equivalence class (original) (raw)
Let S be a set with an equivalence relation
∼. An equivalence class
of S under ∼ is a subset T⊂S such that
- •
If x∈T and y∈S, then x∼y if and only if y∈T - •
If S is nonempty, then T is nonempty
For x∈S, the equivalence class containing x is often denoted by [x], so that
| [x]:={y∈S∣x∼y}. |
|---|
The set of all equivalence classes of S under ∼ is defined to be the set of all subsets of S which are equivalence classes of S under ∼, and is denoted by S/∼. The map x↦[x] is sometimes referred to as the .
For any equivalence relation ∼, the set of all equivalence classes of S under ∼ is a partition of S, and this correspondence is a bijection between the set of equivalence relations on S and the set of partitions of S (consisting of nonempty sets).
| Title | equivalence class |
|---|---|
| Canonical name | EquivalenceClass |
| Date of creation | 2013-03-22 11:52:30 |
| Last modified on | 2013-03-22 11:52:30 |
| Owner | mathcam (2727) |
| Last modified by | mathcam (2727) |
| Numerical id | 10 |
| Author | mathcam (2727) |
| Entry type | Definition |
| Classification | msc 03E20 |
| Classification | msc 93D05 |
| Classification | msc 03B52 |
| Classification | msc 93C42 |
| Related topic | EquivalenceRelation |
| Related topic | Equivalent |
| Related topic | Partition |