2 OBSERVATIONS

2.1 Photometry

Photometry of GSC 4019 3345 (α = 00^h22^m45^s.37, δ = 62°20′05″.5) has been carried out in 2004, 2005, 2006, 2007, and 2009 observing seasons. Observations between 2004 and 2007 are mainly based on the time of minimum observations using several telescopes (0.3- and 0.4-m Cassegrain–Schmidt) and CCD cameras (SBIG ST10XME and SBIG ST1001E) of the Çanakkale Onsekiz Mart University Observatory (COMUO) in order to determine the precise orbital period of the binary system. Only Johnson V-band data were studied due to its higher quality with respect to other filters used during the observations between 2004 and 2007. After determining the accurate orbital period of the system, a 1.22-m telescope of COMUO equipped with ST1001E CCD has been used in the 2009 observing season to obtain the whole light curve in UBVR and I-band filters. A total of 15 nights were allocated for the CCD photometry of the system. For differential photometry, GSC 4019 2747 (α =00^h22^m42^s.97, δ = 62°18′35″.3, V~11.4 mag) and GSC 4019 2784 (α = 00^h22^m17^s.97, δ = 62°21′33″.7, V~11.7 mag) were chosen for comparison and as a check star, respectively. The average standard deviations of a typical observation in UBVR and I bands are σ = 0.058, 0.009, 0.008, 0.008 and 0.009, respectively. The log of photometric observations is given in Table 1.

Table 1. Log of photometric observations of GSC 4019 3345.

The reduction of CCD frames was made by means of the aperture photometry with C-MuniwinFootnote ¹ package, on which one of the authors has development contribution. The reduction of CCD frames is standard: bias and dark subtraction and flat field correction. The size of apertures during the computation of magnitudes of stars in the CCD field selected was about three times the Full Width at Half Maximum (FWHM) of the star profile so that no flux is lost and noise has no considerable effect. The airmass for program stars has not been taken into account due to their proximity with less than 7 arcmin in the sky.

The B and V magnitudes of stars in the same CCD field of GSC 4019 3345 are available in several survey catalogs (i.e. Tycho-2, Høg et al. Reference Høg2000; United States Naval Observatory (USNO), Monet et al. Reference Monet, Canzian, Harris, Reid, Rhodes and Sell1997). Using these catalog magnitudes of stars, we standardized B and V magnitudes of GSC 4019 3345 at light maximum as B = 12.55(0.10) and V = 12.15(0.02).

2.2 Orbital period

A total of 14 times of minima are extracted from the photometric observations of the system between 2004 and 2009. The method described by Kwee & van Woerden (Reference Kwee and van Woerden1956) was used for the determination of times of minima. The times of minima extracted are listed in Table 2 together with their uncertainties and minimum types. The regression analysis of the O − C data (for the observing span from 2004 to 2009) improved the orbital period P _orb = 4.077278 days given by Bakış et al. (Reference Bakış, Bakış, Demircan, Erdem and Cicek2007) and provided the new ephemeris:

(1) \begin{equation} {\rm Pri\; HJD} = 245\,3648.2847(4) + 4.077304(3) \times E. \end{equation}

Table 2. Times of minimum of GSC 4019 3345.

Based on the new ephemeris (Equation (1)), the calculated O − C values are also included in Table 2. The O − C diagram is shown in Figure 1, where the consistency of the orbital period is clear with an accuracy better than 3×10⁻⁶ days.

Figure 1. O − C diagram of GSC 4019 3345. Filled and empty circles are from primary and secondary times of minima, respectively.

2.3 Spectroscopy

The spectra of GSC 4019 3345 were taken with the Faint Object Spectrograph and Camera (TFOSC) of the TUBITAK National Observatory (TUG), Turkey. It is attached on the Cassegrain focus of the 1.5-m telescope called RTT150 located at Bakırlıtepe (~36°49^m N, 30°20^m E; altitude = 2 500 m), Antalya. TFOSC has two main capabilities: (a) direct imaging and (b) low-/medium-resolution spectroscopy, both operated by a Linux operating system. For imaging and spectroscopy the same CCD, which has a field of view of 13.3×13.3 arcmin with a chip dimension of 2 048×2 048 pixels with a pixel size 15×15 μm, is used. The spectrograph was designed to provide a continuous wavelength coverage between 330 and 1 200 nm and has a resolution range of R(λ/δλ)~205–5 099 with a different wavelength interval. The grisms are used to change the resolutions. The list of available grisms and the resulting resolutions is given in the instrument's manual.Footnote ²

In this project, we have chosen the highest available resolution mode (R~5 099) of TFOSC, which provides a continuous wavelength coverage of 330–900 nm in 11 échelle orders. All spectra presented in this paper are obtained in three observing sessions (2010 September, 2011 August, and 2011 October). The total number of spectra obtained for GSC 4019 3345 is 28. We have observed radial velocity (RV) standard star Vega (α Lyrae) in each observing night in order to standardize our RV measurements.

Comparison spectra of the iron–argon arc lamp for the wavelength calibration were recorded before and after each exposure. For the exact time of the stellar observation, the dispersion solution was interpolated between the two spectra of the arc lamp. A set of white lamp images was taken every night for flat-fielding.

All spectra were reduced with the Image Reduction and Analysis Software (iraf).Footnote ³ The reduction is standard for échelle spectra: bias subtraction, scattered light correction, aperture extraction, flat-field correction, and dispersion solution for wavelength calibration.

An observed sample spectrum at phase φ ~0.5 of GSC 4019 3345 and of Vega (α Lyr) with the same instrument is presented in Figure 2. All spectra observed around the H_α region are also shown together with orbital phases in Figure 3 in order to show the phase distribution of the observed spectrum and Doppler shifts of the component stars during the orbital motion. The journal of observations including observing times, mean signal-to-noise ratios (S/N) at 650 nm and exposure times is given in Table 3.

Figure 2. Observed spectrum of GSC 4019 3345 (at φ = 0.5) (upper) and Vega (lower).

Figure 3. The Hα (6 563 Å) lines of the components of GSC 4019 3345. Orbital phases are shown on the right.

Table 3. Journal of spectroscopic observations for GSC 4019 3345. S/N refers to the continuum near 6 500 Å.

3 SPECTROSCOPIC ORBIT SOLUTION

Relatively sharp spectral lines (see Figure 2) of GSC 4019 3345 may allow a direct measurement of RVs by the Gaussian fitting to the line profiles. However, for most of the spectra of low S/N (see Table 3), weak lines become less reliable for RV measurements. Therefore, we avoided using cross-correlation or line-fitting techniques, but preferred to use a spectral disentangling method, the code korel (Hadrava, Reference Hadrava1995), which is able to use all spectral information in spectral regions selected. Using the light contributions of the components, korel solves the pure Keplerian orbit, excluding eclipse effects on RVs, the so-called Rossiter–McLaughlin effect, and measures the RVs simultaneously. Additionally, it gives the disentangled spectrum of the component stars if the light contribution at the observed phases is provided correctly. In this study, the light contributions of the components are taken from the light-curve solution (Section 4), which are almost same for both components at out-of-eclipse phases except during the eclipses where the light contribution of the eclipsed component diminishes.

Since korel accepts input spectrum with 2 ⁿ data points, our spectra had to be re-binned. Therefore, we re-sampled our spectra to have 1 024 data points so that each pixel corresponded to ~26 km s⁻¹. The orbital period is adopted from Equation (1) and kept fixed, while the time of periastron passage T ₀, orbital eccentricity e, longitude of periastron w, and velocity semi-amplitudes K _1,2 have been converged during the orbital solution. The orbital solution yielded a small eccentricity (e = 0.03). The systemic velocity V _γ is measured by cross-correlating the spectrum at the time of conjunctions (φ = 0.497, 0.503), with the RV standard star Vega (α Lyrae) as template. The final RVs are given in Table 3 and adopted orbital parameters with their uncertainties are given in Table 4. The best-fitting reconstructed spectra, together with observed one at two particular orbital phases (φ = 0.60, 0.70), and the Keplerian orbital model are shown in Figure 4.

Figure 4. Top: spectral disentangling results on selected spectra around Hα. Observations and fits are shown in black and red, respectively. Middle: reconstructed spectrum of the components. Bottom: best-fitting orbital solution, where filled and empty squares are of primary and secondary RVs, respectively.

Table 4. Spectroscopic orbital parameters of GSC 4019 3345.

4 SIMULTANEOUS SOLUTION OF LIGHT AND RADIAL VELOCITY CURVES

The whole set of photometric data for LC analysis consists of 442 measurements in the U band, 578 in the B band, 890 in the V band, 572 in the R band, and 574 data points in the I band. The relatively low number of U-band data is due to the tracking errors of the telescope in long exposures during the U-band observations. The relatively high number of V-band data is due to the existence of extra V-band observations covering 2004–2007 observing seasons.

The catalog of the 2MASS survey gives the infrared magnitudes of GSC 4019 3345 as J = 11.139 ± 0.024, H = 11.040 ± 0.026, and K = 11.001 ± 0.020, which yields the system color J − H = 0.099 ± 0.050, implying a spectral type of A4–A5V (Covey et al. Reference Covey2007). Since both components in the light curve have the same color, we can use the system color as the temperature indication for the component stars. Following temperature–spectral-type calibration tables of Straižys & Kuriliene (Reference Straižys and Kuriliene1981), we adopted a temperature of 8 600 K as an input temperature for the primary during the simultaneous analysis of LCs and RV data. The solutions have been carried out using the w-d program (Wilson & Devinney Reference Wilson and Devinney1971; Wilson Reference Wilson1979, Reference Wilson1990). Eclipse effects in the RVs are taken into account during the solution. The logarithmic bolometric and monochromatic limb-darkening coefficients were interpolated from van Hamme's (Reference van Hamme1993) tables. In the gravity-darkening law (T ~g ^(τ/4)), the gravity-darkening exponent τ was taken to be 1.0 for each component, which corresponds to β = τ/4 = 0.25, as suggested by Lucy (Reference Lucy1967) for early-type non-convective stars. A bolometric albedo was also set to 1.0 as suggested by Ruciński (Reference Ruciński1973) for early-type non-convective stars. Both fixed and adjusted parameters during the solutions are presented in Table 5.

Table 5. Results from the simultaneous solution of UBVR and I-band LCs and RVs. Adjusted and fixed parameters are presented in separate panels of the table. Uncertainties of adjusted parameters are given in parentheses.

The w-d program yielded a unique detached system with two equal components within the uncertainty box of output parameters. Table 5 lists the output parameters with their uncertainties. Figure 5 shows the best-fitting LC and RV models together with the observations.

Figure 5. Top: best-fitting LC models in UBVR and I bands. Lower left: primary and secondary minima with theoretical fit. Lower right: RV curves of the components together with the theoretical model; filled and empty squares are for primary and secondary components, respectively.

6 CONCLUDING REMARKS

1. There were only three A-type twins known among the binary systems with reliable spectroscopic data. Early-type (OBA) twins have great importance since their formation scenario is not very well known as of low-mass twins of F, G, and K spectral types. The precise physical parameters derived for GSC 4019 3345 in this study increased the number of early-type known twins to four.

2. Both components of GSC 4019 3345 occupy the same location on the Hertzsprung-Russell (H-R) diagram according to the derived luminosity, effective temperature, and surface gravity values. Hence, evolutionary status (ages) is similar for both components. This means that both components of GSC 4019 3345 passed the mass accretion phase during the formation at the same time within the derived parameters’ uncertainty boxes. On the contrary, it is not possible with present accuracy to prove or disprove that GSC 4019 3345 contradicts with Parenago 1802, the low-mass binary with an age difference between the components (e.g. Stassun et al. Reference Stassun, Mathieu, Cargile, Aarnio, Stempels and Geller2008), since the age difference between the components of Parenago 1802 is on the order of several hundred thousand years that is beyond the accuracy of the present study.

3. The synchronization time scale for the component stars of GSC 4019 3345 is, following Zahn (Reference Zahn1977), on the order of 3 Myr. Nevertheless, the orbital circularization time scale is, again following Zahn (Reference Zahn1977), on the order of 570 Myr. The age of GSC 4019 3345 is clearly higher than the synchronization time scale but lower than the circularization time scale of the system. According to the estimated system age, the system should have been in a non-circular orbit with a pseudosynchronized rotation. Supersynchronism itself is unusual for a binary with circular orbit since tidal synchronization proceeds faster than tidal circularization. However, such unusual supersynchronism is also found in the M35 open cluster (τ = 150 Myr) in a binary (P _orb = 10.3 days) having circular orbit with four times supersynchronous rotation (Meibom et al. Reference Meibom, Mathieu and Stassun2006). Obviously, such systems are challenges for the present tidal evolution theory.

Higher resolution spectroscopy of the system is strongly needed to study the spectral lines in the individual spectrum of the components. This will enable one to know the metal content of the components, which will provide more reliable age estimates for GSC 4019 3345.