# Difference between revisions of "Polarization Mixing Due to Feed Rotation"

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\begin{align} | \begin{align} | ||

\phi_{ij}(XX) &= \phi(X_j) - \phi(X_i) = \phi_j - \phi_i \\ | \phi_{ij}(XX) &= \phi(X_j) - \phi(X_i) = \phi_j - \phi_i \\ | ||

− | \phi_{ij}(XY) &= \phi(Y_j) - \phi(X_i) = \phi_j + d\phi_j | + | \phi_{ij}(XY) &= \phi(Y_j) - \phi(X_i) = \phi_j + d\phi_j - \pi/2 - \phi_i \\ |

\phi_{ij}(YX) &= \phi(X_j) - \phi(Y_i) = \phi_j - \phi_i - d\phi_i - \pi/2 \\ | \phi_{ij}(YX) &= \phi(X_j) - \phi(Y_i) = \phi_j - \phi_i - d\phi_i - \pi/2 \\ | ||

\phi_{ij}(YY) &= \phi(Y_j) - \phi(Y_i) = \phi_j + d\phi_j - \phi_i - d\phi_i | \phi_{ij}(YY) &= \phi(Y_j) - \phi(Y_i) = \phi_j + d\phi_j - \phi_i - d\phi_i | ||

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<center><math> | <center><math> | ||

\begin{align} | \begin{align} | ||

− | \phi_{ij}(XY) - \phi_{ij}(XX) &= \phi_j + d\phi_j | + | \phi_{ij}(XY) - \phi_{ij}(XX) &= \phi_j + d\phi_j - \pi/2 - \phi_i - \phi_j + \phi_i &= d\phi_j - \pi/2, \\ |

\phi_{ij}(YY) - \phi_{ij}(YX) &= \phi_j + d\phi_j - \phi_i - d\phi_i - \phi_j + \phi_i + d\phi_i + \pi/2 &= d\phi_j + \pi/2, \\ | \phi_{ij}(YY) - \phi_{ij}(YX) &= \phi_j + d\phi_j - \phi_i - d\phi_i - \phi_j + \phi_i + d\phi_i + \pi/2 &= d\phi_j + \pi/2, \\ | ||

\phi_{ij}(XX) - \phi_{ij}(YX) &= \phi_j - \phi_i - \phi_j + \phi_i + d\phi_i + \pi/2 &= d\phi_i + \pi/2, \\ | \phi_{ij}(XX) - \phi_{ij}(YX) &= \phi_j - \phi_i - \phi_j + \phi_i + d\phi_i + \pi/2 &= d\phi_i + \pi/2, \\ | ||

− | \phi_{ij}(XY) - \phi_{ij}(YY) &= \phi_j + d\phi_j | + | \phi_{ij}(XY) - \phi_{ij}(YY) &= \phi_j + d\phi_j - \pi/2 - \phi_i - \phi_j - d\phi_j + \phi_i + d\phi_i &= d\phi_i - \pi/2, |

\end{align} | \end{align} | ||

</math></center> | </math></center> | ||

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<center><math> | <center><math> | ||

\begin{align} | \begin{align} | ||

− | d\phi_i &= \phi_{i14}(XX) - \phi_{i14}(YX) - \pi/2 = \phi_{i14}(XY) - \phi_{i14}(YY) | + | d\phi_i &= \phi_{i14}(XX) - \phi_{i14}(YX) - \pi/2 = \phi_{i14}(XY) - \phi_{i14}(YY) + \pi/2, \\ |

− | d\phi_{14} &= \phi_{i14}(XY) - \phi_{i14}(XX) | + | d\phi_{14} &= \phi_{i14}(XY) - \phi_{i14}(XX) + \pi/2 = \phi_{i14}(YY) - \phi_{i14}(YX) - \pi/2, |

\end{align} | \end{align} | ||

</math></center> | </math></center> |

## Revision as of 15:52, 2 July 2017

## Contents

# Explanation of Polarization Mixing

The newer 2.1-m antennas [Ants 1-8 and 12] have AzEl (azimuth-elevation) mounts (also referred to as AltAz; the terms Altitude and Elevation are used synonymously), which means that their crossed linear feeds have a constant angle relative to the horizon (the axis of rotation being at the zenith). The older 2.1-m antennas [Ants 9-11 and 13], and the 27-m antenna [Ant 14], have Equatorial mounts, which means that their crossed linear feeds have a constant angle with respect to the celestial equator, the axis of rotation being at the north celestial pole. Thus, the celestial coordinate system is tilted by the local co-latitude (complement of the latitude). This tilt results in a relative feed rotation between the 27-m antenna and the AzEl mounts, but not between the 27-m and the older equatorial mounts. This angle is called the "parallactic angle," and is given by:

where is the site latitude, is the Azimuth angle [0 north], and is the Elevation angle [0 on horizon]. This function obviously changes with position on the sky, and as we follow a celestial source (e.g. the Sun) across the sky this rotation angle is continuously changing in a surprisingly complex manner as shown in **Figure 1**. Note that at zero hour angle for declinations less than the local latitude (37.233 degrees at OVRO), but is at higher declinations.

The crossed linear dipole feeds on all antennas are oriented with the X-feed as shown in **Figure 2**, at 45-degrees from the horizontal, when the antenna is pointed at 0 hour angle. This is the view as seen looking down at the feed from the dish side, although since the feeds are at the prime focus this is the same as the view projected onto the sky. At other positions, the feeds on the AzEl antennas experience a rotation by angle relative to the equatorial antennas.

Because of this rotation, the normal polarization products XX, XY, YX and YY on baselines with dissimilar antennas (one AzEl and the other equatorial) become mixed. The effect of this admixture can be written by the use of Jones matrices (see Hamaker, Bregman & Sault (1996) for a complete description). Consider antenna A whose feed orientation is rotated by , cross-correlated with antenna B with unrotated feed. The corresponding Jones matrices, acting on signal vector are:

and the cross-correlation is found by taking the outer product, i.e.

which relates the output polarization products to the input as

where we have dropped the subscripts and complex conjugate notation for brevity. Of course, there are other effects such as unequal gains and cross-talk between feeds that are also at play, but for now we ignore those and focus only on the effect of this polarization mixing due to the parallactic angle.

# Absolute vs. Relative Angle of Rotation

However, the above description fails when we consider a rotation on both antennas, so that

In this case, performing the outer product gives:

whereas intuitively we want something like:

which becomes the identity matrix when , i.e. when the feeds on two antennas of a baseline are parallel. The difference seems to be that the earlier expression evaluates to components of X and Y in an absolute coordinate frame, whereas we are interested only the difference in angle of the feeds in a relative coordinate frame. This choice no doubt has implications for measuring Stokes Q and U, but for solar data we are not concerned with linear polarization.

One way to achieve this in the framework of Jones matrices is to form Mueller matrices from the outer-product of the rotation times the gain matrix:

and

then form an overall matrix

where .

# Effect of an X - Y Delay

Regardless of how the math is done, we expect that the result should be dependent on the difference in angle, , so as a practical solution let us simply replace with and proceed as in section 1.

and the cross-correlation is found by taking the outer product, i.e.

which relates the output polarization products to the input as

Now consider that there is a "multi-band" delay on both antennas, and . Then (2) becomes:

The result agrees with our intuition:

This approach will be implemented, to see how well it does in correcting for the effects of differential feed rotation.

# Another Look at X-Y Delays

Prior to doing the feed rotation correction, it is essential that any X-Y delays be measured and corrected. We have devised a calibration procedure in which we take data on a strong calibrator with the feeds parallel, then rotate the 27-m (antenna 14) feed so that they are perpendicular. For an unpolarized source, this results in signal on the XX and YY polarization channels in the first case, and on the XY and YX polarization channels in the second case. As a practical matter, this can be done on all antennas at once if a strong source is observed near 0 HA, ideally timed to start 20 min before 0 HA and completing 20 min after 0 HA. The source 2253+161 works well, as does 1229+006 (3C273). Two observations are needed

- one with the 27-m feed unrotated (gives parallel-feed data for all dishes, if done near 0 HA). Gives strong signal in XX and YY channels. Example
- one with the 27-m feed rotated to -90 degrees (gives crossed-feed data for all dishes, if done near 0 HA). Gives strong signal in XY and YX channels. Example

Note that the feed should be rotated by -90, not 90, in order for the expressions below to be used correctly.

## Background

Consider antenna-based phases on X polarization as and on Y polarization as , i.e. the Y phases are nominally the same as for X, except for a 90-degree rotation and a possible X-Y delay difference , here written as delay phase . We are finding that this delay is a complicated function of frequency, so it is just as well to keep it in terms of phase. On a baseline , then, the four polarization terms become:

We then examine the channel differences on baselines with antenna 14, i.e.

where . Consequently, we can solve redundantly in two ways for the antenna-based delay phases:

where we specifically use to emphasize that this quantity for all antennas should be the same value, because the measurements are all baselines with antenna 14. In practice, we can average the two measurements for each antenna for , and the 26 measurements for antenna 14 for , although care must be taken to do an appropriate average to take care of the phase ambiguity. One way to do this is form unit vectors and sum them, then find the phase of the summed vector. The **Figure** shows the results for a measurement on 2017-07-02.

## Applying the Measurements

Once we have these, we can apply corrections to each of the polarization channels, and then do the feed rotation correction. The corrections are done to data taken in a normal way, without rotating the 27-m feed. The application of the correction is:

It is quite pleasing that this agrees perfectly with the analysis of the previous section, and the only difference is one of emphasis. Rather than using fixed delays and , here we are using the frequency-dependent delay-phase. Actually, there is another, no-so-trivial difference. Here I am considering making these phase corrections first, and then applying the feed-rotation correction, i.e.:

where the primed quantities are the phase-corrected channel data.

I have analyzed a set of observations and got the values for , but when I attempt to make the corrections to parallel and crossed data I find that these are the required corrections:

where is an antenna-dependent value that is zero for antennas 1, 2, 3, 6, and 8, but is 1 for antennas 4, 5, and 7. The values for other antennas remains to be determined. I am not sure what this is, but probably is has to do with differences in the Tecom feed internal connections, which may be reversed for some antennas.

When I attempt to make corrections to non-crossed data (i.e. data taken with normal observations), I find that I need to apply:

So, the location of the has changed, but this could be due to the sign of the parallactic angle at the time the observations were taken, since the phase flips by 180 degrees at 0 HA.

I tried applying the feed rotation correction, and it does not seem to work. Okay, I looked at feed_rot_simulation.py, and I now realize that for my tests, which were done with negative angle for the crossed-feed measurements, I should expect the phase difference between XX and XY to be , not zero. For a positive angle, the flip by would appear in YX. This means that I need a diff correction:

# Effect of Polarization Mixing on Observations

## See Powerpoint Presentation File:EOVSA Status Jan 2017.pptx

The main effect that is noticeable in observations is that strong signals on the crossed hands (XY and YX) will appear when feeds are misaligned. When feeds are properly aligned, we expect to see only weak signals in the crossed hands, nominally zero, but in practice non-zero due to slight cross-talk between X and Y, which can be due to non-orthogonality or simply coupling between the separate channels. Note that non-equal gains will not cause cross-talk, but can complicate efforts to untangle it.

To make the observations, we observe calibrator sources at different declincations over a broad range of hour angle. The two sources observed so far are 3C84, at declination 41 degrees, and 3C273, at declination 2 degrees. We then plot the observed amplitude and phase for each of the observed polarization products [XX, XY, YX, YY]. For this demonstration, we use the baseline of Ant1-14, where Ant1 has the rotating feed and Ant14 has the non-rotating one (with respect to the celestial coordinate system). **Figure 3** shows the 3C84 observation and simulation. The upper-left panel is the observed amplitude of the four polarization products during an observation from 08:30-15:00 UT, and the upper-right panel is the corresponding phase. The lower panels are the simulation amplitude and phase, where the simulation assumed constant polarization products with Amp[XX, XY, YX, YY] = [0.15, 0, 0, 0.23], and Phase[XX, XY, YX, YY] = [3.1, 0, 0, 2.4] (radians). A noise level of 0.015 rms was added. It is clear that the amplitude simulation works very well, but the phase does not have the correct character--the only deviation from constant phase is an abrupt 180-degree phase jump in XY and YX at 0 hour angle. Such phase jumps are seen in the observed data, but in addition there is a large amount of phase rotation in the observations that is not in the simulation.

As a test, a simulation was done applying a phase rotation based on , as shown in **Figure 4**. Applying a rotation by the parallactic angle itself proved to be too small, and did not show the symmetric behavior around 0 hour angle, so the phase rotation applied in Fig. 4 is . It now looks about right, but there is a curvature in the simulation phase that is not really seen in the data.

As a check, we repeated the exercise on 3C273, again applying a phase rotation of , with the result shown in **Figure 5**. As before, the amplitudes match quite well. For this different source, however, the measured phase variation is not symmetric about 0 hour angle, so the simulated phases do not match the observed ones. Finally, we instead apply a phase correction without the absolute value, i.e. just , with the result in **Figure 6**. Clearly this is "better," but still does not match the phase variation precisely.

## Other Possible Reasons for the Observed Phase Variations

It has been suggested that there may be some secular change in phase not related to feed rotation, perhaps a delay error due to a baseline error, or because the Az and El axes do not cross at a common point. However, baseline errors would seem to be unlikely, because exactly the same character in the phase variations occurs on **all** of the AzEL antennas. And anyway a delay error is ruled out for another reason--the phase variation is **not** frequency dependent. **Figures 7 & 8** illustrate these facts.

Based on these tests, I conclude that the observed phase variations are indeed due to the relative feed rotation, but that something is missing in the above mathematical analysis or its application. One possibility is that there is some subtlety in the complex-conjugation of the Jones matrices, since in the above analysis they are entirely real. --Dgary (talk) 11:50, 22 October 2016 (UTC)

## More On Axis Offset

Dr. Avinash Deshpande (Raman Research Institute, Bangalore -- Thanks to Dr. Ananthakrishnan for contacting him) confirms that no phase rotation is expected for the parallactic correction, aside from the 180-degree phase jump at the meridian crossing. He suggests that a non-intersecting axis is more likely, and notes that my plots claiming no evidence of a delay is too hasty. It may be that the small range of frequencies in Figure 8 is too small to see an evident frequency dependence that may nevertheless be there. He notes that the effect of non-intersecting axes is a phase rotation of

where is the elevation angle, and is the offset distance. As a test, I applied this function, using cm (based on the apparent phase variation in the observed phases), and obtained the results in **Figures 9 and 10**. Although the observed phases show a bit more curvature than the simulation, this can be due to residual baseline errors, so I think it is fair to say this is a promising result. We can prove this very shortly, since the feed rotator on the 27-m antenna is soon to be working (I hope). The prediction is that rotating the 27-m feed to keep it parallel to the 2.1-m feeds on these antennas will correct the amplitudes, but the phases will still show the same behavior (since they are due to a different cause), and also that using a wider range of frequencies (which we can do, especially now that the high-frequency receiver is available) will show a frequency dependence in the amount of phase variation. --Dgary (talk) 04:55, 8 November 2016 (UTC)

### Further update

On 2016 Nov 13, new observations of 3C84 were taken, and the correction for the axis offset (d = 15.2 cm) were applied, as shown in **Figure 11** (at left). It appears that this correction works well, and that there is a residual baseline error on each of the antennas due to the fact that they were originally determined without the axis-offset correction. --Dgary (talk) 14:20, 15 November 2016 (UTC)