Prison Break

A prisoner wants to escape from a prison. The prison is represented by the interior of the convex polygon with vertices $$$P_1, P_2, P_3, \ldots, P_{n+1}, P_{n+2}, P_{n+3}$$$. It holds $$$P_1=(0,0)$$$, $$$P_{n+1}=(0, h)$$$, $$$P_{n+2}=(-10^{18}, h)$$$ and $$$P_{n+3}=(-10^{18}, 0)$$$.

The prison walls $$$P_{n+1}P_{n+2}$$$, $$$P_{n+2}P_{n+3}$$$ and $$$P_{n+3}P_1$$$ are very high and the prisoner is not able to climb them. Hence his only chance is to reach a point on one of the walls $$$P_1P_2, P_2P_3,\dots, P_{n}P_{n+1}$$$ and escape from there. On the perimeter of the prison, there are two guards. The prisoner moves at speed $$$1$$$ while the guards move, remaining always on the perimeter of the prison, with speed $$$v$$$.

If the prisoner reaches a point of the perimeter where there is a guard, the guard kills the prisoner. If the prisoner reaches a point of the part of the perimeter he is able to climb and there is no guard there, he escapes immediately. Initially the prisoner is at the point $$$(-10^{17}, h/2)$$$ and the guards are at $$$P_1$$$.

Find the minimum speed $$$v$$$ such that the guards can guarantee that the prisoner will not escape (assuming that both the prisoner and the guards move optimally).

Notes:

• At any moment, the guards and the prisoner can see each other.
• The "climbing part" of the escape takes no time.
• You may assume that both the prisoner and the guards can change direction and velocity instantly and that they both have perfect reflexes (so they can react instantly to whatever the other one is doing).
• The two guards can plan ahead how to react to the prisoner movements.