A. Crystal structure refinements

The crystal structure and EDD of KZnB₃O₆ were obtained based on two SXRD data sets collected at 298 and 81 K, respectively. The latter dataset collected at a lower temperature is of higher quality, exhibiting a high d-spacing resolution (d _min = 0.50) and a much higher signal-to-noise ratio (I/σ(I) = 78) compared to the 298 K data with d _min = 0.65, I/σ(I) = 27.1. The crystal structure of KZnB₃O₆ was refined using the full-matrix method based on F ², utilizing the SHELXTL package, and all atoms were refined anisotropically. The refinement process yielded reliability(R) indices of R ₁ = 2.35%, wR ₂ = 6.35%, R _int = 2.04% for the 298 K data, corresponding to completeness of 97.9%, redundancy of 1.22, number of unique reflections of 2112. For the 81 K data, the reliability indices can be further lowered to R ₁ = 1.23%, wR ₂ = 3.25%, R _int = 1.06%, with completeness of 100%, redundancy of 4.20, and number of unique reflections of 4414. The X-ray absorption of both was handled using multi-scan method. More details of SXRD data can be seen in the CIF files deposited as supporting information. Subsequently, the MEM calculations were performed using the Dysnomia package, employing the Limited-memory Broyden–Fletcher–Goldfarb–Shannon (L-BFGS) algorithm to reconstruct the EDD with a grid size of 68 × 70 × 70 pixels in the unit cell.

The structure from PXRD data was further refined in the 2θ range from 3.0 to 30.0° using the Rietveld method implemented in RIETAN-FP. A composite background function based on Legendre polynomials with twelve adjustable parameters was fitted to the background intensities. The pseudo-Voigt function was employed to fit the peak profiles. Attempting to refine the atoms anisotropically led to unstable results for some B atoms and O atoms. Consequently, isotropic atomic displacement parameters were assigned to all atoms. The refinement resulted in reliability (R) indices of R _p = 3.457%, R _wp = 5.235%, S = 6.0700, R _B = 6.666%, R _F = 3.163%. The results of the Rietveld refinement on the powder diffraction pattern are displayed in Figure 2(d). Finally, the MPF method was applied to obtain the three-dimensional EDD, with a grid size of 68 × 70 × 70 pixels in the unit cell. After two REMEDY cycles, the reliability indices decreased to R _B = 2.847% and R _F = 1.493%, respectively.

Figure 2. The single crystal structures of KZnB₃O₆ with anisotropic displacement parameters and corresponding three-dimensional EDD were obtained at 298 K (a) and 81 K (b). (c) The powder crystal structure of KZnB₃O₆ with isotropic displacement parameters collected at 100 K and the three-dimensional EDD. All the isosurface density levels of (a–c) are equal to 8 e/ų. (d) Comparison of the observed diffraction patterns (red point) of KZnB₃O₆ with the corresponding calculated patterns (green solid line). The lower green vertical bars show the Bragg positions. The difference curve is plotted in a blue solid line. Inset shows the structure of KZnB₃O₆, emphasizing the edge-sharing BO₄ units (λ = 0.4255 Å).

The crystal structure of KZnB₃O₆, depicted in Figure 2, reveals a unit cell consisting of 22 atoms. The compound maintains its inversion symmetry (space group P-1) between temperatures of 81 K and 298 K. As illustrated in the inset of Figure 2(d), this compound exhibits two edge-sharing BO₄ units, comprising two corner-shared B₃O₃ rings connected by a B₂O₂ ring. The refined cell parameters obtained through various methods are summarized in Table I. The unit cell volume increases from 269.646 to 272.68 Å³ between 81 and 298 K. The structural parameters for single crystal KZnB₃O₆ at 298 and 81 K are listed in Table II and Table III, respectively. Table IV provides the structural parameters for the powder data at 100 K.

TABLE I. Crystal data for KZnB₃O₆ refined by powder data at 100 K, single crystal data at 298 and 81 K, respectively

TABLE II. Structural parameters for single crystal KZnB₃O₆ at 298 K

TABLE III. Structural parameters for single crystal KZnB₃O₆ at 81 K

TABLE IV. Structural parameters for powder KZnB₃O₆ at 100 K

B. Charge density distributions

Figures 2(a) and 2(b) display the experimental charge density ρ(r) obtained from SXRD at 298 and 81 K, respectively. Additionally, Figure 2(c) showcases the experimental ρ(r) derived from the PXRD data. In all cases, the equidensity isosurfaces of the 3D ρ(r) demonstrate satisfactory agreement with the corresponding atom arrangements. It is important to note that the experimental ρ(r) represents a dynamic function that incorporates thermal effects. As depicted in Figure 2(a), the influence of thermal motion on the charge density is evident, with significant anisotropic thermal motion at 298 K causing expansion of the electron density isosurface along the stronger vibrational direction. Conversely, at 81 K, the electron density isosurface appears more isotropic due to reduced thermal effects, as shown in Figure 2(b). Meanwhile, in the PXRD case, while the crystal structures and ρ(r) maps generally align, it is worth noting that the resulting thermal motion factors and ρ(r) isosurfaces are larger than those obtained from the SXRD datasets. This observation suggests that the powder diffraction data provide the least precise ρ(r) in the present study.

The most intriguing feature of KZnB₃O₆ lies in its edge-sharing B–O section, specifically the B₆O₁₂ block composed of two BO₄ tetrahedra and four BO₃ triangles. The BO₄ tetrahedra share edges with each other and are further connected to BO₃ triangles at their outer vertices (see the insert in Figure 2(d)). In Figure 3, we present two-dimensional slices of the charge density distribution in the B₃O₃ ring and B₂O₂ ring, obtained from the synchrotron PXRD data at 100 K, as well as the SXRD data at 298 and 81 K.

Figure 3. Two-dimensional slices of experimental ρ(r) in the B₃O₃ ring were obtained from (a) single crystal data at 298 K, (b) single crystal data at 81 K, and (c) powder data at 100 K. Two-dimensional slices of experimental ρ(r) in the B₂O₂ ring were obtained from (d) single crystal data at 298 K, (e) single crystal data at 81 K, and (f) powder data at 100 K. Each subgraph is plotted using the same charge density ranges.

From Figures 3(a)–3(c), all illustrate the experimental ρ(r) of the corner-shared B–O hexatomic ring, which is a common structural motif in borate crystals. The center of the six atoms is clearly visible in the ρ(r) map, which is projected onto the (−1.43433, 1, 1.03254) plane intersecting the B₃O₃ ring. To enhance the visualization of charge density in the bonding region, the ρ(r) range is limited to values lower than 1.5 e/ų. Additionally, we observe an obvious electron segregation within the B₃O₃ ring in the bonding region, indicative of the involvement of p atomic orbitals in the formation of covalent bonds. Notably, in the bonding region of the B–O hexatomic ring, the charge density obtained from the PXRD data becomes discontinuous at the lower level of 0.8 e/ų, confirming it is not as precise as the results from the SXRD data.

To investigate the nature of bond interactions in the edge-sharing region, we present the ρ(r) map in the (1.13693, 2.90022, −1) plane intersecting the B₂O₂ ring (from Figures 3(d)–3(f)). In this plane, the two heavier atoms with higher ρ(r) values correspond to the O element, while the smaller two atoms represent B. Similar to the observations in the B–O hexatomic ring, we observe distinct electron segregation within the B₂O₂ ring in the B–O bonding region, indicating the involvement of p atomic orbitals in the formation of covalent bonds. Interestingly, both the room temperature SXRD data and the cryogenic synchrotron PXRD data reveal a fascinating phenomenon: the edge-shared B₂O₂ ring exhibits a significant accumulation of charge density between the O atoms. This unconventional O–O bonding is unexpected, as O–O covalent bonds are primarily observed in organic compounds. Such O–O covalence bonds are less common in inorganic systems, typically limited to certain metal peroxides and superoxides.

However, based on the high-quality SXRD data, it was demonstrated that the unusually accumulated electrons in the O–O bonding region are absent. The SXRD data at 81 K, with its high resolution (d _min = 0.50) and high signal-to-noise ratio (I/σ(I) = 78), provide more reliable charge density information. As shown in Figure 3(e), electron accumulation is observed solely in the B–O bond region within the edge-sharing B₂O₂ ring, suggesting that chemical bonding is still predominantly governed by B–O sp³ bonding. This finding is consistent with the results of theoretical calculations performed using the experimental cell parameter of 81 K SXRD data, as illustrated in Figures 4(a) and 4(b). The one-dimensional electron density profiles along the O1–O1 bond in the B₂O₂ ring obtained by three experiments are compared with ab-initio calculations in Figure 4(c), demonstrating that electron density from the 81 K SXRD data is of the most accurate, while the PXRD provides the worst accuracy. Furthermore, to study the topology of charge density, the critical point in the middle of the B₂O₂ ring was calculated with the aid of the EDMA program (van Smaalen et al., Reference Smaalen, Palatinus and Schneider2003). A critical point of (3, +1) is found in both 81 and 298 K SXRD, which means the center of a ring structure without chemical bonding. However, the 100 K PXRD gives a critical point of (3, −1), showing the feature of a chemical bond. Considering all these factors above, the electron density obtained by the 81 K SXRD is the most plausible. Hence, it is evident that high-quality SXRD data collected at low temperatures is crucial in obtaining reliable experimental ρ(r) values for KZnB₃O₆ using MEM.

Figure 4. Three-dimensional charge density distribution of B₂O₂ ring obtained by single crystal diffraction at 81 K (a) and ab-initio calculations (b), with isosurface density level at 0.8 e/ų. (c) The one-dimensional electron density profiles along the O1–O1 bond in the B₂O₂ ring in various conditions. The inset shows the enlarged view of electron density.