Definition:Self-Distributive Operation/Right

Definition
Let $\circ$ be a binary operation on the set $S$.

$\circ$ is right self-distributive :
 * $\forall a, b, c \in S: \paren {a \circ b} \circ c = \paren {a \circ c} \circ \paren {b \circ c}$

Also known as
Some sources use the term right distributive over itself

Also see

 * Definition:Left Self-Distributive Operation