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May 30

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A proof attempt for the transcendence of ℼ

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The proposition "if is rational then is algebraic" is comprehensively true,
and is equivalent to "if is inalgebraic then is irrational" (contrapositive).

My question is this:
The proofs for the transcendence of are of course by contradiction.
Now, do you think it is possible to prove somehow the proposition "if is algebraic then is rational", reaching a contradiction?
Meaning, by assuming is algebraic and using some of its properties, can we conclude that it must be algebraic of degree 1 (rational) – contradicting its irrationality?

I know the proposition "if is algebraic then is rational" is not comprehensively true ( is a counterexample),
but I am basically asking if there exist special cases such that it does hold for them. יהודה שמחה ולדמן (talk) 18:48, 30 May 2024 (UTC)[reply]

There are real-valued expressions such that the statement "if is algebraic, is rational" is provable, but this does not by itself establish transcendence. For example, substitute for Given the irrationality of proving the implication for would give yet another proof of the transcendence of . I see no plausible approach to proving this implication without proving transcendence on the way, but I also see no a priori reason why such a proof could not exist.  --Lambiam 19:24, 30 May 2024 (UTC)[reply]
Also, for a while now I am looking to prove the transcendence of by trying to generalize Bourbaki's/Niven's proof that π is irrational for the th-degree polynomial:
Unfortunately, I failed to show that is a non-zero integer (aiming for a contradiction).
Am I even on the right track, or is my plan simply doomed to fail and I am wasting my time?
Could the general Leibniz rule help here? יהודה שמחה ולדמן (talk) 12:28, 2 June 2024 (UTC)[reply]
I suppose that you mean to define where the are integers, and hope to derive a contradiction from the assumption For that, doesnt'it suffice to show that the value of the integral is non-zero?
I'm afraid I'm not the right person to judge whether this approach offers a glimmer of hope.  --Lambiam 15:40, 2 June 2024 (UTC)[reply]