On the infinity category of homotopy Leibniz algebras

Abstract

We discuss various concepts of ∞-homotopies, as well as the relations between them (focussing on the Leibniz type). In particular ∞-n-homotopies appear as the n-simplices of the nerve of a complete Lie ∞-algebra. In the nilpotent case, this nerve is known to be a Kan complex Get09. We argue that there is a quasi-category of ∞-algebras and show that for truncated ∞-algebras, i.e. categorified algebras, this ∞-categorical structure projects to a strict 2-categorical one. The paper contains a shortcut to (∞,1)-categories, as well as a review of Getzler's proof of the Kan property. We make the latter concrete by applying it to the 2-term ∞-algebra case, thus recovering the concept of homotopy of BC04, as well as the corresponding composition rule SS07. We also answer a question of BS07 about composition of ∞-homotopies of ∞-algebras.