4.1. Radio emission maps

Given the axi-symmetry of the WCR at the spatial scales of interest, the morphology of the emission maps depends almost exclusively on the system orientation. We compute synthetic emission maps for different observing angles $\psi$ . We convolve these maps with a Gaussian beam of $5.6'' \times 11.3''$ , and normalise the simulations in such a way that the integrated flux density in the map matches the flux density reported by Marcote et al. (Reference Marcote, Callingham, De Becker, Edwards, Han, Schulz, Stevens and Tuthill2021), that is, $S_{2\,\mathrm{GHz}} = 60\,\mathrm{mJy}$ Footnote c.

In Figure 3, we show the synthetic emission maps. For $\psi < 90^\circ$ , the WC star is in front, whereas for $\psi> 90^\circ$ the WN is in front. Despite the fact that the measurement by Marcote et al. (Reference Marcote, Callingham, De Becker, Edwards, Han, Schulz, Stevens and Tuthill2021) is resolving out flux, we can constrain the value of $\psi$ comparing by eye the synthetic maps with the observed one. Values of $\psi < 65^\circ$ and $\psi > 105^\circ$ lead to emission much more spatially diluted than the observed one, as can be appreciated from the contour levels and/or the colorscale. For this reason, we rule out these values leaving us with a tentative value of $\psi = 85^\circ \pm 20^\circ$ . Additionally, the case with $\psi = 85^\circ$ shows the best agreement with the observed map, and we therefore fix this value hereafter. We note, however, that for the range of values of $\psi = 65^\circ-105^\circ$ , the distance between the stars varies in less than 10%, and therefore the specific value adopted for $\psi$ has little impact in the results obtained in the following sections.

Figure 3. Synthetic emission maps using the model described in Section 3. The position of the WC (left) and WN (right) stars are shown, together with the synthesised beam in the bottom right corner of the middle left panel. The intensity of the wind-collision region emission is shown in grayscale, and we overplot the same contour levels as in Marcote et al. (Reference Marcote, Callingham, De Becker, Edwards, Han, Schulz, Stevens and Tuthill2021). The maps match well with the observed morphology for $\psi {\sim}85^\circ$ .

For consistency, we check whether this value is compatible with independent measurements by other authors. In particular, by modelling the IR spiral plume, Han et al. (Reference Han2020) found the following orbital parameters for the Apep system: inclination $i=25^\circ \pm 5^\circ$ , argument of periastron $\omega=0^\circ \pm 5^\circ$ , and true anomaly at 2018 epoch $\nu=-173^\circ \pm 15^\circ$ . Similar values (within errors) were also obtained by Bloot et al. (Reference Bloot, Callingham and Marcote2021) by modelling the lightcurve at radio wavelengths. We can derive the corresponding projection angle for these parameters as $\psi = \arctan{( \sqrt{x^2 + y^2}/z )}$ , where $x=D\cos{(\omega-\nu)}\cos{(i)}$ , $y=D\sin{(\omega-\nu)}$ , and $z=D\cos{(\omega-\nu)}\sin{(i)}$ are the coordinates of the secondary star. We obtain $\psi \approx 70^\circ$ , which is roughly consistent with the value we derive independently from the morphology of the emission maps.

4.2. Radio spectral energy distribution

The shape of the SED at radio frequencies depends strongly on the stellar mass–loss rates. This is because the spectrum below 1 GHz is severely affected by FFA in the ionised stellar winds. Moreover, the thermal free–free emission is also relevant at frequencies above 10 GHz. Both features are more pronounced for higher values of $\dot{M}$ . We therefore carry out simulations for different values of $\dot{M}_\mathrm{WN}$ (and, consistently, of $\dot{M}_\mathrm{WC}$ ; see Section 2) and compute the radio SED in each case. All the SEDs are normalised such that $S_{2\,\mathrm{GHz}} = 120\,\mathrm{mJy}$ ; for doing this, we fix $f_\mathrm{NT} = 0.1$ ( $f_\mathrm{NT,e} = 0.005$ ) and vary the magnetic field intensity in the WCR through the parameter $\eta_B$ . For the cases considered of $\dot{M}_\mathrm{WN} = (2-8)\times10^{-5}\,\mathrm{M}_\odot\,\mathrm{yr}^{-1}$ , the $\eta_B$ -values are in the range (0.17–1.1) $\times 10^{-2}$ , with the lower values of $\eta_B$ corresponding to the greater values of $\dot{M}_\mathrm{WN}$ . We show our results in Figure 4, together with the available observational data points.

Figure 4. Modelled SED of Apep at radio frequencies for different values of the WNstar mass–loss rate, as indicated in the colorbar. We show the observational data points taken with the uGMRT and ATCA (Bloot et al. Reference Bloot, Callingham and Marcote2021), and the upper limit at 150 MHz calculated in this work from the GMRT 150 MHz all-sky radio survey (Intema et al. Reference Intema, Jagannathan, Mooley and Frail2017). Dotted lines show the total free–free from the stellar winds, dashed lines the synchrotron component from the wind-collision region, and solid lines are the sum of both.

The available radio data allow us to put strong constraints on the value of $\dot{M}_\mathrm{WN}$ . The flux densities at 1–3 GHz allow us to characterise the intensity of the synchrotron spectrum, while the flux densities and upper limit below 1 GHz help us to infer the position of the FFA turnover frequency. Moreover, the flux density value at 19.7 GHz further constrains the combination of the synchrotron SED and the thermal free–free emission from the winds.

Accordingto the results shown in Figure 4, the shape of the radio SED cannot be reconciled with low mass–loss rates, $\dot{M}_\mathrm{WN} < 3\times10^{-5}\,\mathrm{M}_\odot\,\mathrm{yr}^{-1}$ , as the flux density below 300 MHz would be highly overpredicted. In addition, high values of $\dot{M}_\mathrm{WN} > 5\times10^{-5}\,\mathrm{M}_\odot\,\mathrm{yr}^{-1}$ lead to a significant absorption up to ${\sim}2\,\mathrm{GHz}$ , in tension with the data at 0.6–1.4 GHz, and they also lead to an overestimation of the total flux density at 19.7 GHz. Therefore, we conclude that the value of $\dot{M}_\mathrm{WN}$ is well-constrained to the range $(3-5)\times10^{-5}\,\mathrm{M}_\odot\,\mathrm{yr}^{-1}$ , which leads to $\dot{M}_\mathrm{WC} \approx (2.2-3.7)\times10^{-5}\,\mathrm{M}_\odot\,\mathrm{yr}^{-1}$ . For these mass–loss rates, the model reproduces quite well the overall shape of the radio SED, but not the very pronounced decline suggested by the data at 255 MHz. Hereafter, we adopt a reference value of $\dot{M}_\mathrm{WN} = 4 \times10^{-5}\,\mathrm{M}_\odot\,\mathrm{yr}^{-1}$ .

Figure 5. Modelled non-thermal SED of Apep for different values of $\eta_B$ . We show the observational data points taken with ATCA (Callingham et al. Reference Callingham, Tuthill, Pope, Williams, Crowther, Edwards, Norris and Kedziora-Chudczer2019) and the upper limit we derive from XMM-Newton data (Section 2.3). Dotted lines show the p–p component, dot-dashed lines the IC component, and solid lines the synchrotron component from the wind-collision region; all emission components are absorption-corrected. We also show the sensitivity curves for 1-Ms NuSTAR (Koglinet al. Reference Koglin2005), 1-yr e-ASTROGAM (de Angelis et al. Reference de Angelis2018), 10-yr Fermi-LAT (extracted from https://www.slac.stanford.edu/exp/glast/groups/canda/lat_Performance.htm for a broadband detection), and 100-h CTA (extracted from Funk, Hinton, & CTA Consortium 2013).

Nonetheless, we caution that these estimates are subject to larger uncertainties when taking into account the uncertainties in the wind parameters, particularly in those adopted as typical values for high-mass stellar winds (Table 1). For instance clumping yields $\dot{M} \propto f^{-1/2}$ , so that variations in the assumed value of f within a factor of two would yield variations in the estimated values of $\dot{M}$ within a factor $\sqrt{2}$ . Additional uncertainties come from other system parameters, such as the distance d to the source, although in this case the values of $\dot{M}$ vary approximately by only $\Delta d/d < 20\%$ .

In addition, Callingham et al. (Reference Callingham, Tuthill, Pope, Williams, Crowther, Edwards, Norris and Kedziora-Chudczer2019) found observational evidence of anisotropy in the stellar winds, which is a feature not included in our model. Moreover, Bloot et al. (Reference Bloot, Callingham and Marcote2021) also favoured the presence of anisotropic winds in Apep by means of modelling the radio lightcurve using a one-zone approximation for the emitter. However, such a one-zone model treats the emitter as a point-like homogeneous region and is therefore incapable of accounting for the extended nature of the WCR and the fact that the emitted photons probe different regions of the stellar winds depending on their production site (e.g. Dougherty et al. Reference Dougherty, Pittard, Kasian, Coker, Williams and Lloyd2003). Thus, we expect that the actual impact of the wind anisotropies in the radio SED to be less significant than implied by Bloot et al. (Reference Bloot, Callingham and Marcote2021). With respect to the spherical wind approximation in our model, depending on the geometry of the system and the winds anisotropy, the anisotropy in the winds could potentially increase the opacity in the direction of the line of sight for photons coming from close to the bright apex of the WCR. Such a possibility could help to relieve the tension with the data at 255 MHz.

Finally,we note that the observations by Marcote et al. (Reference Marcote, Callingham, De Becker, Edwards, Han, Schulz, Stevens and Tuthill2021) only revealed the WCR, but they did not detect the individual stars. Therefore, we cannot rule out the possibility that the positions of the WR stars are exchanged. This means that in Figure 3 the WC could actually be the star to the right, having the strongest wind. In this scenario, the value of $\eta = 0.44$ , together with the wind terminal velocities, yield $\dot{M}_\mathrm{WC} \approx 4\dot{M}_\mathrm{WN}$ . This leads to some complications, however. First, as shown previously, higher mass–loss rates can hardly be reconciled with the observed SED at high frequencies and with the non-detection of the individual WR stars by Marcote et al. (Reference Marcote, Callingham, De Becker, Edwards, Han, Schulz, Stevens and Tuthill2021). One would actually need to reduce $\dot{M}_\mathrm{WN}$ to achieve the above constraint. This, in turn, would lead to lower absorption in the radio SED, which again is inconsistent with the observations at low frequencies. In addition, the lower wind kinetic power would demand an even more efficient conversion of wind kinetic power into non-thermal particles. We conclude that the adopted configuration, with the WN star to the right (i.e., having the strongest wind), seems to be the most plausiblechoice.

4.3. High-energy spectral energy distribution

Having solved the uncertainties in $\psi$ and $\dot{M}$ to a great extent, we now focus on the degeneracy of the two remaining free parameters in the model: $\eta_B$ and $f_\mathrm{NT,e}$ . Such a degeneracy cannot be solved by radio data alone, but predictions in the high-energy domain can help to break this degeneracy (e.g. del Palacio et al. Reference del Palacio2020). Here, we calculate the expected fluxes in different energy bands accessible to current facilities. In particular, we report the fluxes in the hard X-ray energy range observable with the satellite NuSTAR (10–79 keV), the $\gamma$ -ray energy ranges observable by Fermi-LAT ( $0.1-100\,\mathrm{Gev})$ and the forthcoming Cherenkov Telescope Array (CTA; $0.1-100\,\mathrm{TeV})$ . We also compare the predicted fluxes in the MeV band with the expected sensitivity of the e-ASTROGAM mission (de Angelis et al. Reference de Angelis2018).

Table 2. Fluxes in different energy bands for different values of $\eta_B$ . The selected energy bands correspond to the ones accessible by NuSTAR (3–79 keV), Fermi (0.1–100 GeV), and imaging air Cherenkov telescopes such as CTA (0.1–100 TeV).

We calculate the broadband SED for different scenarios that cover plausible physical conditions at the shocks. We explore different values of $\eta_B$ and fit the fraction of the available wind kinetic power transferred to relativistic electrons in the shocks needed to match the observed flux density at 2 GHz. For each of these scenarios, we also calculate the IC emission produced by the same population of relativistic electrons, and the p–p emission produced by the relativistic protons. The results are shown in Figure 5. We note that the synchrotron and IC SED deviate from a simple power law due to the efficient IC cooling of the high-energy electrons.

If we consider a case of high magnetic field given by $\eta_B = 0.1$ ( $B_\mathrm{WCR} {\sim}0.4\,\mathrm{G}$ ), which is relatively close to the pressure equipartition condition, we obtain a corresponding value of $f_\mathrm{NT} = 5.4\times 10^{-3}$ . However, the strong magnetic field enhances the synchrotron emission from low-energy electrons that emit at $\nu \gtrsim 10\,\mathrm{GHz}$ , surpassing the detected flux density at 19.7 GHz by a ${\sim}30\%$ ; this leads to a significant tension considering that the stellar winds should also have a relevant contribution at these frequencies (see Section 2.2). If we instead consider a low magnetic field case with $\eta_B = 0.001$ ( $B_\mathrm{WCR} {\sim}0.04\,\mathrm{G}$ ), we obtain a high value of $f_\mathrm{NT} = 0.42$ ( $f_\mathrm{NT,e} = 0.081$ ), which yields an IC flux in the 3–10 keV band of $\gtrsim 9\times10^{-13}\,\mathrm{erg\,s}^{-1}\,\mathrm{cm}^{-2}$ that is in tension with the upper limits set by X-ray observations (Section 2.3). We can therefore rule out models with $\eta_B < 0.002$ as they overpredict the X-ray flux in the 3–10 keV band (Section 2.3). In conclusion, we can constrain $0.002 < \eta_B \leq 0.1$ . Below, we present a more detailed analysis of the cases $\eta=0.003$ , $\eta=0.01$ , $\eta=0.03$ and $\eta=0.1$ .

For the values of $\eta_B \approx 0.003-0.1$ ( $B_\mathrm{WCR} {\sim}0.08-0.4\,\mathrm{G}$ ), we derive corresponding values of $f_\mathrm{NT} \approx 0.005-0.13$ ( $f_\mathrm{NT,e} \approx (0.11-2.7)\times 10^{-3}$ ), which can vary by a factor $0.85-1.6$ when taking into account the uncertainty in the distance to the system. These values are consistent with those found for the CWB HD 93129A by del Palacio et al. (Reference del Palacio2020) ( $\eta_B\approx0.02$ , $B_\mathrm{WCR} {\sim}0.5\,\mathrm{G}$ , and $f_\mathrm{NT,e}\approx6\times10^{-3}$ ). Moreover, we show that the $\gamma$ -ray emission comes from a combination of IC radiation and p-p interactions. However, the predicted fluxes are below the sensitivity of current $\gamma$ -ray facilities by an order of magnitude, except in the most favourable scenarios (Figure 5). This is mainly due to the rather soft spectral index of the particle energy distribution ( $p=2.42$ ). In addition, for photon energies ${\sim}100\,\mathrm{GeV}$ , $\gamma-\gamma$ absorption is relevant and diminishes the flux of the source by $\approx 25\%$ . Nonetheless, a possible hardening of the particle energy distribution at high energies could potentially increase the $\gamma$ -ray luminosity significantly (e.g. del Palacio et al. Reference del Palacio, Bosch-Ramon, Romero and Benaglia2016, Reference del Palacio2020). We also note that the radiation from secondary pairs created in $\gamma-\gamma$ interactions is negligible because the soft $\gamma$ -ray spectrum leads to much less power being radiated above 100 GeV than below 100 GeV, so the pair energetics is small. We summarise the predicted fluxes for each scenarioin Table 2.