Surface error: ruze curves.

The error in the reflectors will cause the gain to decrease as the wavelength decreases. The ruze formula tells how much this is:

Gain=Gain0 * exp(-(4*pi*delta/lambda)^2)

Gain0 is the gain for a perfect reflector (or long wavelength).
Delta is the rms surface error (which should be random)
Lambda is the wavelength in the same units as delta.

The measured telescope gain from jul08 thru feb09 was used to compute the ruze curves.
The plot shows (.pdf):

3409 gain measurements were used (lband thru xband).
Gain0 was taken to be 10.75 Jy. This value was picked because it went thru the highest lband point.

2762 m^2 is 1 K/Jy
A 225 spherical aperture has 39760 m^2 or 14.4 K/Jy.
This assumes a uniform flux across the area. The edge taper will decrease this:

12K/Jy/14.4K/Jy = .83 aperture efficiency
10.75 K/Jy/14.4 = .75 aperture efficiency.

The dashed color lines are the gain vs frequency from the ruze equation using various surface errors:

black: rms= 1.5 mm
red: rms=2.0 mm
green: rms=2.5 mm
blue: rms=3.0 mm

The 2.5 mm comes closest to the data. Some of the errors in the data are:

cbh (6-8 Ghz) under illuminates the tertiary (so the gain is low).
The cals could be a bit off.
For higher frequencies, some of the sources with 15" extent or more are no longer point sources.

The ruze formula assumes the surface errors are uncorrelated. Large scale errors will probably cause larger sidelobes.

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