4.1. MT radius and potential effects

The nearest-neighbor interatomic distance in CaS is 2.84 Å and the lattice structure is not closely packed. It has already been pointed out that a MT potential is not optimized for an open structure (Rehr & Albers, 2000). As we will show next, by performing calculations with varying MT potentials and MT radii, this also holds true for the cubic CaS structure. Regarding the MT potential, the conventional way to construct the potential is by imposing a constant interstitial potential with either overlapping or non-overlapping MTs (Rehr & Albers, 2000). We analysed potential effects by changing the overlap value and determining the MT radius for the different procedures. In Table 1 we list the corresponding MT radii for each atom in the XANES calculations at the Ca and S K-edges. In the Norman procedure (Norman, 1974) the MT radius is determined so as to guarantee that the integral charge within the MT sphere is equal to the total atomic charge. An extra 10% overlap is introduced (Natoli et al., 2003). In the Raydem approach the MT radius is arbitrarily defined as half of the interatomic distance. A third procedure optimizes the MT radii in order to minimize discontinuities at the boundaries. The overlap factor we considered (10%, 12% and 15%) will compensate for discontinuities between adjacent MT spheres (Joly, 2001).

Spectral difference among models with different MT radius determined from the aforementioned procedures and a model with a 10% overlap factor are compared for both Ca and S K-edges. In Figs. 2 and 3, spectral differences as well as spectra calculated with different MT radii are shown. Clearly the near-edge region shows differences for different MT radii; and the intensity of the pre-edge peak is much higher in the case of the Raydem and Norman procedures. In Table 1 the MT radii of atoms corresponding to different procedures are listed. Apparently, the MT radius of calcium as determined by the Norman procedure is larger than others while the MT radius of sulfur is slightly smaller. Remarkably, spectral variations with respect to different MT radii are distinctive of both Ca and S K-edges. At the Ca K-edge the 12% and 15% overlaps show similar spectral trends while the Raydem and Norman results belong to a different group with similar variation. As shown in Table 1, the MT radius of the S atom in the first overlap set (12% and 15%) is larger than that of the second set (Raydem and Norman). Since the first-shell atoms around calcium are S atoms, their MT radii directly determine how much charge is contained in the small atomic cluster. The smaller sulfur MT radius and the larger one of Ca lead to an increased dispersion of sulfur p orbitals towards Ca d orbitals, in agreement with the observed intensity enhancement of the pre-edge feature at the Ca K-edge. Indeed, pre-edge features at the Ca K-edge originate from empty states of d character hybridized with p orbitals, as confirmed by density of states calculations presented in the following sections. The interpretation of spectral variations at the S K-edge is, on the contrary, not straightforward. S K-edge XANES changes dramatically versus the MT radius as determined by different procedures: (i) most of the spectral variations concentrate at the near-edge region from 2470 to 2480 eV, except for the case of the 12% overlap whose spectral variation extends over a larger energy range up to 30–40 eV above the edge; (ii) the Raydem case also shows significant spectral differences around 2476 eV, corresponding to the second peak of the structured edge; (iii) the spectral difference for 15% overlap is less relevant than the Norman one and of the 12% overlap, pointing out that the choice of the MT radius is much more critical at the S K-edge.

Figure 2 (Top) Comparison of Ca K-edge XANES spectra calculated with different MT radii (see text for more details on the procedure to determine the different MT radius). (Bottom) Spectral difference between each spectrum and a reference spectrum calculated with the MT radius with a 10% overlap. The red dotted line refers to the Norman procedure; the blue dotted line is the Raydem procedure; the blue dashed line correspond to a 12% overlap, the black solid line to a 15% overlap.

Figure 3 (Top) Comparison of S K-edge XANES spectra calculated with different MT radii (see text for more details on the procedure to determine the different MT radius). (Bottom) Spectral difference between each spectrum and a reference spectrum calculated with the MT radius with a 10% overlap. The red dotted line refers to the Norman procedure; the blue dotted line is the Raydem procedure; the blue dashed line correspond to a 12% overlap, the black solid line to a 15% overlap.

To achieve semi-qualitative information, we compared the MT radius (Table 1) from different procedures simulating S K-edge XANES. For the excited sulfur, the Norman procedure generates the smallest MT radius (1.40908 Å) while the Raydem procedure produces the largest one (1.44891 Å). For S atoms in the ground state, the MT radius for 12% overlap is 0.02 Å shorter than that for 10% overlap. It implies that charged states penetrate into the Ca MT regions. Consequently, the MT radius of Ca is larger with 12% overlap than that with 10% overlap (Table 1). Moreover, the 12% overlap also induces a shift of the Fermi energy level that determines a threshold of empty and occupied states; therefore, there is a significant spectral difference between the 12% overlap and 10% overlap. It is already known that the Fermi energy determined from the MT potential approximation has an uncertainty of about 1 eV (Moreno et al., 2007). In this case we point out that the Fermi energy is significantly affected by the selected MT radius for light elements such as sulfur. Although the MT approximation is trustworthy as tested in many different systems, the CaS system poses severe constraints to potential boundary conditions and the determination of the Fermi level is not straightforward. We ought to consider a non-MT potential to better understand the origin of the observed spectral variations that is probably induced by potential boundary effects.

4.2. Calcium K-edge: MT versus non-MT potential

In Fig. 4 (left), experimental and theoretical Ca K-edge XANES spectra of CaS are compared. Four types of theoretical spectra have been calculated to compare size effects induced by different cluster sizes and potential effects owing to MT versus non-MT approximations. The collinear alignment of atoms in the rock-salt cubic lattice generates long-range-order effects in CaS in both the Ca and S K-edge spectra. Actually, a long-range atomic arrangement (cluster of radius ∼12 Å) has to be considered as in a previous report (Kravtsova et al., 2004). To study the potential effects we performed non-MT potential calculations using the same cluster size. It shall be underlined here that the non-MT method, i.e. the finite-difference method, is extremely time-consuming and computationally challenging. In this case, only two cluster sizes were attempted for the FDM method because of practical limitations.

Figure 4 (Left) Comparison of Ca K-edge XANES spectra calculated for different cluster sizes and both MT and non-MT methods. (Right) The same as in the left panel but for the S K-edge.

Size effects at the Ca K-edge are evident for both MT and non-MT approaches. Specifically, the features d and e in Fig. 4 are more evident as the cluster radius increases from 8 Å to 12 Å. Therefore, the high-energy feature e originates from multiple-scattering contributions occurring in an outer sphere extending over the smaller radius. As mentioned above, pre-edge features at the Ca K-edge are closely related to the hybridization among Ca d states and S p states. Moreover, the Fermi energy level is also slightly affected by the size of the MT radii of each atom. Apparently the non-MT approach reproduces very well the Fermi energy and also the position of both the pre-edge feature a and the white-line b. Size effects also determine unique behaviors in the XANES spectra of CaS: (i) the pre-edge peak (feature a), regardless of its position, appears in large clusters while it disappears in the smaller one, no matter whether MT or non-MT potentials are employed; (ii) the intensity of the white line (feature c) reduces in larger clusters, a behavior present in both MT and non-MT simulations. The feature a probes the hybridization among electron orbitals as well as long-rang-order scattering effects, while the feature c mainly mirrors the interference between different scattering waves from different atomic shells.

Neglecting the anomalous feature b′, in between the b and the c features, the non-MT approach reproduces experimental spectra quite well both in terms of peak positions and intensity. As for the feature b′, it probably probes an additional transition channel opened to electron transition. It may be a multiple electron excitation or an extra charge transfer from sulfur to calcium owing to radiation damage. In silicate glasses it has been observed that a fraction of S²⁻ changes to S⁴⁺ owing to radiation damage (Wilke et al., 2008). Independently, data confirm that the MT approach is inadequate to describe the absorption spectrum at the Ca K-edge in CaS. Calculations could be improved by introducing a non-MT treatment of the potential, and using a large cluster to better reduce size effects.

4.3. Sulfur K-edge: MT versus non-MT potential

In this section we will describe potential and size effects at the S K-edge. The spectra we measured at the K-edge shown in Fig. 4 (right) are actually different from those available in the literature. The pre-edge peak a is not present in Kravtsova's spectrum (Kravtsova et al., 2004) while it is probably present in a more recent contribution (Alonso Mori et al., 2009). We point out here that the origin of the differences is the experimental resolution, which is significantly improved in the recent years.

Unlike the size effects observed at the Ca K-edge, the S K-edge spectra shows clear features in the larger clusters: (i) the long-range multiple scattering peaks d, e and f increase as the cluster size increases and become more pronounced in the non-MT approach; (ii) the white-line peaks, namely the features b and c, are enhanced in the large cluster within the non-MT approach; (iii) opposite to the Ca K-edge, the pre-edge peak (feature a) appears also in a relatively small cluster (e.g. 8 Å). However, the peak position agrees well with experimental spectra only when a large cluster and a non-MT potential is employed.

We have to mention here also that S atoms may exhibit several valences and easily react with X-ray radiation (Wilke et al., 2008; Hackett et al., 2012). As a consequence, the anomalous feature f cannot be explained without taking into account the complex valence state possibly owing to a charge transfer induced by radiation damage. This mechanism hampers the experimental determination of the sulfur valence and also poses a great challenge to the theoretical description. This work is mainly a comparison between MT and non-MT potentials and a further investigation of the sulfur valence states is left to a further work.

In this section we discussed potential effects and size effects in CaS. We have yet another tool to probe the system and better understand the CaS electronic structure. This tool is the orbital-projected density of states that reflects the population of atomic states available from different orbitals and atoms. It is a useful and important tool to recognize peaks and reconstruct details of the system electronic structure.

4.4. Projected density of states: the calcium K-edge

As discussed above, the pre-edge at the Ca K-edge in the CaS is complex and interesting owing to the possible interplay between electron hybridization and long-distance atomic scattering contributions. In Fig. 5 (left) we show the projected density of states and compare it with the theoretical spectrum at the Ca K-edge. From the comparison we may claim that the pre-edge feature a mainly originates from Ca d states hybridized with S p states, similarly to transition metal oxides where the hybridization of transition metal d states and oxygen p states drives the pre-edge behavior. Moreover, the hybridization also occurs between Ca p and d. The origin of features b, c and d can be assigned to the strong hybridization between Ca p, d states and S p states. Recently, Chen et al. (2007) calculated the band structure and the projected density of states using density functional theory. In their calculation the band structure shows a wide direct bandgap about 4.47 eV wide at the Γ point and the density of states indicated that Ca d states dominate at the Fermi energy. Our calculation shows a similar trend: (i) calcium d states are present at the Fermi level giving rise to the pre-edge feature; (ii) the sulfur p states dominate at energies about 5 eV below the Fermi energy. The density of states extracted from XANES calculations is then in agreement with first-principles calculations.

Figure 5 (Left) Comparison of the l-projected density of states and the Ca K-edge XANES spectrum (top). (Right) the same as in the left panel but for the S K-edge.

4.5. Projected density of states: the sulfur K-edge

In Fig. 5 (right) the projected density of states at the S K-edge is presented and compared with the theoretical XANES spectrum. Also in this case, it is evident that the edge structure (features b and c) originates from S empty p states. Furthermore, the features d, e and f also resemble p states of S atoms, pointing out the presence of strong electronic effects at the S K-edge. The pre-edge feature a is due to a strong hybridization between S p states and Ca d states, evident also at the Ca K-edge spectrum. The s states of sulfur partially contribute to the pre-edge feature of the S K-edge XANES spectrum. For the p states of sulfur, the largest density of states is around −10 eV on our energy scale, i.e. far away from the Fermi energy, as confirmed also by first-principles calculations (Chen et al., 2007). These states are fully occupied and not available for electron transitions; as a consequence, no other features below the feature a can be observed.

As listed in Table 2, electronic parameters (the absolute charge transfer and charge counts for different atomic orbitals) have been compared at both Ca and S K-edges. The charge transfer is about 0.21–0.25 electrons while Ca d states have a large charge count (∼0.86 electrons), close to the value (0.855) of the CaO system (Modrow et al., 2003), indicating similarity of the charge distribution in the two systems.