In mathematics and theoretical physics, a superalgebra is a Z2-graded algebra. That is, it is an algebra over a commutative ring or field with a decomposition into "even" and "odd" pieces and a multiplication operator that respects the grading.
The prefix super- comes from the theory of supersymmetry in theoretical physics. Superalgebras and their representations, supermodules, provide an algebraic framework for formulating supersymmetry. The study of such objects is sometimes called super linear algebra. Superalgebras also play an important role in related field of supergeometry where they enter into the definitions of graded manifolds, supermanifolds and superschemes.
Let K be a commutative ring. In most applications, K is a field of characteristic 0, such as R or C.
A superalgebra over K is a K-module A with a direct sum decomposition
A=A0 ⊕ A1
AiAj\subeAi+j
A superring, or Z2-graded ring, is a superalgebra over the ring of integers Z.
The elements of each of the Ai are said to be homogeneous. The parity of a homogeneous element x, denoted by, is 0 or 1 according to whether it is in A0 or A1. Elements of parity 0 are said to be even and those of parity 1 to be odd. If x and y are both homogeneous then so is the product xy and
|xy|=|x|+|y|
An associative superalgebra is one whose multiplication is associative and a unital superalgebra is one with a multiplicative identity element. The identity element in a unital superalgebra is necessarily even. Unless otherwise specified, all superalgebras in this article are assumed to be associative and unital.
A commutative superalgebra (or supercommutative algebra) is one which satisfies a graded version of commutativity. Specifically, A is commutative if
yx=(-1)|x||y|xy
for all homogeneous elements x and y of A. There are superalgebras that are commutative in the ordinary sense, but not in the superalgebra sense. For this reason, commutative superalgebras are often called supercommutative in order to avoid confusion.
When the Z2 grading arises as a "rollup" of a Z- or N-graded algebra into even and odd components, then two distinct (but essentially equivalent) sign conventions can be found in the literature.[1] These can be called the "cohomological sign convention" and the "super sign convention". They differ in how the antipode (exchange of two elements) behaves. In the first case, one has an exchange map
xy\mapsto(-1)mn+pqyx
m=\degx
x
p
n=\degy
y
q.
xy\mapsto(-1)pqyx
p=m\bmod2
q=n\bmod2
End(V)\equivHom(V,V)
Hom
Hom
Let A be a superalgebra over a commutative ring K. The submodule A0, consisting of all even elements, is closed under multiplication and contains the identity of A and therefore forms a subalgebra of A, naturally called the even subalgebra. It forms an ordinary algebra over K.
The set of all odd elements A1 is an A0-bimodule whose scalar multiplication is just multiplication in A. The product in A equips A1 with a bilinear form
\mu:A1 ⊗
| A0 |
A1\toA0
\mu(x ⊗ y) ⋅ z=x ⋅ \mu(y ⊗ z)
There is a canonical involutive automorphism on any superalgebra called the grade involution. It is given on homogeneous elements by
\hatx=(-1)|x|x
\hatx=x0-x1
Ai=\{x\inA:\hatx=(-1)ix\}.
The supercommutator on A is the binary operator given by
[x,y]=xy-(-1)|x||y|yx
The supercenter of A is the set of all elements of A which supercommute with all elements of A:
Z(A)=\{a\inA:[a,x]=0forallx\inA\}.
The graded tensor product of two superalgebras A and B may be regarded as a superalgebra A ⊗ B with a multiplication rule determined by:
(a1 ⊗ b1)(a2 ⊗ b2)=
| |b1||a2| | |
| (-1) |
(a1a2 ⊗ b1b2).
One can easily generalize the definition of superalgebras to include superalgebras over a commutative superring. The definition given above is then a specialization to the case where the base ring is purely even.
Let R be a commutative superring. A superalgebra over R is a R-supermodule A with a R-bilinear multiplication A × A → A that respects the grading. Bilinearity here means that
r ⋅ (xy)=(r ⋅ x)y=(-1)|r||x|x(r ⋅ y)
Equivalently, one may define a superalgebra over R as a superring A together with an superring homomorphism R → A whose image lies in the supercenter of A.
One may also define superalgebras categorically. The category of all R-supermodules forms a monoidal category under the super tensor product with R serving as the unit object. An associative, unital superalgebra over R can then be defined as a monoid in the category of R-supermodules. That is, a superalgebra is an R-supermodule A with two (even) morphisms
\begin{align}\mu&:A ⊗ A\toA\ η&:R\toA\end{align}