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Prove that the following inequality holds $a^a b^b c^c\ge (abc)^{\frac{a+b+c}{3}}$ if $a,b,c$ are positive.

I'm not sure how to handle these kinds of powers. Are there any "famous" but not so advanced inequalities that involve this kinds of expressions?

I was trying to do something like ordering them without lost of generality because it's symmetric, but I get nowhere and I just make the thing even more complicated.

I'm asking for solution rather than hints since this is my first time encountering these kinds of problems.

3 Answers 3

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This might be a bit similar to N.S.'s answer but here goes anyway:

Take logarithms. Without loss of generality, take $a\leq b\leq c$. Define:

$x_1 = x_2 = x_3 = \frac a3, \\x_4 = x_5 = x_6 = \frac b3, \\x_7 = x_8 = x_9 = \frac c3, \\y_1 = y_2 = y_3 = \log a, \\y_4 = y_5 = y_6 = \log b, \\y_7 = y_8 = y_9 = \log c.$

Clearly, $x_1 \leq x_2 \leq \cdots \leq x_9$ and $y_1 \leq y_2 \leq \cdots \leq y_9$.

Now just use the rearrangement inequality on this and you're done.

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Take the logs to get rid of the powers ;)

$a \ln(a) + b \ln (b) + c \ln (c) \geq \frac{a+b+c}{3} [ \ln (a)+ \ln(b) + \ln(c)] $

Then a relatively simple but less known inequality, Chebyshev inequality:

If $ a_1 \geq a_2 \geq \cdots \geq a_n$, $b_1 \geq b_2 \geq \cdots \geq b_n$, then ${1\over n} \sum_{k=1}^n a_k \cdot b_k \geq \left({1\over n}\sum_{k=1}^n a_k\right)\left({1\over n}\sum_{k=1}^n b_k\right)$

solves the problem.


If you are not familiar to Chebyshev, try proving directly that

$a \ln(a) + b \ln (b) \geq a \ln(b) + b \ln(a) $

Do the same for $(a,c), (b,c)$ and add them togeter....


P.S. The last observation leads to the following "elementary" but more complicated solution.

We prove first that

$a^ab^b \geq a^bb^a \,.$

Indeed since the equation is symmetric, we can assume WLOG that $a \geq b$ and then

$a^{a-b} \geq b^{a-b} \,.$

Which is exactly the desired inequality.

Then we have

$a^ab^b \geq a^bb^a \,.$ $a^ac^c \geq a^cc^a \,.$ $b^bc^c \geq b^cc^b \,.$ $a^ab^bc^c \geq a^ab^bc^c \,.$

Multiplying togeter, you get

$a^{3a}b^{3b}c^{3c} \geq (abc)^{a+b+c} \,.$

What I did here was to reprove the Chebyshev inequality in this particular case, without writing the logs....

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Take logarithms. The function $x\log x$ is convex. The result now follows from Jensen's Inequality (use "weights" $1, 1, 1$).

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    I believe this requires a second application of Jensen's using the concavity of $\log(x)$. \begin{align}\frac{a\log(a)+b\log(b)+c\log(c)}3 &\ge\frac{a+b+c}3\log\left(\frac{a+b+c}3\right)\tag{first}\\ &\ge\frac{a+b+c}3\frac{\log(a)+\log(b)+\log(c)}3\tag{second}\end{align} However, $\log(x)$ can be replaced by any monotonically increasing function and the full inequality above still holds. See [here](http://math.stackexchange.com/a/990133).2014-10-25