Alternating multilinear map

In mathematics, more specifically in multilinear algebra, an alternating multilinear map is a multilinear map with all arguments belonging to the same vector space (for example, a bilinear form or a multilinear form) that is zero whenever any pair of its arguments is equal. This generalizes directly to a module over a commutative ring.

The notion of alternatization (or alternatisation) is used to derive an alternating multilinear map from any multilinear map of which all arguments belong to the same space.

Definition[edit]

Let $R$ be a commutative ring and $V$ , $W$ be modules over $R$ . A multilinear map of the form $f:V^{n}\to W$ is said to be alternating if it satisfies the following equivalent conditions:

whenever there exists ${\textstyle 1\leq i\leq n-1}$ such that $x_{i}=x_{i+1}$ then $f(x_{1},\ldots ,x_{n})=0$ .^[1]^[2]
whenever there exists ${\textstyle 1\leq i\neq j\leq n}$ such that $x_{i}=x_{j}$ then $f(x_{1},\ldots ,x_{n})=0$ .^[1]^[3]

Vector spaces[edit]

Let $V,W$ be vector spaces over the same field. Then a multilinear map of the form $f:V^{n}\to W$ is alternating if it satisfies the following condition:

if $x_{1},\ldots ,x_{n}$ are linearly dependent then $f(x_{1},\ldots ,x_{n})=0$ .

Example[edit]

In a Lie algebra, the Lie bracket is an alternating bilinear map. The determinant of a matrix is a multilinear alternating map of the rows or columns of the matrix.

Properties[edit]

If any component $x_{i}$ of an alternating multilinear map is replaced by $x_{i}+cx_{j}$ for any $j\neq i$ and $c$ in the base ring $R$ , then the value of that map is not changed.^[3]

Every alternating multilinear map is antisymmetric,^[4] meaning that^[1]

f(\dots ,x_{i},x_{i+1},\dots )=-f(\dots ,x_{i+1},x_{i},\dots )\quad {\text{ for any }}1\leq i\leq n-1,

or equivalently,

f(x_{\sigma (1)},\dots ,x_{\sigma (n)})=(\operatorname {sgn} \sigma )f(x_{1},\dots ,x_{n})\quad {\text{ for any }}\sigma \in \mathrm {S} _{n},

where

\mathrm {S} _{n}

denotes the permutation group of degree

n

and

\operatorname {sgn} \sigma

is the sign of

\sigma

.^[5] If

n!

is a unit in the base ring

R

, then every antisymmetric

n

-multilinear form is alternating.

Alternatization[edit]

Given a multilinear map of the form $f:V^{n}\to W,$ the alternating multilinear map $g:V^{n}\to W$ defined by

g(x_{1},\ldots ,x_{n})\mathrel {:=} \sum _{\sigma \in S_{n}}\operatorname {sgn}(\sigma )f(x_{\sigma (1)},\ldots ,x_{\sigma (n)})

is said to be the alternatization of

f

.

Properties

The alternatization of an $n$ -multilinear alternating map is $n!$ times itself.
The alternatization of a symmetric map is zero.
The alternatization of a bilinear map is bilinear. Most notably, the alternatization of any cocycle is bilinear. This fact plays a crucial role in identifying the second cohomology group of a lattice with the group of alternating bilinear forms on a lattice.

Notes[edit]

^ ^a ^b ^c Lang 2002, pp. 511–512
^ Bourbaki 2007, A III.80, §4
^ ^a ^b Dummit & Foote 2004, p. 436
^ Rotman 1995, p. 235
^ Tu 2011, p. 23

References[edit]

Bourbaki, N. (2007). Eléments de mathématique. Vol. Algèbre Chapitres 1 à 3 (reprint ed.). Springer.
Dummit, David S.; Foote, Richard M. (2004). Abstract Algebra (3rd ed.). Wiley.
Lang, Serge (2002). Algebra. Graduate Texts in Mathematics. Vol. 211 (revised 3rd ed.). Springer. ISBN 978-0-387-95385-4. OCLC 48176673.
Rotman, Joseph J. (1995). An Introduction to the Theory of Groups. Graduate Texts in Mathematics. Vol. 148 (4th ed.). Springer. ISBN 0-387-94285-8. OCLC 30028913.
Tu, Loring W. (2011). An Introduction to Manifolds. Springer-Verlag New York. ISBN 978-1-4419-7400-6.

[FOOTNOTELang2002511–512-1] Lang 2002, pp. 511–512

[FOOTNOTEBourbaki2007A_III.80,_§4-2] Bourbaki 2007, A III.80, §4

[FOOTNOTEDummitFoote2004436-3] Dummit & Foote 2004, p. 436

[FOOTNOTERotman1995235-4] Rotman 1995, p. 235

[FOOTNOTETu201123-5] Tu 2011, p. 23

[1]

[2]

[3]

[4]

[5]