4.1 Light curve fitting

The companion star in the binary was estimated to have mass M ₂ ≃ 0.03 M _⊙ and radius R ₂ ≃ 0.03 R _⊙ (Wang & Chakrabarty Reference Wang and Chakrabarty2004). The effective temperature of the heated side of the companion is estimated as the following. Cartwright et al. (Reference Cartwright, Engel, Heinke, Sivakoff, Berger, Gladstone and Ivanova2013) obtained a luminosity range (2–10 keV) of 4.6–6.8 × 10³⁶d ²₇ erg s⁻¹ for this binary, where d ₇ is the source distance in units of 7 kpc, and Madej et al. (Reference Madej, Garcia, Jonker, Parker, Ross, Fabian and Chenevez2014) derived a slightly higher but similar luminosity (0.1–10 keV) of 7.6 × 10³⁶ erg s⁻¹ from their 2012 Chandra observation. We used the latter value as the source luminosity. The binary separation is D_b ≃ 1.8 × 10¹⁰ cm for an orbital period P = 18.2 min and a neutron star mass M _ns = 1.4M _⊙. The fraction f of the X-ray photons received by the companion is f = (R ₂/D_b)²/4 ≃ 0.004. The effective temperature of the heated side is T = [f(1−η_*)L _X/πR ²₂σ]^1/4, where σ is the Stefan–Boltzmann constant and η_* is the albedo of the companion. The value for the latter is often assumed to be 0.5 (e.g., Arons & King Reference Arons and King1993), and thus T ≃ 64,100d ^1/2₇ K, which we used in the following calculations. Because of uncertainties on the X-ray flux (although it is relatively stable; Cartwright et al. Reference Cartwright, Engel, Heinke, Sivakoff, Berger, Gladstone and Ivanova2013), the masses of the binary, and the albedo, the temperature value is rather uncertain. We found that η_*, which can have values of 0.6–0.8 based on the results from modelling of emission from irradiated companions in radio pulsar binaries or LMXBs (e.g., see Stappers et al. Reference Stappers, van Kerkwijk, Bell and Kulkarni2001; Reynolds et al. Reference Reynolds, Callanan, Fruchter, Torres, Beer and Gibbons2007; Wang et al. Reference Wang, Breton, Heinke, Deloye and Zhong2013), causes the largest changes in T. For example, when η_* = 0.8 (Wang et al. Reference Wang, Breton, Heinke, Deloye and Zhong2013), T ≃ 51 000 K, indicating ~ 20% uncertainty on T.

This is higher than the effective temperatures of most non-degenerate stars, but hot white dwarfs can have effective temperatures as high as 2 00 000 K, and at least 100 hydrogen-atmosphere white dwarfs have effective temperatures > 60 000 K (e.g., see the review by Sion Reference Sion2011). Despite its very low mass in comparison with the typical hot white dwarf, the surface properties of the companion to 4U 1543–624 may otherwise be quite similar.

As the visible area of the heated side varies as a function of the orbital phase, a modulation of f _*[1 + sinisin(2πt/P)] arises, where t is time and f _*∝(R ₂/d)²T ³ is the flux from the irradiated side of the companion (see Arons & King Reference Arons and King1993 for details). We then added a constant flux component f_c to account for the constant emission from the accretion disk, and assumed that the temperature of the non-irradiated side of the companion was 3 000 K, which is a value found from fitting optical light curves of very low-mass companions in pulsar binaries (see Stappers et al. Reference Stappers, van Kerkwijk, Bell and Kulkarni2001; Reynolds et al. Reference Reynolds, Callanan, Fruchter, Torres, Beer and Gibbons2007; note that emission from this cold side is negligible comparing to that from the accretion disk and the heated side). The modulation amplitude is then given by (f _*sini)/(f_c + f _*) (Arons & King Reference Arons and King1993). In order to reproduce the observed modulation, d (since f _*∝T ³d ⁻²∝d ^−1/2), i, and f_c are key parameters to be considered.

The hydrogen column density to the source is N _H = 2.4 × 10²¹ cm⁻² (Madej et al. Reference Madej, Garcia, Jonker, Parker, Ross, Fabian and Chenevez2014), which gives the extinction A_V ≃ 1.34 (A_V = N _H/1.79 × 10²¹ cm⁻²; Predehl & Schmitt Reference Predehl and Schmitt1995), or A _r′ = 1.13 (Schlegel, Finkbeiner, & Davis Reference Schlegel, Finkbeiner and Davis1998). We fit the dereddened light curve of 4U 1543–624 to obtain constraints on i and f_c. The average magnitude was taken to be 20.22 mag (obtained from the linear decay component at the mean observing time of MJD 54672.02991): changing this slightly to account for the linear decay would shift f_c up or down fractionally by the same amount (see the bottom panel of Figure 4). The fitting was very degenerate with distance, with a range of distances all having similar best-fit χ² values (the minimum χ² ≃ 124 for 118 DoF) up to d = 9.2kpc, beyond which no good fits could be obtained. The resulting i and f_c value ranges (90% confidence) as a function of d are shown in Figure 4. The best-fit model light curve is virtually identical to the sinusoidal fit in Section 3, and thus is not displayed in Figure 3. From the fitting, we found that i is sensitive to distance, ranging from 19°–25° at 4 kpc to 63°–90° at 8.5 kpc, but f_c remains in the range 70–80 μJy. When d > 8.5 kpc, the binary system is required to be nearly edge-on. The large χ² values indicate that d ⩾ 10 kpc is extremely unlikely. In Figure 3, an example of the model light curves at d = 10 kpc is shown for comparison.

Figure 4. Derived value ranges at a 90% confidence level from light curve fitting (marked by diamonds and dotted curves) for inclination i (top panel) and constant disk flux f_c (bottom panel) as a function of distance d, where η_* = 0.5 was used (i.e., T ≃ 64,100d ^1/2₇ K). In the bottom panel, the disk r′-band F _ν ranges as a function of d, calculated from the standard accretion disk model (see Section 4.2), are shown by two dash–dot curves. The two dash–dot curves were set by using the corresponding i range at each distance in the top panel. By requiring that f_c matches the disk flux F _ν (i.e., the shaded region), d = 6.0–6.7 kpc (90% confidence) is found, which in turn constrains i = 34°–61° (indicated by the shaded region in the top panel).

4.2 Disk flux calculation

The binary has a compact accretion disk and the disk flux is sensitive to i at certain distances. Here, we considered the standard geometrically thin, optically thick disk model (see Frank, King, & Raine Reference Frank, King and Raine2002). The outer radius of the disk r_o is approximately r_o ≃ 1.1 × 10¹⁰ cm, limited to the tidal radius (90% of the neutron star's Roche-lobe radius; Frank et al. Reference Frank, King and Raine2002). The disk temperature was determined by including both viscous heating and X-ray irradiation (for the latter, see Vrtilek et al. Reference Vrtilek, Raymond, Garcia, Verbunt, Hasinger and Kurster1990); because of the strong X-ray emission from the neutron star, irradiation is the dominant heat source. The mass accretion rate $\dot{M}$ in the disk was estimated from $L_{\rm X}=GM_{\rm ns}\dot{M}/R_{\rm ns}$, where the neutron star radius R _ns was assumed to be 10⁶ cm (at 7 kpc distance, $\dot{M} \simeq 3.8\times 10^{16}$ g s⁻¹). The disk flux F _ν at frequency ν is then given as (Frank et al. Reference Frank, King and Raine2002)

$$\begin{equation*} F_{\nu}= \frac{4\pi h\nu ^3\cos i}{c^2 d^2}\int ^{r_o}_{r_i}\frac{rdr}{e^{h\nu /k_BT_d}-1}\, \end{equation*} $$

where h is Planck's constant, k_B Boltzmann's constant, and c the speed of light. The disk temperature T_d is a function of the disk radius r, $T_d \propto \dot{M}^{2/7} r^{-3/7}$ (Vrtilek et al. Reference Vrtilek, Raymond, Garcia, Verbunt, Hasinger and Kurster1990), and r_i is the inner disk radius (we set r_i = 10⁷ cm in our calculation, but note that the disk flux is not sensitive to r_i as long as r_i ≪ r_o). We calculated the disk flux at the central wavelength (6 300 Å) of the r′ band over the same range of distance as considered in Figure 4, where we required that i(d) matched the constraints from Section 4.1. The possible range of F _ν is shown by the two dash–dot curves in the bottom panel of Figure 4. Requiring the disk flux F _ν to be consistent with f_c from Section 4.1, we find d = 6.0–6.7 kpc and i = 34°–61° (90% confidence).

We note that the i value range is lower than that of 65°–82° obtained by Madej et al. (Reference Madej, Garcia, Jonker, Parker, Ross, Fabian and Chenevez2014) from their X-ray spectral fitting, but are consistent with the non-detection of any eclipses or dips at X-ray energies (which generally suggest i < 60°; Frank et al. Reference Frank, King and Raine2002). However, our results were calculated from simple analytic models for X-ray binaries and depend on parameters such as η_* that were not robustly examined here. For example, if η_* = 0.8 (i.e., T ≃ 51000d ^1/2₇ K) is assumed, the above calculations will result in d ~ 5.2–6.0 kpc and i ~ 35–87°. In any case, our calculations clearly show that to produce the optical modulation seen in 4U 1543–624 at optical wavelengths, it is likely that d ⩽ 9 kpc, not supporting the suggestion that this binary is an ultra-luminous X-ray source. Instead, our fitting suggests d ~ 6.0–6.7 kpc. Following similar calculations presented here, future multi-band observations will certainly help our study of this ultra-compact binary by determining its distance and inclination.