3.1.1. Crystal structure

Lb crystallizes in the cubic space group P2₁3 (Figs. 1 and 2). The crystal structure of Lb is composed of SO₄ tetrahedra and MgO₆ octahedra. Potassium cations, which were placed in the voids between these polyhedra, are surrounded by oxygen anions (see Fig. 2). Due to significant geometric distortion of the K coordination environment, it can be considered a deformed KO₁₂ icosahedron. Although the polyhedra seem to completely fill the space [Fig. 2(c)], this schematic presentation is not optimal, when the topology of EDD must be described, as polyhedra are not the best representations of the actual electron density, since they contain only a part of the atomic electron density of the central atom/ion and small parts of electron density of the corner ions/atoms. For this reason we focused on the analysis of atomic basins instead. Note that refinement of aspherical models of electron density also results in more precise geometric parameters (bond lengths and valence angles) than is possible in conventional spherical atom refinements. Tables containing information about interatomic distances for Mo_exp, Ag_exp and APS_exp are presented in Table S6 of the supporting information. One can use the ambient-pressure data as the reference and find relations between particular parameters when the pressure is changed. For example, in Fig. 4(a) linear relations between the ambient-pressure interatomic distances and the interatomic distances at elevated pressures are shown. The slopes of these relations can be interpreted as a change in the resistance of this structure to the increasing pressure. Of course, the KO₁₂ polyhedra are the most sensitive to changes of pressure, whereas the SO₄ tetrahedron is the least deformable by pressure. Different types of interionic contacts give different responses to pressure increases. The most resistant to pressure are the S—O contacts, which are the shortest and are considered to be covalent bonds. A 40 GPa pressure causes shrinking of only about 1.5–3.0% in length. Slightly more susceptible to compression are the Mg—O contacts, which undergo changes in length by 4.6–6.8% at 40 GPa compared with ambient conditions. The most significant changes as a function of pressure were observed for the K—O contacts, which shorten by up to 16.3% at 40 GPa (both the relative and absolute changes are the largest observed here).

Figure 4 (a) Interionic distances as a function of pressure (data correspond with Table S7). (b) Average eigenvalues for specific ADPs obtained on the basis of synchrotron measurements and in-house measurements. Blue dots – relation between Ag_exp and Mo_exp, orange dots – relation between Ag_exp and APS_exp. (c) Average eigenvalues for specific ADPs obtained on the basis of theoretical calculations. (d) Similarity index calculated for ADPs obtained on the basis of theoretical dynamic structure factors. (e) Volumes of integrated atomic basins under pressure versus integrated ambient atomic basins – all from theoretical calculations.

3.1.2. Anisotropic displacement parameters

It is widely known that lower temperatures result in smaller values for ADPs. Also, the higher the pressure, the smaller the thermal ellipsoids. Although the effect seems to be similar (reduction of ADPs), the mechanism is slightly different (reduction of the vibrational energy versus contraction of the potential wall). The consequence is that temperature reduces the atomic displacements as well as the anharmonic components, whereas pressure reduces the displacements but not the anharmonicity. To check whether a pressure of 1 GPa is large enough to cause any significant changes of ADPs in Lb, we compared the thermal ellipsoids for all experiments. Specific tables containing the values of ADPs resulting from the refinement of the Mo_exp, Ag_exp and APS_exp data as well as tables containing principal diagonal components of ADPs obtained in both theoretical and experimental investigations are available in Tables S8–S10 of the supporting information. Fig. 4(b) presents charts comparing the relationship between the isotropic ADPs [the average eigenvalues of the ADP matrices of particular ions/atoms at ambient pressure and 1 GPa, see Fig. 4(b)]. The relationship between the average eigenvalues for specific ADPs obtained from synchrotron measurements and in-house measurements Ag_exp (x axis) and Mo_exp (y axis; blue dots) and between the isotropic ADP values for Ag_exp (x axis) and APS_exp (y axis; orange dots) are shown in Fig. 4(b). From the data analys in this figure, we can see two clear trends. First, the eigenvalues obtained for the synchrotron measurements at 1 GPa are systematically lower for all types of atoms compared with the corresponding eigenvalues obtained for the in-house measurements at ambient pressure. So the difference of 1 GPa is sufficient to observe this effect. The difference is ca 0.004 (1 Å⁻²) and, as a result, those eigenvalues are smaller by about 60% for S3, 50% for Mg4 and Mg5, and about 20% for K and O ions. The second trend is visible when we expand our range of investigation and include the results for theoretical calculations [see Fig. 4(c)]. As we can see, the ADPs of some atoms/ions are more affected by increasing pressure than the ADPs of others. The `hard/resistant' atoms include sulfur and magnesium. The list of `soft/sensitive' atoms includes oxygen and potassium ions. One can also note that the increase of pressure generates non-uniform changes of ADPs. In relative terms (per unit of pressure), the changes of ADPs are largest when pressure is close to the ambient value. On the other hand, when pressure is already high the compressibility of ions is of course smaller. One can see this from a regular decrease in the slope of the linear relations shown in Fig. 4(c) by relating the slope to pressure. This is a consequence of the shape of EOS function.

A convenient method of ADP comparison is the similarity index (see Table S11) (Whitten & Spackman, 2006). This indicator was introduced to characterize the degree of agreement between ADPs obtained using different approaches (1 and 2). It can be defined in terms of the overlap between the two probability density functions in direct space. It is convenient to transform the ADP tensor U into a Cartesian system, and for two compared tensors U₁ and U₂, the equation has the form (Whitten & Spackman, 2006):

Probability density functions are normalized, so as a result, for U₁ = U₂, the similarity index R₁₂ = 1.0. To underline subtle differences and present them as percentages between two compared ADPs we used the similarity index in the form

By analysing the data in Table S11, we observed that the S₁₂ index is surprisingly small for K cations but significant (up to almost 40%) for oxygen anions. The X-ray data from APS_exp (1 GPa) are different from those obtained in both in-house experiments (ambient pressure). However, despite the rather good correlation between ADPs of both in-house measurements [see Fig. 4(b)], the similarity index for them still shows differences up to 20% for some oxygen anions, whereas for the rest of ions the ADPs are almost identical. This highlights the importance of proper description and deconvolution of thermal motion of ions from electron distribution effects. The use of pressure (ca 1 GPa) doubles the values of similarity indexes which effectively illustrates the scale of compressibility of ions close to ambient pressure. No doubt this is the valence electron density of the oxygen atoms/ions which are the softest and can be easily relocated by pressure.

In the case of theoretical calculations, differences between particular ADPs are much smaller despite the larger pressure range used in the computations (see Table S10). One reason could be the fact that experimental measurements were absolutely independent from one another whereas the theoretical results output from one calculation at a given pressure value was used as input for the next higher pressure value calculations. So despite shrinking ADPs, their orientations in space were more or less conserved. Taking into consideration the results depicted in Fig. 4(d), we see once again that the similarity index shows the most significant changes in the case of potassium and oxygen ions, whereas for sulfur and magnesium the changes are as much as four times smaller. Atomic volumes [Fig. 4(e)] are discussed in the next section.

3.2.1. Electron density parameters

In order to compare parameters of EDDs, we will discuss the properties at bond critical points (BCPs), net charge of atoms/ions, volumes of integrated atomic basins, maps of the laplacian of electron density, total electron density and deformation electron density. The crucial experiment in this context is our high-resolution, high-pressure measurement at the synchrotron facility abbreviated to APS_exp. We will relate results obtained at high pressure to those obtained at ambient pressure denoted Ag_exp and Mo_exp.

Table S12 presents the values of electron density and laplacian of electron density at (3,−1)-type BCPs. The amount of electron density (ρ) at the BCPs for all interionic contacts in the Lb structure resulting from the APS_exp data look indistinguishable from results obtained on the basis of the in-house experiments. Surprisingly, there is one outlier among the ∇²_ρ values which is observed for the S(3)—O(8) interaction [2.9 e⁻ Å⁻⁵ versus −15.3 e⁻ Å⁻⁵/−13.0 e⁻ Å⁻⁵]. Relatively high values of ρ and ∇²_ρ < 0 suggest that the S—O bonds can be considered as shared-shell interactions (covalent and polar bonds), whereas Mg⋯O for which ∇²_ρ > 0 and values of ρ are small as closed-shell interactions (the ionic ones). Results for Ag_exp and Mo_exp are comparable but not identical. In the case of ρ, the values obtained for the Mg—O bonds seem to be systematically larger for Ag_exp than for Mo_exp [with the exception of the S(3)—O(6) contact]. Although numerical values of electron density ρ and Laplacian ∇²_ρ presented in Table S12 are not absolutely identical for compared experiments, they are very similar, especially taking into account the estimated standard deviation error.

Because the results of the in-house experiments are based on 100% complete X-ray data and data obtained from APS, to the APS_exp, which has only a 89% completeness, an additional column has been added in Table S12 and Table 2. The `Ag_exp (APS completeness)' column shows results for the in-house Ag_exp after the removal of these reflections which are missing in the synchrotron data. In other words, in this attempt the completeness of the original dataset was adjusted to be exactly the same as the synchrotron data. Note that differences in ρ are at the second position after the coma, and are smaller than the standard deviation of ρ. Differences in Laplacian values are more noticeable, but only significant for S(3)—O(6) and S(3)—O(8) contacts. Atomic charges differ at the second decimal position similarly as for atomic volumes. This shows that the cutting off of the data did not significantly change the results quantitatively or qualitatively. We will discuss the effect of deteriorating completeness on the final results of refinement in the last section of this work.

Table 2 contains values of the net atomic charge and atomic volumes after integration of the atomic/ionic basins. The most striking differences were observed for O(9) which is an interlink between three potassium polyhedra. Its charge, −2.0, is ca 0.4⁻ bigger than the average value for the in-house experiments. Additionally, a significant discrepancy was observed for K(2). Its charge is about 0.45 smaller than for the averaged in-house data. Except for the noted outliers other results were directly comparable. The sum of all atomic charges per unit cell after atomic basin integration is close to 0 and the sum of atomic volumes is equal to the volume of the unit cell within the level of errors. For the unit-cell volume, the sums of atomic volumes differed from the volumes of the original cells by ca −0.7, 0.7, −1.2 and −2.4% for Ag_exp, Ag_exp (APS completeness), Mo_exp and APS_exp data, respectively.

When comparing particular values of charge and atomic volume for Ag_exp and Mo_exp, one can see that the biggest atomic basins had potassium cations located in cavities between the SO₄ and MgO₆ polyhedra, whereas Mg and S, surrounded closely by oxygen atoms, have four times smaller atomic basins. The atomic charge at the potassium cation is ca +1 whereas that of the magnesium cation is significantly larger. The fact that both potassium cations have a slightly different charge and not all oxygen anions had the same charge is associated with the different interactions of these ions in the crystal lattice of Lb. The K(1) polyhedron is formed by nine oxygen anions [O(6), O(7), O(9) and symmetry-related oxygens], whereas the K(2) void is surrounded by 12 oxygen anions (see Fig. 2). On the other hand, the position of O(9) is a bridging position between three potassium voids and as a consequence its charge is significantly different from the charge of the other oxygen atoms/ions.

3.2.2. Dynamic structure factors and theoretical models of electron density

Because of the limitations resulting from DAC construction, sometimes it is not possible to obtain experimental data suitable for experimental charge density analysis for high-pressure values. Thus theoretical calculations which can mimic particular pressure effects could be compelling. In this work experimental data were complemented with theoretical calculations for six pressure values. Two of them, ambient pressure and 1 GPa, correspond with experimental measurements, the other allowed us to widen the investigation slightly beyond current experimental limits.

In Table S13, the values of selected properties at BCPs resulting from theoretical calculations are presented. The values of ρ and the laplacian were calculated with the use of the XDPROP module of XD. To avoid repetition, the table combining results for BCPs for experimental and theoretical data is presented in the supporting information. In Table 3, the volumes of integrated atomic basins and net atomic charges within these basins are presented.

When we consider ρ and ∇²_ρ for Mg⋯O-type interactions, we can see that these values correspond very well with the experimental values (Table S12). However, the values of the laplacian in the case of S⋯O are no longer very negative, thus indicating that these `covalent' bonds are becoming more ionic (Fig. 5).

Figure 5 Laplacian and ρ as a function of pressure for S—O and Mg—O contacts at the (3, −1) BCPs for theoretical calculations.

Table S14 presents the values of the net atomic charge and volumes obtained after integration over atomic basins. The values of the net atomic charge do not change significantly within the investigated pressure range. Charge does not change monotonically as it is dependent on changing the electronegativity of ions/atoms under pressure or/and the transfer of charge among ions under pressure. The deviation of total charge per unit cell in the whole pressure range varied investigated between +0.64 and −0.44 which seems to be irrelevant taking into consideration that the unit cell of Lb contains 824 electrons (384 valence electrons to refine by the multipole model), so the deviation of about 1 electron from neutrality is just 0.12% of all the electrons in the unit cell.

We observe a similar situation for atomic basins as a function of pressure [see Fig. 4(e)] as for the ADP values [see Fig. 4(c)]. There is group of `hard' atoms such as sulfur and magnesium whose volumes are quite resistant to pressure change and a group of `soft' atoms/ions such as oxygen and potassium whose atomic basins are noticeably decreasing under pressure.

As we see from Fig. 4(e) and Table 3, the volumes of atomic basins decrease as a function of pressure as expected. In addition to the numerical values of many point parameters presented in the tables above, maps of these parameters could be helpful to compare results of EDD obtained in different ways and detect detailed differences. Here we would like to discuss three types of such 2D maps: maps of total electron density, maps of the Laplacian and maps of deformation density. These maps are presented in Figs. S2 and S3. Two areas are depicted on the maps: a vicinity of the S cation (plane defined by the S cation and two neighbouring oxygen atoms, see Fig. S2) and the environment of the Mg cation (the plane determined by the Mg cation and two neighbouring oxygen anions, see Fig. S3). In each case, the results of the in-house experimental measurements (Mo_exp, Ag_exp) are compared with synchrotron experiment (APS_exp) as well as with theoretical calculations (theor_0).

Let us first focus on the maps of the SO₂ fragment. We see that on the maps of total electron density (contour 0.1e), there are no significant differences. However, we can say that in the case of theoretical calculations contours appear to be smoother than those obtained for the experimental results, which is also true for the laplacian and for the deformation density maps. Looking at the deformation density maps (red – minus values, blue – plus values, contours 0.05e) when the spherical IAM model of electron density is removed from the total EDD, we expect that, due to its rather covalent character, we will observe some density on the bond paths between S and O. In fact, for the theoretical results, we see some maxima on these paths as well as additional maxima (two per oxygen anion), which can be interpreted as free electron pairs of oxygens. Near the sulfur cation, we can see depletion of electron density. Generally, similar features that are a bit more perturbed can also be observed from the experimental results. Considering maps of the laplacian (blue contour – positive value, red contour – negative value), a positive maximum near the halfway point of each S—O bond path could be found.

For the maps of the MgO₂ fragment (defined by the Mg cation and two O anions), we can observe that for the theoretical results two other oxygen atoms also reside almost in this plane (concentration of electron density above and below the Mg cation) whereas for the experimental data these oxygens were no longer visible in this plane. It is so because in the theoretically optimized structures, one observes an almost flat MgO₄ moiety, but for structures refined against the experimental X-ray diffraction data, positions of other oxygens are off this plane. That is why we will discuss only similarities and differences observed for the Mg(4)⋯O(6) and Mg(4)⋯O(7) bond paths which are visible on all maps. The Mg⋯O interactions are expected to have much more ionic character than the S—O interactions, and in fact, there are no significant electron density maxima close to the midpoint of the Mg⋯O bond paths (see deformation density maps). Also there are no peaks of the laplacian along these paths.

The maps presented in Figs. S4 and S5 are difference maps. They were created by subtracting maps from Figs. S2 and S3 and present only the differences between pairs of subtracted maps.

As 2D maps are only cuts through 3D features, the 3D maps are, in our opinion, far more informative. In Fig. 6, deformation density maps for SO₄ and MgO₆ groups are presented. This gives a better view of details of rather complex distributions of density around ions and cations.

Figure 6 3D deformation density maps (red – minus values, blue – plus values, contour ±0.022 e).

Although numerical data showing changes of electron distribution are quite informative, visualizations would make interpretation easier.

3.2.3. Atomic/ionic basins

There is no doubt that the polyhedra commonly used in mineralogy and crystallography at the structural level of X-ray results are not useful representations of the actual electron density as they neither have full representation of the central ion nor any of the corner ions (see Fig. 7).

Figure 7 Relation between the polyhedral representation of ions in the crystal structure of Lb and atomic/ionic basins of particular ions.

So from time to time an old question returns (Brown, 2017): how big are atoms/ions in crystals (particularly in minerals)? This question is asked because atoms in crystals, particularly the partition of electron density, can be defined in many different ways. The quantum theory of atoms in molecules (QTAIM) (Bader, 1994) describes a far more useful method to partition electron density into atomic basins. This is based on the gradient lines of electron density which start from the local maxima of electron density (atoms/ions) and go to infinity with exceptions for those which go to the nearest atoms. Such gradient lines of electron density are called bond/interaction paths. The intersection of each bond path with its interatomic surface of zero flux of the gradient of electron density is a charge density minimum along the bond path and is known as the BCP. Obviously, particular atoms in the structure (in 3D space) can be surrounded by many neighbours (Fig. 8), so there are many bond/bonding paths oriented in different directions and having different length to their BCPs. That is why atomic basins have an irregular shape but completely fill the space (Fig. 8). We have illustrated this in Fig. 8 and corresponding movie M1 presented in the supporting information. It helps to understand how complex the arrangement of atomic basins is and how their shapes are affected by closest neighbours.

Figure 8 (a) Atomic basin of O9 (red shape) surrounded by basins belongs to sulfur (yellow), magnesium (cyan), oxygen (green) and potassium atoms (pink); (b) SO4 group (green – oxygen, yellow – sulfur).

Atomic basins are topologically equivalent to polyhedra, in such a way that they also have faces, edges and vertices, and they satisfy Euler's relationship (faces − edges + vertexes = 2). However, because of their irregular shapes, the basins have curved edges and faces. We can say that in Lb, the Mg basins are most similar to cubes with six faces [see Fig. 8(a), cyan shape] and the S basins to tetrahedra with four faces (see Fig. 9). Other basins such as K and especially O are much more irregular.

Figure 9 Sulfur atomic basin and the evolution of its shape as a function of pressure.

It could be beneficial to associate changes of EDD with the shapes of atomic basins. We should not treat atoms/ions or cations as points within the space of a particular unit cell. Atomic charge density is not a well defined property. It depends on a given definition. We use the Bader's integrated atomic charges in this work. So electron density which belongs to particular atoms, fills some shapes (atomic basins), and these shapes, like bricks, form the crystal structure [see Figs. 8(a) and 8(b)]. That is why any changes of EDD caused by pressure will be visible as changes of the shapes of these bricks (atomic basins). Additionally, as a result of pressure, EDD within particular atomic basins will be changed. So let us look into this issue and see how atomic basins are changing as a function of pressure. There are nine different ions in the asymmetric part of Lb structure: four oxygen anions, two potassium cations, two magnesium cations and one sulfur cation. This means that we have nine different atomic basins to consider (see Fig. 7).

The sulfur atomic basin is one of the smallest and is characteristically defined by the atomic basins of the neighbouring oxygens. In fact, the sulfur basin is almost completely surrounded from each side by oxygen basins [see Fig. 8(b), movie M2]. Each of these surrounding oxygen basins perturbs the shape of the sulfur basin (see Fig. 9). Because the effective atomic basin describing the sulfur cation no longer has anything in common with its tetrahedron schematic. The issue is much more visible in the movie M3. It shows that in fact the tetrahedron and atomic basins overlap only in a small central region. On one hand a significant part of the basins goes beyond the polyhedra boundaries, on the other, the vertices of polyhedra are beyond the atomic basin.

The higher the pressure, the more significant the deformation of the sulfur atomic basin is. As a result of the squeezing caused by high pressure, the volumes of the atomic basins decrease. But they depict a delicate balance in the interactions of the crystal structure of Lb which is dependent on pressure. Their shapes will also be dependent on pressure. Of course SO₄ is a very well defined anion so the shape of its basin is quite well conserved as a function of pressure.

Of course the higher the pressure, the smaller the volume of the unit cell. But when we investigate the data in Table 3 further, we can see that different basins do not change their volume proportionally to the decrease of the whole unit cell. For example, at less than 5 GPa, the volume of the whole unit cell is smaller by about 6.4% in relation to that at ambient pressure. However, one of the magnesium basins has a slightly expanded volume, but the potassium basins have shrunk by about 8.5–9.8% and one of the oxygen basins by 10.3%. This situation should be reflected somehow by changes of net atomic charges of those basins (Table 3). In fact the net atomic charge under 5 GPa appears to correspond quite well with the results from 1 GPa and ambient pressure. However, for 10 and 20 GPa, a significant discrepancy between charge of anions and cations is observed. As a rule, the whole unit cell should be neutral. Some small deviations ca ±1 electron (which is ca 0.1%) could be accepted. The shapes of atomic basins of all moieties present in the Lb structure under different pressure values are visualized in Figs S6–S14.

Moreover, to better display how neighbouring ions affect the shape of particular central ions, movies M4–M9 are presented.

3.2.4. Changes of atomic/ionic basins as a function of pressure

Even subtle changes of particular atomic basins are more visible when we subtract and superimpose the two shapes of the basins we want to compare. As observed from Fig. 10, at 1 GPa the shape of sulfur atomic basin is almost identical to that at ambient pressure. However, the higher the pressure the more deformed the atomic basin is, with respect to the corresponding atomic/ionic basin at ambient pressure. Such illustrations nicely show the anisotropy of interionic interactions under pressure. Atomic basins of all the other cations and anions and their changes as a function of pressure are presented in the supporting information.

Figure 10 Differences between shape of the sulfur atomic basin (in blue) at ambient pressure and pressures ranging from 1 to 40 GPa (in red).

The sulfur atomic basins depicted in Figs. 9 and 10 as well as data presented in Table 3 correspond with results obtained on the basis of theoretical optimization of the Lb structure in CRYSTAL17. The comparison of selected examples of atomic basins obtained on the basis of experimental data and theoretical calculations is presented in Fig. 11.

Figure 11 Comparison of selected atomic basins: O(7), K(1) and S(3) and their difference maps for experimental and theoretical data.

When a particular atomic basin is squeezed under pressure, its volume shrinks and, as a result, the charge density within it must be redistributed. We will illustrate such processes by using an example of one of the oxygen anions/atoms. The atomic basin of O9 [red shape on Fig. 8(a)] is surrounded by the other ions: sulfur, magnesium and potassium cations and other oxygen anions. When the pressure is raised, and the atomic basin changes shape, some charge density inside it must be redistributed.

3.2.5. Redistribution of charge density inside atomic/ionic basins

When external stimuli such as pressure or temperature are applied, charge also redistributes inside atomic/ionic basins. The way in which the EDD changes with pressure is visible when difference maps comparing two pressures are created (Fig. 12). They are presented as a set of difference electron density maps showing changes at the O(9) anion/atom. In each case, a map results from subtracting the total charge density at the O(9) anion at ambient pressure from the high-pressure data. Maps for five different pressure ranges are depicted. Moreover, to show how EDD is sensitive to pressure changes, for each pressure value, sets of different isosurfaces are used. This is necessary because for maps showing differences within the low-pressure range (as ambient and 1 or 5 GPa) changes are quite subtle and small isovalues are needed to present those changes. Whereas for maps showing differences within the large pressure range (between ambient and 20 or 40 GPa) changes are significant and to show them some larger isovalues are needed. Additionally, in the movies provided in the supporting information, movie M13 is presented differences in EDD at O(9) in a pressure range between ambient and 1 GPa.

Figure 12 Differences in EDD at the O(9) anion in a range of pressure values from ambient to 40 GPa described by a set of isovalues. The regions in space which carry more total electron density (defined by the isosurface value) at ambient pressure than under particular pressure values are in blue and the regions for which there are more total electron density (as defined by the isocontour value) under pressure than at ambient pressure are in red. So we can interpret such figures as an illustration of the redistribution of charge (at a given contour isosurface value) from the blue regions at ambient pressure to the red regions under higher pressure values.

Of course such changes in EDD caused by pressure within a particular atomic basin do not occur in isolation from neighbouring basins. This is a concerted mechanism. That is why we should also take into account the changes in atomic basins of the surrounding atoms/ions. Fig. 13(a) shows the SO₄ group and Fig. 13(b) the O(9) atomic basin as well as changes of EDD within this basin. Such maps where two total electron densities under different pressures are subtracted from each other, two factors are responsible for the visualized changes of EDD. One component is the true difference of electron density at the position of the considered particular atom/ion and in its vicinity. This is the main cause of differences at the centre of such grids [at the O(9) anion position]. The second factor, whose participation increases when we are further away from the centre of the grid, is the change of atomic position in space. The higher the difference of pressure values, the more significant changes in atomic positions. Although at the centre of map the situation is normalized in a way that the atom considered is always exactly at the centre, the closer to the edges of map the higher discrepancies in the atomic positions become.

Figure 13 Difference of total electron density at the (a) SO4 group, difference between ambient pressure and 1 GPa (iso-contour: + 0.005 blue and −0.005 red). (b) Map of the difference between ambient pressure and 10 GPa (iso-contour: +0.05 and −0.05; blue and red, respectively).