ALMA SIS14 apcal: Difference between revisions

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<pre style="background-color: #E0FFFF;">
<pre style="background-color: #E0FFFF;">
What are you looking for in these amplitude? As with phase, a continuous trend is good and most (but not all) data sets will
What are you looking for in these amplitude? As with phase, a continuous trend is a good sign and sudden discontinuities may be warning
 
signs. With the gain corrections the actual values of the gain are also potentially of interest. They reflect the actual gain of the
A well-behaved calibration table shows continuous trends
antennas. If one antenna has a very high or - more worrisome - a very low value, this may be a sign of a problem. Perhaps the antenna
in phase and often the same pattern in both calibrations - though perhaps with an overall offset.  
was mispointed or otherwise problematic. This may indicate data that eventually need to be flagged.
Ideally a stable antenna will change phase only gradually as a function of time. Rapid wrapping may  
be a sign for alarm. Sudden, large jumps in phases may also be a signal for worry; we often want to
be able to interpolate between these corrections and sudden jumps can make this difficult (or impossible).  
Depending on the application, you may also be interested in the overall amplitude of the solution; e.g.,
when engaged in iterative self-calibration the amplitude of the phase correction is of interest.
</pre>
</pre>



Revision as of 20:50, 6 March 2014

This lesson steps through the basic calibration of the phase and amplitude response of each telescope as a function of time. In this step we will

Setup

To run this tutorial, you need the measurements set "sis14_twhya_calonly.ms." This measurement set contains the calibrators from the parent data set. If you are using the pre-provided directory structure then you want to work in the directory (relative to the root for the package):

lessons/basic_cal/

and you can copy the data to your working directory using the commands

# In CASA
os.system("rm -rf sis14_twhya_calonly.ms")
os.system("cp -r ../../working_data/sis14_twhya_calonly.ms .")

With this measurement set in place, you can follow the tutorial below inside the "basic_cal/" directory.

Overview

This lesson covers basic calibration. We will use observations of a quasar, which can be assumed to be a point source at the middle of the field. Mainly using the task gaincal, we will derive the time-dependent corrections to the phase and amplitude response of each antenna that cause the observations to best match this model. These corrections are stored in a calibration table by CASA. They can be applied to the data, correcting observations of both the source and the quasar.

This whole procedure makes an underlying assumption about the quasar's geometry (we take it to be a point source) and assumes that antenna-dependent terms are calibration issues rather than something astronomical. The latter is a very good assumption that underlies most of the calibration we do. The geometry of the quasar can be checked and modeled in a more sophisticated way if necessary. A future lesson gives an example of this procedure for planets.

The flow of the lesson is:

  • We derive phase corrections for each antenna for each scan using gaincal.
  • We inspect these phase corrections using plotcal.
  • We derived shorter timescale phase corrections using gaincal, which we will use to remove decorrelation from the calibrator during amplitude calibration.
  • We derive amplitude corrections for each antenna using gaincal and taking into account these short-timescale phase corrections.
  • We inspect the amplitude corrections using plotcal.

After the main lesson we discuss some additional options and advanced strategies that can be used with gaincal.

Get Oriented

First, as usual we orient ourselves by looking at the output of listobs (and perhaps plotants or a plotms call). See the lesson on getting started for more details.

# In CASA
listobs("sis14_ampandphase.ms")

A snippet of the output is here:

2014-03-06 19:09:04 INFO listobs	  19-Nov-2012/07:36:57.0 - 07:39:13.1     4      0 J0522-364                 5060  [0]  [6.05] [CALIBRATE_BANDPASS#ON_SOURCE, CALIBRATE_PHASE#ON_SOURCE, CALIBRATE_WVR#ON_SOURCE]
2014-03-06 19:09:04 INFO listobs	              07:44:45.2 - 07:47:01.2     7      1 Ceres                     5060  [0]  [6.05] [CALIBRATE_AMPLI#ON_SOURCE, CALIBRATE_PHASE#ON_SOURCE, CALIBRATE_WVR#ON_SOURCE]
2014-03-06 19:09:04 INFO listobs	              07:52:42.0 - 07:53:47.6    10      2 J1037-295                 2760  [0]  [6.05] [CALIBRATE_PHASE#ON_SOURCE, CALIBRATE_WVR#ON_SOURCE]
2014-03-06 19:09:04 INFO listobs	              08:04:36.3 - 08:05:41.9    14      2 J1037-295                 3000  [0]  [6.05] [CALIBRATE_PHASE#ON_SOURCE, CALIBRATE_WVR#ON_SOURCE]
2014-03-06 19:09:04 INFO listobs	              08:16:20.6 - 08:17:26.2    18      2 J1037-295                 3000  [0]  [6.05] [CALIBRATE_PHASE#ON_SOURCE, CALIBRATE_WVR#ON_SOURCE]
2014-03-06 19:09:04 INFO listobs	              08:28:17.1 - 08:29:22.6    22      2 J1037-295                 3000  [0]  [6.05] [CALIBRATE_PHASE#ON_SOURCE, CALIBRATE_WVR#ON_SOURCE]
2014-03-06 19:09:04 INFO listobs	              08:40:11.9 - 08:41:17.4    26      2 J1037-295                 3000  [0]  [6.05] [CALIBRATE_PHASE#ON_SOURCE, CALIBRATE_WVR#ON_SOURCE]
2014-03-06 19:09:04 INFO listobs	              08:51:57.1 - 08:53:02.6    30      2 J1037-295                 3000  [0]  [6.05] [CALIBRATE_PHASE#ON_SOURCE, CALIBRATE_WVR#ON_SOURCE]
2014-03-06 19:09:04 INFO listobs	              09:01:35.7 - 09:02:41.2    34      2 J1037-295                 2530  [0]  [6.05] [CALIBRATE_PHASE#ON_SOURCE, CALIBRATE_WVR#ON_SOURCE]
2014-03-06 19:09:04 INFO listobs	              09:09:59.1 - 09:11:04.7    38      2 J1037-295                 2530  [0]  [6.05] [CALIBRATE_PHASE#ON_SOURCE, CALIBRATE_WVR#ON_SOURCE]

From the output of listobs we can see that this data set contains a single spectral window and observations of three sources: the calibrators J0522-364, Ceres, and J1037-295. The first two are intended to calibrate the flux scale and bandpass; in this lesson we focus on the third calibrator, J1037-295, which we note is Field 2 (you can see this by looking at the intents at the end of the lines for each scan and at the field table). Each visit to the this quasar was about a minute long and in the original data set they bracketed visits to the source.

Following the earlier lesson, we pick out DV22 as a reasonable reference antenna that sits near the center of the array.

Phase Calibration

Per Scan Phase Calibration

Our first calibration step is to derive a phase correction for each antenna as a function of time that will be suitable for correcting the phases of the science data.

The task gaincal does this, attempting to match the DATA column (i.e., the measurements) to the MODEL column (the expected visibility for the source). In the absence of any MODEL column (and this is the case here), gaincal tries to match the observed data to a point source of amplitude 1 Jy at the center of the field. We'll discuss the correct amplitude scaling in an upcoming lesson, but for now this is perfect - a phase calibrator can usually be taken to be a point source with fixed amplitude at the center of the field, that's the whole idea.

For now, calibrate the phase corrections only using:

# In CASA
os.system("rm -rf phase_scan.cal")
gaincal(vis="sis14_twhya_calonly.ms",
        caltable="phase_scan.cal",
        field="2",
        solint="inf",
        calmode="p",
        refant="DV22",
        gaintype="G")

These commands do the following:

  • First, we delete any previous table using the os.system call.
  • Then we tell gaincal to consider the measurement set "sis14_twhya_calonly.ms" (via vis).
  • We tell gaincal that we want the output written to the calibration table "phase_scan.cal" (via caltable).
  • We tell gaincal to consider only the phase calibrator, which we know is field number 2 from the listobs (field=2).
  • We ask gaincal to solve only for the phase solutions by saying calmode="p".
  • We specify DV22 as our reference antenna (refant). This antenna will have phase correction 0 by definition (the other corrections are relative to the refant).
  • We ask gaincal to solve for a correction for each "correlation" (i.e., each polarization) by specifying gaintype="G".
  • Finally, we specify that we want to combine data across the longest possible time interval by setting the solution interval to infinity (solint="inf"), but because gaincal will not combine across scans (or spws or fields) by default, solint="inf" can be read "solve for the phase correction for each antenna for each scan."

More on solint: The timescale over which we calibrated is critical here - our goal with this table is to generate the phase correction to be applied to the source. Therefore, we choose to derive one correction per scan. This means that we get one phase correction for each antenna for each visit to the phase calibrator. In between these corrections we observed the source. This represents an optimum tradeoff of signal to noise vs. precision of the correction. Solving for a finer timescale solution won't be particularly useful (i.e., solving every 6 seconds on the calibrator doesn't help if you then go stare at the source for five minutes) while solving over a longer timescale loses precision in the calibration (e.g., if we averaged over an hour timescale we would blend together many calibrator-source-calibrator cycles).

Run this command the results will be written to a new directory, "phase.cal" that contains the calibration table holding the phase corrections. You may want to briefly inspect the directory using linux/unix commands (e.g., "ls phase.cal") just to understand the directory structure. But this isn't strictly necessary. From CASA's perspective the directory "phase.cal" is now a calibration table suitable for use in other tasks.

Read more about the choices involved in gaincal at the end of the lesson.

Inspect Your Phase Calibration Table

Now we plot the results of the calibration. plotcal is the CASA task for plotting calibration tables. We will plot the phase correction as a function of time for our new table via the command:

# In CASA
plotcal(caltable="phase_scan.cal", 
        xaxis="time",
        yaxis="phase",
        subplot=331,
        iteration="antenna",
        plotrange=[0,0,-180,180],
        markersize=10,
        fontsize=10.0,
        figfile="sis14_phase_scan.png")

This does the following:

  • We plot the calibration table "phase_scan.cal"
  • We choose to plot time on the x-axis.
  • We choose to plot the phase correction to be applied on the y-axis.
  • We want a plot for each antenna and so set iteration to "antenna".
  • We want several plots per page, subplot=331 will plot 3x3 panels with one plot per panel.
  • We set the plot range (via plotrange) to autoscale on the x-axis (0,0) and run from (-180,180) on the y-axis.
  • We set markersize and fontsize to very large values in order to make the plots legible for screen capture.
  • (Not important usually, but we also output the plot to a PNG file in order to upload it here).

This produces the plot below. You are able to cycle between successive panels using the buttons at the bottom of the window. For example, because there are more than 9 antennas in these data we will need to do this to see all the plots. Note tat you see two points in each plot because we have a solution for each polarization.

Phase corrections vs. time for our "phase_scan.cal" table. Each panel shows one antenna, the two colors show the two correlations. Click next to cycle through all antennas.

What are you looking for in these tables? A well-behaved calibration table shows continuous trends 
in phase and often the same pattern in both calibrations - though perhaps with an overall offset. 
Ideally a stable antenna will change phase only gradually as a function of time. Rapid wrapping may 
be a sign for alarm. Sudden, large jumps in phases may also be a signal for worry; we often want to 
be able to interpolate between these corrections and sudden jumps can make this difficult (or impossible). 
Depending on the application, you may also be interested in the overall amplitude of the solution; e.g., 
when engaged in iterative self-calibration the amplitude of the phase correction is of interest.

For now, these solutions look good. See how they change only gradually and continuously with time and how the two correlations (green and blue) track one another, though sometimes with an offset. We proceed to amplitude self-calibration.

Amplitude Calibration

Now we calibrate the amplitude response of each antenna as a function of time. As with phase, our goal is to reach a correction for each antenna for each scan, suitable for application to the science target. There are a couple of additional complications for the amplitude case. First, remember that the actual flux scale of our data remains unspecified; that will be the topic of a future lesson, in this lesson we solve for the corrections under the default assumption that the amplitude of the calibrator is one Jansky. So these are correct relative corrections.

The second complication is that decorrelation due to phase errors can confuse the amplitude response of the telescope. That is, if the phase is noisy or corrupted, the amplitude of the calibrator may appear artificially faint. Therefore it is common, though not universal, practice to attempt to correct for phase scatter on the calibrator before deriving amplitude corrections. This step should be viewed as optional but highly recommended; it is a part of the standard ALMA reduction path. Note, however, that unless you can self-calibrate on the science target, these same short timescale phase variations will affect the source.

Remove Short-Timescale Phase Variations

To solve for short timescale variations in phase on the source, we repeat our earlier phase calibration with one key change: we set the solution interval (solint) to "int", meaning one integrations (from the listobs, you can see that this is 6 seconds long). Run the resulting command:

# In CASA
os.system("rm -rf phase_int.cal")
gaincal(vis="sis14_twhya_calonly.ms",
        caltable="phase_int.cal",
        field="2",
        solint="int",
        calmode="p",
        refant="DV22",
        gaintype="G")

and again we can use plotcal to inspect the results.

  1. In CASA

os.system("rm -rf phase_int.cal") plotcal(caltable="phase_int.cal",

       xaxis="time",
       yaxis="phase",
       subplot=331,
       iteration="antenna",
       plotrange=[0,0,-180,180],
       markersize=5,
       fontsize=10.0,
       figfile="sis14_phase_int.png")

</source>

Notice that now we are getting many vary slightly scattered phase corrections for each visit to the phase calibrator, separated by long empty times when the science target was observed.

Phase corrections vs. time solved for our "phase_int.cal" table. Each panel shows one antenna, the two colors show the two correlations. Click next to cycle through all antennas. Notice that we now have many solutions (one per integration) for each visit to the calibrator.

Per-Scan Amplitude Calibration

Now we are ready to solve for the amplitude corrections as a function of time. Because this is a table for application to the source, we again solve for one correction for each scan by setting the solution interval to inf but not allowing gaincal to combine scans. The key difference from before is that we now apply the integration-length phase corrections to the data before

# In CASA
os.system("rm -rf amp_scan.cal")
gaincal(vis="sis14_twhya_calonly.ms",
        caltable="amp_scan.cal",
        field="2",
        solint="inf",
        calmode="a",
        refant="DV22",
        gaintype="G",
        gaintable="phase_int.cal")

Again, this is fairly similar to the earlier phase cal. Key differences are:

  • We tell gaincal that we want the output written to a new calibration table "amp_scan.cal" (via caltable).
  • We ask gaincal to solve only for the amplitude solutions by saying calmode="a".
  • We apply a previous calibration table "on the fly", meaning that these corrections are applied before the new ones are derived. We provide the per-integration phase correction table via the gaintable parameter (="phase_int.cal"). This should remove short-timescale phase variations before

Next we plot the results of this fit, again using plotcal:

# In CASA
plotcal(caltable="amp_scan.cal", 
        xaxis="time",
        yaxis="amp",
        subplot=331,
        iteration="antenna",
        plotrange=[0,0,0,0],
        markersize=10,
        fontsize=10.0,
        figfile="sis14_amp_scan.png")
  • The main difference from the previous plotcal call is that plot "amp" on the y-axis we now auto-scale the y-axis to the range of the data by setting the y part of the plotrange to 0,0.

Amplitude (gain) correction vs. time for our scan-length solution. Each antenna is one panel and the two colors (green and blue) show the two polarizations ("correlations").

What are you looking for in these amplitude? As with phase, a continuous trend is a good sign and sudden discontinuities may be warning 
signs. With the gain corrections the actual values of the gain are also potentially of interest. They reflect the actual gain of the 
antennas. If one antenna has a very high or - more worrisome - a very low value, this may be a sign of a problem. Perhaps the antenna 
was mispointed or otherwise problematic. This may indicate data that eventually need to be flagged.

Advanced Options

Averaging Options

"Layering" Calibrations