3.1. CuO

The local structure of Cu in CuO consists of four O atoms in a quasi-planar structure, with interatomic Cu—O distances R₁ = 1.95 Å and R₂ = 1.96 Å (Sipr, 1992). These four atoms form a distorted pyramid with two apical O atoms at R₃ = 2.78 Å from Cu. Ab initio single-channel multiple-scattering computations of the Cu K-edge of CuO were performed for different cluster sizes around the photoabsorbing Cu atom and by using different treatments of the exchange-correlation potential (ECP) (Chaboy et al., 2005; Natoli et al., 2003).

Starting from the simplest square-planar Cu–O arrangement, further coordination shells are included to build up a cluster of 51 atoms, i.e. covering contributions from atoms located within the first 5 Å around Cu. The addition of further shells does not produce major changes.

The cluster potential was approximated by a set of spherically averaged muffin-tin potentials built by following the standard Mattheis prescription (Mattheis, 1964). The radii of the muffin-tin potentials centered on the atomic sites were determined following Norman's criterion and by imposing a 10% overlapping factor (Norman, 1974). The Coulomb part of each atomic potential was generated using charge densities for neutral atoms obtained from the tabulated atomic wavefunctions of Clementi & Roetti (1974). The final-state potential was built according to the screened Z + 1 approximation (Lee & Beni, 1977) and by adding an appropriate exchange and correlation potential.

Fig. 1 reports a comparison of the experimental CuO spectrum with that of the theoretical computation obtained by using the screened Z + 1 approximation and complex Hedin–Lundqvist ECP for the construction of the final-state potential. The Cu K-edge experimental spectrum of CuO shows different absorption features: (i) a step-like peak (A) at the raising edge; (ii) a main absorption line composed of up to three contributions (B ≃ 8.6 eV; C ≃ 13.4 eV; D ≃ 17 eV); (iii) a split (E ≃ 27 eV; F ≃ 33 eV) feature at the high-energy side of the main line; and finally (iv) a deep minimum (G ≃ 43 eV) and a broad positive resonance (H ≃ 65 eV) at higher energies. The single-channel theoretical calculations do not reproduce the experimental spectral shape of CuO, independently of the ECP used for the calculation. The calculation returns the step-like feature A and a single main line whose energy position and width resemble those of the spectral feature B. By contrast both C and D structures, at the main peak, and feature F, in the high-energy region, are not accounted for by the calculation. Moreover, the calculated G and H spectral features fall short of the experimental ones. The comparison is not improved by changing the constant parameter Γ_C used for the convolution of the theoretical spectrum to account for the core-hole lifetime and the experimental resolution.

Figure 1 (a) Comparison of the experimental XANES spectrum at the Cu K-edge in CuO (circles) and the theoretical spectra computed by using a complex Hedin–Lundqvist ECP and different convolution parameter: ΓC = 1.5 eV (green, open circles), 1.84 eV (blue, dashed line) and without convolution (red, dotted line). (b) Comparison of the computed XANES spectra calculated by using a complex Hedin–Lundqvist ECP for different cluster sizes: 51 atoms (red, solid line), 93 atoms (blue, open circles) and 135 atoms (green, dashed line). Spectra are shown without convolution for the sake of clarity. In the inset the computation performed for the 51 atoms cluster by using different overlapping factors (see text for details) is shown: 1% (green, dotted line), 10% (red, solid line) and 20% (blue, dashed line). Colour versions of the figures are available in the online version of the paper.

The disagreement between the theoretical calculations and the experimental spectrum is not due either to structural effects or to a bad choice of the interstitial potential. Indeed, as shown in Fig. 1(b), no significant modification of the narrow single-peak spectral profile is obtained by (i) increasing the size of the cluster (from 51 to 135 atoms) to include contributions from atoms located within the first 7.1 Å around Cu; and (ii) by imposing different (1%, 10% and 20%) overlapping factors of the muffin-tin spheres to modify ad hoc their scattering power, and in a second instance to decrease the volume of the interstitial region (Natoli et al., 2003). At this point it is instructive to compare the width of the main Cu K-edge absorption line for the systems under study with that of the tetramminecopper(II) aqueous solution (Chaboy et al., 2005). As shown in Fig. 2, this width is similar in the considered cases, and twice that of the K-edge XANES spectra of different divalent transition metals (Fe, Co, Ni) in aqueous solution (Benfatto et al., 1997). This result suggests the need to include two different excitation channels, as in the case of tetramminecopper(II) (Chaboy et al., 2005), to account for the Cu K-edge XANES spectra of the selected Cu(II) compounds.

Figure 2 Comparison of the experimental XANES spectrum at the Cu K-edge in CuO (circles), aqueous solution of tetramminecopper(II) (solid line) and KCuF3 (triangles).

As with the previous results (Chaboy et al., 2005), we have used SCF potentials for the different electronic configurations used in the calculations: 3d⁹ and 3d¹⁰, where denotes a 2p hole in the ligand oxygen atom. The excited final-state potential was calculated by promoting one of the 1s electrons of Cu to the first free energy level of the right symmetry and fixing to one the 1s occupancy during the SCF procedure. The energy of the process is then given by the difference between the total energy of the excited final state and the initial ground state. We have (SCF) stabilized a small [CuO₄]⁶⁻ cluster with an outer sphere with a 6+ charge to neutralize the whole cluster. This cluster has been embedded in the larger ones in order to perform the multiple-scattering calculations. Then, the potential of both the absorbing Cu and the four next-neighbor O atoms is SCF, while the potential around the other atoms was built according to Mattheis' prescription. This procedure has been previously shown to be successful on extended systems (Wu et al., 1992; Pedio et al., 1994). Both 3d⁹ and 3d¹⁰ configurations give rise to two absorption edges shifted in energy by Δ = 6.1 eV, close to the values found for other Cu(II) systems (Chaboy et al., 2005, 2006). As shown in Fig. 3, a remarkable agreement is found between the experimental data and the Cu K-edge cross section computed as the sum of both 3d¹⁰ and 3d⁹ contributions with fixed relative weights of 68% and 32%, respectively (Chaboy et al., 2005). These factors, close to the values reported by Wu et al. (1996), were fixed throughout this study.

Figure 3 Comparison of the experimental XANES spectrum at the Cu K-edge in CuO and the theoretical spectrum obtained as the weighted sum of the 3d9 (32%) and 3d10 (68%) contributions (solid line); equal weighting (50%) of both channels (dotted line) and the calculation performed on the single-channel approximation (dashed line). All the calculations have been performed by using the Hedin–Lundqvist ECP and a convolution parameter ΓC = 1.84 eV (see text for details).

3.2. KCuF₃

The results obtained for CuO suggest that the two absorption channels (3d¹⁰ and 3d⁹) scheme is a general characteristic of Cu(II) K-edge XANES spectra, the relative weight of both channels being close to the 70:30 ratio. Further confirmation of this result can be obtained by computing the Cu K-edge X-ray absorption of Cu(II) in KCuF₃.

Research into the KCuF₃ compound has recently attracted much attention owing to its links with the development of the resonant elastic X-ray scattering (RXS) technique that has been postulated as an incomparable tool for probing orbital ordering (Paolasini et al., 2002). The theoretical interpretation of the RXS spectra is being developed and several questions still remain open regarding the role of the spin polarization versus the orbital polarization in determining the RXS spectra (Takahashi et al., 2003; Bingelli & Altarelli, 2004).

The RXS at the Cu K-edge in KCuF₃ derives from a virtual dipolar excitation to the empty 4p states. The resulting RXS amplitude is thus not directly related to the 3d states that exhibit orbital ordering, but to the anisotropy induced in the surrounding 4p states. This indirect dependence makes the interpretation of the RXS results difficult (Takahashi et al., 2003; Bingelli & Altarelli, 2004). Indeed, recent calculations have shown that the Cu K-edge RXS in KCuF₃ is more sensitive to the Jahn–Teller distortion that accompanies the orbital ordering rather than to the orbital ordering itself (Bingelli & Altarelli, 2004). One of the key points for the computation of the RXS at the Cu K-edge is the calculation of the density of states (DOS). The performance of the computed DOS is usually tested by calculating the absorption coefficient, as it is almost proportional to the 4p DOS. This is shown in Fig. 4, where the experimental Cu K-edge spectrum of KCuF₃ is compared with the absorption coefficient obtained from the calculated 4p DOS of Cu by Takahashi et al. (2003) and Bingelli & Altarelli (2004). This procedure is consistent provided that the Cu K-edge XANES corresponds to a single-channel excitation. However, if the XANES spectrum was due to the superposition of different absorption channels, as found before for Cu–N (Chaboy et al., 2005) and in this study for Cu–O systems, it would lead to unreliable results.

Figure 4 Comparison of the experimental Cu K-edge spectrum of KCuF3 (circles), adapted from Paolasini et al. (2002), and the absorption coefficient obtained from the calculated 4p density of states of Cu by Takahashi et al. (2003) (solid line) and by Bingelli & Altarelli (2004) (dotted line).

With the aim of determining whether the Cu K-edge XANES spectrum of KCuF₃ is due to a single or double excitation process we have extended our investigation to the KCuF₃ case. The crystal structure of KCuF₃ is made up of an array of CuF₆ octahedra, the distance between Cu²⁺ ions being almost the same along the three principal axes. Each CuF₆ octahedron is slightly elongated along the a and b axes such that the distortion is orthogonal to that of the neighboring octahedra in the plane. The structure contains two distinct fluorine ions: (i) F₁ (bond centered) ions located between the ab planes and occupying symmetric positions, and (ii) F₂ ions in the ab planes. The F₂ ions are slightly displaced, in the opposite (type a) or same (type d) directions, from the midpoint of adjacent Cu sites (Hidaka et al., 1998). The distorted CuF₆ octahedron contains two F₁ ions at 1.96 Å from Cu and two pairs of F₂ ions with interatomic Cu—F₂ distances R = 1.88 Å and 2.26 Å, respectively. The Cu K-edge XANES of KCuF₃ is shown in Fig. 5. It is characterized by (i) a shoulder (A) at the threshold; (ii) an asymmetric absorption line showing a main peak (B₁) at ∼7 eV above the edge and a second shoulder (B₂) at the high-energy side (∼12.5 eV); (iii) a positive peak (C) at ∼21 eV above the edge and, finally, (iv) three well defined spectral features, D (∼37 eV), E (∼52 eV) and F (∼72 eV), at high energy. The width of the main absorption line is comparable with that of the previously studied Cu(II) compounds (see Fig. 2), suggesting also the presence of different excitation channels. We have initially calculated the Cu K-edge absorption within a single-channel frame by using both non-SCF X_α and Hedin–Lundqvist potentials for different cluster sizes. The smallest cluster was built by including the first F and K coordination shells around absorbing Cu (R_max = 3.5 Å) (Hidaka et al., 1998). The calculation performed for this cluster, shown in Fig. 5(a), reproduces the peak at the edge and the high-energy features (D to F). However, only a single main peak without trace of both shoulder B₂ and peak C is obtained. Addition of further shells, including atoms located within a maximum interatomic distance of 4.7 Å around copper, reproduces the B₂ peak. Similar results are found by extending the maximum interatomic distance to 5.9 Å and 7.1 Å around copper (see Fig. 5a). However, the calculations fail in reproducing the intensity ratio of both B₁ and B₂ features and in reproducing peak C. The latter result strongly suggests that the omission of peak C in the calculations is not due to a structural effect. Consequently, we have studied whether the presence of a second absorption channel can account for the missed structure. Then, we stabilized a SCF potential for a regular [CuF₆]⁴⁻ cluster with an averaged Cu—F distance of R = 1.96 Å. The whole cluster was neutralized by using an outer sphere with a 4+ charge embedded in the larger (i.e. distorted) ones to perform the multiple-scattering calculations. In this case the SCF potential was stabilized for both 3d⁹ and 3d¹⁰ electronic configurations, where denotes a hole in F from the ligand. This procedure gives rise to two absorption edges shifted in energy by Δ = 10.3 eV. According to this calculation, reported in Fig. 5(b), the main peak B₁ is due to the 3d¹⁰ channel, while both the B₂ shoulder and feature C result from the competition of both 3d¹⁰ and 3d⁹ channels. These results suggest the existence of two competitive ionization channels for the K-edge of divalent copper also in the KCuF₃ system. Finally, a special comment is deserved for the relative weighting factor for the two absorption channels. Using both 68:32 and 84:16 weighting ratios led to the appearance of an additional peak close to the B₂ shoulder, resembling the C peak previously missing in the calculations. However, the comparison between the experimental and calculated intensity ratio of both B₁ and B₂ features is not so straightforward. Moreover, the reproduction of the high-energy features (D to F) worsens by using the two-channels computation as compared with the single-channel ones, especially regarding feature E. In the absence of an appropriate multichannel multiple-scattering code (Natoli et al., 1990; Krüger & Natoli, 2004), these results can be related to both interchannel interference (Wu et al., 1996) and to the presence of additional channels, as well as to the need to perform the SCF calculation for a larger distorted octahedron including further cations beyond the first Cu–F coordination shell. Indeed, while in both Cu–N and Cu–O cases the nearest neighborhood of Cu is formed for four ligands in a regular square-planar geometry, it is strongly distorted in the case of KCuF₃ because of the presence of both bond-centered and displaced F₂ and F₁ ions.

Figure 5 (a) Comparison of the experimental Cu K-edge spectrum of KCuF3 (circles) and the spectra calculated by using a complex Hedin–Lundqvist ECP and different clusters with a maximum distance around Cu of Rmax = 3.5 Å (dotted line), 4.7 Å (dashed line), 5.9 Å (solid line) and 7.1 Å (dot-dashed line). (b) Comparison of the experimental spectrum and the theoretical calculations obtained for both 3d9 (dashed line) and 3d10 (solid line) after applying a 32% and 68% weighting factor. The weighted sum obtained according to the 68:32 (dot-dashed line) and 84:16 (dotted line) ratios is shown (see text for details).