Construct an injective function from N to P(N) in a way that f(n) is not finite for any n in N and prove that it is injective.

ridge041h

ridge041h

Answered question

2022-09-07

Construct an injective function from N to P(N) in a way that f(n) is not finite for any n and prove that it is injective.
Problem. Construct an injective function from N to P(N) in a way that f(n) is not finite for any n N and prove that it is injective.
This is what I have attempted so far and I just need someone to check if what I have done is correct, or maybe guide me on what I have done wrong. This is my first time taking a proofs course and I am trying my best to learn and attempt the questions.
So first I decided that f ( n ) = { n , }.
And then to prove injectivity I picked two elements, x and y such that
{ x , } = { y , } x = y
Hence, injectivity is proved.

Answer & Explanation

Kody Arellano

Kody Arellano

Beginner2022-09-08Added 10 answers

Step 1
Instead of { m N m n }, you can also write { n , n + 1 , n + 2 , }, depending on how formal you want to be. (For a variant of the interval-notation, you could write [ n , ) N , but that's not so common.)
Notation aside, you ask how you would prove that { m N m n } is an infinite set. Well, that hardly requires a proof; you're just saying that there are infinitely many integers greater than n, which should be obvious. If you really prove it, you can try to show that the set can have no largest element.
Step 2
Injectivity is basically the same as in your attempt. Hint: If f ( x ) = f ( y ), then they must have the same smallest element.

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