Anticommutative
A
mathematical operator
(typically a binary operator, represented by *) is
anticommutative
iff
it is true that "x * y = −(y * x)" for all x and y on the operator's valid domain (e.g.
R
for subtraction, and
R
3
vectors
for cross products). Examples:
Subtraction
Cross product
Lie algebras
See also
Commutativity
.
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