Geometric measure of entanglement in example with GHZ state

Question

I'm learning about different possibilities to measure entanglement right now, and I'm struggling with the geometric measure. My question is probably quite trivial, but I can just not comprehend how the following example was calculated.

So, what I know is that if I have an $n$-partice pure state, in general: $$\lvert{\psi}\rangle = \sum_{p_1,p_2,\dots p_n} C_{p_1 \dots p_n}\lvert{p_n}^{(1)}\rangle \otimes \ \lvert{p_2}^{(2)}\rangle \otimes \dots \lvert{p_n}^{(n)}\rangle $$ Then I have to find the closest seperable pure state $$\lvert\phi\rangle.$$ The measure is then $$ \Lambda = \max_{\phi} \lvert\langle\phi|\psi\rangle\rvert$$

In the given example, there is the GHZ-State: $$ \lvert \text{GHZ}\rangle= \frac{1}{\sqrt{3}} ( \lvert001\rangle + \lvert010\rangle + \lvert100\rangle) $$ And the solution should be $\Lambda=2/3$. But I do not know, how this is calculated. The result implies (so I think) that the relevant $\lvert\phi\rangle$, which creates the maximum value, is a linear combination of 3 states of which 2 are also in the GHZ-state. But a state like: $$ \lvert\phi\rangle = \frac{1}{\sqrt{3}} ( \lvert001\rangle + \lvert010\rangle + \lvert000\rangle ) $$ Is not separable in factors of the 3 separate Hilbert-spaces. What do I miss? Or which thing did I misunderstood?

Edit: relevant link to slides : http://insti.physics.sunysb.edu/conf/simons-qcomputation/talks/wei.pdf Definition on Slide 10, Example on Slide 14)

Answer 1

This is a sketch of the calculation, take:

$$ \lvert\phi\rangle = \lvert\phi_1\rangle \otimes \lvert\phi_2\rangle \otimes \lvert\phi_2\rangle $$

The most general form of each component is

$$ \lvert\phi_i\rangle = \frac{1}{\sqrt{1+u_i^2+v_i^2}}\begin{bmatrix} u_i+iv_i \\ 1 \end{bmatrix}$$

where, $i=1,2,3$ and $u_i$ and $v_i$ are real

Writing the (square of the) inner product $\Lambda$ with and differentiating it with respect to the $u_i$'s and the $v_i$'s we obtain 6 equations, each couple of equations of the $u_i$'s and $v_i$'s can be subtracted to obtain linear equations whose final result implies that:

$$u_1=u_2=u_3 \doteq u $$

and

$$v_1=v_2=v_3 \doteq v $$

substituting thse results in the expression for $\Lambda$, we get

$$\Lambda = \frac{\sqrt{3r}}{(\sqrt{1+r})^3}$$

where $ r = u^2+v^2$

This expression attains its maximum at $r = \frac{1}{2}$ with $\Lambda = \frac{2}{3}$