Ky Fan’s inequality - SoatDev IT Consulting

Let

with each component satisfying 0 < x_i ≤ 1/2. Define the complement x′ by taking the complement of each entry.

Let G and A represent the geometric and arithmetic mean respectively.

Then Ky Fan’s inequality says

$frac{G(x)}{G(x')} leq frac{A(x)}{A(x')}$

Now let H be the harmonic mean. Since in general H ≤ G ≤ A, you might guess that Ky Fan’s inequality could be extended to

$frac{H(x)}{H(x')} leq frac{G(x)}{G(x')} leq frac{A(x)}{A(x')}$

and indeed this is correct.

Source: Jósef Sándor. Theory and Means and Their Inequalities.