras

Results on stability of Lie subalgebras and their morphisms

Abstract

In this note, we use give some algebraic applications of a previous result by the author which compares the deformations parameterized by the Maurer-Cartan elements of a differential graded Lie algebra, and a differential graded Lie subalgebra: It gives a criterion for the map on the space of Maurer-Cartan elements up to gauge equivalence, induced by the inclusion of the subalgebra, to be locally surjective. By making appropriate choices for the differential graded Lie algebra and a differential graded Lie subalgebra, we recover some classical results in the deformation theory of finite-dimensional Lie and associative algebras. We consider rigidity of Lie and associative algebras, Lie algebra morphisms, and give a quick proof of the fact that the deformation theories of a unital associative algebra as a unital associative algebra and as an associative algebra are equivalent. We then turn to stability of Lie subalgebras and their morphisms under deformations of the ambient Lie algebra structure, and study when the compatibility with a geometric structure of a representation of a Lie algebra on a vector space is stable under deformations of the representation.