2.1.1. Latencies associated with the MWA trigger of GRB 180805A

The VOEvent associated with the Swift-BAT detection of GRB 180805A was circulated 64 s post-burst (approx 18 m before the corresponding GCN Circular was published onlineFootnote b). The MWA rapid-response front-end web service received the VOEvent via the Comet client 1 s later, at which point the event was added to a queue that ensures incoming events are sent to the Swift- Fermi VOEvent handler in chronological order. The handler parses all incoming VOEvents for events of interest, and in this case captured the event associated with GRB 180805A, identifying it as a real GRB and triggering MWA observations. The MWA was on-target and observing GRB 180805A within 20 s of the Swift broadcast of the VOEvent. A time line of the detection, alert, and response is summarised in Table 2. The code that queues incoming VOEvents and passes them to the various VOEvent handlers (event 3 in Table 2) resulted in a delay of 2.8 s for GRB 180805A. At this point, the front-end VOEvent parser sent a request to the back-end web-service on the telescope requesting an immediate observation. It took 1.8 s for the back-end to calculate a pointing direction that placed the Sun in a primary beam null for the first observation (since this was a day-time observation), calculate the best calibrator to observe following the 30 min GRB observation, and then schedule the observations.

Table 2. Timeline for MWA triggered observations of GRB 180805A.

The MWA was on target at 09:06:06 UT (77 s post-burst); however, the correlated data recording started 2.7 s later (this delay is related to internal MWA correlator setting changes) and the next 4 s of data were automatically flagged by the AOFlagger algorithm (Offringa et al. Reference Offringa, de Bruyn, Biehl, Zaroubi, Bernardi and Pandey2010; Reference Offringa, van de Gronde and Roerdink2012) in order to remove bad data from the first scan integration boundary. However, it is possible that a subset of this 4 s may still contain good data if using the MWA Phase II correlator, so future GRB data processing may be able to retrieve additional seconds of good data at the start of the observation. For GRB 180805A, the very first nonflagged timestep was therefore collected by the MWA at 09:06:12.7 UT, just 83.7 s following the Swift detection.

2.2.1. MWA transient reduction pipeline

The MWA triggered observation of GRB 180805A was processed using a semi-automated pipeline called MWA-fast-image-transients,Footnote c which is specifically designed for the reduction of transient MWA imaging data in preparation for transient analysis. It is therefore capable of creating images over a wide variety of timescales to match the coherent radio transient timescales expected from GRBs. This workflow is heavily based on the processing techniques employed for the GaLactic and Extragalactic All-sky Murchison Widefield Array (GLEAM) survey (Hurley-Walker et al. Reference Hurley-Walker2017), GLEAM-XFootnote d, as well as the MWA image-plane FRB search (Rowlinson et al. Reference Rowlinson2016).

All observations of GRB 180805A were calibrated using the in-field calibration technique developed for the GLEAM-X pipeline. The in-field calibration scheme uses the GLEAM catalogue as a sky model (Hurley-Walker et al. Reference Hurley-Walker2017), rather than the more traditional single bright source model. This reduces the positional shifts induced by differing ionospheric refraction in different sky locations. Rather than deriving in-field calibration solutions for each individual snap-shot observation of a GRB, we choose to apply a single solution derived from a snap-shot close to the centre of the 30 min integration, which will likely have the median ionospheric shift compared to the observations on either side. The advantage of a single solution is that each calibrated observation will have a fairly consistent absolute flux calibration. For GRB 180805A, we instead chose to use the in-field calibration solutions derived from the observation 1217495544 as the nearby bright source Cen A was in a primary beam null (the final calibration solution applied to all ObsIDs can be accessed via Anderson Reference Anderson2021). The change in the observational pointing centre that occurred between this and the following observation 1217495664 (due to the Sun suppression subroutine) resulted in Cen A sitting in a $\sim10\%$ primary beam sidelobe in all the following snapshots. At the time of processing, the sky-model used for in-field calibration did not include Cen A so if any later observations were used for the in-field calibration, the resulting solutions would include unmodelled flux.

The calibration and imaging was conducted in the following manner using scripts from the MWA-fast-image-transients workflow (names of scripts are indicated for reproducibility).

1. 1. We use obs_asvo.sh to fetch all target observations from the MWA All-Sky Virtual Observatory (ASVO) serviceFootnote e. The ASVO service converts the MWA-specific data format into a measurement set format,Footnote f applies phase calibration based on cable lengths and antenna/tile positions, and flags known bad tiles and channels.

2. 2. We use an in-field calibration scheme (obs_infield_ cal.sh) on one of the target observations. Provided the ionosphere is reasonably stable, this would usually be the central 2 min snapshot of the total 30 min observation. For GRB 180805A, we used ObsID 1217495544 (see explanation above). During the calibration stage for GRB 180805A, we identified that tile 84 was not producing good data, so it was flagged from all observations using obs_flag_tiles.sh.

3. 3. The derived calibration solution is then applied to all of the target observations using obs_applycal.sh.

4. 4. All imaging was carried out with wsclean (Offringa et al. Reference Offringa2014), with which we generate multifrequency synthesis images on a range of timescales (2 min, 30 s, 5 s, and 0.5 s) using a pixel scale of 16 arcsec and an image size of 4 096 pixels ( $18.2\deg$ ) on a side (these scales are appropriate for the Phase II extended configuration). The 2 min and 30 s timescale images were cleaned such that all peaks above $3\sigma$ were cleaned to $1\sigma$ (obs_image.sh and obs_im28s), and the restored images were created using a 80 arcsec restoring beam for all observations. The 5 s and 0.5 s images were created using obs_im5s.sh and obs_im05s.sh but were not cleaned. All imaging scripts create instrumental Stokes XX and YY polarisation images, which are primary beam corrected and converted into Stokes I images. On 0.5 s timescales, we also produce a set of images that are divided into 24 coarse channels of bandwidth 1.28 MHz using obs_im05s_24c.sh.

All the output images are then prepared for transient and variable analysis using Robbie (see Section 2.2.2) as this workflow requires that all images have the same shape and sky coverage. As each of the 15 snapshot observations has a different pointing centre, all images were regridded to a template image that represents the largest region of overlap between snapshots (a nearly square region $\sim140$ deg² in size centred at $\alpha \text{(J2000.0)} = 10^{\text{h}}48^{\text{m}}55\overset{\text{s}}{.}7$ and $\delta (\text{J2000.0}) = -40^{\circ}27'50{''}{.}4$ ) using the Miriad (Sault et al. Reference Sault, Teuben and Wright1995) task regrid.

2.2.2. Transient and variable search

We used Robbie to search for transient and variable sources on all full-bandwidth (30.72 MHz) images, grouped by cadence (2 min, 30 s, 5 s, and 0.5 s). The scale of data being processed for this project was beyond the capability of Robbie as described by Hancock et al. (‘V1.0’ Reference Hancock, Hurley-Walker and White2019a). The main limitation was the use of Make (Feldman Reference Feldman1979) as a workflow manager in an HPC environment, as it does not integrate with queue scheduling systems such as SLURM (Yoo, Jette, & Grondona 2003). Additionally, V1.0 was developed and tested with 25 epochs of data, however, when scaling out to the 3 315 epochs required for the 0.5 s images in this project, it became clear that the processing and storage choices were inappropriate. In particular, FITSFootnote g tables are limited to 1 000 columns. To counter these limitations, we ported Robbie to use NextFlow (Tommaso et al. Reference Tommaso, Chatzou, Floden, Barja, Palumbo and Notredame2017) as the workflow manager, containerised the entire software stack using DockerFootnote h and Singularity (Kurtzer, Sochat, & Bauer Reference Kurtzer, Sochat and Bauer2017) and used VOTables Footnote i instead of FITS files to store tabulated data. This updated version of Robbie is now more portable, can be run on desktop or HPC systems, and can scale to surveys with thousands of epochs of observations. The logical flow and operation of Robbie are unchanged and we summarise its operation below.

Robbie first derives and then applies an astrometric correction to each image that corrects for any ionosphere distortion. This is conducted using the algorithm fits_warp (Hurley-Walker & Hancock Reference Hurley-Walker and Hancock2018) and uses the GLEAM catalogue as a template for the source positions (note that due to the minimal signal detected in the coarse channel images, the ionospheric distortions calculated for the full-bandwidth 0.5 s images were applied to the 24 coarse channel images of the corresponding timestep, which were used in the analysis described in Section 2.2.3). Once the ionospheric corrections are applied, Robbie proceeds with a transient and variable search as follows:

1. • Stack all epochs to form a cube;

2. • Create a mean and noise image from the cube;

3. • Use Aegean blind source finding to identify persistent sources in the mean image;

4. • Use Aegean priorised fitting to create a light curve for each persistent source;

5. • Mask persistent sources from each individual epoch; and

6. • Use Aegean blind source finding on the masked single epoch images to identify transient candidates (which may appear in one or more epochs).

Robbie was modified to allow positions of interest to be added to the persistent source catalogue, causing light curves to be generated for these locations via priorised fitting. This functionality was used to calculate a light curve at the Swift-XRT position of GRB 180805A (see Section 3.1).

Corrections to the absolute flux scale were calculated using the software tool flux_warp (Duchesne et al. Reference Duchesne, Johnston-Hollitt, Zhu, Wayth and Line2020), which compares the source fluxes measured by Aegean to the GLEAM catalogue. We assumed a mean offset in flux for each of the 2 min snapshot images and applied this mean correction to all quoted flux densities and limits in Tables 1, 3, and Section 3. Deriving reliable absolute flux-scale corrections on shorter timescales was not feasible due to fewer sources being detected, and the source flux density uncertainties being larger. We therefore assumed that the flux calibration did not change within a 2 min snapshot and applied the same correction to the shorter timescales (30 s, 5 s, and 0.5 s). The flux scale corrected light curves at each timescale are shown in Figure 7. Following the mean correction on the 2 min snapshot images, we measured a $1\sigma$ scatter on the final flux values of $\leq15$ %.

Figure 1. The first 100 s of the dynamic spectrum measured at the pixel location of GRB 180805A at a 1.28 MHz frequency and 0.5 s time resolution. The full MWA follow-up observation covered approximately 30 min. The first 4 s and last 5.5 s of each individual observation are flagged due to instrumental reasons. While the first timestep begins at $t=$ 79.68 s post-burst, the first 4 s are flagged so the first nonflagged integration starts at 09:06:12.7 UTC ( $83.68$ s post-burst). The full dynamic spectrum can be downloaded from Anderson (Reference Anderson2021).

2.2.3. Image dedispersion and dispersed transient search

Searching for dispersed transient signals via image dedispersion techniques is potentially far more sensitive to these likely narrow (ms timescales) FRB-like signals when compared to image searches for which the integration time is equivalent to how long we expect the signal to traverse the full 30.72 MHz bandwidth for a given DM (e.g. Law et al. Reference Law2018). For example, if the FRB has an intrinsic duration of 100 ms at a redshift of 0.7, then it will take 30 s to cross the MWA bandwidth so a snapshot of this duration would result in a signal-to-noise loss of a factor of 300. The final stage of our data processing for GRB 180805A is to perform a search for dispersed, prompt signals on the native MWA correlator temporal resolution of 0.5 s and the coarse channel resolution of 1.28 MHz. The recent detection of FRB 191001, which was detected in an ASKAP snapshot image with a 10 s integration time and later processed with a DM search, demonstrates the utility of a dual processing approach (Bhandari et al. Reference Bhandari2020). This search was conducted over the full 30 min observation for a DM range of 200–3 000 pc cm^–3, which corresponds to the known SGRB redshift range of $\sim0.1<z<2.5$ . We compute the dispersive delay of a pulse sweep between the upper ( $\nu_h$ ) and lower ( $\nu_l$ ) ends of a band for a given DM as

(1) \begin{eqnarray} \delta t (DM,\nu_l,\nu_h)& = & 4.15{\rm DM}\,\left(\frac{1}{\nu^2_l} - \frac{1}{\nu^2_h} \right)[{\rm ms}], \end{eqnarray}

where frequencies $\nu_l$ and $\nu_h$ are expressed in GHz. The MWA band for the observations of GRB 180805A is between $\nu_l = 0.175$ GHz and $\nu_h = 0.200$ GHz.

This analysis was performed on the 0.5 s duration coarse channel images that were output by the MWA-fast-image-transients pipeline (see Section 2.2 point iv). The ionospheric correction that Robbie calculated for each 0.5 s image (see Section 2.2.2) was applied to each set of coarse channel images (of which there are 24) for the corresponding timestep. It was not possible to calculate the ionospheric correction on individual 0.5 s coarse channel images due to their low sensitivity preventing the detection of individual field sources. Ionospheric induced position shifts are frequency dependent ( $\propto 1/\nu^2$ ), with larger offset distortions expected at lower frequencies. The expected difference in position shifts between the upper and lower end of the observing band are just $(\Delta\nu/\nu)^2\sim3\%$ for a 30.72 MHz bandwidth at 185 MHz. We did not apply a chromatic correction to the ionospheric offsets calculated from the 0.5 s images over the full 30.72 MHz bandwidth before applying them to the coarse channel images.

The 0.5 s coarse channel images were first used to create a $n_{t} \times n_{ch}$ dynamic spectrum at the position of the GRB over the full 30 min observation. As the Swift-XRT $3\sigma$ positional uncertainty for GRB 180805A was 4.7 arcsec, which is far less than the MWA Phase II synthesised beam of $\sim80$ arcsec at 185 MHz, it was therefore sufficient to perform our signal search analysis on a single pixel (sized 16 arcsec square) at the nominal position of the GRB. A small section of this dynamic spectrum showing the first 100 s of the MWA follow-up observation at the pixel location of GRB 180805A is shown in Figure 1. Note that the first timestep (when the MWA was on-target) began at $t=$ 76.98 s post-burst, but the first 2.7 s was not recorded and a further 4 s are always flagged due to instrumental reasons. Therefore, the first non-flagged integration started at 09:06:12.7 UTC ( $83.68$ s post-burst). The total number of time-steps is $n_{t}=3\,434$ including the 9.5 s gaps between each 2 min snapshot.

In order to determine the noise in the dynamic spectrum in the direction of the GRB, we first chose independent directions on the sky and created additional dynamic spectra, the spectrum at the GRB location is labelled as the ‘signal’ while the remainder are labeled as ‘noise’. In order to remove instrumental effects and persistent astrophysical sources from each dynamic spectrum, we measured a time-averaged spectral energy distribution (SED), and subtracted this from each time step. This SED subtraction was done independently for all pointing directions. The dynamic spectral plots for the ‘noise’ directions were combined into a cube, which were then used to compute a mean ( $\mu$ ) map. Finally, we computed a final GRB dynamic spectrum (DS) by subtracting the mean from the signal:

(2) \begin{equation} \text{DS} = \text{signal} -\mu.\end{equation}

Using the noise subtracted GRB dynamic spectrum, a dedispersed time series (DTS) was calculated for each DM in the range [ $D_{min},D_{max}]$ and potential pulse start time ( $T_{s}$ ) in the range ( $[-\tau_{max} , T_{last}]$ ), where $D_{min}$ is the minimum trialed DM (200 pc cm^–3), $T=0$ s is the start time of the first recorded MWA timestep, $\tau_{max} \approx122.4$ s is the maximum sweep time over the MWA band ( $30.72$ MHz) corresponding to the maximum DM ( $D_{max} = 3\,000$ pc cm^–3), and $T_{last}$ is the time of the last recorded MWA timestep ( $3\,434 \times 0.5$ s in this case). Some of the FRBs show significant temporal pulse broadening due to scattering (Qiu et al. Reference Qiu2020). These scattering times at GHz frequencies correspond to a few seconds at the MWA frequency assuming frequency scaling proportional to $\sim \nu^{-4}$ (Bhat et al. Reference Bhat, Cordes, Camilo, Nice and Lorimer2004). Therefore, we have also performed averaging of dynamic spectrum along the time axis on timescales between 1 to 10 s and then formed DTS using the time averaged dynamic spectra. Similarly, no statistically significant candidates were found.

An SGRB with a high DM could potentially allow observations at MWA observing frequencies to detect prompt radio signals that are predicted to be emitted prior to the merger (see Section 4.2). The GRB was detected by Swift-BAT just 83.7 s before the first MWA data were collected. Based on Equation (1), this means that for a prompt radio signal emitted at the time of the SGRB (which we assume corresponds to the first detection of $\gamma$ -ray emission) to be detectable in our MWA observing band (170–200 MHz), we required a $DM\gtrsim800$ pc cm^–3.

Therefore, for the higher DM trial values (in the range $800 - 3\,000$ pc cm^–3), we can use the full observing band sensitivity to probe the parameter space in which radio prompt signals were emitted from the SGRB up to about 350 s before the merger (first detection of $\gamma$ -rays). For the DM range $580 - 800$ pc cm^–3, we can use part of the observing band to search for dispersed signals emitted at the time of the SGRB as according to Equation (1), $DM=580$ pc cm^–3 corresponds to a 83 s dispersive delay between the first $\gamma$ -ray detection and the lower end of the MWA observing band (170 MHz).

Figure 2. Left: The central region of the dedispersed time series showing the mean flux density for the path swept across the dynamic spectrum (Figure 1) for every DM trial ranging from 100 to 3 000 pc cm^–3 at 1.0 pc cm^–3 intervals, covering approximately $700 - 1300$ s at a resolution of 0.1 s following the GRB detection. Right: The peak SNR over all dedispersed time series as a function of DM trial. The highest SNR values detected in the dedispersed time series (up to $\approx 10$ ) correspond to low DMs ( $<$ 140 pc/cm³), where the number of averaged pixels in the dispersion sweep is low and a single channel RFI can increase the dedispersed value. Therefore, we have excluded these low DMs from our analysis. Also note that we do not expect SGRBs to have a $\text{DM}<200 \text{pc\,cm}^{-3}$ (shaded areas) if we assume a minimum SGRB redshift of $z \sim0.1$ . The full dedispersed time series can be downloaded from Anderson (Reference Anderson2021).

The resulting DTS is a two-dimensional image with the horizontal axis corresponding to the tested pulse start time ( $T_{s}$ ) with a 0.1 s resolution and the vertical axis corresponding to the DM in steps of 1 pc cm^–3. The sampling of pulse arrival times (0.1 s) was chosen to be smaller than the actual temporal resolution of the images to ensure no signal was missed due to rounding errors caused when calculating the positions of the pixels along the dispersion sweeps. Following Equation (1), we calculated the value in each pixel at ( $T_{s}$ ,DM) as the mean of all pixel values (in ${\rm Jy\,beam^{-1}}{}$ ) along the corresponding tested path swept out by a pulse across the dynamic spectrum between 170 and 200 MHz. The central time region of the DTS image calculated for the central pixel (nominal position of GRB 180805A) is shown in the left panel of Figure 2.

The standard deviation of the DTS is not constant across the image as it depends on the number of pixels averaged together for a given DM sweep, which increases with increasing DM as the dispersion sweep across the dynamic spectrum becomes longer before it reaches the lower frequency end. We therefore generated a corresponding map of the number of pixels ( $n_{d}$ ) used to calculate each image pixel in the DTS image shown in the left panel of Figure 2. This resulting map was used to derive the dependence of the DTS standard deviation ( $\sigma_{dts}$ ) as a function of $n_{d}$ , such that $\sigma_{dts}(n_{d}) = \sigma_{dts}(0) / \sqrt{n_{d}} $ , which was divided through the DTS image to create a DTS image in units of SNR. Each pixel ( $T_{s}$ ,DM) of the final SNR DTS image with a DM between 200 and 3 000 pc cm^–3 was then searched for any dispersed signals above the specified thresholds of $\sigma_{dts}>5$ and $\sigma_{dts}>6$ , for which Gaussian statistics predict there to be approximately 2.76 and 0.01 random events (when only different dispersion sweep paths through the dynamic spectrum are taken into account), respectively, based on the number of DM and time trials. We verified that values in the DTS images have a Gaussian distribution, but we also note that those dispersion sweeps with 1 or 2 pixels in common are not fully statistically independent. However, this is only a few percent effect given that even the lowest trail $\text{DM} = 200\text{pc\,cm}^{-3}$ has $\gtrsim50$ pixels.

We used the DTS SNR image of the GRB to further explore how the summed number of pixels effects the final SNR measurements for a given DM by plotting the peak SNR in each dedispersed time series as a function of DM trial (i.e. the maximum SNR value for each DM over all possible signal start times; see the right panel of Figure 2). We found that the high SNR ( $\lesssim10$ ) dispersed transient candidates for GRB 180805A were grouped at $\text{DMs}\leq140$ pc cm^–3. For this low DM region, the signals were calculated by averaging a low number of dynamic spectrum pixels ( $n_{d}$ ) due to the short dispersion sweep, with the pixel count often being further reduced due to the sweep encountering 9.5 s gaps in the data between two MWA observations. In the case of a single high value pixel in the dynamic spectrum (e.g. caused by RFI), this could significantly increase the mean value of a small number of pixels averaged over a short dispersion sweep, therefore boosting the final dedispersed SNR for the corresponding trial. However, such an anomaly does not impact our analysis as we expect SGRBs to lie within the DM range of 200–3 000 pc cm^–3. Indeed, assuming an extra-galactic origin for GRB 180805A, we may expect a Galactic DM contribution of $\approx178$ pc cm^–3 estimated from Yao, Manchester, & Wang (Reference Yao, Manchester and Wang2019) ( $\approx$ 135 pc cm^–3 from the NE2001 model from Cordes & Lazio Reference Cordes and Lazio2002) along this line of sight. Additionally, contributions from the MW halo and host galaxy to the DMs of localized FRBs have been found to be on average 75 pc cm^–3 (Macquart et al. Reference Macquart2020), which is consistent with the lowest DMs of observed FRBs: 180729.J1316+55 (CHIME/FRB Collaboration et al. 2019a) and FRB 171020 (Shannon et al. Reference Shannon2018), with excess DMs of 78.4 pc cm^–3 and 75.7 pc cm^–3, respectively. We could therefore expect a minimum DM of 210 pc cm^–3 for GRB 180805A

This dedispersed transient search procedure was verified by simulating dispersed pulses and adding their fluxes to the appropriate pixels of a dynamic spectrum based on the dispersion sweep calculated using Equation (1). We randomly simulated 100 pulses per DM and fluence pair (DM, $\mathcal{F}$ ) for twelve DM values (200, 350, 500, 1 000, 1 250, 1 500, 1 750, 2 000, 2 250, 2 500, 2 750, and 3 000 pc cm^–3) and 21 $\mathcal{F}$ values (50, 100, 200, 300, 400, 500, 600, 700, 800, 900, 1 000, 1 100, 1 200, 1 500, 2 000, 3 000, 4 000, 5 000, 6 000, 7 000, and 10 000 [Jy ms]). Currently, the algorithm only simulates narrow pulses, such that the entire fluence is contained within a single 0.5 s time bin. However, simulating temporally broadened pulses due to scattering will be implemented in a future version. The arrival times of the simulated pulses at the upper end of the MWA observing band were randomised within the 30 min of the MWA observations. An example of an injected pulse is shown in Figure 3. The dynamic spectra with injected pulses were processed using the same analysis as was used to search for pulsed signals in the GRB DTS (Figure 2). The efficiency ( $\epsilon$ ) of the search was calculated as $\epsilon = N_{det} / N_{gen}$ , where $N_{det}$ is the number of simulated pulses identified by the algorithm and $N_{gen}$ (100 in this simulation) is the total number of generated pulses for a given (DM, $\mathcal{F}$ ) pair. Figure 4 shows the pulse detection efficiency (at $\ge 6\sigma_{dts}$ ) for each tested DM and fluence pair. This demonstrates that for a threshold of $\sigma_{dts} > 6$ , the 90% fluence detection efficiency limit varies as a function of DM within the tested range, which ranges between 570 Jy ms at DM $=3\,000$ pc cm^–3 and 1750 Jy ms at DM = 200 pc cm^–3, with likely zero false positives due to noise events. To illustrate this dependence, we performed polynomial fits to the DM curves in Figure 4 to find the 90% fluence detection efficiency for each tested DM, which are plotted in Figure 5. The variation in efficiency is mainly due to the noise in the dynamic spectrum.

Figure 3. Left: An example of a simulated dispersed pulse with fluence 10000 Jy ms and DM = 1000 pc cm^–3 added to the dynamic spectrum of an image pixel used for this efficiency test. Again, the dynamic spectrum begins at the first MWA timestamp of 79.68 s but the first 4 s are flagged as shown in Figure 1. Right: The corresponding dedispersed time series (DTS) around the start time and DM of the injected pulse. The horizonal axis start time in this DTS image corresponds to the Swift detection time of GRB 180805A, which was 83.7 s before the MWA began observing the event. This algorithm therefore probes possible pulse start times that began before the start of the MWA follow-up observations if emitted at a high enough DM for the signal to be dispersed by $>83.7$ s. The “green-hatched triangle” in the bottom-left corner corresponds to negative pulse start times (radio signals arriving at the upper end of the frequency band before the MWA started observations) and DM sweep times too short to be captured at the lower frequency end ( $T_s + \delta t (DM,0.170,0.200) < 0$ ), hence covering the DM/pulse start time parameter space inaccessible to the analysis. As 100 pulses were generated for each pair of DM (12 values) and fluence (21 values), a total of 25200 simulated pulses were processed through the transient search pipeline used to search for signals in the GRB DTS described in Section 2.2.3, allowing us to determine the efficiency of this technique (see also Figure 4).

Figure 4. The measured efficiency for detecting pulses with $\sigma_{dts}> 6$ as a function of fluence at twelve tested DMs (values indicated on the colour bar). The fluence where detection efficiency exceeds a threshold of 90% varies as a function of DM from $\approx$ 1 750 Jy ms at DM = 200 pc cm^–3 to $\approx$ 570 Jy ms at DM = $3\,000$ pc cm^–3. Hence, any dispersed radio signal from the GRB 180805A brighter than 1 750 Jy ms in the trialled DM range $200 - 3\,000$ pc cm^–3 should be detected with 90% probability by the search procedure described in Section 2.2.3.

Figure 5. The 90% fluence detection efficiency as a function of DM. A 6-order polynomial has been fitted in order to interpolate the 90% fluence detection efficiency for any DM value within the tested range of $200-3\,000$ pc cm^–3.