g(bottom string)= 0.0 and g(top string)= 1.0

g(bottom string)= 0.0 ----- g(top string)= 1.0

The contours of the $1-\vert \sigma \vert^2$ movies are at values 0.1, 0.2, 0.5. Note that $\vert\sigma \vert^2 + \vert \phi \vert ^2 = 1$ is the vacuum. The strings reconnect.
The contours of the $\vert \phi \vert^2$ movies are at values 0.1, 0.2, 0.5. The strings relax to NO strings.

	vel = 0.5	vel = 0.9	vel = 0.975	vel = 0.9, beta = 4.0
angle = 0	$1-\vert \sigma \vert^2$ 2D, ang	$1-\vert \sigma \vert^2$ 2D, ang	$1-\vert \sigma \vert^2$ 2D, ang
angle = 15	$1-\vert \sigma \vert^2$	$1-\vert \sigma \vert^2$
angle = 30	$1-\vert \sigma \vert^2$	$1-\vert \sigma \vert^2$		$1-\vert \sigma \vert^2$ , $\vert\phi \vert^2$
angle = 45	$1-\vert \sigma \vert^2$	$1-\vert \sigma \vert^2$
angle = 60	$1-\vert \sigma \vert^2$	$1-\vert \sigma \vert^2$
angle = 90	$1-\vert \sigma \vert^2$ , $\vert\phi \vert^2$	$1-\vert \sigma \vert^2$ , $\vert\phi \vert^2$		$1-\vert \sigma \vert^2$ , $\vert\phi \vert^2$
angle = 120	$1-\vert \sigma \vert^2$	$1-\vert \sigma \vert^2$
angle = 150	$1-\vert \sigma \vert^2$	$1-\vert \sigma \vert^2$		$1-\vert \sigma \vert^2$ , $\vert\phi \vert^2$
angle = 165	$1-\vert \sigma \vert^2$	$1-\vert \sigma \vert^2$
angle = 180	$1-\vert \sigma \vert^2$ 2D, ang	$1-\vert \sigma \vert^2$ 2D, ang	$1-\vert \sigma \vert^2$ 2D, ang

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