2.5-m Telescope Pointing Error Budget
Sloan Digital Sky Survey Telescope Technical Note
19970527
Walter
Siegmund
Contents
Introduction
The Sloan Digital Sky Survey imaging survey consists of 90
strips that are produced by scanning a great circle with the
telescope. Each pair of strips make a filled stripe 2.5°
wide. Thus, it is correct to say that the imaging survey consists of
45 stripes. The data are saved as 2048 x 1362 pixel frames
The interleaved strips and adjacent stripes overlap about 1 arc
minute. It is desirable that large extended objects, i.e., nearby
galaxies, be contained wholly within one strip or its neighbor. This
will not always be possible, especially for galaxies with large
angular diameters. However, a 2-D pointing accuracy of 3 arc seconds
RMS leads to acceptibly uniform overlap and minimises the number of
cases that require special handling (Table 3).
The requirement of efficiency in acquiring the guide stars in the
setup for spectroscopy runs leads to the same number (Table 1). A
guide fiber bundle diameter of 16.5 arc seconds and a pointing
accuracy of 3 arc sec RMS results in 99% initial success in acquiring
guide stars. This assumes that additional errors due to rotator
angle, plate scale, star position, etc., are negligible.
Table 1: Pointing accuracy criterion needed for
efficient spectroscopic operation.
|
Component
|
Value
|
Unit
|
Notes
|
|
Guide fiber bundle diameter
|
1
|
mm
|
1
|
|
Guide fiber bundle diameter
|
16501
|
mas
|
2
|
|
Image diameter
|
1000
|
mas
|
3
|
|
Max radius for acquisition
|
7751
|
mas
|
4
|
|
Number of standard deviations
|
2.58
|
|
5
|
|
Pointing accuracy (RMS)
|
3004
|
mas
|
6
|
Notes:
- One of the ten guide bundles will be 1.0 mm in diameter. The
balance will be 0.5 mm in diameter.
- The telescope scale is 60.6 microns/arc second.
- We assume that the guiding algorithm will converge if the
image center is 500 mas or more from the edge of the fiber
bundle.
- See previous note.
- This corresponds to a 99% success rate for a Gaussian
distribution.
- See previous note.
Pointing error budget
Table 2: Pointing error budget.
|
Component
|
2-D error
(mas RMS)
|
Notes
|
|
Tracking error (300 > f > 1 mHz)
|
100
|
1
|
|
Magnetic fiducial error
|
1500
|
2
|
|
Encoder error between fiducials (f < 1 mHz)
|
1000
|
3
|
|
Pointing model error
|
1000
|
4
|
|
Flexure (not in model)
|
1000
|
5
|
|
Mechanical Hysteresis
|
1000
|
6
|
|
Thermal deformation
|
1000
|
7
|
|
Refraction error (z = 45 deg)
|
400
|
8
|
|
Primary nonrepeatability
|
800
|
9
|
|
Secondary nonrepeatability
|
20
|
10
|
|
Camera nonrepeatability
|
200
|
11
|
|
Coordinate transformation error
|
10
|
12
|
|
Total
|
2846
|
13
|
Notes:
- This number is for the tracking error budget (Sloan Digital
Sky Survey Telescope Technical Note 19970523). It is applicable
over the listed frequency range. The unit mHz is millihertz.
- Assumes a specification for the magnetic fiducials of +/-15
microns worst case over the temperature range -20 to +20 deg
C.
- Over several days, on the 3.5-m the locations of the fiducials
repeat to 8 arc sec P-V. This includes magnetic fiducial error and
encoder error.
- This only includes errors in determining model coefficients.
The values of this and the three following items are set to a
level that should allow rapid debugging of these effects. The
major limitation, position noise from seeing should be below 100
mas RMS and should not contribute significantly.
- This includes all mechanical flexure that is not in the
telescope model.
- This includes all mechanical hysteresis.
- This includes all errors due to temperature gradients in
telescope components.
- The total refraction at this zenith angle is 60 arc sec. This
varies by perhaps +/-1 arc sec during clear weather. The
assumption here is that all but 100 mas RMS can be compensated
using surface pressure, humidity and temperature
measurements.
- Assumes use of linear stepper motors with an error of 0.6
microns RMS and that quantization error dominates.
- Assumes measured performance of the 3.5-m secondary.
- The kinematic mount for the 3.5-m optics test interferometer
repeated to 1 micron. The camera is more massive and the mount
more complex so a more conservative number is suggested. Gunn
believes that 1 micron can be achieved.
- From Russell Owen.
- Statistical independence assumed.
Table 3: Overlap error of adjacent or interleaved
strips.
|
Component
|
2-D error
(mas RMS)
|
Notes
|
|
1-d error
|
2012
|
1
|
|
Strip overlap error
|
2845
|
2
|
|
Peak-valley overlap variation (6 sigma)
|
17070
|
3
|
Notes:
- Only the error normal to the strip direction affects strip
overlap.
- The error from two pointings determines strip overlap.
- Only 1 in 1000 overlaps will be worse than this. Each of the
90 strips will likely be observed in several segments.
Consequently, several hundred pointing operations will be
required.
Discussion
I believe this to be a conservative error budget that should be
straightforward to satisfy initially. Also, it should be reasonable
to maintain telescope pointing at this level. Should this prove
impractical for some unforeseen reason, alternatives exist.
- We can imagine doing real-time updates of the tracking, by,
e.g., noticing when and where a given astrometric standard crosses
the array.
- We can perform an initial on-sky pointing correction. Since
the scan loci in alt-az space are rather compact over most of the
sky, this would provide most of the benefit of real-time updates
but may be easier to implement.
Date created: 05/27/97
Last modified: 05/28/97
Walter A. Siegmund
siegmund@astro.washington.edu