Homework SourseProve or disprove If B is a partial order on set A then the
Prove or disprove: If B, is a partial order on set A, then the symmetric closure of R is an equivalence relation.
Solution
Equivalence relations–:
A relation that is reflexive, symmetric and transitive
Partial order -: A relation that is reflexive, antisymmetric and transitive
Let R be a relation on A, and let x,y,zA.
xRy and yRx implies x=yxRy and yRx implies x=y
here told R is partial order on set A,
Let S be the transitive closure of the symmetric closure of the reflexive closure of R.
You have to show three things:
| A relation R is ... | if ... |
|---|---|
| reflexive | xRx |
| transitive | xRy and yRz implies xRz |
| antisymmetric | |
| symmetrix | xRy implies yRx |
