PlanetPhysics/Non Commutative Structure

Let ${\displaystyle (C,\circ )}$ be a structure consisting of a class , ${\displaystyle C}$, together with a binary [[../Cod/|operation]] ${\displaystyle \circ }$ defined for pairs of [[../TrivialGroupoid/|objects]] in ${\displaystyle C}$ (or elements of ${\displaystyle C}$ when the latter is a small class, i.e., a set). The structure-- and the operation ${\displaystyle \circ }$-- are said to be [[../AbelianCategory3/|noncommutative]] if

${\displaystyle \begin{array}{c}a\circ b\ne b\circ a\end{array}}$

for either at least some or all of the ${\displaystyle a,b}$ pairs in ${\displaystyle C}$ for which the operation is defined.

A structure that is noncommutative is also called sometimes a \htmladdnormallink{non-Abelian {http://planetphysics.us/encyclopedia/AbelianCategory3.html} structure}, although the latter term is, in general, more often used to specify non-Abelian theories. A binary operation that is not commutative is said to be [[../AbelianCategory3/|non-commutative]] (or noncommutative ). Thus, a noncommutative structure can be alternatively defined as any structure whose binary operation is not commutative (that is, in the commutative case one has

${\displaystyle \begin{array}{c}a\circ b=b\circ a\end{array}}$

for all ${\displaystyle a,b}$ pairs in ${\displaystyle C}$, and also that the operation ${\displaystyle \circ }$ is defined for all pairs in ${\displaystyle C}$).

An example of a commutative structure is the [[../CosmologicalConstant2/|field]] of real numbers-- with two commutative operations in this case-- which are the addition and multiplication over the reals.

A [[../AbelianCategory3/|commutative group]] is also called Abelian , whereas a [[../Cod/|category]] with structure that has [[../Commutativity/|commutative diagrams]] is not necessarily Abelian --unless it does satisfy the Ab1 to Ab6 axioms that define an [[../AbelianCategory2/|abelian category]] (or equivalently, if it has the properties specified in Mitchell's alternative definition of an Abelian category .)

An example of a non-commutative operation is the multiplication over ${\displaystyle n\times n}$ [[../Matrix/|matrices]]. Another example of a noncommutative algebra is a general [[../CCliffordAlgebra/|Clifford algebra]], which is of fundamental importance in the [[../CoIntersections/|algebraic]] theory of [[../QuantumSpinNetworkFunctor2/|observable]] [[../QuantumOperatorAlgebra5/|quantum operators]] and also in [[../TriangulationMethodsForQuantizedSpacetimes2/|Quantum Algebraic Topology]].

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