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Exercise 4.6 - clarification needed #10

@abhinav-upadhyay

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@abhinav-upadhyay

The definition of CodeCog is not clear from the question. I could think of two possible interpretations: CodeCog is a set consisting of any n natural numbers, or another interpretation is that CodeCog consists of numbers from 1 to n.

In the latter interpretation, it is pretty straightforward to prove that the union of all such CodeCog will essentially be N
CodeCog
which has an injective mapping from CodeCog

In the former case I am confused if it can be shown that there will be a injection from CodeCog to the union because I can always select arbitrary CodeCog which always excludes certain numbers from CodeCog (say none of the CodeCog has 1) then the union will essentially be CodeCog. In this case it is easy to show a surjection from CodeCog to CodeCog but will it also be an injection because of the their infinite cardinality?

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