Enhanced Leibniz Algebras: Structure Theorem and Induced Lie 2-Algebra

Abstract

An enhanced Leibniz algebra is an algebraic struture that arises in the context of particular higher gauge theories describing self-interacting gerbes. It consists of a Leibniz algebra (V,[ ·, · ]), a bilinear form on V with values in another vector space W, and a map t W V, satisfying altogether four compatibility relations. Our structure theorem asserts that an enhanced Leibniz algebra is uniquely determined by the underlying Leibniz algebra (V,[ ·, · ]), an appropriate abelian ideal i inside it, as well as a cohomology 2-class [] which only effects the W-valued product. Positive quadratic enhanced Leibniz algebras, as needed for the definition of a Yang-Mills type action functional, turn out to be rather restrictive on the underlying Leibniz algebra (V,[ ·, ]): V has to be the hemisemidirect product of a positive quadratic Lie algebra g with a g-module i, V g i, with i the above-mentioned ideal in this case. The second main result of this article is the construction of a functor from the category of such enhanced Leibniz algebras to the category of (semi-strict) Lie 2-algebras or, equivalentely, of two-term L∞-algebras.