2.1. Sample preparation

Polycrystalline KUO₃ powder was prepared by mixing stoichiometric amounts of U₃O₈ and K₂CO₃ powders, and performing heat treatments in a Carbolite TZF1800 tube furnace. Firstly, a portion of depleted UO_2+x powder (nuclear-grade impurity) (Leinders et al., 2015), supplied by FBFC International (Belgium), was oxidized to U₃O₈ by treating at 500°C for 4 h in a dynamic air atmosphere (N₂/21 vol% O₂). Secondly, stoichiometric amounts of U₃O₈ and K₂CO₃ (ACS Reagent, ≥99.0%), obtained from Sigma-Aldrich (Belgium), were intimately mixed using a zirconia mortar and pestle, and the mixture was annealed at 800°C for 10 h. A reducing atmosphere (−400 kJ mol⁻¹ at 800°C) was applied by flushing the furnace with a gas mixture of Ar/0.5 vol% O₂ (519 ml min⁻¹) and Ar/5 vol% H₂ (481 ml min⁻¹). The used gases were of high purity (99.9992%) and flow rates were accurately controlled using Bronkhorst EL-FLOW mass flow controllers.

Phase purity of the sample was confirmed from X-ray powder diffraction (PANalytical X'Pert Pro), see Figure 8 in the supporting information.

Sample preparation for X-ray absorption spectroscopy at the ESRF consisted of mixing the KUO₃ powder (30–50 mg) with boron nitride powder (98%), purchased from Sigma-Aldrich (Belgium). The sample holder used at beamline ID26 required to compact the resulting powder into a thin pellet. The sample holder used at beamline BM20 consisted of a polypropylene disc with a small recess in which the powder was directly inserted. Both sample holders were sealed with Kapton foil.

2.2. High energy resolution fluorescence detected X-ray absorption spectroscopy

Uranium L₁- and L₃-edge XANES measurements were performed at BM20 (The Rossendorf Beamline) (Matz et al., 1999; Scheinost et al., 2021) of the European Synchrotron Radiation Facility (ESRF) operating at an electron beam energy of 6 GeV, in Grenoble, France. The incident energy was scanned using a Si(111) monochromator. HERFD-XANES spectra were collected at room temperature using an X-ray emission spectrometer equipped with five Si(220) crystal analyzers with 0.5 m bending radius, and a silicon drift X-ray detector in a vertical Rowland geometry (Kvashnina & Scheinost, 2016). For uranium L₃-edge HERFD-XANES measurement, the spectrometer was tuned to the maximum of the U Lα₁ (2p_3/2–3d_5/2 transition at 13.614 keV) X-ray emission line using the 〈880〉 reflection at a Bragg angle of 72°. For the uranium L₁-edge HERFD-XANES measurement, the spectrometer was tuned to the maximum of the U Lβ₄ (2s_1/2–3p_1/2 transition at 16.575 keV) X-ray emission line using the 〈10 10 0〉 reflection at a Bragg angle of 77°. The detected intensity was normalized to the incident flux. Beam size was estimated to be 200 µm (vertically) by 450 µm (horizontally). The beamline settings available at the time of the measurements did not allow ultra-high-energy resolution in HERFD mode to be achieved. Nevertheless, the total experimental energy broadening (incident energy convoluted with emitted energy and core-hole lifetime broadening) of 3.9 eV and 12.5 eV were still below the core-hole lifetime broadening of the U L₃-edge (∼8.2 eV) and L₁-edge (∼17.5 eV). The resolution can be further improved for example at the U L₃-edge by using a Si(311) crystal monochromator, a Ge(777) crystal analyzer with 1 m bending radius, and by reducing the beam size below 100 µm. Energy calibration was achieved through the Y K-edge excitation energy (17.038 keV) and through the Ru K-edge excitation energy (22.117 keV) of metallic yttrium and ruthenium foils placed in the beam path for the uranium L₃- and L₁-edge, respectively.

The U M₄-edge HERFD-XANES measurements were performed at the ID26 beamline (Gauthier et al., 1999) of the ESRF. The U M₄-edge (3.725 keV) incident energy was selected using the Si(111) double-crystal monochromator. Rejection of higher harmonics was achieved by three silicon mirrors at 3.5 mrad working under total reflection. Beam size was estimated to be 200 µm (vertically) by 500 µm (horizontally). HERFD-XANES spectra were measured at room temperature using an X-ray emission spectrometer equipped with five 1 m bending radius Si(220) crystal analyzers and a silicon drift X-ray detector in a vertical Rowland geometry. The spectrometer was tuned to the maximum of the U Mβ (3d_3/2–4f_5/2 transition, at 3.3374 keV) X-ray emission line using the 〈220〉 reflection (analyzer crystals at a Bragg angle of 75.4°). The detected intensity was normalized to the incident flux. The total experimental energy broadening (incident energy convoluted with emitted energy and core-hole lifetime broadening) was evaluated at 0.7 eV.

It has to be mentioned that, following the allowed electronic dipolar transition, the main differences between HERFD-XANES experiments at the uranium L₁-edge, L₃-edge and M₄-edge lie in the fact that different density of states are being probed, namely uranium 7p, 6d and 5f states, respectively. Those states are likely to show individual sensitivity towards the uranium oxidation state as a function of their involvement in bonding to ligands, the presence of crystal-field effects and the core-hole broadening affecting the overall resolution of useful features.

2.3. Electronic structure calculations

The XANES theoretical calculations were performed using the Finite Difference Method for Near-Edge Structure (FDMNES) code (Bunău & Joly, 2009). KUO₃ is an alkali-metal uranate crystallizing in a prototypical undistorted perovskite-type structure (), in which U atoms are octahedrally coordinated by oxygen (see Fig. 1) situated at 2.37 Å at room temperature. The K atoms are cuboctahedrally coordinated (12-fold) by oxygen atoms, at a distance equal to 3.04 Å.

Figure 1 Representation of the KUO3 unit cell, which exhibits an ideal, cubic perovskite structure. The oxygen atoms form a framework of corner-linked oxygen octahedra around each U atom. The K atom is positioned in the central cuboctahedral void formed by the vertices of the anion octahedra. Figure created using the VESTA3 software (Momma & Izumi, 2011).

An atomic cluster of 9 Å was used in self-consistent-field calculations using the Dirac–Slater approach. The Poisson equation was solved to obtain the Coulomb potential from the superposed self-consistent atomic densities in the considered cluster. The energy-dependent exchange-correlation potential was evaluated using the local density approximation, and constructed using both the real Hedin–Lundquist and Von Barth formulations. These calculations were based on static atom supercells of hundreds of atoms, and thermally induced disorder was not considered. Because of the presence of heavy nuclei (U), spin–orbit effects were taken into account but no spin-polarization effect has been noticed from the comparison of spin-polarized spectra. Finally, calculations were performed with and without the quadrupolar transition probability in order to assess the 6d and 5f contribution on the final spectra at the U L₁ and L₃-edges, respectively.

3.1. Uranium L₁-edge HERFD-XANES

Experiments at the U L₁-edge (∼21758 eV) probe the U 7p states following the allowed electronic dipolar transition 2s → (n)p. Conventional XANES characterization is not often performed at this uranium edge due to the very large core-hole lifetime broadening of about 17 eV, which hinders resolving useful features. However, by applying HERFD-XANES, several features can become visible thanks to the tremendous gain in energy resolution by the virtual reduction of core-hole broadening. The obtained HERFD-XANES spectrum of KUO₃ is shown in Figure 2 together with the simulated spectrum and the calculated partial density of states (DOS) of selected orbitals. The maximum of the white line occurs at 21791 (1) eV, while the maximum of the first derivative, which corresponds to the uranium L₁-edge energy position E₀, is found at 21770 (1) eV.

Figure 2 (a) Uranium L1-edge HERFD-XANES and the corresponding simulated spectrum using FDMNES. (b, c) Calculated U-p, U-f, O-p and K-d partial density of states, to allow direct comparison with the experimental XANES spectrum. The Fermi energy level is indicated with a vertical dotted line. Vertical dashed-dotted lines indicating the position of features A and B in partial DOS are also present to guide the eyes. The intensity of U-p and U-d partial DOS in subplot (b) were here multiplied by 5 and 2, respectively, to better distinguish each contribution. We refer to Figure 6 of the supporting information for the other calculated partial DOS.

Two post-edge features, indicated as A and B on Figure 2, are resolved and their energy position can be identified at 21817 (1) eV and 21850 (1) eV, respectively. Good agreement is observed between calculated and experimental spectra in terms of number of features and their relative intensity. Some discrepancy can be understood due to the fact that the FDMNES calculations used here are based on DFT which is by definition a fundamental state theory at 0 K, and therefore it is not necessarily adapted to XAS which is probing an excited state, here at room temperature. The post-edge features A and B are not calculated exactly at their corresponding energy position observed in the experiment, but occur around 21812.8 (2) eV and 21841.9 (2) eV, respectively. The calculated DOS (see Figure 2, and additionally Figure 7 of the supporting information) indicate that these features are essentially caused by U-p, with a potential smaller contribution of the U-f states. Moreover, in feature B the O-p and K-d states are overlapping with the aforementioned U states in energy scale, which demonstrates their role in uranium bonding with oxygen and potassium neighbours.

In addition to the two post-edge features, two shoulders marked as S1 and S2 in Figure 2 on the lower energy side of the white line, at 21757 (1) eV and 21770 (1) eV, respectively, are also observed. The former shoulder S1 would typically be attributed to a pre-edge feature, i.e. a possible quadrupolar transition 2s → (n)d, in line with U-d DOS. However, calculations without quadrupolar transition are not demonstrating its U-d states origin. Assigning it to an octupolar transition 2s → (n)f can also be ruled out, given its significant strength and its occurrence in dipole-only calculations. The most plausible interpretation remains a U-p origin given the presence of such states in partial U-p DOS (see Figure 7 of the supporting information). Nevertheless, the relative U-p DOS intensities are not sufficient to solely explain the observed intensity of S1. Usually not well reproduced by our calculations, it is likely that such a feature is enhanced by the mixing of U-d/f and U-p states with potential effect of hybridization to the O-p states, as revealed by the overlapping U-p, U-f and O-p DOS in this energy range. Further studies at the U L₁-edge are therefore required to confirm such hypothesis. The latter shoulder S2 at 21770 (1) eV seems also related to the splitting of U-p states into two main bands, one at around 21774 (3) eV and the other at 21790 (3) eV. Both bands contribute significantly to the overall shape of the white line and link to the energy position of the white line maximum and L₁-edge energy position E₀ (i.e. the first derivative).

3.2. Uranium L₃-edge HERFD-XANES

Experiments at the U L₃-edge (∼17166 eV) probe the U 6d states following the allowed electronic dipolar transition 2p → (n)d. The uranium L₃-edge is often used for XANES and EXAFS characterizations thanks to its limited core-hole lifetime broadening of about 8 eV, which is significantly lower than at the U L₁-edge. Again, by using HERFD-XANES instrumentation, more features can be resolved thanks to the tremendous gain in energy resolution by the virtual reduction of core-hole broadening. The obtained HERFD-XANES spectrum of KUO₃ is shown in Figure 3 together with the simulated spectrum and the calculated partial DOS of selected orbitals. Very good agreement between experiments and calculation is demonstrated. The maximum of the white line occurs at 17179.6 (5) eV, while the maximum of the first derivative, which corresponds to the uranium L₃-edge energy position E₀, is found at 17169.9 (5) eV.

Figure 3 (a) Uranium L3-edge HERFD-XANES and the corresponding simulated spectrum using FDMNES. (b, c) Calculated U-d, U-f and O-p partial DOS, here expressed as cubic harmonics (except U-f), to allow direct comparison with the experimental XANES spectrum. The Fermi energy level is indicated with a vertical dotted line. Vertical dashed-dotted lines indicating the position of features A, A, B and C in partial DOS are also present to guide the eyes. We refer to Figure 6 of the supporting information for the other calculated partial DOS.

In the post-edge region of the experimental spectrum (see Figure 3), up to four features can be identified, here designated A, A, B and C. In general, all observed spectral features are reproduced by the calculations in terms of number and relative intensity. A comparison between the experimentally observed and calculated energy position of the post-edge features is reported in Table 1. Some discrepancy remains on the respective positions, especially for A, but with differences of the order ∼1 eV the agreement is better than at the U L₁-edge.

Table 1 Energy position of experimentally observed and calculated U L3-edge HERFD-XANES edge and post-edge spectral features; the U-d cubic harmonics mainly contributing to these features are also indicated Feature Experimental Calculated Involved U-d cubic harmonics t2g 17173 (1) eV 17173.3 (2) eV U-dxy, U-dxz, U-dyz eg 17179.6 (5) eV 17180.2 (2) eV U- #!dz2, U- A 17191 (1) eV 17189.9 (2) eV U-dxy, U-dxz, U-dyz A 17200 (1) eV 17197.1 (2) eV U-dxy, U-dxz, U-dyz B 17222.1 (5) eV 17219.5 (2) eV U- #!dz2, U- C 17238.7 (5) eV 17236.6 (2) eV All

To gain more insight on the nature of the spectral features, a distinction between cubic harmonics of U-d states and O-p states was made in Figure 3. Features A and A can be considered to originate mainly from U-d states, with no significant contribution from O-p states. Feature B is essentially related to U- #!d_z² and U-, with also a significant contribution of O-p_x. Feature C appears to result from a mixture of all U-d electrons, together with contributions of O-p_y and O-p_z. Therefore, features B and C are most relevant with respect to uranium–oxygen bonding.

In addition to those post-edge features, the improved energy resolution in HERFD-XANES experiments allows to distinguish a bimodal white line shape. The occurrence of a quadrupolar transition 2p → (n)f as previously reported on UO₂, [UO₂py₅][KI₂py₂] and UO₂(NO₃)₂(H₂O)₆ by Vitova et al. (2010), and later also on U₄O₉ and U₃O₈ (Kvashnina et al., 2014), and [Ni(H₂O)₄]₃[U(OH,H₂O)(UO₂)₈O₁₂(OH)₃] (Bès et al., 2016), is not well resolved, despite the resolution gain in our experiments. Indeed, there is a partial overlap between U-5f and U-6d electrons as a consequence of the 6d electrons strong crystal-field splitting expected when considering the undistorted oxygen octahedral geometry around uranium atoms in the crystal structure of KUO₃ (Kemmler-Sack, 1968). As a result, the U- #!d_z² and U- orbitals, the so-called t_2g, are pulled to lower energy, partially overlapping (and probably hybridizing) with U-f orbitals. At the same time, U-d_xy, U-d_yz and U-d_yz orbitals, the so-called e_g, are pushed to higher energy. The crystal field strength, 10Dq, can be deduced from the energy separation between t_2g and e_g (see Table 1), where comparable values of 6.6 (1.5) eV and 6.9 (4) eV are found from experiment and calculations, respectively.

3.3. Uranium M₄-edge HERFD-XANES

Experiments at the U M₄-edge (∼3725 eV) probe the U 5f states following the allowed electronic dipolar transition 3d → (n)f. This technique, and especially the application of HERFD-XANES, has gained much attention over the past decade as more and more facilities offered its use on radioactive materials. By probing directly the U 5f states and having a formidable spectral resolution down to 1 eV and lower (Kvashnina et al., 2014), it presents great advantages over the U L-edges with respect to chemical state determination in uranium compounds (Leinders et al., 2017, 2020). The obtained HERFD-XANES spectrum of KUO₃ is shown in Figure 4 together with the simulated spectrum and partial DOS of selected orbitals. Very good agreement between experiments and calculation is also demonstrated. The maximum of the white line occurs at 3726.7 (1) eV, while the maximum of the first derivative, which corresponds to the uranium M₄-edge energy position E₀, is found at 3726.4 (1) eV.

Figure 4 (a) Uranium M4-edge HERFD-XANES and the corresponding FDMNES calculated spectrum (non convoluted). The absorbance scale was limited in this plot to better distinguish the numerous satellite features (denoted as A, B, C, D, E and F). We refer to Figure 7 in the supporting information for the full scale absorption spectrum. (b, c) Calculated U-f and O-p partial DOS, here expressed as cubic harmonics, to allow direct comparison with the experimental XANES spectrum. The Fermi energy level is indicated with a vertical dotted line. Vertical dashed-dotted lines indicating the position of features A, B, C, D, E and F in partial DOS are also present to guide the eyes. We refer to Figure 6 of the supporting information for the other calculated partial DOS.

Thanks to the tremendous gain in energy resolution, several features (here assigned A to F) are clearly visible beyond the white line in Figure 4. These post-edge features are well reproduced by the calculations, but features C to F remain slightly off in energy position, with differences of the order 1–3 eV as reported also in Table 2. The good agreement between calculations and experiment allows to confidently assign spectral features to the U-f DOS, which are further divided as a function of the cubic harmonics. Feature A can be attributed to U- #!f_x³, U- #!f_y³ and U- #!f_z³ states, with significant hybridization to O-p_y and O-p_z states. Features B and C are composed of U-f_xyz states, with additional contribution from all O-p states, but feature C includes also significant contribution of U- #!f_x³, U- #!f_y³ and U- #!f_z³ states. It is furthermore expected that the crystal field splitting is playing a significant role in the distribution and cubic harmonic nature of features A, B and C (Butorin, 2020). The features D and E relate to mixing of U-f_xyz, U- #!f_x(y²+z²), U- #!f_y(x²+z²) and U- #!f_z(x²+y²) states, with additionally a significant contribution of O-p_y and O-p_z states which appears more pronounced in feature E. Finally, feature F is essentially composed of U- #!f_x³, U- #!f_y³ and U- #!f_z³ states with contribution of all O-p states. In conclusion, the observed hybridization between O-p and U-f states in the U M₄-edge HERFD-XANES post-edge spectral features demonstrates a strong relation to the U–O bonding nature. Consequently, one may expect their occurrence, intensity and position to be sensitive to changes in U–O bonding and ligand geometry around uranium sites.

The experimentally observed U M₄-edge white line displays an asymmetric sharp peak at 3726.7 (1) eV with a full width at half-maximum of about 1.5 eV [see Figure 7 in the supporting information, and Leinders et al. (2017)]. Its slight broadening is essentially due to a small shoulder clearly visible on its high energy side which is probably the consequence of the uranium 5f level crystal field splitting in addition to spin–orbit coupling. Such crystal field splitting is expected to be strong when considering the 5f ¹ electronic configuration of uranium in an octahedral ligand geometry. Unfortunately, despite the resolution gain in HERFD-XANES, the core-hole lifetime broadening still prevents distinguishing the degeneracy breaking within the 5f bands resulting from this crystal field. Therefore, only insights obtained through calculations are available here. The calculated U-f DOS contributing to the white line is shown in Figure 5 alongside a schematic recalling the 5f ¹ octahedral crystal field and spin–orbit coupling splitting.

Figure 5 Uranium 5f level crystal field splitting as deduced from the calculated DOS. Those peaks are contributing to the white line intensity in the U M4-edge HERFD-XANES spectra. U-f states are here represented as cubic harmonic.

Several isolated peaks are clearly visible in the calculated DOS, demonstrating the strength of the degeneracy breaking of 5f bands in KUO₃. Their energy relative to the ground states, i.e. the first peak Γ₇, are reported in Table 3. The five main peaks, denoted as Γ₇, Γ₈, , and Γ₆, can be attributed to the five theoretically expected Γ_n states. A comparison of their energy position with the experimentally observed forbidden Laporte f–f transition Γ₇ → Γ_n reported by Kemmler-Sack (1968) and by Kanellakopulos et al. (1980) supports well this assumption. Moreover, Γ₇ and both display a U-f_xyz character, with additional contribution of U- #!f_x(y²+z²), U- #!f_y(x²+z²) and U- #!f_z(x²+y²) states, especially for . States Γ₈ and have a U- #!f_x(y²+z²), U- #!f_y(x²+z²) and U- #!f_z(x²+y²) character with minor contribution of other U-f states, while Γ₆ has a more pronounced U- #!f_x³, U- #!f_y³ and U- #!f_z³ character with a small contribution of U- #!f_x(y²+z²), U- #!f_y(x²+z²) and U- #!f_z(x²+y²) states. Therefore, the U-f character of these peaks, as deduced from our DOS calculations, further support the split state identification.

Table 3 Crystal field splitting energies (all in eV) of the U-5f electronic levels above the Γ7 ground state in KUO3. Those peaks are contributing to the white line intensity in the U M4-edge HERFD-XANES spectra. Experimental forbidden Laporte f–f transition Γ7 → Γn from Kemmler-Sack (1968) and from Kanellakopulos et al. (1980) were initially reported in cm−1 units, and are here converted to eV units. Additional predicted transitions Γ7 → Xn are also indicated. The most significant U-f cubic harmonics for each state are also reported (see text for more details)   This work Kemmler-Sack Kanellakopulos   Transition Calc. Exp. Calc. Exp. Calc. Main U-f cubic harmonic involved Γ7 → X1 0.133 (5) – – – – U-fxyz Γ7 → X2 0.179 (5) – – – – U- #!fx(y2+z2),             U- #!fy(x2+z2), U- #!fz(x2+y2) Γ7 → Γ8 0.501 (5) 0.543 (1) 0.551 (1) 0.564 (1) 0.554 (1) U- #!fx(y2+z2),             U- #!fy(x2+z2), U- #!fz(x2+y2) Γ7 → X3 0.645 (5) – – 0.678 (1) 0.676 (1) U-fxyz, U- #!fx(y2+z2),             U- #!fy(x2+z2), U- #!fz(x2+y2) Γ7 → 0.763 (5) 0.849 (1) 0.848 (1) 0.889 (1) 0.888 (1) U- #!fx(y2+z2),             U- #!fy(x2+z2), U- #!fz(x2+y2) Γ7 → X4 0.897 (5) – – – – U-fxyz, U- #!fx(y2+z2),             U- #!fy(x2+z2), U- #!fz(x2+y2) Γ7 → X5 1.025 (5) – – – – U- #!fx3, U- #!fy3,             U- #!fz3, U- #!fx(y2+z2),             U- #!fy(x2+z2), U- #!fz(x2+y2) Γ7 → 1.199 (5) 1.216 (1) 1.311 (1) 1.185 (1) 1.305 (1) U- #!fx(y2+z2),             U- #!fy(x2+z2), U- #!fz(x2+y2) Γ7 → X6 1.304 (5) – – – 1.340 (1) U- #!fx3, U- #!fy3, U- #!fz3 Γ7 → Γ6 1.582 (5) 1.549 (1) 1.589 (1) 1.550 (1) 1.558 (1) U- #!fx3, U- #!fy3, U- #!fz3 Γ7 → X7 2.086 (5) – – – – U- #!fx3, U- #!fy3, U- #!fz3 Γ7 → X8 2.352 (5) – – – – U- #!fx3, U- #!fy3, U- #!fz3

In addition to the five main Γ_n peaks, eight minor peaks, denoted X_n with n ranging from 1 to 8, are also predicted by our calculations. Almost all of them can be attributed to further degeneracy breaking of the five main peaks. X₁ is related to the ground state Γ₇ with major contribution of U-f_xyz states. X₂ occurs very close to Γ₇, but has no U-f_xyz states character. Instead, it resembles the character of Γ₈. According to Allen et al. (1981), Γ₈ and are likely to split if the octahedral coordination is distorted. However, no experimental evidence for distortion of the octahedron in KUO₃ has been reported at room temperature (Chippindale et al., 1989; Dickens & Powell, 1991; Soldatov et al., 2007). Therefore, no distortion of the oxygen octahedra was taken into account in our calculations. X₃ is rather weak in our calculations but its energy position corresponds well to a level not seen by Kemmler-Sack (1968) but reported by Kanellakopulos et al. (1980). Kanellakopulos et al. attributed X₃ to further splitting of Γ₈, but our calculations would predict a character due to the strong contribution of U-f_xyz states. Theoretical calculations by Hinatsu et al. (1998) predict inversion of Γ₈ and when the relative magnitudes of the crystal field with octahedral symmetry and spin–orbit coupling interactions decreased. Such an inversion occurs when the spin–orbit coupling constant is very low compared with the crystal field strength, and can be ruled out here when considering the observed energy of the f–f transition Γ₇ → Γ_n. X₄ is very similar to X₃, and can be assigned to . X₅ is a mixture of all U-f states except U-f_xyz, similar to Γ₆, but being situated between and . Its attribution to any main peak splitting is ambiguous. X₆, as well as X₇ and X₈, show only a U- #!f_x³, U- #!f_y³ and U- #!f_z³ character, which also makes their association with any of the main peak unclear. Moreover, X₇ and X₈ are situated in the UV–Vis–NIR region where strong absorption has been reported in KUO₃ by Kemmler-Sack (1968), Kanellakopulos et al. (1980) and Allen et al. (1981). Such absorption is not only attributed to charge transfer transitions, but also to Laporte-allowed uranium 5f → 6d transitions. Those transition are likely to be very intense, especially because X₇ and X₈ occur in regions where 5f and 6d hybridization are observed in our DOS calculations.

3.4. Electronic structure of filled orbitals

Given the good agreement between our calculations and experimental data above the Fermi level, one can also consider comparing the electronic structure of the filled orbital to additional experimental data, such as electron binding energies obtained using X-ray photoelectron spectroscopy (XPS). To the best of our knowledge, only Liu et al. (2009) and Lopez et al. (2017) have reported XPS data for KUO₃. In both studies the U 4f doublet was measured using the Al K_α emission line (KL_2, 3) as excitation source. Their measured electron binding energies and the ones deduced from our calculations are reported in Table 4.

Clearly, there is a lack in XPS experimental data for most of the electron binding energies. The XPS results from Liu et al. and Lopez et al. are in good agreement, especially when considering the energy differences between the U-4f_5/2 and U-4f_7/2 lines. However, the calculated binding energies are shifted by a few eV when comparing with experimental data. This may be expected when considering that the energy scale origin is different in our calculations and in the XPS measurements. Indeed, the binding energies in Liu et al. (2009) and Lopez et al. (2017) are given relatively to the carbon 1s peak position taken at 285.0 eV for energy calibration, while our calculated values are relative to the Fermi level. Moreover, our calculations are not taking into account the core-hole created during the absorption process, which may be not fully screened in both XAS and XPS experiment. The core-hole can lead to significant shifts in electron binding energies as well as satellite peaks in XPS spectra. By taking into account the core-hole within our XAS calculations, the U-4f electron binding energies would be increased by about 27 eV, which shows their high sensitivity to screening effects. However, the agreement between XAS experiments and calculations with such a core-hole is worse, in particular at the U M₄-edge.