symmetric monoidal (∞,1)-category of spectra
The LP category is a category whose Lie algebra objects are Leibniz algebras.
Given any category $C$, one can define the arrow category $\Arr(C)$ of $C$, whose objects are morphisms in $C$ and whose morphisms are commutative squares. If $C$ is the category of vector spaces (or some other $k$-linear closed symmetric monoidal category with equalizers) one can define the infinitesimal or Loday–Pirashvili (LP) tensor product on the category of arrows, as well as an inner hom, equipping the category $\mathrm{Arr} C$ with a structure of a $k$-linear closed symmetric monoidal category.
The LP-tensor product is
This is a truncation of the tensor product of chain complexes where $V_1\otimes W_1$ is dropped.
The inner hom is rather interesting: $\mathbf{Hom}(f,g) = (p:\mathrm{Hom}_1(f,g)\to\mathrm{Hom}_0(f,g))$, where $\mathrm{Hom}_0(f,g)$ is the equalizer of two morphisms
namely precomposing the first summand with $f$ and postcomposing the second summand with $g$ (where $\mathrm{hom}$ is the ordinary inner hom in $C$), and where $\mathrm{Hom}_1(f,g)$ is the equalizer of two morphisms
namely the identity and the map which replaces the lower component with the postcomposition by $g$ applied on $\mathrm{hom}(V_0,W_1)$ and keeps the upper component. Finally, $p$ is the natural projection.
In the case of vector spaces this means that we have diagonal lifts in squares such that the lower square commutes but not necessarily the upper, i.e. $\mathrm{Hom}(f,g)$ is the space consisting of all triples $(u_1,u_0,\phi)$ where $u_1:V_1\to W_1$, $u_0:V_0\to W_0$ and $\phi:V_0\to W_1$ such that $g\circ u_1= u_0\circ f$ and $u_0=g\circ\phi$ while one does not require $\phi\circ f=u_1$.
There are a number of remarkable functors relating internal algebras in LP, Lie algebras in LP etc., to or from some other categories of algebras. For example the categories of left Leibniz algebras and of right Leibniz algebras embed as full subcategories into the category of internal Lie algebras in LP. This embedding has an adjoint. Notice that because of truncation, being a Lie algebra in LP is a bit less than a (strict) $2$-Lie algebra (a requirement in degree $2$ is dropped).
Jean-Louis Loday, Teimuraz Pirashvili, The tensor category of linear maps and Leibniz algebras, Georg. Math. J. vol. 5, n.3 (1998) 263–276 (doi:10.1023/B:GEOR.0000008125.26487.f3)
Last revised on May 23, 2020 at 13:04:12. See the history of this page for a list of all contributions to it.