How i show this beautiful inequality :$\frac{x^n}{x^m+y^m}+\frac{y^n}{y^m+z^m}+\frac{z^n}{z^m+x^m}\geq \frac{3} {2}(\frac{1}{\sqrt{3}})^{n-m}$? [closed]

Question

This question accross to this question from SE which there some answers but they r n't

enough to me hop to see MO what can they say about it .

let $m,n$ be integers, show that if $ n>m\geq 0 $ :

$$\frac{x^n}{x^m+y^m}+\frac{y^n}{y^m+z^m}+\frac{z^n}{z^m+x^m}\geq \frac{3} {2}\left(\frac{1}{\sqrt{3}}\right)^{n-m}$$

where real $x,y,z > 0 $ and $xy + yz + zx = 1$

Note : The question is Already montioned here in journal k.s competition prolem 111.

Edit :The choice of $x, y ,z$ gaven by peterMuller, does not fulfill the auxiliary condition $xy+yz+zx=1$ as it is required in the problem, so it cannot serve as a counter example. In any case, even with him choice of $x,y,z,$ he still need to show it is less than $\sqrt{3}/2$, since this is the claim in the problem

Thank you for your help .

Answer 1

This inequality doesn't hold in general. It is false for instance for $m=7$, $n=8$: Set $X=3/4$, $Y=1$, and $Z=9/7$. Then $XY+YZ+ZX=3$, however $\frac{X^8}{X^7+Y^7}+\frac{Y^8}{Y^7+Z^7}+\frac{Z^8}{Z^7+X^7}<\frac{3}{2}$.