Definition:Semigroup with respect to Equivalence Relation

Definition
Let $C$ be a set.

Let $\thickapprox$ be an equivalence relation on $C$.

Let $\left({C, \cdot}\right)$ be a magma.

Then $\left({C, \cdot}\right)$ is a semigroup with respect to $\thickapprox$ iff:
 * $\forall x, y,z \in C: \left( x \cdot y \right)\cdot z \thickapprox x \cdot \left(y \cdot z\right)$

Stronger properties

 * Definition:Semigroup
 * Definition:Commutative Semigroup with respect to Equivalence Relation
 * Definition:Commutative Semigroup