An Introduction to L∞-Algebras and their Homotopy Theory

Abstract

In this review we give a detailed introduction to the theory of (curved) L∞-algebras and L∞-morphisms. In particular, we recall the notion of (curved) Maurer-Cartan elements, their equivalence classes and the twisting procedure. The main focus is then the study of the homotopy theory of L∞-algebras and L∞-modules. In particular, one can interpret L∞-morphisms and morphisms of L∞-modules as Maurer-Cartan elements in certain L∞-algebras, and we show that twisting the morphisms with equivalent Maurer-Cartan elements yields homotopic morphisms.

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