4.1. NP Ser and GX $17+2$ revisited

GX $17+2$ is one of the brightest X-ray sources on the sky, from which 43 PRE bursts have been recorded (see Table 1 of Galloway et al. Reference Galloway2020 and references therein); its distance was estimated to be 7.3–12.6 kpc by treating its PRE bursts as standard candles (as explained in Section 1), where the distance uncertainty is dominated by the uncertain composition of the nuclear fuel (Galloway et al. Reference Galloway2020). The optical source NP Ser, $\approx1.^{\prime\prime}0$ away from GX $17+2$ , was initially considered the optical counterpart of GX $17+2$ (Tarenghi & Reina Reference Tarenghi and Reina1972), but the association has been ruled out, based on its sky-position offset from GX $17+2$ (Deutsch et al. Reference Deutsch, Margon, Anderson, Wachter and Goss1999) and its lack of optical variability (as expected for the optical counterpart of GX $17+2$ ) (e.g. Davidsen et al. Reference Davidsen, Malina and Bowyer1976; Margon Reference Margon1978). Despite this, NP Ser was initially treated as a potential counterpart and the Gaia properties of NP Ser were analysed. Regardless of the non-association of NP Ser and GX $17+2$ , the complex sky region around GX $17+2$ for optical/infrared observations (see Figure 2 of Deutsch et al. Reference Deutsch, Margon, Anderson, Wachter and Goss1999 for example) merits high-precision Gaia astrometry of NP Ser, which will facilitate future data analysis of optical/infrared observations of GX $17+2$ .

Figure 2. 2-D histograms and marginalised 1-D histograms for posterior distance $D^{\textrm{post}}$ and posterior mass fraction of hydrogen of nuclear fuel $X^{\textrm{post}}$ simulated with bilby (Ashton et al. Reference Ashton2019) and plotted with corner.py (Foreman-Mackey Reference Foreman-Mackey2016). The n-th contour in each 2-D histogram contains $1-\exp\left(-n^2/2\right)$ of the simulated sample (Foreman-Mackey Reference Foreman-Mackey2016). The vertical lines in the middle and two sides mark the median and central 68% of the sample, respectively.

Using the astrometric parameters of NP Ser in Tables 2 and 3, we extrapolated the reference position of NP Ser (from the reference epoch 2016.0 yr, or MJD 57388) to MJD 47496, following the method described in Section 3.2 of Ding et al. (Reference Ding, Deller, Freire, Kaplan, Lazio, Shannon and Stappers2020). The projected Gaia position of NP Ser is offset from the VLA position of GX $17+2$ (see Table 2 of Deutsch et al. Reference Deutsch, Margon, Anderson, Wachter and Goss1999) by $0.^{\!\prime\prime}95\pm0.^{\!\prime\prime}07$ at MJD 47496. Considering the distances to GX $17+2$ and NP Ser, nuclear fuel with cosmic abundances (73% hydrogen) corresponds to the smallest PRE distance of $8.5\pm1.2$ kpc for GX $17+2$ (Galloway et al. Reference Galloway2020); in comparison, the calibrated Gaia parallax of NP Ser is $0.70\pm0.09$ mas, corresponding to a distance of $1.44^{+0.21}_{-0.16}$ kpc, which establishes NP Ser as a foreground source of GX $17+2$ . The current sky-position offset between NP Ser and GX $17+2$ depends on the proper motion of GX $17+2$ . Assuming GX $17+2$ rotates around the Galactic centre in the Galactic disk with negligible peculiar velocity (with respect to the neighbourhood of GX $17+2$ ), the apparent proper motion of GX $17+2$ would be $\mu_{\alpha}=-3.5$ $\textrm{mas yr}^{-1}$ and $\mu_{\delta}=-6.7$ $\textrm{mas yr}^{-1}$ given a distance of 8.5 kpc (from the Earth). Based on this indicative proper motion of GX $17+2$ and the Gaia ephemeris of NP Ser, NP Ser is currently (at MJD 59394) $1.^{\prime\prime}0$ away from GX $17+2$ and continues to move away from GX $17+2$ on the sky; accordingly, it would become easier with time to resolve GX $17+2$ from the foreground NP Ser in optical/infrared observations.

4.2. Posterior distances and compositions of nuclear fuel for Cen $\textrm{X}-4$ , Cyg $\textrm{X}-2$ , and $4\textrm{U}\,0919-54$

Among the (calibrated) parallaxes $\pi_1-\pi_0$ of the 4 PRE bursters (i.e. Cen $\textrm{X}-4$ , Cyg $\textrm{X}-2$ , $4\textrm{U}\,0919-54$ , and XB 2129+47), $\pi_1-\pi_0$ for Cen $\textrm{X}-4$ , $4\textrm{U}\,0919-54$ and XB 2129+47 are detected, whereas $\pi_1-\pi_0$ of Cyg $\textrm{X}-2$ is weakly constrained. All PRE bursters except XB 2129+47 have nominal PRE distances published that are inferred from their respective PRE bursts (see Table 4 for PRE distances and their references). Using Bayesian inference, we can incorporate the parallax of a PRE burster with its nominal PRE distance to constrain the composition of nuclear fuel and refine the nominal PRE distance.

In Section 1, we have mentioned that the Eddington luminosity (measured by an observer at infinity) $L_{\textrm{Edd},\infty}$ varies with NS mass $M_{\textrm{NS}}$ and photosphere radius $R_{\textrm{P}}$ (see Equation (1)). In practice, the bolometric flux at the ‘touchdown’ (when the photosphere drops back to the NS surface) of a PRE burst is compared to the theoretical $L_{\textrm{Edd},\infty}$ at $R_{\textrm{P}}=R_{\textrm{NS}}$ (where $R_{\textrm{NS}}$ stands for NS radius) to calculate the nominal PRE distance (Galloway et al. Reference Galloway2020). Therefore, the theoretical $L_{\textrm{Edd},\infty}$ should change with $M_{\textrm{NS}}$ and $R_{\textrm{NS}}$ , which is, however, not taken into account in this work. We note that, following Galloway et al. (Reference Galloway2020), we assume $M_{\textrm{NS}}=1.4\,\textrm{M}_{\odot}$ and $R_{\textrm{NS}}=11.2$ km (Steiner et al. Reference Steiner, Heinke, Bogdanov, Li, Ho, Bahramian and Han2018) for all PRE bursters.

4.2.1. Bayes factor between two ends of the composition of nuclear fuel

As mentioned in Section 1, the Eddington luminosity of PRE bursts depends on the composition of nuclear fuel (accreted onto the NS surface from its companion) at the time of the outburst. This composition is normally parameterised by X, the mass fraction of hydrogen in nuclear fuel at the time of a PRE burst, which generally ranges from 0 to $\approx73$ %, the cosmic mass fraction of hydrogen. As the result of the dynamic nucleosynthesis process during accretion, X varies from one PRE burst to another, but is always smaller than the hydrogen mass fraction of the donor star. X can be roughly predicted by the theoretical ignition models of X-ray bursts and mainly depends on the local accretion rate $\dot{m}$ (e.g. Fujimoto, Hanawa, & Miyaji, Reference Fujimoto, Hanawa and Miyaji1981).

Nominal PRE distances for $X=0$ , denoted as $D_0$ , are summarised in Table 4 along with their references. At any given X, the nominal PRE distance $D_X= D_0/\sqrt{X+1}$ (Lewin et al. Reference Lewin, van Paradijs and Taam1993). As the fractional uncertainty of a nominal PRE distance measurement is independent of X, $\sigma_X=\sigma_0/\sqrt{1+X}$ , where $\sigma_0$ and $\sigma_X$ represent the uncertainty of the nominal PRE distance at $X=0$ and at a given X, respectively.

Table 4. Bayes factor $K=K^{X=0.7}_{X=0}=P(\pi_1-\pi_0|X=0.7)/P(\pi_1-\pi_0|X=0)$ (ratio of two conditional probabilities), where X refers to the mass fraction of hydrogen of the nuclear fuel

$^\mathrm{a}$ Chevalier et al. (Reference Chevalier, Ilovaisky, Van Paradijs, Pedersen and Van der Klis1989);

$^\mathrm{b}$ Galloway et al. (Reference Galloway2020).

As our first attempt to constrain X, we used the calibrated Gaia parallax of each PRE burster to determine which value of X is more likely for the burster –0.73 or 0. We calculated the Bayes factor $K=K^{X=0.7}_{X=0}$ using

(3) \begin{equation}\begin{split}K &= \frac{\textrm{P}(\pi_1-\pi_0|X=0.7)}{\textrm{P}(\pi_1-\pi_0|X=0)}\\[3pt] &= \frac{\int^{\infty}_{0} \frac{1}{\sigma_{0.7}}\exp\left[-\frac{1}{2}\left(\frac{1/D-\mu_{\pi}}{\sigma_{\pi}}\right)^2-\frac{1}{2}\left(\frac{D-D_{0.7}}{\sigma_{0.7}}\right)^2\right]\textrm{d}D}{\int^{\infty}_{0} \frac{1}{\sigma_{0}}\exp\left[-\frac{1}{2}\left(\frac{1/D-\mu_{\pi}}{\sigma_{\pi}}\right)^2-\frac{1}{2}\left(\frac{D-D_{0}}{\sigma_{0}}\right)^2\right] \textrm{d}D},\end{split}\end{equation}

where $\pi_1-\pi_0=\mu_{\pi}\pm\sigma_{\pi}$ , $D|_{X=0.7}=D_{0.7} \pm \sigma_{0.7}$ and $D|_{X=0}=D_{0} \pm \sigma_{0}$ . For the calculation of $K^{X=0.7}_{X=0}$ , we did not use any Galactic prior (see Equation (4) for explanation), as the extra constraint given by a Galactic prior is negligible when X is fixed. The results of $K^{X=0.7}_{X=0}$ are presented in Table 4.

Among the three $\log_{10} K^{X=0.7}_{X=0}$ values, the one for Cen $\textrm{X}-4$ is the most offset from 0, which suggests the calibrated parallax of Cen $\textrm{X}-4$ substantially (when $0.5<|\log_{10}K^{X=0.7}_{X=0}|<1$ , Kass & Raftery Reference Kass and Raftery1995) favours $X=0$ over $X=0.7$ . Merely 2 PRE bursts have ever been observed from Cen $\textrm{X}-4$ in 1969 (Belian et al. Reference Belian, Conner and Evans1972) and 1979 (Matsuoka et al. Reference Matsuoka1980). The long intervals between PRE bursts of Cen $\textrm{X}-4$ imply small accretion rates and low X at the time of PRE bursts, despite hydrogen signatures observed from its donor star (e.g. Shahbaz, Watson, & Dhillon, Reference Shahbaz, Watson and Dhillon2014). This expectation is confirmed by the $\log_{10} K^{X=0.7}_{X=0}$ of Cen $\textrm{X}-4$ .

It is noteworthy that hydrogen-poor nuclear fuel at the time of PRE bursts is also favoured for Cyg $\textrm{X}-2$ and $4\textrm{U}\,0919-54$ . In fact, the previous independent test of the simplistic PRE model using GC PRE bursters also suggests hydrogen-poor nuclear fuel at the time of PRE bursts for the majority of the 12 GC PRE bursters (Kuulkers et al. Reference Kuulkers, den Hartog, in’t Zand, Verbunt, Harris and Cocchi2003). The statistical inclination towards low X, if confirmed with a larger sample of PRE bursters, might be partly attributed to a selection effect explained as follows.

For each PRE burster, only the brightest PRE bursts are selected to calculate its nominal PRE distance (Galloway et al. Reference Galloway, Muno, Hartman, Psaltis and Chakrabarty2008; Reference Galloway2020; Chevalier et al. Reference Chevalier, Ilovaisky, Van Paradijs, Pedersen and Van der Klis1989). This selection criterion results in a nominal PRE distance that tends to decrease with time as brighter bursts are discovered. This tendency is clearly shown by the fact that almost all the nominal PRE distances registered in Table 9 of Galloway et al. (Reference Galloway, Muno, Hartman, Psaltis and Chakrabarty2008) are larger than their counterparts in Table 8 of Galloway et al. (Reference Galloway2020). If we assume the variability of observed fluxes of PRE bursts is mainly caused by the fluctuation of X (at the time of different PRE bursts), the selection criterion of PRE bursters would lead to an increasingly biased PRE-burst sample that is more likely low-X. This selection effect would have a big impact on the X of the frequent PRE burster Cyg $\textrm{X}-2$ (see $n_{\textrm{burst}}$ in Table 1 of Galloway et al. Reference Galloway2020), but less so for $4\textrm{U}\,0919-54$ and Cen $\textrm{X}-4$ . A low X of $4\textrm{U}\,0919-54$ (if confirmed in the future) can be explained by the suggestion that the donor star of $4\textrm{U}\,0919-54$ is likely a helium white dwarf (in’t Zand et al. Reference in’t Zand, Cumming, van der Sluys, Verbunt and Pols2005). On the other hand, the revised nominal PRE distances of PRE bursters (Galloway et al. Reference Galloway2020) relieve the tension between the pre-2008 nominal PRE distances (see the references in Table 1 of A21) and the Gaia DR2 distances (A21), as mentioned in Section 1.

4.2.2. Refining nominal PRE distances and compositions of nuclear fuel

To better understand the statistical properties of X (and to refine the PRE distance), we subsequently constrained both X and the nominal PRE distance D of each PRE burster with its calibrated parallax in a Bayesian way. The 2-D joint probability distribution (JPD) we applied is

(4) \begin{equation}\begin{split} \phi &= \phi(D,X\ |\ \pi_1-\pi_0,D_0) \\[3pt] &\propto \phi(\pi_1-\pi_0,D_0\ |\ D,X) \\[3pt] &\propto \rho(D) \exp\left[{-\frac{1}{2}\left( \frac{\frac{1}{D}-\mu_{\pi}}{\sigma_{\pi}}\right)^2-\frac{1}{2}\left( \frac{D-\frac{D_0}{\sqrt{X+1}}}{\frac{\sigma_0}{\sqrt{X+1}}}\right)^2}\right], \\[3pt] & (D>0\ \text{and}\ X \in [0,0.73]),\end{split}\end{equation}

where $\rho(D)$ represents the Galactic prior term, i.e., the prior probability of finding a PRE burster at a distance D along a given line of sight. We approached $\rho$ by the Galactic mass distribution of LMXBs, which can be calculated with Equation (5) of Atri et al. (Reference Atri2019) using parameters provided by Grimm et al. (Reference Grimm, Gilfanov and Sunyaev2002); Atri et al. (Reference Atri2019). Among the three components of the Galactic mass density (i.e. $\rho_{\textrm{bulge}}$ , $\rho_{\textrm{disk}}$ , and $\rho_{\textrm{sphere}}$ , see Grimm et al. Reference Grimm, Gilfanov and Sunyaev2002 for explanations), the Galactic-disk component $\rho_{\textrm{disk}}$ dominates the Galactic mass density budget for LMXBs at the light of sight to any of the three PRE bursters. Therefore, for this work alone, we adopted $\rho_{\textrm{disk}}$ (see Equation (5) of Grimm et al. Reference Grimm, Gilfanov and Sunyaev2002) as the Galactic prior term $\rho$ .

Figure 3. 2-D histograms and marginalised 1-D histograms of posterior distance $D^{\textrm{post}}$ and $X'^{\textrm{post}}$ (defined in Section 4.3) simulated with bilby (Ashton et al. Reference Ashton2019) and plotted with corner.py (Foreman-Mackey Reference Foreman-Mackey2016). The n-th contour in each 2-D histogram contains $1-\exp\left(-n^2/2\right)$ of the simulated sample (Foreman-Mackey Reference Foreman-Mackey2016). The vertical lines in the middle and two sides mark the median and central 68% of the sample, respectively.

Following the JPD, we simulated posterior {D, X} pairs (hereafter referred to as $D^\textrm{post}$ and $X^\textrm{post}$ ), using bilby Footnote c (Ashton et al. Reference Ashton2019). For this simulation, we adopted a uniform distribution between 0 and 0.73 for X and a uniform distribution between 0 and 50 kpc for D (where using a larger upper limit of D does not change the result). Based on the marginalised probability density functions (PDFs) of the simulated { $D^\textrm{post}$ , $X^\textrm{post}$ } chain, we estimated $D^\textrm{post}$ and $X^\textrm{post}$ , which are presented in Figure 2 and Table 4.

In general, the conversion of parallax to distance depends on the adopted Galactic prior (Bailer-Jones Reference Bailer-Jones2015). As an example, A21 found that the application of different Galactic priors (e.g. Bailer-Jones et al. Reference Bailer-Jones, Rybizki, Fouesneau, Demleitner and Andrae2021; Atri et al. Reference Atri2019) results in inconsistent distances (see Figure 3 of A21). Unlike A21, we applied an extra constraint on D provided by the PRE distance (see Equation (4)), which gives a handle on X and improves the constraint on D. With this extra constraint, the dependence on the Galactic prior becomes negligible for all of the three PRE bursters: their $D^\textrm{post}$ and $X^\textrm{post}$ stay almost the same without the $\rho(D)$ term.

The PDFs of X provide richer information on X than $K^{X=0.7}_{X=0}$ . As expected from $K^{X=0.7}_{X=0}$ , the PDF of X for Cen $\textrm{X}-4$ favours a hydrogen-poor nature of nuclear fuel. In addition to the new constraint we put on X, the nominal PRE distance of each PRE burster incorporating the parallax information is supposed to be more reliable (though not necessarily more precise). We note that the refined nominal PRE distances are still model dependent; their accuracies are subject to the validity of the simplistic PRE model.

4.3. A roadmap for testing the simplistic PRE model with parallax measurements

The discussion in Section 4.2 is based on the correctness of the simplistic PRE model. Now we discuss the potential feasibility of using parallaxes (of PRE bursters) to test the simplistic PRE model. We first define the PRE distance correction factor $\eta$ ( $\eta>0$ ) using the relation

(5) \begin{equation}D_X = \eta\ \frac{D_0}{\sqrt{X+1}},\end{equation}

where $D_0$ stands for the nominal PRE distance at $X=0$ (derived from the simplistic PRE model), and $D_X$ refers to the ‘true’ distance. If the simplistic PRE model is correct, then $\eta=1$ . However, $\eta\ \neq\ 1$ is possible due to various causes including the stochasticity of PRE burst luminosity and anisotropy of PRE burst emission (e.g. Sztajno et al. Reference Sztajno, Fujimoto, van Paradijs, Vacca, Lewin, Penninx and Trumper1987). The latter cause implies $\eta$ to be geometry dependent (e.g. viewing-angle-related); if all PRE bursters have different geometry-dependent $\eta$ , a search for a global deviation of $\eta$ from unity with a sample of PRE bursters would be less practical. Nevertheless, it remains practical to constrain $\eta$ on an individual basis. One way to make this constraint is using the generalised X, defined as

(6) \begin{equation}X'+1=\frac{X+1}{\eta^2}.\end{equation}

Accordingly, $D_X=D_0/\sqrt{X'+1}$ . Thanks to the same mathematical formalism, we can re-use Equation (4) as the JPD for statistical analysis, except that the domain of $X^{\prime}$ is widened to $X'>-1$ .

The simulated { $D^{\textrm{post}}$ , $X'^{\textrm{post}}$ } chain (posterior D and $X^{\prime}$ ) is depicted in Figure 3. If the simplistic PRE model is correct, then $\eta=1$ ; as a result, $X^{\prime}$ is supposed to fall into the ‘standard’ domain of [0, 0.73]. None of the three PDFs of $X^{\prime}$ decisively rules out $X^{\prime}$ from this standard domain. However, we notice $X'<0$ at 90% confidence for Cen $\textrm{X}-4$ , which moderately disfavours the simplistic PRE model.

As the domain of $X^{\prime}$ is broadened from that of X, the fractional precision of $D^{\textrm{post}}$ becomes predominantly reliant on that of the parallax. In this regime, $D^{\textrm{post}}$ and $X'^{\textrm{post}}$ become more dependent on the adopted Galactic prior. To understand the degree of this dependence, we re-estimated $D^{\textrm{post}}$ and $X'^{\textrm{post}}$ after resetting the Galactic prior to $\rho(D)=1$ , which are summarised in Table 5. For Cyg $\textrm{X}-2$ with insignificant $\pi_1-\pi_0$ , the dependence on the Galactic prior is evident, despite the consistency between the two sets of $D^{\textrm{post}}$ and $X'^{\textrm{post}}$ . For Cen $\textrm{X}-4$ and $4\textrm{U}\,0919-54$ both having relatively significant $\pi_1-\pi_0$ , the degree of the dependence varies with the Galactic coordinates of the targets. In particular, we found the $D^{\textrm{post}}$ and $X'^{\textrm{post}}$ of Cen $\textrm{X}-4$ are robust against the selection of Galactic priors in Equation (4).

Table 5. $D^{\textrm{post}}$ and $X'^{\textrm{post}}$ (see Section 4.3) inferred from the Galactic prior $\rho(D)$ of Equation (4), in comparison to the counterparts (noted as $\tilde{D}^{\textrm{post}}$ and $\tilde{X'}^{\textrm{post}}$ ) given $\rho(D)=1$

Using $X^{\prime}$ as a probe of the simplistic PRE model has the advantage of being independent of the PDF for X, which is usually not available. Future $D_0$ and $\pi_1-\pi_0$ measurements with higher precision will sharpen the above test of the simplistic PRE model. Lower fractional uncertainty of $\pi_1-\pi_0$ will not only reduce the strong correlation between $D^{\textrm{post}}$ and $X'^{\textrm{post}}$ for Cyg $\textrm{X}-2$ and $4\textrm{U}\,0919-54$ (shown in Figure 3) but also lessen the dependence of inferred $D^{\textrm{post}}$ and $X'^{\textrm{post}}$ on the adopted Galactic prior. On the other hand, constraining X at PRE bursts independently (with, for example, ignition models of X-ray bursts) is the key to singling out $\eta$ . Given that the simplistic PRE model is not significantly disfavoured by any of the 3 PRE bursters, the refined distances in Table 4 (based on the correctness of the simplistic PRE model) are still valid.

4.4. Future prospects

The potential of constraining X and testing the simplistic PRE model using Gaia parallaxes of PRE bursters hinges on the achievable parallax uncertainties. Future Gaia data releases include Gaia Data Release 4 (DR4) (for the 5-yr data collection) and the data release after extended observations of up to 5.4 yr (https://www.cosmos.esa.int/web/gaia/release). We predict the achievable parallax ( $\pi_1$ ) and proper motion uncertainties of Cen $\textrm{X}-4$ for future Gaia data releases using the simulation method detailed in Appendix A. In the same way, we estimated the predicted $\pi_1$ uncertainty $\hat{\sigma}_{\pi_1}$ of Cyg $\textrm{X}-2$ , $4\textrm{U}\,0919-54$ , and XB 2129+47 for future data releases and DR2, which are listed in Table 6. The predicted $\pi_1$ uncertainties for DR2, denoted as $\hat{\sigma}^\textrm{DR2}_{\pi_1}$ , generally agree with the real values $\sigma^\textrm{DR2}_{\pi_1}$ (see Table 6). In general, our simulation shows Gaia parallax and proper motion precision improves with observation time t at roughly $t^{-1/2}$ and $t^{-3/2}$ , respectively.

Table 6. Predicted parallax ( $\pi_1$ ) uncertainties $\hat{\sigma}_{\pi_1}$ for Cen $\textrm{X}-4$ , Cyg $\textrm{X}-2$ , and $4\textrm{U}\,0919-54$ obtained with simulations (see Appendix A for details). For comparison, real values of $\sigma^\textrm{DR2}_{\pi_1}$ are provided as $\sigma^\textrm{DR2}_{\pi_1}$

$^*$ we adopt an indicative 5-yr extension on top of the Gaia 5-yr mission.

According to Table 3, the future parallax uncertainty of Cyg $\textrm{X}-2$ will be predominantly limited by the uncertainty of $\pi_0$ , or $\sigma_{\pi_0}$ . For this target, improvement in the estimation of the zero-point parallax correction and its uncertainty – which is challenging due to the relative brightness of the source – is essential. In comparison, the $\sigma_{\pi_1}$ of Cen $\textrm{X}-4$ , $4\textrm{U}\,0919-54$ , and XB 2129+47 dominates the respective error budget of the calibrated parallax $\pi_1-\pi_0$ . Therefore, one can expect $\pi_1-\pi_0$ of Cen $\textrm{X}-4$ , $4\textrm{U}\,0919-54$ , and XB 2129+47 to be potentially 1.9 times more precise (than EDR3) at the end of the extended Gaia mission (with 10-yr data), which would promise better constraints on X and $X^{\prime}$ for Cen $\textrm{X}-4$ and $4\textrm{U}\,0919-54$ . On the other hand, to constrain X and $X^{\prime}$ for XB 2129+47 with its already relatively precise Gaia parallax will require more PRE bursts to be detected from XB 2129+47. Apart from Gaia astrometry, radio observations of PRE bursters during their outbursts using very long baseline interferometry technique can also potentially measure geometric parallaxes of PRE bursters, hence serving the same scientific goals outlined in this paper.

This work only deals with the simplistic PRE model, the hitherto most impactful PRE model. As is mentioned in Section 1, PRE models are not the only pathway to the distances of type I X-ray bursters. Bayesian inference based on a burst ignition model (Cumming & Bildsten Reference Cumming and Bildsten2000) was recently realised to estimate parameters including X and D (Goodwin et al. Reference Goodwin, Galloway, Heger, Cumming and Johnston2019). We believe such inferences will be made for more type I X-ray bursters in the near future. In Bayesian analysis based on burst ignition models (e.g. Cumming & Bildsten Reference Cumming and Bildsten2000; Woosley et al. Reference Woosley2004), model-independent geometric parallaxes will serve as prior knowledge and help refine the inferred parameters including D and X; the parallaxes can also judge which burst ignition model is more likely correct with a Bayes factor analysis.

Finally, we reiterate that we have assumed $M_{\textrm{NS}}=1.4\,\textrm{M}_{\odot}$ and $R_{\textrm{NS}}=11.2$ km for all PRE bursters. Therefore, strictly speaking, $\eta$ should also reflect the deviation of $M_{\textrm{NS}}$ and $R_{\textrm{NS}}$ from their respective assumed values. Though a large deviation of $M_{\textrm{NS}}$ from 1.4 $\textrm{M}_{\odot}$ is rare, it is not impossible (Shao et al. Reference Shao, Tang, Jiang and Fan2020). In general, $L_{\textrm{Edd},\infty}$ would increase with larger $M_{\textrm{NS}}$ and $R_{\textrm{NS}}$ (see Equation (1)). For example, $L_{\textrm{Edd},\infty}(M_{\textrm{NS}}=2, R_{\textrm{NS}}=15)$ is 40% greater than $L_{\textrm{Edd},\infty}(M_{\textrm{NS}}=1.4, R_{\textrm{NS}}=11.2)$ . Such a $L_{\textrm{Edd},\infty}$ would correspond to $X'=-0.29$ assuming $X=0$ and the simplistic PRE model is correct. This value is consistent with $X'=-0.55^{+0.38}_{-0.23}$ for Cen $\textrm{X}-4$ . Given that the NS mass distribution is relatively well constrained compared to the NS radius distribution, it is possible to constrain the NS radius of a PRE burster in a Bayesian framework (slightly different from this work) provided prior knowledge of X, D, and $M_{\textrm{NS}}$ , assuming the simplistic PRE model is correct.