Identity

Identity is a primary, axiomatic concept. It refers to the "this"-ness of an object, the fact that it is this and not that.

Mathematics conceptualizes identity using the equals ("=") symbol.

Equivalence relations

Things can be identical in some respects, but not others.

Standard mathematics formalizes this idea as follows.

Let ${\displaystyle S}$ be a set. An equivalence relation is a relation ${\displaystyle \sim }$ on ${\displaystyle S}$ satisfying three axioms. For any ${\displaystyle a,b,c\in S}$,

1. (Reflexivity) ${\displaystyle a\sim a}$,
2. (Symmetry) If ${\displaystyle a\sim b}$ then ${\displaystyle b\sim a}$,
3. (Transitivity) If ${\displaystyle a\sim b}$ and ${\displaystyle b\sim c}$, then ${\displaystyle a\sim c}$.

If ${\displaystyle a\in S}$, we denote the equivalence class of ${\displaystyle a}$ to be the set ${\displaystyle [a]:=\{b\in S:b\sim a\}}$. Define the quotient of ${\displaystyle S}$ by the equivalence relation ${\displaystyle \sim }$, or ${\displaystyle S/\sim }$, as the set of all equivalence classes of elements in ${\displaystyle S}$.

Note that if ${\displaystyle a\sim b}$, then ${\displaystyle [a]=[b]}$.