Communicative Ring is a #Ring where its multiplicative operation is communicative, as shown below. It also satisfies the properties from #Group and #Abelian Group.
- Commutativity of multiplication, where \(\forall a, b \in S, ab = ba\).
Communicative Ring is a #Ring where its multiplicative operation is communicative, as shown below. It also satisfies the properties from #Group and #Abelian Group.
If the multiplicative operation is commutative, then it forms Communicative Ring#.
Integral Domain is a #Ring which satisfies the following properties including those in #Group, #Abelian Group and #Communicative Ring.
Field is a Set# \(S\), together with two operations \(+\) and \(*\), which has the following properties including those in #Group, #Abelian Group, #Ring, #Communicative Ring, and #Integral Domain: