Any square matrix 
can be written as a sum
 |
(1)
|
where
 |
(2)
|
is a symmetric matrix known as the symmetric part of 
and
 |
(3)
|
is an antisymmetric matrix known as the antisymmetric part of 
.
Here, 
is the transpose.
Any rank-2 tensor can be written as a sum of symmetric and antisymmetric parts as
 |
(4)
|
The antisymmetric part of a tensor 
is sometimes denoted using the special notation
![A^([ab])=1/2(A^(ab)-A^(ba)).](/images/equations/AntisymmetricPart/NumberedEquation5.svg) |
(5)
|
For a general rank-
tensor,
![A^([a_1...a_n])=1/(n!)epsilon_(a_1...a_n)sum_(permutations)A^(a_1...a_n),](/images/equations/AntisymmetricPart/NumberedEquation6.svg) |
(6)
|
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)).](/images/equations/AntisymmetricPart/NumberedEquation7.svg) |
(7)
|
(Wald 1984, p. 26).
