2.1 Photometric data

To construct the SEDs in Section 4.1, we collected the photometric data from the Vizier database (Ochsenbein et al. Reference Ochsenbein, Bauer and Marcout2000). Photometry at optical and near-IR wavelengths characterises the photospheric emission of the post-AGB star. Subsequently, the post-AGB photosphere is fitted using these data points (see Section 4.1). The most significant photometry bands we used at these wavelengths are the UBVRI Johnson-Cousins bands (Bessell Reference Bessell1990). For one of the targets, we also used photometry from Geneva (Rufener Reference Rufener1999) and SDSS (Blanton et al. Reference Blanton2017). Emission at longer wavelengths is dominated by low-temperature emission from the dusty disc. Therefore, photometry at mid- and far-IR wavelengths defines the circumstellar environment. To characterise this we use the photometric data from the 2MASS All-Sky Catalog of Point Sources (Cutri et al. Reference Cutri2003), the WISE All-Sky Data catalogue (Cutri et al. Reference Cutri2012), the AKARI/IRC mid-IR all-sky survey (Ishihara et al. Reference Ishihara2010), and the IRAS catalogue of Point Sources (Helou & Walker Reference Helou and Walker1988). The photometric magnitudes of all the objects covering the optical, near-IR, and mid-IR bands are presented in Table 2. As these stars are pulsating, multiple measurements for magnitude values within the same photometric bands are available. Hence, we provide the mean value of each measurement in Table 2. We refer to the Appendix A of Oomen et al. (Reference Oomen2018) for the list of the most common catalogues used.

Table 2. Photometric data of the targets. See text for full details.

Notes: The RA and DEC coordinates are given for the J2000 epoch. Null magnitudes are listed as 99.999.

Fig. 6 shows the SEDs of all the targets in our sample. As mentioned in Section 2, the SEDs of our target stars are of ‘disc-type’.

2.2 Spectroscopic observations and data reduction

The high-resolution optical spectra of the three targets: J005107, MACHO 47.2496.8, and HD 158616 were taken from the Ultraviolet and Visual Echelle Spectrograph (UVES, Dekker et al. Reference Dekker, D’Odorico, Kaufer, Delabre, Kotzlowski, Iye and Moorwood2000), which is the echelle spectrograph mounted on the 8 m UT2 Kueyen Telescope of the Very Large Telescope (VLT) array at the Paranal Observatory of European Southern Observatory (ESO) in Chile, aiming to obtain comprehensive data on a large sample of post-AGB objects. The dichroic beam-splitter was used to get maximum wavelength coverage resulting in a wavelength coverage from approximately 3 280 Å to 4 560 Å for the blue arm of UVES, and from approximately 4 726 Å to 5 800 Å and 5 817 Å to 6 810 Å for the lower and upper part of the red arm of the UVES CCD chip, respectively. There are small spectral gaps between 4 560 Å and 4 726 Å and between 5 800 Å and 5 817 Å due to the spatial gap between the three UVES CCDs. Each wavelength range is observed separately with a specific exposure time. The resolving power of the UVES spectra varies between $\sim$ 60 000 and $\sim$ 65 000. In Fig. 3, two spectral snippets are presented, illustrating the quality of the spectral data and highlighting the identification of certain s-process elements in the target stars.

Table 3 gives the log of the observations, the spectral intervals covered and the signal-to-noise (S/N) ratio for each object. In general, the S/N ratio is lower at blue wavelengths. We note that the echelle data does not have a consistent S/N because it depends on the blaze function. The S/N is higher at the blaze wavelengths, where the spectrograph works most efficiently, compared to other parts of the spectrum. The ‘References’ column points to the literature of the previous high-resolution studies.

Figure 3. Comparison of the normalised and radial velocity corrected spectra of all target stars. The spectra have been shifted in flux for clarity. Red and black vertical lines mark the positions of s-process elements (and also carbon) and non-s-process elements, respectively. For more information, see the text.

In the following paragraphs, we only discuss the spectral reduction, normalisation, radial velocity correction, and weighted average merging of J005107 in detail. Similar steps of the other two targets: MACHO 47.2496.8 and HD 158616 are explained in detail by Reyniers et al. (Reference Reyniers2007) and De Smedt et al. (Reference De Smedt2016), respectively.

The UVES spectral reduction of the raw data of J005107 was performed using the UVES reduction pipeline from EsoReflex on the default optimal settings. The EsoReflex software allows the user to choose from a variety of pipelines that correspond to the various telescopes available at ESO. The reduction process involves the standard steps of extracting frames, determining wavelength calibration and applying this scale to flat-field divided data. As part of the reduction, cosmic clipping was also taken into account.

The normalisation of the reduced spectrum was done by fitting in small spectral windows with fifth-order polynomials through interactively defined continuum points. We note that normalisation is the most delicate step in the reduction procedure, especially in the blue part of the spectrum, where the spectrum is so crowded that the continuum is rarely reached. The most significant source of uncertainty for the abundances calculated from lines in this region is the continuum location. Three observations were taken for J005107 with an exposure time of 3 005 s for each UVES arm. Since the third observation (OB3) of J005107 was taken after 19 days (see Table 3) from observation one (OB1) and observation two (OB2) and considering the target to be an RV Tauri pulsator, the phase of OB3 is different from that of OB1 and OB2. Hence, we decided to treat the OB3 as an independent spectrum for the rest of our analysis. However, the OB3 spectra had minimal lines to be useful for both atmospheric parameter analysis as well as abundance derivation. Therefore, we chose to use only OB1 and OB2 for the rest of our analysis.

Table 3. Observational logs of the target stars. The references for previous high-resolution spectroscopic studies utilising the spectra presented in this table are provided.

Notes: The exposure times of UVES spectra are split into four categories: exposure times for the Blue arm, Red Lower arm, Red Upper arm or all three arms; the latter is indicated with ‘All’. The wavelength coverage for the ‘Blue’ UVES arm is from approximately 3 280 to 4 530 Å and the ‘RedL’ and ‘RedU’ UVES arms are from approximately 4 780 to 5 770 Å and from 5 800 to 6 810 Å, respectively.

$^{(1,2)}$ The log details are for Observation one (OB1) and Observation two (OB2) together (see text for details on OB1, OB2, and OB3).

$^{(3)}$ The log details are for Observation three (OB3).

References: a – Reyniers et al. (Reference Reyniers2007), b – De Smedt et al. (Reference De Smedt2016).

To determine the radial velocity of J005107, several well-identified atomic lines in the spectrum were fitted with a Gaussian curve to find their centre wavelength. The Doppler shift equation was used to compute the shifted velocity. This yields a heliocentric radial velocity of $v=160\,\pm\,$ 8 km s $^{-1}$ for OB1 and OB2, which is precise enough for line identification purposes. This is also in good agreement with the radial velocity value $v=187.5\pm4.3$ km s $^{-1}$ estimated by Kamath et al. (Reference Kamath, Wood and Van Winckel2014) using the low-resolution spectra. Furthermore, the velocity of J005107 validates the membership of the SMC, with the heliocentric radial velocity of the SMC being $\sim$ 160 km s $^{-1}$ (Richter et al. Reference Richter, Tammann and Huchtmeier1987).

Once all three spectra (Blue, RedL, and RedU) of OB1 and OB2 were normalised and radial velocity corrected, a weighted mean average merging was performed, thereby obtaining a single final spectrum, which was used to perform a detailed spectral analyses of J005107. A significant portion of the Blue spectrum (wavelength range 3 280–4 560 Å) has a S/N ratio that is too low to be useful for a precise spectral abundance analysis; as a result, these wavelength ranges are not used for the spectral analyses of J005107.

3.1 Atmospheric parameter determination

We derived the atmospheric parameters of all the target stars using Fe I and Fe II lines (see Section 3 for more details on line selection). Fe was chosen due to its large number of unblended lines, covering a broad range of excitation potential (EP). The EWs were calculated for each line using an iterative procedure in which the theoretical EWs of individual lines were compared to the calculated EWs. The atmospheric parameter determination method is outlined below.

The effective temperature ( $T_{\rm eff}$ ) was estimated using excitation analysis, wherein the abundances derived from Fe I lines are imposed to be independent of their EP. An accurate derivation of $T_{\rm eff}$ is promoted by the wide range in EP (0.5–5 eV) and the sufficiently large number of lines. The surface gravity (log g) is determined using ionisation analyses, imposing the abundances to be independent of the lines being from neutral or ionised Fe. The microturbulent velocity ( $\xi_{\rm t}$ ) was derived by imposing the independence of the abundance derived from individual Fe lines of the reduced equivalent width (RW). Concerning the error estimation for atmospheric parameters, they are determined from the covariance matrix generated by the non-linear least-squares fitting algorithm in E-iSpec.

We note that the atmospheric parameter analysis can be verified using other species like Ti or Cr, provided there is a substantial number of lines for certain species. However, due to a large number of blends, the majority of the elements only have less than three useful lines to perform the analysis.

The results of the atmospheric parameter analysis of our targets are presented in Table 1 and discussed in Section 3.3.

3.2 Abundance analysis

We derived chemical abundances using both the EW method and the SSF technique – which are modules of E-iSpec. In the EW method, observed EWs were compared with predictions from theoretical model atmospheres (ATLAS9 Castelli & Kurucz Reference Castelli, Kurucz, Piskunov, Weiss and Gray2003 or MARCS Gustafsson et al. Reference Gustafsson2008), involving an iterative adjustment of assumed abundances until observed and predicted EWs converged, yielding best-fit abundance values. The SSF technique involved comparing observed stellar spectra with synthetic spectra generated by theoretical model atmospheres, employing chi-square fitting to iteratively refine model parameters and derive precise chemical abundances.

We note that the lines used for the abundance derivation are as per the criteria mentioned in Section 3. The complete linelists of the target stars are provided as online supporting material.

The uncertainties associated with the derived abundances are determined using the procedure outlined by Deroo et al. (Reference Deroo, Reyniers, van Winckel, Goriely and Siess2005). E-iSpec provides the errors of the derived abundances only as standard deviations of the measured values ( $\sigma_{\rm |121|}$ ). However, the total error $\sigma_{\rm tot}$ is the quadratic sum of $\sigma_{\rm |121|}$ , uncertainties in abundances due to atmospheric parameters and the [Fe/H] error. To determine the sensitivity of the abundances to the stellar parameters, the abundances were recalculated changing $T_{\rm eff}$ , $\log g$ , and $\xi_{\rm t}$ with their calculated error (see Table 1 for atmospheric parameter errors). We impose a $\sigma_{\rm |121|}$ of 0.20 dex for all the ions for which only one line was available. The chosen uncertainty of 0.2 dex corresponds to the allowed standard deviation for the line-to-line scatter, indicating the range within which all individual line abundances are expected to lie.

The results of the abundance analysis of our targets are presented in Tables 4 and A1 and discussed in Section 3.3.

Table 4. Spectroscopically determined abundance results for J005107.

Notes: The ions that were detected and their corresponding atomic number (Z) are listed in columns 1 and 2, respectively. The solar abundances ( $\log\varepsilon_{\odot}$ ) in column 3 are retrieved from Asplund et al. (Reference Asplund, Grevesse, Sauval and Scott2009). N represents the number of lines used for each ion, [X/Fe] is the element-over-iron ratio, $\sigma_{\rm tot}$ is the total uncertainty on [X/Fe], $\log\varepsilon$ is the derived abundance, and $\sigma_{\rm |121|}$ is the line-to-line scatter. We impose a $\sigma_{\rm |121|}$ of 0.20 dex for all ions for which only one line is available for the abundance determination.

Figure 4. Spectroscopically derived abundances of J005107. The error bars represent the total uncertainties $\sigma_{\rm tot}$ . Some elements are labelled for reference. The black colour data points represent CNO elements, the blue represents Fe peak elements, the magenta represents Zn and S, and the red represents s-process elements.

3.3 Results of spectroscopic analysis: Atmospheric parameters and chemical abundances

In this section, we present the results of the spectral analyses of J005107. We note that this study marks the first high-resolution spectral analyses of J005107. However, for MACHO 47.2496.8 and HD 158616 similar high-resolution spectral analyses have been previously carried out by Reyniers et al. (Reference Reyniers2007) and De Smedt et al. (Reference De Smedt2016), respectively. For benchmarking our methodology (i.e. the E-iSpec Code) we repeated the spectral analyses for these two objects (see Appendix A for the final results). Since the derived atmospheric parameters and abundances of MACHO 47.2496.8 and HD 158616 align closely with values reported in the literature (refer to Tables 1 and A1), we opted to adopt the literature values of both atmospheric parameters and abundances for the rest of our analysis.

The various atmospheric parameters of J005107 are displayed in Table 1, under the title ‘This study’. The atmospheric parameters of J005107 clearly fall within the range of typical post-AGB parameter values.

Table 4 presents the final derived abundances for different elements of J005107. Unfortunately, all Ba lines were severely saturated (see Fig. 3 at 6 141.7324 Å), making it impossible to accurately determine the abundance of one of the significant s-process species. Except for the species where all observable lines turned out to be blended, the other s-process elemental abundances were derived from isolated single lines. We list the elements by their atomic number (Z), the solar abundances ( $\log\varepsilon_{\odot}$ ) retrieved from Asplund et al. (Reference Asplund, Grevesse, Sauval and Scott2009), the number of lines identified for each element (N), the element-over-iron ratio ([X/Fe]), the total uncertainty on [X/Fe] ( $\sigma_{\rm tot}$ ), the determined abundance ( $\log\varepsilon$ ), and the line-to-line scatter ( $\sigma_{\rm |121|}$ ). Although the abundances of several useful elements for nucleosynthesis studies could not be determined, Table 4 still provides quantified abundances of a range of s-process elements. See Section 3 for details on atmospheric parameters and derived abundance uncertainties.

Combining the results of both atmospheric parameter analysis and abundance derivation, we interpret the characteristics of J005107. J005107 is an F-type star ( $T_{\rm eff}$ = $5\,764\pm85$ K) with a low surface gravity ( $\log g$ = $0.21\pm0.10$ dex) and an iron abundance ([Fe/H] = $-1.57\pm0.10$ ). The iron abundance of J005107 is low compared to the mean metallicity of the SMC [Fe/H] = −0.7 dex (Luck et al. Reference Luck, Moffett and Barnes1998). This categorises J005107 as a low-metallicity star, which is commonly recognised as an astrophysical production site producing heavy s-process elements provided the TDU occurs (Bisterzo et al. Reference Bisterzo, Gallino, Straniero, Cristallo and Käppeler2010). Fig. 4 shows the abundance distribution ([X/Fe]) for J005107 as a function of atomic number (Z). From the abundance plot, it is clear that J005107 is strongly enriched in s-process elements with an [s/Fe] = $1.52\pm0.20$ dex. Moreover, it also has a carbon enrichment with [C/Fe] = $1.09\pm0.21$ dex. However, we note that owing to the observed blending in the single available carbon line (located at 4 817.373 Å as detailed in the linelist), accurately determining the carbon abundance posed a significant challenge.

4.1 SED fitting

Most of our targets are RV Tauri pulsators that often show large amplitude pulsations that can go up to several magnitudes in V. One of the greatest challenges in fitting the SEDs of these stars is that these pulsations cause a scatter in the photometric data points. Therefore reddening is difficult to determine. To overcome this issue, it is crucial to have full coverage of all photometric bands in the same pulsation phase. However, since the same pulsation phase data is unavailable, we have utilised all the accessible photometric data points (see Section 2.1) to construct the SEDs. We determined the SED of all the targets of this study in a strictly homogeneous way, as explained below.

We adopted the same approach described in Kluska et al. (Reference Kluska2022) and Kamath et al. (Reference Kamath2022) to construct all the SEDs in this study. In summary, we began by determining the total line-of-sight reddening or extinction parameter ( $E(B-V)$ ) by minimising the difference between the optical fluxes and the reddened photospheric models. The total reddening includes both interstellar and circumstellar reddening. We assume that the total reddening in the line of sight has the wavelength dependency of the ISM extinction law (Cardelli et al. Reference Cardelli, Clayton and Mathis1989) with Rv = 3.1. The extinction law in the circumstellar environment likely differs from the interstellar extinction law. However, investigating this aspect falls outside the scope of our current study. For the atmospheric models, we used the appropriate Kurucz atmospheric models (Castelli & Kurucz Reference Castelli, Kurucz, Piskunov, Weiss and Gray2003), the parameters of which were taken from the spectroscopic analysis presented in Section 3.1 (see Table 1). We interpolated in the $\chi^2$ landscape between the models centred around the spectroscopically determined parameters and applied ranges of $\Delta T_{\rm eff}$ $\pm 500$ K, $\Delta\log g$ $\pm 0.5$ dex, $\Delta\textrm{[Fe/H]}$ $\pm 0.5$ dex (see Fig. 5). The SEDs of our three target stars are presented in Fig. 6.

Figure 5. An example of $\chi^2$ plot of J005107 to obtain the reddening parameter $E(B-V)$ after the parameter grid search. This plot illustrates the correlation between $T_{\rm eff}$ and $E(B-V)$ of the targets.

4.2 Luminosity determination

Accurately determining the luminosities of post-AGB stars and combining them with their effective temperatures ( $T_{\rm eff}$ ) allows us to investigate their positions in the Hertzsprung-Russell (HR) diagram. This helps us better understand the evolutionary stage of the target post-AGB objects. However, accurately deriving the luminosities of post-AGB stars remains a significant challenge due to multiple factors. These include the impact of reddening–both circumstellar and interstellar–on observational photometric data, along with complexities arising from variability, particularly for the RV Tauri pulsators. Moreover, concerning binary post-AGB stars with orbital periods ranging from 100 to 700 days, systematic errors in parallax determination affect distances and consequently, luminosities (Kamath et al. Reference Kamath2022). This issue arises because Gaia EDR3 does not account for the orbital motion of binaries, often resulting in an underestimation of parallax. Consequently, this oversight impacts the derived distances and the luminosities of these stars (Pourbaix Reference Pourbaix2019).

To estimate the luminosity of our targets, it is imperative to address the limitations above. We, therefore, use two methods discussed in the following subsections, that is, the SED fit ( $\rm L_{SED}$ ) (Section 4.2.1) and the period–luminosity–colour (PLC) relation ( $\rm L_{PLC}$ ) (Section 4.2.2). We find $\rm L_{PLC}$ to offer greater precision and reliability when compared to $\rm L_{SED}$ . This preference arises due to significant variations in $T_{\rm eff}$ across the pulsation cycle in our target stars, which are RV Tauri pulsators (see Section 2). These fluctuations also lead to notable changes in the model fitting of stellar atmospheres (illustrated by the red lines in Fig. 6). Additionally, as mentioned above, for stars in binary systems, the uncertainties in distances obtained from parallax measurements are markedly influenced by binary orbital motion, which adds to the uncertainties in $\rm L_{SED}$ .

4.2.1 Deriving the luminosity using SED

The bolometric luminosities ( $\rm L_{SED}$ ) of the targets were derived by integrating the flux under the dereddened photospheric SED model (see Section 4.1). To achieve this, we assumed an average distance of $62.1 \pm 1.9$ kpc to the SMC (Graczyk et al. Reference Graczyk2012) and $49.97 \pm 1$ kpc to the LMC (Walker Reference Walker2012; Pietrzyński et al. Reference Pietrzyński2013), respectively. For our Galactic target HD 158616, we utilised the more precise Bailer-Jones geometric distances (i.e. $z_{\rm BJ}$ ) and their associated upper and lower limits ( $z_{\rm BJU}$ and $z_{\rm BJL}$ , respectively) from the study by Bailer-Jones et al. (Reference Bailer-Jones, Rybizki, Fouesneau, Demleitner and Andrae2021). The geometric distances were determined using Gaia EDR3 parallaxes, incorporating a direction-dependent prior distance. Throughout this computation, we assumed that the flux emitted by the stars is radiated isotropically. The derived SED luminosities ( $\rm L_{SED}$ ) along with their corresponding upper and lower limits ( $\Delta$ $\rm L_{SED}$ ) for the targets are presented in Col. 3 and 4 of Table 5, respectively. To calculate these upper and lower limits for the SED luminosities ( $\Delta$ $\rm L_{SED}$ ), we utilised the corresponding upper and lower limits of the reddening values, as derived and outlined in Col 7 of Table 5.

Figure 6. SEDs of J005107 (top left), MACHO 47.2496.8 (top right), and HD 158616 (bottom). The data points represent the dereddened photometry. The red line represents the best-fitting scaled model atmosphere (see text for details).

4.2.2 Deriving the luminosity using PLC relation

One of the greatest benefits of type II Cepheids is that their pulsations can be used to determine their luminosities due to the correlation between their pulsational periods and luminosities. Unlike the previous SED fitting method (see Section 4.2.1), this approach does not rely on distance dependencies, providing a valuable advantage for accurate luminosity derivation.

Many post-AGB stars, specifically RV Tauri stars exhibit strong radial pulsations because they are located in the long-period segment of the type II Cepheid instability strip. The radial modes of these stars can be directly linked to their physical sizes. By incorporating a colour or temperature factor, one can establish a connection between the star’s luminosity and its pulsation period. This relationship is referred to as the PLC relation, as shown in studies by Alcock et al. (Reference Alcock1998) and Ripepi et al. (Reference Ripepi2015).

Table 5. Luminosities of the targets derived using the SED fitting method and PLC relation method.

Notes: $P_0$ is the fundamental pulsation period of the RV Tauri targets and are shown in Col. 2. The luminosities derived from SED along with their corresponding upper and lower limits are displayed in Col. 3 and 4, respectively. Similarly, the luminosities obtained using the PLC relation along with their corresponding upper and lower limits are displayed in Col. 5 and 6, respectively. Note that the target HD 158616 does not have luminosity derived from the PLC relation as it is not an RV Tauri star. The reddening derived from the SED model along with their corresponding upper and lower limits are shown in Col. 7, and the SED type of the targets are presented in Col. 8 (see text for details).

Figure 7. The reddening-free Wesenheit index plotted with the log ( $P_0$ ) of the RV Tauri stars in the LMC and SMC from Soszyński et al. (Reference Soszyński2015, Reference Soszyński2017). Note: We excluded stars from the analysis if their standard deviation exceeded $1\sigma$ of the fit.

We determined the luminosities of the two RV Tauri stars: J005107 and MACHO 47.2496.8, by adopting the PLC relation calibration method as established by Manick et al. (Reference Manick, Van Winckel, Kamath, Sekaran and Kolenberg2018). The PLC relation was calibrated separately for the LMC and SMC stars using the photometric data in the latest OGLE IV database (Soszyński et al. Reference Soszyński2018). This relation uses the colour-corrected V-band magnitude known as the Wesenheit index (WI) (Ngeow & Kanbur Reference Ngeow and Kanbur2005) and is given by

(1) \begin{equation} M_{bol,WI} = m\cdot \log\!(P_0)+c-\mu +BC+2.55(V-I)_0\end{equation}

where $P_0$ is the observed fundamental pulsation period in days, m is the slope and c is the intercept of the linear regression in the Wesenheit plane (see Fig. 7). We obtained $m = -3.59$ and c = 18.79 for the LMC and $m = -2.45$ and c = 17.45 for SMC, respectively. $\mu$ is the distance modulus for the LMC and SMC and have values of 18.49 (Walker Reference Walker2012; Pietrzyński et al. Reference Pietrzyński2013) and 18.965 (Graczyk et al. Reference Graczyk2012), respectively. The value BC is the bolometric correction for each star computed using the relation between BC and effective temperature provided by Flower (Reference Flower1996). The intrinsic colour $(V-I)_0$ of each star in the SMC and LMC is calculated using the reddening $E(V-I)$ and the observed colour $(V-I)$ . The reddening $E(V-I)$ is determined by the conversion of the total reddening $E(B-V)$ derived from the SED (see Section 4.2.1) using the conversion equation by Tammann et al. (Reference Tammann, Sandage and Reindl2003) and Haschke et al. (Reference Haschke, Grebel and Duffau2011).

(2) \begin{equation} E(V-I) = 1.38 E(B-V)\end{equation}

The derived PLC luminosities ( $\rm L_{PLC}$ ) along with their corresponding upper and lower limits ( $\Delta$ $\rm L_{PLC}$ ) of the RV Tauri targets are displayed in Col. 5 and 6 of Table 5, respectively. To calculate these upper and lower limits for the PLC luminosities ( $\Delta$ $\rm L_{PLC}$ ), we utilise the corresponding upper and lower limits of the reddening values, as outlined in Col 7 of Table 5, and also incorporate the error propagation values obtained through the PLC calibration fit.

We once again note that $\rm L_{PLC}$ offers greater precision and reliability when compared to $\rm L_{SED}$ , as detailed in the last paragraph of Section 4.2. However, for HD 158616 we had to consider $\rm L_{SED}$ as there is no $\rm L_{PLC}$ (this is not an RV Tauri star).

The luminosities of the target stars are presented in Table 5, and the derived luminosities fall within the typical post-AGB luminosity range. Consequently, we investigate the chemical peculiarities of the target stars, within the context of the post-AGB evolutionary phase.

4.3 Initial mass estimates

The evolution of LIM stars during the post-He-burning life is characterised by the gradual increase in the luminosity, in turn, related to the growth of the mass of the degenerate core, due to the continuous flux of H-free matter, favoured by the CNO nuclear activity. As far as AGB stars are concerned, a classic relation between core mass and luminosity was found by Paczyński (Reference Paczyński1971). As stars with different masses evolve through the AGB with different core masses, the luminosity of AGB stars serves as a reliable indicator of the mass of the progenitor. On the chemical side, the surface composition is exposed to changes during the AGB lifetime, primarily connected to the occurrence of several TDU events, which raise the surface carbon, and potentially lead to the formation of carbon stars (Iben Reference Iben1974). The increase in the surface carbon takes place in parallel with the growth of the core mass (hence of the luminosity) and is accompanied by the surface s-process enrichment. Based on these reasons, the combined knowledge of the luminosity and the surface chemical composition can be tentatively used to identify the progenitors of the sources considered and the evolutionary stage when the AGB evolution was halted, and the contraction to the post-AGB phase began.

Table 6. Overview of the $T_{\rm eff}$ , metallicity, [C/Fe], s-process indices, C/O ratio, and initial mass of our target stars.

Notes: $T_{\rm eff}$ , [Fe/H], [C/Fe], [s/Fe], and C/O of MACHO 47.2496.8 and HD 158616 are taken from the high-resolution spectroscopic analysis conducted by Reyniers et al. (Reference Reyniers2007) and De Smedt et al. (Reference De Smedt2016), respectively.

Although an accurate abundance derivation for carbon ([C/Fe]) is absent for MACHO,47.2496.8, it is still categorised as a carbon enriched object due to its high C/O and carbon isotopic ratio, as indicated by Reyniers et al. (Reference Reyniers2007). The C/O ratio for J005107 should be treated as a lower limit as the precise determination of carbon was not feasible (see Section 3.3).

The C/O ratio for MACHO 47.2496.8 is a lower limit, as the precise determination of carbon and oxygen abundances was not feasible (see Reyniers et al. (Reference Reyniers2007) for additional details).

In this section, we use ATON code for stellar evolution modelling (Ventura et al. Reference Ventura, Zeppieri, Mazzitelli and D’Antona1998) to estimate the mass of the progenitors of our target stars and their formation epoch. While the ATON evolutionary models are designed for single AGB stars, we explore the potential of employing these single AGB models to characterise the chemical composition of our binary post-AGB target stars, based on the assumption that the photospheric chemical abundance pattern observed in binary post-AGB stars is a reflection of the AGB nucleosynthesis that occurred before the termination of the AGB phase due to the binary interaction. By comparing our observations with predictions from the ATON stellar evolution models, we can indeed confirm whether binary interactions impact the stellar chemical composition. We used evolutionary tracks with an initial metallicity of Z = 0.001 for J005107 and MACHO 47.2496.8, and Z = 0.004 for HD 158616. The observationally derived values of [C/Fe], [s/Fe], and C/O, along with the corresponding initial mass range as determined in this section, are presented in Table 6. Note that the initial mass range indicated here refers to the mass at the beginning of the AGB.

In Fig. 8 we show the AGB evolution of stars of different mass and metallicity $Z=0.001$ , in the (surface) $\rm C/O$ vs. luminosity plane. This is similar to the plane used by Kamath et al. (Reference Kamath2023) to interpret the sample of Galactic AGBs presented in Kamath et al. (Reference Kamath2022). The single evolutionary sequences run towards the right upper part of the plane, as both luminosity and the surface $\rm C/O$ increase as a consequence of the growth in the core mass and of the effects of TDU. The role of the initial mass is seen in the largest $\rm C/O$ reached, which is seen to be higher the larger the initial mass of the star, as higher mass stars experience more TDU events than their lower mass counterparts, thus reach higher carbon mass fractions in the surface regions (Dell’Agli et al. Reference Dell’Agli2015). The $\rm 2.5\;M_{\odot}$ model star partly escapes from this trend, as the surface carbon enrichment is less efficient in stars with mass close to the threshold to experience hot bottom burning (Dell’Agli et al. Reference Dell’Agli2015). We also note that the luminosity at which a given value of $\rm C/O$ is reached is sensitive to the initial mass of the star. This is particularly evident for $\textrm{M} > 1.5\;\textrm{M}_{\odot}$ (see Fig. 8), above the threshold mass to start helium burning under quiescent conditions; indeed all the stars undergoing the helium flash develop cores of similar mass. Thus they start the AGB phase with similar luminosities (Ventura et al. Reference Ventura2021).

Figure 8. AGB evolution of stars of different mass and metallicity $\rm Z=0.001$ , in the $\rm C/O$ vs. luminosity plane. The target stars J005107 and MACHO 47.2496.8 are marked. See text for more details.

The dashed horizontal line in Fig. 8 refers to J005107. It is located in correspondence with the lower limit for the surface $\textrm{C/O}\sim\!0.58$ , while the width indicates the luminosity $\rm L_{PLC}$ along with the upper and lower limits $\Delta$ $\rm L_{PLC}$ (see Table 5). Unfortunately, the latter quantity is very large, of the order of $\rm 5\,000\;L_{\odot}$ , thus preventing a tight derivation of the mass of the progenitor. The comparison with the evolutionary tracks shows compatibility with progenitors of 1–2 $\textrm{M}_{\odot}$ , corresponding to the formation epoch from 1 to 3 Gyr ago. This explanation holds provided that the luminosity is above $\rm 4\,000\;L_{\odot}$ . Taking into account the recommended value of the base luminosity $\rm 2\,868\;L_{\odot}$ (see Table 5) poses severe problems in the interpretation of this source, because, as shown in Fig. 8, no occurrence of TDU events is expected according to the results based on standard stellar evolution modelling in the low-luminosity domain. A possible explanation, similar to the one proposed by Kamath et al. (Reference Kamath2023) to interpret a few low-luminosity sources in the sample by Kamath et al. (Reference Kamath2022), is that J005107 descends from a low-mass (0.8–1 $\textrm{M}_{\odot}$ ) progenitor, which is currently contracting to the blue after losing the external envelope, before the start of the thermal pulses phase. The carbon and s-process enrichment would be favoured by the occurrence of deep mixing during the helium flash, similarly to the mechanism invoked by Schwab (Reference Schwab2020) to explain the presence of lithium-rich clump stars. A further possibility is that J005107 suffered a late thermal pulse after the beginning of the post-AGB contraction (Iben Reference Iben1984) so that it is nowadays re-expanding to the red, at a luminosity significantly lower than that characterising the contraction phase. Examples of such an evolution are shown in Bloecker (Reference Bloecker1995) (see Fig. 14) and Tosi et al. (Reference Tosi2022) (see Fig. 3).

The grey-shaded region in Fig. 8 refers to MACHO 47.2496.8, based on the lower limit of $\sim$ 2 of the surface $\rm C/O$ (Reyniers et al. Reference Reyniers2007) and the luminosity $\rm L_{PLC}$ range reported in Table 5. We find consistency with the predictions from AGB modelling only if the luminosity is close to the upper limit given in Table 5, as no carbon enrichment is expected at lower luminosities. According to this interpretation MACHO 47.2496.8 descends from a progenitor of mass in the 0.8–1 $\textrm{M}_{\odot}$ range, which left the AGB after one or two thermal pulses after the C-star stage was reached. We once again note that the values indicated above refer to the mass at the beginning of the AGB. If we consider a typical mass loss during the ascending of the red giant branch of $\rm \sim 0.2\;M_{\odot}$ , we deduce that the progenitor mass was in the 1–1.2 $\textrm{M}_{\odot}$ range, which corresponds to an age range for MACHO 47.2496.8 of 3–6 Gyr.

To study HD 158616 we use the $Z=0.004$ tracks published in Kamath et al. (Reference Kamath2023). The luminosity range reported in Table 5 rule out very low-mass progenitors, thus shifting the attention to $\textrm{M} > 1.5\;\textrm{M}_{\odot}$ stars. In Fig. 9, we show the time variation of the luminosity and the surface $\rm C/O$ of a $\rm 2.5\;M_{\odot}$ model star of $Z=0.004$ . The grey-shaded region indicates the evolutionary phase during which both the luminosity and the $\rm C/O=0.94\pm0.22$ (De Smedt et al. Reference De Smedt2016) are consistent with those derived from the observations. Based on these results, we propose that HD 158616 descends from a $\rm 2.5\;M_{\odot}$ progenitor, formed around half Gyr ago, which left the AGB after experiencing a few thermal pulses, two out of which after the first TDU event. The estimated mass interval for the progenitor is pretty narrow in this case since the initial mass vs luminosity trend is very tight in the $\textrm{M} > 2\;M_{\odot}$ domain (see Fig. 8).

Figure 9. Time variation of the luminosity and the surface $\rm C/O$ of a $\rm 2.5\;M_{\odot}$ model star of $Z=0.004$ . The grey-shaded region indicates the evolutionary phase of HD 158616 during which both the luminosity and the C/O are consistent with those derived from the observations. See text for more details.