Antisymmetric Tensor (original) (raw)
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An antisymmetric (also called alternating) tensor is a tensor which changes sign when two indices are switched. For example, a tensor 
such that
 |
(1) |
|---|
is antisymmetric.
The simplest nontrivial antisymmetric tensor is therefore an antisymmetric rank-2 tensor, which satisfies
 |
(2) |
|---|
Furthermore, any rank-2 tensor can be written as a sum of symmetric and antisymmetric parts as
 |
(3) |
|---|
The antisymmetric part of a tensor 
is sometimes denoted using the special notation
![A^([ab])=1/2(A^(ab)-A^(ba)).](http://mathworld.wolfram.com/images/equations/AntisymmetricTensor/NumberedEquation4.svg) |
(4) |
|---|
For a general rank-
tensor,
![A^([a_1...a_n])=1/(n!)epsilon_(a_1...a_n)sum_(permutations)A^(a_1...a_n),](http://mathworld.wolfram.com/images/equations/AntisymmetricTensor/NumberedEquation5.svg) |
(5) |
|---|
where 
is the permutation symbol. Symbols for the symmetric and antisymmetric parts of tensors can be combined, for example
![T^((ab)c)_([de])=1/4(T^(abc)_(de)+T^(bac)_(de)-T^(abc)_(ed)-T^(bac)_(ed)).](http://mathworld.wolfram.com/images/equations/AntisymmetricTensor/NumberedEquation6.svg) |
(6) |
|---|
(Wald 1984, p. 26).
See also
Alternating Multilinear Form, Exterior Algebra, Symmetric Tensor, Wedge Product
Portions of this entry contributed by Todd Rowland
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References
Wald, R. M. General Relativity. Chicago, IL: University of Chicago Press, 1984.
Referenced on Wolfram|Alpha
Cite this as:
Rowland, Todd and Weisstein, Eric W. "Antisymmetric Tensor." From MathWorld--A Wolfram Resource. https://mathworld.wolfram.com/AntisymmetricTensor.html