V
V,
\wedge
v\wedgev=0
v
V.
\wedge
V
V.
The wedge product of
k
v1\wedgev2\wedge...\wedgevk
k
k
v\wedgew
v
w,
k
v\wedgev=0
v\wedgew=-w\wedgev,
The full exterior algebra contains objects that are not themselves blades, but linear combinations of blades; a sum of blades of homogeneous degree
k
k
k
V.
k
V,
The exterior algebra is universal in the sense that every equation that relates elements of
V
V
V
The definition of the exterior algebra can be extended for spaces built from vector spaces, such as vector fields and functions whose domain is a vector space. Moreover, the field of scalars may be any field (however for fields of characteristic two, the above condition
v\wedgev=0
v\wedgew+w\wedgev=0,
k
k
R2
{e}1=\begin{bmatrix}1\\0\end{bmatrix}, {e}2 =\begin{bmatrix}0\\1\end{bmatrix}.
Suppose that
v=\begin{bmatrix}a\\b\end{bmatrix} =ae1+be2, w =\begin{bmatrix}c\\d\end{bmatrix} =ce1+de2
v
w
Area =l|\det\begin{bmatrix}v&w\end{bmatrix}r| =l|\det\begin{bmatrix}a&c\ b&d\end{bmatrix}r| =\left|ad-bc\right|.
Consider now the exterior product of
v
\begin{align} v\wedgew &=(ae1+be2)\wedge(ce1+de2)\\ &=ace1\wedgee1+ade1\wedgee2+bce2\wedgee1+bde2\wedgee2\\ &=\left(ad-bc\right)e1\wedgee2 \end{align}
e2\wedgee1=-(e1\wedgee2).
e1\wedgee1=e2\wedgee2=0.
The fact that this coefficient is the signed area is not an accident. In fact, it is relatively easy to see that the exterior product should be related to the signed area if one tries to axiomatize this area as an algebraic construct. In detail, if denotes the signed area of the parallelogram of which the pair of vectors v and w form two adjacent sides, then A must satisfy the following properties:
With the exception of the last property, the exterior product of two vectors satisfies the same properties as the area. In a certain sense, the exterior product generalizes the final property by allowing the area of a parallelogram to be compared to that of any chosen parallelogram in a parallel plane (here, the one with sides e1 and e2). In other words, the exterior product provides a basis-independent formulation of area.[3]
For vectors in R3, the exterior algebra is closely related to the cross product and triple product. Using the standard basis, the exterior product of a pair of vectors
u=u1e1+u2e2+u3e3
v=v1e1+v2e2+v3e3
u\wedgev=(u1v2-u2v1)(e1\wedgee2)+(u3v1-u1v3)(e3\wedgee1)+(u2v3-u3v2)(e2\wedgee3)
Bringing in a third vector
w=w1e1+w2e2+w3e3,
u\wedgev\wedgew=(u1v2w3+u2v3w1+u3v1w2-u1v3w2-u2v1w3-u3v2w1)(e1\wedgee2\wedgee3)
The cross product and triple product in three dimensions each admit both geometric and algebraic interpretations. The cross product can be interpreted as a vector which is perpendicular to both u and v and whose magnitude is equal to the area of the parallelogram determined by the two vectors. It can also be interpreted as the vector consisting of the minors of the matrix with columns u and v. The triple product of u, v, and w is geometrically a (signed) volume. Algebraically, it is the determinant of the matrix with columns u, v, and w. The exterior product in three dimensions allows for similar interpretations. In fact, in the presence of a positively oriented orthonormal basis, the exterior product generalizes these notions to higher dimensions.
The exterior algebra
wedge(V)
V
K
I
x ⊗ x
x\inV
wedge(V):=T(V)/I.
The exterior product
\wedge
wedge(V)
\alpha\wedge\beta=\alpha ⊗ \beta\pmodI.
The exterior product is by construction alternating on elements of, which means that
x\wedgex=0
x\inV,
0=(x+y)\wedge(x+y) =x\wedgex+x\wedgey+y\wedgex+y\wedgey =x\wedgey+y\wedgex
x\wedgey=-(y\wedgex).
More generally, if
\sigma
x\sigma(1)\wedgex\sigma(2)\wedge … \wedgex\sigma(k)=sgn(\sigma)x1\wedgex2\wedge … \wedgexk,
sgn(\sigma)
In particular, if
xi=xj
x1\wedgex2\wedge … \wedgexk=0.
Together with the distributive property of the exterior product, one further generalization is that a necessary and sufficient condition for
\{x1,x2,...,xk\}
x1\wedgex2\wedge … \wedgexk=0.
The th exterior power of, denoted, is the vector subspace of spanned by elements of the form
x1\wedgex2\wedge … \wedgexk, xi\inV,i=1,2,...,k.
If, then
\alpha
\alpha
k
\alpha
{stylewedge}k(V)
\alpha=e1\wedgee2+e3\wedgee4.
If the dimension of
V
n
\{e1,...,en\}
V
| \{e | |
| i1 |
\wedge
| e | |
| i2 |
\wedge … \wedge
| e | |
| ik |
~ |~~1\lei1<i2< … <ik\len\}
v1\wedge … \wedgevk,
vj
vj
By counting the basis elements, the dimension of
{stylewedge}k(V)
\dim{stylewedge}k(V)=\binom{n}{k},
{stylewedge}k(V)=\{0\}
Any element of the exterior algebra can be written as a sum of -vectors. Hence, as a vector space the exterior algebra is a direct sum
{stylewedge}(V) ={stylewedge}0(V) ⊕ {stylewedge}1(V) ⊕ {stylewedge}2(V) ⊕ … ⊕ {stylewedge}n(V)
If, then it is possible to express
\alpha
\alpha=\alpha(1)+\alpha(2)+ … +\alpha(s)
\alpha(i)
\alpha(i)=
| (i) | |
| \alpha | |
| 1 |
\wedge … \wedge
| (i) | |
| \alpha | |
| k, |
i=1,2,\ldots,s.
The rank of the -vector
\alpha
Rank is particularly important in the study of 2-vectors . The rank of a 2-vector
\alpha
\alpha
ei
\alpha
\alpha=\sumi,jaijei\wedgeej
aij=-aji
aij
\alpha
In characteristic 0, the 2-vector
\alpha
p
\underset{p}{\underbrace{\alpha\wedge … \wedge\alpha}} ≠ 0
\underset{p+1}{\underbrace{\alpha\wedge … \wedge\alpha}}=0.
The exterior product of a -vector with a -vector is a
(k+p)
{stylewedge}(V)={stylewedge}0(V) ⊕ {stylewedge}1(V) ⊕ {stylewedge}2(V) ⊕ … ⊕ {stylewedge}n(V)
{stylewedge}k(V) \wedge{stylewedge}p(V) \sub{stylewedge}k+p(V).
Moreover, if is the base field, we have
{stylewedge}0(V)=K
{stylewedge}1(V)=V.
The exterior product is graded anticommutative, meaning that if
\alpha\in{stylewedge}k(V)
\alpha\wedge\beta=(-1)kp\beta\wedge\alpha.
In addition to studying the graded structure on the exterior algebra, studies additional graded structures on exterior algebras, such as those on the exterior algebra of a graded module (a module that already carries its own gradation).
Let be a vector space over the field . Informally, multiplication in
{stylewedge}(V)
v\wedgev=0
{stylewedge}(V)
j:V\toA
j(v)j(v)=0
f:{stylewedge}(V)\toA
To construct the most general algebra that contains and whose multiplication is alternating on, it is natural to start with the most general associative algebra that contains, the tensor algebra, and then enforce the alternating property by taking a suitable quotient. We thus take the two-sided ideal in generated by all elements of the form for in, and define
{stylewedge}(V)
{stylewedge}(V)=T(V)/I
{stylewedge}(V)
As a consequence of this construction, the operation of assigning to a vector space its exterior algebra
{stylewedge}(V)
Rather than defining
{stylewedge}(V)
{stylewedge}k(V)
{stylewedge}k(V)
R
R
{stylewedge}(M)
{stylewedge}(M)
M
M
Exterior algebras of vector bundles are frequently considered in geometry and topology. There are no essential differences between the algebraic properties of the exterior algebra of finite-dimensional vector bundles and those of the exterior algebra of finitely generated projective modules, by the Serre–Swan theorem. More general exterior algebras can be defined for sheaves of modules.
For a field of characteristic not 2,[7] the exterior algebra of a vector space
V
K
T(V)
k
K
I
T(V)
I
Let
Tr(V)
r
v1 ⊗ … ⊗ vr, vi\inV.
The antisymmetrization (or sometimes the skew-symmetrization) of a decomposable tensor is defined by
\operatorname{l{A}(r)
r! ≠ 0
r!
\operatorname{Alt}(r)(v1 ⊗ … ⊗ vr) =
| 1 | |
| r! |
\operatorname{l{A}(r)
l{A}
\rm{Alt}
Note that
\operatorname{l{A}(r)
Such that, when defined,
\operatorname{Alt}(r)
l{A}(T(V))
l{A}(r)
l{A}
\operatorname{Alt}
A(V)
\widehat{ ⊗ }
t\wedges=t~\widehat{ ⊗ }~s=\operatorname{Alt}(t ⊗ s).
Assuming
K
A(V)
I
A(V)\cong{stylewedge}(V).
l{A}
\rm{Alt}
A(V)\cong{stylewedge}(V)
A(V)
| \wedge |
Finally, we always get isomorphic with, but the product could (or should) be chosen in two ways (or only one). Actually, the product could be chosen in many ways, rescaling it on homogeneous spaces as
c(r+p)/c(r)c(p)
c(r)
Suppose that V has finite dimension n, and that a basis of V is given. Then any alternating tensor can be written in index notation with the Einstein summation convention as
t=
| i1i2 … ir | |
| t |
| {e} | |
| i1 |
⊗
| {e} | |
| i2 |
⊗ … ⊗
| {e} | |
| ir |
,
The exterior product of two alternating tensors t and s of ranks r and p is given by
t~\widehat{ ⊗ }~s =
| 1 | |
| (r+p)! |
\sum\sigmar+p
The components of this tensor are precisely the skew part of the components of the tensor product, denoted by square brackets on the indices:
| i1 … ir+p | |
| (t~\widehat{ ⊗ }~s) |
=
| [i1 … ir | |
| t |
| ir+1 … ir+p] | |
| s |
.
The interior product may also be described in index notation as follows. Let
t=
| i0i1 … ir-1 | |
| t |
(\iota\alpha
| i1 … ir-1 | |
| t) |
=
| n\alpha | |
| r\sum | |
| j |
| ji1 … ir-1 | |
| t |
.
Given two vector spaces V and X and a natural number k, an alternating operator from Vk to X is a multilinear map
f:Vk\toX
f(v1,\ldots,vk)=0.
The map
w:Vk\to{stylewedge}k(V),
k
V
k
Vk;
f:Vk → X,
\phi:{stylewedge}k(V) → X
f=\phi\circw.
Vk
See also: Alternating multilinear map.
The above discussion specializes to the case when, the base field. In this case an alternating multilinear function
f:Vk\toK
k
V
V
V
n
Vk
K
Under such identification, the exterior product takes a concrete form: it produces a new anti-symmetric map from two given ones. Suppose and are two anti-symmetric maps. As in the case of tensor products of multilinear maps, the number of variables of their exterior product is the sum of the numbers of their variables. Depending on the choice of identification of elements of exterior power with multilinear forms, the exterior product is defined as
\omega\wedgeη=\operatorname{Alt}(\omega ⊗ η)
\omega
| \wedge |
η =
| (k+m)! | |
| k!m! |
\operatorname{Alt}(\omega ⊗ η),
K
\operatorname{Alt}(\omega)(x1,\ldots,xk) =
| 1 | |
| k! |
| \sum | |
| \sigma\inSk |
\operatorname{sgn}(\sigma)\omega(x\sigma(1),\ldots,x\sigma(k)).
K
{\omega
| \wedge |
η(x1,\ldots,xk+m)} =
| \sum | |
| \sigma\inShk,m |
\operatorname{sgn}(\sigma)\omega(x\sigma(1),\ldots,x\sigma(k))η(x\sigma(k+1),\ldots,x\sigma(k+m)),
See also: Interior product. Suppose that
V
V*
\iota\alpha:{stylewedge}k(V) → {stylewedge}k-1(V).
This derivation is called the interior product with, or sometimes the insertion operator, or contraction by .
Suppose that . Then
w
V*
k-1
(\iota\alphaw)(u1,u2,\ldots,uk-1) =w(\alpha,u1,u2,\ldots,uk-1).
Additionally, let
\iota\alphaf=0
f
The interior product satisfies the following properties:
Λ-1(V)=\{0\}
\iota\alpha:{stylewedge}k(V) → {stylewedge}k-1(V).
v
V
V
\iota\alpha
\iota\alpha(a\wedgeb) =(\iota\alphaa)\wedgeb+(-1)\dega\wedge(\iota\alphab).
These three properties are sufficient to characterize the interior product as well as define it in the general infinite-dimensional case.
Further properties of the interior product include:
\iota\alpha\circ\iota\alpha=0.
\iota\alpha\circ\iota\beta=-\iota\beta\circ\iota\alpha.
See main article: article and Hodge star operator. Suppose that
V
{stylewedge}k(V*) ⊗ {stylewedge}n(V) \to{stylewedge}n-k(V)
\iota\alpha=\iota\beta\circ\iota\alpha.
In the geometrical setting, a non-zero element of the top exterior power
{stylewedge}n(V)
{stylewedge}k(V*)\to{stylewedge}n-k(V) :\alpha\mapsto\iota\alpha\sigma.
If, in addition to a volume form, the vector space V is equipped with an inner product identifying
V
\star:{stylewedge}k(V) → {stylewedge}n-k(V).
The composition of
\star
{stylewedge}k(V)\to{stylewedge}k(V)
\star\circ\star:{stylewedge}k(V)\to{stylewedge}k(V)=(-1)k(n-k)id
For a finite-dimensional space, an inner product (or a pseudo-Euclidean inner product) on defines an isomorphism of
V
{stylewedge}k(V)
\left\langlev1\wedge … \wedgevk,w1\wedge … \wedgewk\right\rangle=\detl(\langlevi,wj\rangler),
the determinant of the matrix of inner products. In the special case, the inner product is the square norm of the k-vector, given by the determinant of the Gramian matrix . This is then extended bilinearly (or sesquilinearly in the complex case) to a non-degenerate inner product on
{stylewedge}k(V).
| e | |
| i1 |
\wedge … \wedge
| e | |
| ik |
, i1< … <ik,
With respect to the inner product, exterior multiplication and the interior product are mutually adjoint. Specifically, for,, and,
\langlex\wedgev,w\rangle =\langlev,
| \iota | |
| x\flat |
w\rangle
x\flat(y)=\langlex,y\rangle
Indeed, more generally for,, and, iteration of the above adjoint properties gives
\langlex\wedgev,w\rangle =\langlev,
| \iota | |
| x\flat |
w\rangle
x\flat\in{stylewedge}l\left(V*\right)\simeql({stylewedge}l(V)r)*
x\flat(y)=\langlex,y\rangle
There is a correspondence between the graded dual of the graded algebra
{stylewedge}(V)
The exterior product of multilinear forms defined above is dual to a coproduct defined on, giving the structure of a coalgebra. The coproduct is a linear function, which is given by
\Delta(v)=1 ⊗ v+v ⊗ 1
1
{stylewedge}(V)
\Delta(v\wedgew)=1 ⊗ (v\wedgew)+v ⊗ w-w ⊗ v+(v\wedgew) ⊗ 1.
Expanding this out in detail, one obtains the following expression on decomposable elements:
\Delta(x1\wedge … \wedgexk) =
| k | |
| \sum | |
| p=0 |
\sum\sigma \operatorname{sgn}(\sigma)(x\sigma(1)\wedge … \wedgex\sigma(p)) ⊗ (x\sigma(p+1)\wedge … \wedgex\sigma(k)).
v\sigma(1)\wedge...\wedgev\sigma(p)
v\sigma(p+1)\wedge...\wedgev\sigma(k)
{stylewedge}(V)
xk
Observe that the coproduct preserves the grading of the algebra. Extending to the full space one has
\Delta:{stylewedge}k(V) \to
| k | |
| oplus | |
| p=0 |
{stylewedge}p(V) ⊗ {stylewedge}k-p(V)
The tensor symbol ⊗ used in this section should be understood with some caution: it is not the same tensor symbol as the one being used in the definition of the alternating product. Intuitively, it is perhaps easiest to think it as just another, but different, tensor product: it is still (bi-)linear, as tensor products should be, but it is the product that is appropriate for the definition of a bialgebra, that is, for creating the object . Any lingering doubt can be shaken by pondering the equalities and, which follow from the definition of the coalgebra, as opposed to naive manipulations involving the tensor and wedge symbols. This distinction is developed in greater detail in the article on tensor algebras. Here, there is much less of a problem, in that the alternating product
\wedge
⊗
⊗
In terms of the coproduct, the exterior product on the dual space is just the graded dual of the coproduct:
(\alpha\wedge\beta)(x1\wedge … \wedgexk) =(\alpha ⊗ \beta)\left(\Delta(x1\wedge … \wedgexk)\right)
where the tensor product on the right-hand side is of multilinear linear maps (extended by zero on elements of incompatible homogeneous degree: more precisely,, where
\varepsilon
The counit is the homomorphism
\varepsilon:{stylewedge}(V)\toK
With an antipode defined on homogeneous elements by, the exterior algebra is furthermore a Hopf algebra.[8]
Suppose that
V
W
f:V\toW
{stylewedge}(f):{stylewedge}(V) → {stylewedge}(W)
| 1 | |
| {stylewedge}(f)\left| | |
| {stylewedge |
(V)}\right. =f:V={stylewedge}1(V) → W={stylewedge}1(W).
In particular,
{stylewedge}(f)
{stylewedge}(f)(x1\wedge … \wedgexk) =f(x1)\wedge … \wedgef(xk).
Let
{stylewedge}k(f) =
| k | |
| {stylewedge}(f)\left| | |
| {stylewedge |
(V)}\right. :{stylewedge}k(V) → {stylewedge}k(W).
The components of the transformation relative to a basis of
V
W
k x k
V=W
V
{stylewedge}n(f)
{stylewedge}n(V)
If
0\toU\toV\toW\to0
0\to{stylewedge}1(U)\wedge{stylewedge}(V) \to{stylewedge}(V)\to{stylewedge}(W)\to0
is an exact sequence of graded vector spaces,[9] as is
0\to{stylewedge}(U)\to{stylewedge}(V).
In particular, the exterior algebra of a direct sum is isomorphic to the tensor product of the exterior algebras:
{stylewedge}(V ⊕ W) \cong{stylewedge}(V) ⊗ {stylewedge}(W).
This is a graded isomorphism; i.e.,
{stylewedge}k(V ⊕ W) \congoplusp+q=k{stylewedge}p(V) ⊗ {stylewedge}q(W).
0=F0\subseteqF1\subseteq … \subseteqFk\subseteqFk+1={stylewedge}k(V)
Fp
p\geq1
u1\wedge\ldots\wedgeuk\wedgev1\wedge\ldotsvp
ui\inU
vi\inV.
Fp+1/Fp\cong{stylewedge}k-p(U) ⊗ {stylewedge}p(W)
u1\wedge\ldots\wedgeuk\wedgev1\wedge\ldots\wedgevp\mapstou1\wedge\ldots\wedgeuk-p ⊗ g(v1)\wedge\ldots\wedgeg(vp).
In particular, if U is 1-dimensional then
0\toU ⊗ {stylewedge}k-1(W) \to{stylewedge}k(V) \to{stylewedge}k(W)\to0
0\to{stylewedge}k(U) \to{stylewedge}k(V) \to{stylewedge}k-1(U) ⊗ W\to0
The natural setting for (oriented)
k
A
k+1
A0,A1,...,Ak
k
A0A1\wedgeA0A2\wedge … \wedgeA0Ak={}
| jA | |
| (-1) | |
| jA |
0\wedgeAjA1\wedgeAjA2\wedge … \wedgeAjAk
PQ
P
Q
n
The sum of the
(k-1)
The vector space structure on
{stylewedge}(V)
(u1+u2)\wedgev=u1\wedgev+u2\wedgev
v1\wedge...\wedgevk
In applications to linear algebra, the exterior product provides an abstract algebraic manner for describing the determinant and the minors of a matrix. For instance, it is well known that the determinant of a square matrix is equal to the volume of the parallelotope whose sides are the columns of the matrix (with a sign to track orientation). This suggests that the determinant can be defined in terms of the exterior product of the column vectors. Likewise, the minors of a matrix can be defined by looking at the exterior products of column vectors chosen at a time. These ideas can be extended not just to matrices but to linear transformations as well: the determinant of a linear transformation is the factor by which it scales the oriented volume of any given reference parallelotope. So the determinant of a linear transformation can be defined in terms of what the transformation does to the top exterior power. The action of a transformation on the lesser exterior powers gives a basis-independent way to talk about the minors of the transformation.
See main article: Electromagnetic tensor. In physics, many quantities are naturally represented by alternating operators. For example, if the motion of a charged particle is described by velocity and acceleration vectors in four-dimensional spacetime, then normalization of the velocity vector requires that the electromagnetic force must be an alternating operator on the velocity. Its six degrees of freedom are identified with the electric and magnetic fields.
F=dA
Fij=A[i,j]=A[i;j],
dF=ddA=0
F[ij,k]=F[ij;k]=0.
\star
J={\star}d{\star}F
Ji=
| ij | |
| F | |
| ,j |
=
| ij | |
| F | |
| ;j |
Fij=gikgjlFkl.
The decomposable -vectors have geometric interpretations: the bivector
u\wedgev
u
u\wedgev\wedgew
Decomposable -vectors in
{stylewedge}k(V)
The exterior algebra has notable applications in differential geometry, where it is used to define differential forms.[12] Differential forms are mathematical objects that evaluate the length of vectors, areas of parallelograms, and volumes of higher-dimensional bodies, so they can be integrated over curves, surfaces and higher dimensional manifolds in a way that generalizes the line integrals and surface integrals from calculus. A differential form at a point of a differentiable manifold is an alternating multilinear form on the tangent space at the point. Equivalently, a differential form of degree is a linear functional on the th exterior power of the tangent space. As a consequence, the exterior product of multilinear forms defines a natural exterior product for differential forms. Differential forms play a major role in diverse areas of differential geometry.
An alternate approach defines differential forms in terms of germs of functions.
In particular, the exterior derivative gives the exterior algebra of differential forms on a manifold the structure of a differential graded algebra. The exterior derivative commutes with pullback along smooth mappings between manifolds, and it is therefore a natural differential operator. The exterior algebra of differential forms, equipped with the exterior derivative, is a cochain complex whose cohomology is called the de Rham cohomology of the underlying manifold and plays a vital role in the algebraic topology of differentiable manifolds.
In representation theory, the exterior algebra is one of the two fundamental Schur functors on the category of vector spaces, the other being the symmetric algebra. Together, these constructions are used to generate the irreducible representations of the general linear group (see Fundamental representation).
The exterior algebra over the complex numbers is the archetypal example of a superalgebra, which plays a fundamental role in physical theories pertaining to fermions and supersymmetry. A single element of the exterior algebra is called a supernumber[13] or Grassmann number. The exterior algebra itself is then just a one-dimensional superspace: it is just the set of all of the points in the exterior algebra. The topology on this space is essentially the weak topology, the open sets being the cylinder sets. An -dimensional superspace is just the -fold product of exterior algebras.
Let
L
\partial:{stylewedge}p+1(L)\to{stylewedge}p(L)
\partial(x1\wedge … \wedgexp+1) =
| 1 | |
| p+1 |
\sumj<\ell(-1)j+\ell+1[xj,x\ell]\wedgex1\wedge … \wedge\hat{x}j\wedge … \wedge\hat{x}\ell\wedge … \wedgexp+1.
The Jacobi identity holds if and only if, and so this is a necessary and sufficient condition for an anticommutative nonassociative algebra
L
The exterior algebra is the main ingredient in the construction of the Koszul complex, a fundamental object in homological algebra.
The exterior algebra was first introduced by Hermann Grassmann in 1844 under the blanket term of Ausdehnungslehre, or Theory of Extension.[14] This referred more generally to an algebraic (or axiomatic) theory of extended quantities and was one of the early precursors to the modern notion of a vector space. Saint-Venant also published similar ideas of exterior calculus for which he claimed priority over Grassmann.[15]
The algebra itself was built from a set of rules, or axioms, capturing the formal aspects of Cayley and Sylvester's theory of multivectors. It was thus a calculus, much like the propositional calculus, except focused exclusively on the task of formal reasoning in geometrical terms.[16] In particular, this new development allowed for an axiomatic characterization of dimension, a property that had previously only been examined from the coordinate point of view.
The import of this new theory of vectors and multivectors was lost to mid-19th-century mathematicians,[17] until being thoroughly vetted by Giuseppe Peano in 1888. Peano's work also remained somewhat obscure until the turn of the century, when the subject was unified by members of the French geometry school (notably Henri Poincaré, Élie Cartan, and Gaston Darboux) who applied Grassmann's ideas to the calculus of differential forms.
A short while later, Alfred North Whitehead, borrowing from the ideas of Peano and Grassmann, introduced his universal algebra. This then paved the way for the 20th-century developments of abstract algebra by placing the axiomatic notion of an algebraic system on a firm logical footing.
Includes a treatment of alternating tensors and alternating forms, as well as a detailed discussion of Hodge duality from the perspective adopted in this article.
This is the main mathematical reference for the article. It introduces the exterior algebra of a module over a commutative ring (although this article specializes primarily to the case when the ring is a field), including a discussion of the universal property, functoriality, duality, and the bialgebra structure. See §III.7 and §III.11.
This book contains applications of exterior algebras to problems in partial differential equations. Rank and related concepts are developed in the early chapters.
Chapter XVI sections 6–10 give a more elementary account of the exterior algebra, including duality, determinants and minors, and alternating forms.
Contains a classical treatment of the exterior algebra as alternating tensors, and applications to differential geometry.
An introduction to the exterior algebra, and geometric algebra, with a focus on applications. Also includes a history section and bibliography.
Includes applications of the exterior algebra to differential forms, specifically focused on integration and Stokes's theorem. The notation in this text is used to mean the space of alternating k-forms on V; i.e., for Spivak is what this article would call Spivak discusses this in Addendum 4.
Includes an elementary treatment of the axiomatization of determinants as signed areas, volumes, and higher-dimensional volumes.
This textbook in multivariate calculus introduces the exterior algebra of differential forms adroitly into the calculus sequence for colleges.
Chapter 10: The Exterior Product and Exterior Algebras
k
k
V
W
{stylewedge}
{stylewedge}