Show that if R is an antisymmetric relation on S then any relation R' subseteq R is also antisymmetric. I think how you solve it is if (x,y) are in R, they must be in R' since R' is a subset of R, thus (x,y) are in R'. To be antisymmetric x has to be related to y and y has to be related to x such that x = y. And since R is antisymmetric and x,y are in R and R' is a subset then x,y in R' follow the same condition of R making them antisymmetric. That's one way I think it's solved but not 100% sure.

wurpenxd

wurpenxd

Answered question

2022-09-06

Discrete math, antisymmetric proof question
Show that if R is an antisymmetric relation on S then any relation R R is also antisymmetric. I think how you solve it is if (x,y) are in R, they must be in R' since R' is a subset of R, thus (x,y) are in R'. To be antisymmetric x has to be related to y and y has to be related to x such that x = y. And since R is antisymmetric and x,y are in R and R' is a subset then x,y in R' follow the same condition of R making them antisymmetric. That's one way I think it's solved but not 100% sure.

Answer & Explanation

Sharon Dawson

Sharon Dawson

Beginner2022-09-07Added 20 answers

Step 1
Mistake: If ( x , y ) R, then they must be in R′ since R′ is a subset of R.
This reasoning is not correct. If you see a black cat, you certainly see cat. If you see a cat, it need not be black.
Step 2
If ( x , y ) R , then ( x , y ) R since R R, since R is antisymmetirc, ( y , x ) R and hence we conclude that ( y , x ) R . That is R′ is antisymmetric.

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