Bohr–Mollerup theorem

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In mathematical analysis, the Bohr–Mollerup theorem is named after the Danish mathematicians Harald Bohr and Johannes Mollerup, who proved it. The theorem characterizes the gamma function, defined for x > 0 by

$\Gamma(x)=\int_0^\infty t^{x-1} e^{-t}\,dt$

as the only function f on the interval x > 0 that simultaneously has the three properties

$f(1)=1\mbox{,} \,$ and
$f(x+1)=xf(x)\ \mbox{for}\ x>0, \,$ and
$\log f \,$ is a convex function. (That is $f \,$ is logarithmically convex.)

That log f is convex is often expressed by saying that f is log-convex, i.e., a log-convex function is one whose logarithm is convex.

An elegant treatment of this theorem is in Artin's book The Gamma Function, which has been reprinted by the AMS in a collection of Artin's writings.

[edit] References

Eric W. Weisstein, Bohr-Mollerup Theorem at MathWorld.
Proof of Bohr-Mollerup theorem on PlanetMath
Proof of Bohr-Mollerup theorem on PlanetMath
Artin, Emil (1964). The Gamma Function. Holt, Rinehart, Winston.
Rosen, Michael (2006). Exposition by Emil Artin: A Selection. American Mathematical Society.

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