Gelfond–Schneider constant

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The Gelfond–Schneider constant or the Hilbert number^[1] is two to the power of the square root of two:

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which was proved to be a transcendental number by Rodion Kuzmin in 1930.^[2] In 1934, Aleksandr Gelfond and Theodor Schneider independently proved the more general Gelfond–Schneider theorem,^[3] which solved the part of Hilbert's seventh problem described below.

Properties

The square root of the Gelfond–Schneider constant is the transcendental number

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This same constant can be used to prove that "an irrational elevated to an irrational power may be rational", even without first proving its transcendence. The proof proceeds as follows: either ${\displaystyle {\sqrt{2}}^{\sqrt{2}}}$ is a rational which proves the theorem, or it is irrational (as it turns out to be) and then

${\displaystyle {\left({\sqrt{2}}^{\sqrt{2}}\right)}^{\sqrt{2}}={\sqrt{2}}^{\sqrt{2}\times \sqrt{2}}={\sqrt{2}}^2=2}$

is an irrational to an irrational power that is a rational which proves the theorem.^[4][5] The proof is not constructive, as it does not say which of the two cases is true, but it is much simpler than Kuzmin's proof.

Hilbert's seventh problem

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Part of the seventh of Hilbert's twenty-three problems posed in 1900 was to prove, or find a counterexample to, the claim that a^b is always transcendental for algebraic a ≠ 0, 1 and irrational algebraic b. In the address he gave two explicit examples, one of them being the Gelfond–Schneider constant 2^√2.

In 1919, he gave a lecture on number theory and spoke of three conjectures: the Riemann hypothesis, Fermat's Last Theorem, and the transcendence of 2^√2. He mentioned to the audience that he didn't expect anyone in the hall to live long enough to see a proof of this result.^[6] But the proof of this number's transcendence was published by Kuzmin in 1930,^[2] well within Hilbert's own lifetime. Namely, Kuzmin proved the case where the exponent b is a real quadratic irrational, which was later extended to an arbitrary algebraic irrational b by Gelfond and by Schneider.

See also

• Gelfond's constant

References

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Further reading

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