A question in my book, chapter relations Let f : M → N and x R y &#x

boloman0z

boloman0z

Answered question

2022-06-18

A question in my book, chapter relations Let f : M N and x R y f ( x ) = f ( y ) prove that this is an equivalence relation (the proof for it being an equivalence relation is pretty straight forward and easy thus already done), and for a f : M N injective, I should write the partition on M Which is defined by R.
So it is the second part that I have problems with, how could I write this partition? What would the equivalence classes be?

Answer & Explanation

Zayden Wiley

Zayden Wiley

Beginner2022-06-19Added 21 answers

Step 1
Consider any x M. What is x related to?
Well, under R, xRy (for some y M) whenever f ( x ) = f ( y ). However, f is injective by hypothesis. Hence, x = y.
Step 2
What this means is that each element is related only to itself.
Hence, the collection of equivalence classes is M / R = { { x } | x M }

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