2.1 Calculation of system temperature

System temperature, $T_{sys}(\nu,\text{LST})$ , is a sum of receiver temperature ( $T_{rcv}(\nu)$ ) and antenna temperature ( $T_{ant}(\nu,\text{LST})$ ), i.e. $T_{sys}(\nu,\text{LST}) = T_{ant}(\nu,\text{LST}) + T_{rcv}(\nu)$ . The receiver temperature, $T_{rcv}(\nu)$ , shown in Figure 1, is time independent. Therefore, it is straightforward to note that the sensitivity of the low frequency array depends not only on its collecting area ( $A_e(\nu)$ ), but also on the system temperature ( $T_{sys}(\nu,\text{LST})$ ), which is strongly LST-dependent due to its sky noise component, $T_{ant}(\nu,\text{LST})$ . The strong LST-dependence of system temperature can be seen in Figure 2 showing the total power ( $P(\nu,\text{LST})$ ), recorded by the AAVS2 station pointed at zenith during a 48- h observation (drift scan observation).

Figure 1. The receiver temperature of the AAVS2 at zenith (dashed blue line) and EDA2 (solid black line) stations used in the simulations presented in this paper. The red crosses were calculated as the mean over receiver temperatures of all individual antennas in the AAVS2 station as simulated in FEKO. They are very similar to the values used for the AAVS2 (dashed blue line). For comparison, the red solid curves with triangles pointing up and down show, are respectively, the minimum and maximum $T_{ant}(\nu,\text{LST})$ calculated over all LSTs for the EDA2 station (the curve for AAVS2 is virtually the same and was not plotted for the clarity of the image). The green curve is the $T_{sky}$ used by Braun et al. (Reference Braun, Bonaldi, Bourke, Keane and Wagg2019).

Figure 2. Total power recorded with the AAVS2 station beam pointed at the zenith (drift scan observation) as a function of local time at a frequency of 159.375 MHz. The uncalibrated data were normalised to the simulation (in Kelvin units) at the peak value. The simulation matches the data points very well (within 10–20% for most of the observation duration). The approximate six-fold change in antenna temperature at different LST times causes correspondingly large changes in the station sensitivity (see examples in Figures 14 and 15).

This total power is directly proportional to the system temperature, $T_{sys}(\nu,\text{LST})$ :

(1) \begin{equation}P(\nu,\text{LST}) = g(\nu,\text{LST}) \left[ T_{ant}(\nu,\text{LST}) + T_{rcv}(\nu) \right],\end{equation}

where $g(\nu,\text{LST})$ is the frequency dependent gain of the system, which can also change in time due to variations in gains of various components. In our simulations, the antenna temperature, $T_{ant}(\nu,\text{LST})$ , was calculated as an integral of sky temperature ( $T_{sky}(\nu,\theta,\phi, \text{LST})$ ) weighted by the beam pattern of the station beam:

(2) \begin{equation}T_{ant}(\nu,\text{LST}) = \frac{\int_{4\pi} B_{st}(\nu,\theta,\phi) T_{sky}(\nu,\theta,\phi,\text{LST}) d\Omega}{\int_{4\pi} B_{st}(\nu,\theta,\phi) d\Omega},\end{equation}

where $B_{st}(\nu,\theta,\phi)$ is the beam pattern of an SKA-Low station (EDA2 or AAVS2), $T_{sky}(\nu,\theta,\phi,\text{LST})$ is the sky brightness temperature from the sky model at frequency $\nu$ and pointing direction $(\theta,\phi)$ in horizontal coordinates, which implies LST dependence as the sky above the horizon changes as the Earth rotates. The angles $\theta$ and $\phi$ are respectively zenith angle and azimuth starting from the North and increasing towards the East (Figure 3). The sky model used in our calculations is based on Haslam et al. (Reference Haslam, Salter, Stoffel and Wilson1982) at 408 MHz (the ‘Haslam map’) scaled to lower frequencies using a spectral index of $-2.55$ (Mozdzen et al. Reference Mozdzen, Mahesh, Monsalve, Rogers and Bowman2019).

An example comparison of the measured total power of the station beam in the X polarisation pointed to the zenith (i.e. drift scan observation) and our simulation is shown in Figure 2. The data and simulation are normalised at the peak value. Figure 2 shows that the antenna temperature ( $T_{ant}(\nu,\text{LST})$ ) varies between approximately 200 and 1 200 K (by a factor of six). Moreover, the simulation matches the data very well with residuals within $\pm$ 10–15% over almost 48 h.

As shown in Figure 1, in the case of SKA-Low prototype stations AAVS2 and EDA2, at the time of Galactic Centre transit ( $\mathrm{LST}\approx17.8\,\mathrm{h}$ ), the system temperature at frequencies below 330 MHz is dominated by the antenna temperature (even by an order of magnitude at frequencies $\le$ 250 MHz). However, even when the Galactic Centre is at its lowest point below the horizon (‘cold sky’ is above the horizon) the antenna temperature still exceeds the receiver temperature below 300 MHz for both AAVS2 and EDA2 stations, but typically by less than an order of magnitude (Figure 1). Therefore, through the dependence on $T_{ant}(\nu,\text{LST})$ , the station sensitivity strongly depends on the pointing direction (‘cold’ vs ‘hot’ parts of the sky) and the LST of the observations. For comparison, the green curve in Figure 1 is the $T_{sky}$ as calculated by Braun et al. (Reference Braun, Bonaldi, Bourke, Keane and Wagg2019), which is between the ‘cold’ and ‘hot’ sky up to $\sim$ 180 MHz and slightly below the temperature corresponding to ‘cold’ sky at higher frequencies. This shows that $T_{sky}$ used by Braun et al. (Reference Braun, Bonaldi, Bourke, Keane and Wagg2019) can often be a factor of a few (in extremes even an order of magnitude) under- or over-estimated, resulting in a similar inaccuracy in the predicted sensitivity.

The receiver temperature of the EDA2 station, which is the same as for the EDA1, was obtained from astronomical measurements (Wayth et al. Reference Wayth2017) and confirmed with laboratory measurements by Ung et al. (Reference Ung, Sokolowski, Sutinjo and Davidson2020); both sets of measurements are shown in Figure 1. However, for the AAVS2 station, a model of zenith dependent receiver temperature was derived based only on laboratory measurements using the same technique as (Ung et al. Reference Ung, Sokolowski, Sutinjo and Davidson2020), and may be subject to modifications once it is also measured using astronomical measurements. All the above values ( $T_{ant}(\nu,\text{LST})$ and $T_{rcv}(\nu)$ ) are stored in the database. Therefore, if the receiver temperature changes (for instance due to improved measurement or modifications in the receiver) it is straightforward to update the sensitivity values in the database by dividing effective area by a sum of $T_{ant}$ and the updated $T_{rcv}$ , without the need for performing the simulations again.

Figure 3. The horizontal coordinates system used in the paper with the definitions of the angles $\theta$ (zenith angle) and $\phi$ (azimuth starting from the North at $\phi= 0^\circ$ and increasing towards the East at $\phi=90^\circ$ ).

2.2 Calculation of station effective area

The effective area, $A_e(\nu,\theta_p,\phi_p)$ , of the station at pointing direction $(\theta_p,\phi_p)$ can be calculated according to the standard equation:

(3) \begin{equation}A_e(\nu,\theta_p,\phi_p) = \frac{G(\nu,\theta_p,\phi_p)c^2}{4\pi\nu^2},\end{equation}

where c is the speed of light and $G(\nu,\theta_p,\phi_p)$ is the station gain calculated as:

(4) \begin{equation}G(\nu,\theta_p,\phi_p) = \frac{4\pi B_{\max}(\theta_p,\phi_p) \eta}{\int_{2\pi} B_{st}(\theta,\phi) \delta \Omega},\end{equation}

where $B_{\max}(\theta_p,\phi_p)$ is the maximum value of the station beam pattern $B_{st}(\nu,\theta,\phi)$ over the entire sky when the station beam is pointed in the direction $(\theta_p,\phi_p)$ and radiation efficiency, $\eta$ , was assumed to be $\eta=$ 1 in our calculations. Further considerations assume that the station beam is pointed in the direction $(\theta_p,\phi_p)$ but these indexes have been dropped for brevity. Typically, $B_{st}(\theta,\phi)$ has a maximum value at zenith ( $\theta=0^\circ$ ). However, we note, that this is not the case for the EDA2 (using MWA bowtie dipoles) at frequencies above 200 MHz where the maximum response of a single dipole can be away from zenith. Therefore, the sensitivity at zenith can be lower than the maximum sensitivity at a given frequency.

The array gain can be accurately estimated with the electromagnetic simulations of the station beam at a given frequency and pointing direction using the Method of Moments implemented in electromagnetic simulation packages such as FEKOFootnote c or Gallileo.Footnote d This is a very accurate method, which takes into account the mutual coupling of the antennas within the stations. However, its main limitation, is that it is very computationally demanding and takes a relatively long time to simulate the beam at a single pointing direction and frequency. For frequencies above 80 MHz, it takes between 1 and 4 d to process a single frequency channel and polarisation, whereas below 80 MHz it can take even between 7 and 14 d to simulate the station beam of AAVS2 at one pointing direction. Consequently, full electromagnetic simulations of both stations at 10 MHz resolution were not available at the time of EDA2 and AAVS2 sensitivity measurements and verifications.

Therefore, a simplified array factor (AF) method has been used, which does not take into account mutual coupling effects. This method, which is the standard approach in antenna texts for array analysis (Balanis Reference Balanis2005), will be referred to as the array factor, or AF method. A more detailed description can be found in Section III of Sokolowski et al. (Reference Sokolowski2021) and will be briefly summarised here. In general, the array factor (Equation (4) in Sokolowski et al. Reference Sokolowski2021) is multiplied by the beam response of a single antenna element (Equation (5) in Sokolowski et al. Reference Sokolowski2021), which in our case is a beam pattern of an individual antenna within a station. The beam pattern for a isolated single element (ISO) over an infinite ground screen was simulated with the FEKO electromagnetic simulation software. This simulation was performed in 1 MHz steps, enabling us to calculate sensitivity at many more frequency channels than using full electromagnetic simulations. Alternatively, we could have used average embedded element (AEE) pattern (average beam pattern of all dipoles within a station). However, the calculation of the AEE patterns requires the calculation of 256 embedded elements patterns (EEPs) which, as mentioned earlier, were only available at a few selected frequencies due to computational complexity. The difference between using AEE and ISO patterns was tested at these frequencies and the differences in the resulting sensitivities are within 15%. Hence, our method is a combination of mathematically calculated array factor and FEKO simulations of a single antenna element. Results shown in Figure 4 indicate that the station main beam can be reliably formed using approximate element patterns—both average and isolated element patterns are shown—at least in terms of the main beam and the inner sidelobes. The reason is that the array factor (geometric phase delays) dominates the element patterns by one to two orders of magnitude in the main beam. However, this is no longer true as one moves further into the sidelobes. More details of the electromagnetic simulation of AAVS2 may be found in Bolli et al. (Reference Bolli, Davidson, Bercigli, Di Ninni, Labate, Ung, Virone, Bonaldi, Wijnholds and Stringhetti2021). We note that once full electromagnetic simulations are feasible and available, the sensitivities in the database can be updated with even more precise values.

Figure 4. A comparison of the AAVS2 station beam formed from: the array factor and the average element pattern (blue dash-dot curve); the array factor and the isolated element pattern (red dashed curve); and a rigorous EEP formulation (black solid curve). This is for the X-polarisation, E-plane (i.e. in the plane of the dipoles).

2.3 Calculation of the system equivalent flux density

The simulation software is based on simulations originally developed in 2016 to verify the sensitivity of the EDA1. The original code used an analytical model of the MWA dipole and this code has been modified to enable use of an arbitrary beam pattern for an individual element, which has to be provided in the FITS file format. The individual dipole patterns were simulated as a single SKALA4.1AL antenna or an MWA bowtie dipole over an infinite ground screen.

System equivalent flux density (SEFD) is the flux density incident on the antenna (or aperture array) resulting in delivered power equal to the system noise ( $A_e(\nu) \cdot $ SEFD = $2kT_{sys}(\nu,\text{LST})$ ), where k is the Boltzmann constant. Hence, the SEFD = 2 $kT_{sys}(\nu,\text{LST}) / A_e(\nu)$ can be calculated for X and Y polarisations by calculating $T_{sys}(\nu,\text{LST})$ and $A_e(\nu)$ for a specific instrumental polarisation (X or Y). As shown by Sutinjo et al. (Reference Sutinjo, Sokolowski, Kovaleva, Ung, Broderick, Wayth, Davidson and Tingay2021), this approach is only valid for unpolarised sources, while the calculation of SEFD for polarised sources is not straightforward. We used the following equation to calculate SEFD in Stokes I polarisation:

(5) \begin{equation}\text{SEFD}_{I} = \frac{1}{2}\sqrt{\text{SEFD}_{XX}^2+\text{SEFD}_{YY}^2},\end{equation}

where $\text{SEFD}_{XX}, \text{SEFD}_{YY}$ , and $\text{SEFD}_{I}$ are SEFDs in X, Y, and Stokes I polarisations, respectively. However, as discussed in Sutinjo et al. (Reference Sutinjo, Sokolowski, Kovaleva, Ung, Broderick, Wayth, Davidson and Tingay2021), this equation is only valid in the cardinal planes (azimuth values $0^\circ$ , $90^\circ$ , $180^\circ$ and $270^\circ$ ) and leads to errors for the off-zenith pointing directions (up to 40% below an elevation of $30^\circ$ in the MWA case). Nevertheless, we used Equation (5) in the current version of the database. Once more accurate equations (valid over the entire hemisphere) for the relationship between the X and Y polarisations and Stokes I are derived, the sensitivity in Stokes I will be updated accordingly.

At this stage, the software provides SEFD values, and it does not calculate standard deviation of the noise ( $\sigma$ ) expected in the images of the sky. This functionality may be added in the future versions, but the expected $\sigma$ of the noise can be calculated using Equation (9.35) in Wilson et al. (Reference Wilson, Rohlfs and Hüttemeister2009), which we repeat below:

(6) \begin{equation}\sigma = \frac{M \cdot SEFD}{\sqrt{N_{st}(N_{st}-1)\Delta t \Delta \nu}},\end{equation}

where $N_{st}$ is the number of SKA-Low stations (expected to be 512), $\Delta t$ is the integration time in seconds, $\Delta \nu$ is the bandwidth in Hz, and M is a factor accounting for additional noise due to analogue to digital conversions (can be assumed to be equal to one).

3.1 Structure of the database

The database consists of a single table and its structure is shown in Figure 5. The sensitivity values for both stations were calculated on the cloud computing system ‘Nimbus’ hosted by the Pawsey Supercomputing Centre (PSC). The calculated values were saved to SQL files and uploaded to the SQLite database (text files were also archived for the future reference). The size of the database file for a single station is approximately 670 MB and contains 4 354 630 records resulting from 48 half hour LST steps $\times 35$ frequencies $\times 18$ elevations $\times 72$ azimuths $\times 2$ polarisations + 70 (35 frequency points in 2 polarisations at zenith where the sensitivity was calculated at a single azimuth $= 0^\circ$ ).

Figure 5. The definition of the Sensitivity table in the database.

4.1 Command line tools

The python script sensitivity_db.py enables access to the sensitivity database. This script requires SQLite database files to exist locally. The full deployment procedure is described in the github repository. On execution, the script generates output text files and png images according to the request specified by the command line options. Typical command line parameters are described in the user manual in the github repository and Appendix A; they implement the following functionality:

• • Sensitivity as a function of frequency at a specified pointing direction and LST or UTC time. Example images obtained with this option at the $\mathrm{LST}=0\,\mathrm{h}$ (‘cold sky’ transiting overhead) and at $\mathrm{LST}=17.8\,\mathrm{h}$ (Galactic Centre transit) are shown, respectively, in the left and right panels of Figures 6 and 7 for AAVS2 and EDA2, respectively. For comparison, SKA-Low specifications and sensitivity from Table 9 in Braun et al. (Reference Braun, Bonaldi, Bourke, Keane and Wagg2019) were included in these plots showing that at some LSTs they can be significantly different (by even a factor of a few) from the results of our simulations.

  

  Figure 6. The AAVS2 sensitivity as a function of frequency at the zenith pointing. Left image : the ‘cold sky’ is transiting at LST = 0 h. Right image : Galactic transit at LST = 17.8 h. The data points are results of this work, dashed orange and dotted red curves are SKA-Low specifications at zenith and averaged over elevations $\ge 45^\circ$ , respectively. The magenta dotted curve is the sensitivity from Table 9 in Braun et al. (Reference Braun, Bonaldi, Bourke, Keane and Wagg2019) (also averaged over elevations $\ge45^\circ$ ).

  

  Figure 7. The EDA2 sensitivity as a function of frequency at the zenith pointing. Left image : the ‘cold sky’ is transiting at LST = 0 h. Right image : Galactic transit at LST = 17.8 h. The data points are results of this work, dashed orange and dotted red curves are SKA-Low specifications at zenith and averaged over elevations $\ge 45^\circ$ , respectively. The magenta dotted curve is the sensitivity from Table 9 in Braun et al. (Reference Braun, Bonaldi, Bourke, Keane and Wagg2019) (also averaged over elevations $\ge45^\circ$ ).

• • All-sky sensitivity map at a specified frequency and LST or UTC time. Example images obtained with this option at $\mathrm{LST}=0\,\mathrm{h}$ (‘cold sky’) and frequency 159.375 MHz are shown in Figures 8 and 9 for AAVS2 and EDA2, respectively. Example images obtained with this option at the time of Galactic transit $\mathrm{LST}=17.8\,\mathrm{h}$ (‘hot sky’) and frequency 110 MHz are shown in Figures 10 and 11 for AAVS2 and EDA2, respectively. These images clearly demonstrate significant non-uniformity of the sensitivity across the sky reaching even a factor of 3 between zenith (high sky noise temperature at the Galactic Centre and Plane) and some $30^\circ$ away from zenith in the North-East direction. Corresponding images at $\mathrm{LST}=21\,\mathrm{h}$ (Galactic Centre in the West at elevation $\approx45^\circ$ ) and frequency 70.3125 MHz are presented in Figures 12 and 13 for AAVS2 and EDA2 respectively.

  

  Figure 8. The AAVS2 all-sky sensitivity map at frequency 160 MHz and LST = 0 h (‘cold sky’) in X polarisation (left image), Y polarisation (centre image), and Stokes I polarisation (right image).

  

  Figure 9. The EDA2 all-sky sensitivity map at frequency 160 MHz and LST = 0 h (‘cold sky’) in X polarisation (left image), Y polarisation (centre image), and Stokes I polarisation (right image).

  

  Figure 10. The AAVS2 all-sky sensitivity map at frequency 110 MHz and LST = 17.8 h (Galactic transit) in X polarisation (left image), Y polarisation (centre image), and Stokes I polarisation (right image). The clearly visible stripe of lower sensitivity is caused by high noise temperature at the Galactic Centre and Plane.

  

  Figure 11. The EDA2 all-sky sensitivity map at frequency 110 MHz and LST = 17.8 h (Galactic transit) in X polarisation (left image), Y polarisation (centre image), and Stokes I polarisation (right image). The clearly visible stripe of lower sensitivity is caused by high noise temperature at the Galactic Centre and Plane.

  

  Figure 12. The AAVS2 all-sky sensitivity map at frequency 70 MHz and LST = 21.1 h (Galactic center at the elevation $\approx45^\circ$ in the West at azimuth $270^\circ$ ) in X polarisation (left image), Y polarisation (centre image), and Stokes I polarisation (right image).

  

  Figure 13. The EDA2 all-sky sensitivity map at frequency 70 MHz and LST = 21.1 h (Galactic center at the elevation $\approx45^\circ$ in the West at azimuth $270^\circ$ ) in X polarisation (left image), Y polarisation (centre image), and Stokes I polarisation (right image).

• • Sensitivity as a function of time at a specified pointing direction and frequency. Example images obtained with this option at the zenith pointing and frequencies 70.3125 and 159.375 MHz are shown in the left and right panels of Figures 14 and 15 for AAVS2 and EDA2 respectively. For comparison, SKA-Low specifications and sensitivity from Table 9 in Braun et al. (Reference Braun, Bonaldi, Bourke, Keane and Wagg2019) were also included. Both are time independent, while the values resulting from our work vary significantly with LST (nearly by an order of magnitude) resulting in even factor $\sim$ 2 differences with the work by Braun et al. (Reference Braun, Bonaldi, Bourke, Keane and Wagg2019) and SKA-Low specifications.

  

  Figure 14. The AAVS2 sensitivity as a function of time at the zenith pointing. Left image : frequency 70.3125 MHz. Right image : frequency 159.375 MHz. These data were generated with a station beam model ( $B_{st}(\nu,\theta,\phi)$ ) in Equation (2). Noticeable is the sharp drop in sensitivity at time of the Galactic transit, which is caused by a very sharp peak in antenna temperature (as in Figure 3) causing sharp and significant reduction in sensitivity. The data points are results of this work, and dashed orange and dotted red curves are SKA-Low specifications at zenith and averaged over elevations $\ge45^\circ$ , respectively. The magenta dotted curve is the sensitivity from Table 9 in Braun et al. (Reference Braun, Bonaldi, Bourke, Keane and Wagg2019) (also averaged over elevations $\ge45^\circ$ ).

  

  Figure 15. The EDA2 sensitivity as a function of time at the zenith pointing. Left image : frequency 70.3125 MHz. Right image : frequency 159.375 MHz. These data were generated with a station beam model ( $B_{st}(\nu,\theta,\phi)$ ) in Equation (2). Noticeable is the sharp trough in sensitivity at time of the Galactic transit, which is caused by a very sharp peak in antenna temperature (as in Figure 3 for AAVS2) causing sharp and significant reduction in sensitivity. The data points are results of this work, and dashed orange and dotted red curves are SKA-Low specifications at zenith and averaged over elevations $\ge45^\circ$ , respectively. The magenta dotted curve is the sensitivity from Table 9 in Braun et al. (Reference Braun, Bonaldi, Bourke, Keane and Wagg2019) (also averaged over elevations $\ge45^\circ$ ).

  

  Figure 16. The sensitivity of AAVS2 as a function of LST for the two extreme scenarios in terms of the sky noise. Left: for the Galactic Centre (‘hot sky’), which is at an elevation $\ge45^\circ$ in the approximate LST range between $-9.6$ and $-2.8\,\mathrm{h}$ . Right: for the center of the Epoch of Reionisation 0 (EoR0) field (‘cold sky’), which is at an elevation $\ge45^\circ$ in the approximate LST range between $-3.3$ and $+3.3\,\mathrm{h}$ . Solid curves show results of this work, and orange and red dashed curves show SKA-Low specifications at zenith and averaged over elevations $\ge45^\circ$ , respectively. The magenta dotted curve is the sensitivity from Table 9 in Braun et al. (Reference Braun, Bonaldi, Bourke, Keane and Wagg2019) (also averaged over elevations $\ge45^\circ$ ). In the case of the EoR0 field, although the sensitivity averaged over elevations $\ge45^\circ$ is similar to values in the SKA-Low specification and Table 9 in Braun et al. (Reference Braun, Bonaldi, Bourke, Keane and Wagg2019), it can be even up to a factor of $\sim$ 2.5 higher and several times lower at the highest and lowest elevations, respectively (right image). Moreover, in the extreme case of the sources near the Galactic Centre (left image), the sensitivity is several times lower and never reaches the specifications and the values in Braun et al. (Reference Braun, Bonaldi, Bourke, Keane and Wagg2019).

  

  Figure 17. The sensitivity of AAVS2 as a function of LST for the radio source 3C444, which is at an elevation $\ge45^\circ$ in the approximate LST range between $-5$ and $+1.4\,\mathrm{h}$ . Similarly to the case of the EoR0 field (Figure 16), this example shows that although the sensitivity averaged over elevations $\ge45^\circ$ is similar to values in the SKA-Low specification and Table 9 in Braun et al. (Reference Braun, Bonaldi, Bourke, Keane and Wagg2019), it can be nearly a factor of 2 higher or several times lower at the best and worst observing scenarios, respectively.

In addition to generating images, the above options can also save the results to text files, which can be used in later analysis.

4.2 Web interface

The same functionality as provided by the command line script described in Section 4.1 is also provided by the web interface. This interface has been implemented as a Django web service deployed on the Amazon web-service available at http://sensitivity.skalow.link. The user can specify a station name (presently EDA2 or AAVS2) and request sensitivity data in one of the formats described in Section 4.1, and the system will generate and display plots of sensitivity as a function of requested parameters (these images can be saved as png files). Optionally, the user can also request text files with the sensitivity data and in such a case a zip archive file containing the requested data in both text and png formats will be returned and can be saved on the user’s local hard drive for later analysis.