2.1. Crystal growth

All starting materials were purchased from Sigma-Aldrich and used as received. L-Cystine (1.48 g, 6.16 mmol) was dissolved in warm ammonium hydroxide solution (ACS reagent, NH₃ 28.0–30.0%, 8 cm³) and crystallized on cooling to ambient temperature (Dahaoui et al., 1999). A high-quality hexagonally shaped crystal of dimensions 0.1 mm × 0.2 mm × 0.2 mm was then loaded into a Merrill–Bassett diamond anvil cell (DAC; Merrill & Bassett, 1974).

2.2. High-pressure crystallography

3.1. The structure of hexagonal L-cystine at ambient pressure

L-Cystine crystallizes in two polymorphic forms: a tetragonal phase (P4₁) that was characterized by Chaney & Steinrauf (1974) and a hexagonal phase (P6₁22) first investigated by Oughton & Harrison (1959) but more recently in a charge density study by Dahaoui et al. (1999). We have re-determined the structure at room temperature (Fig. 1) in order to be able to compare all structures obtained here under similar conditions of temperature. Though we quote our own room-temperature structural parameters, our interpretation of the structure owes much to the paper of Dahaoui et al. (1999), which, in addition to describing the structure of cystine at high resolution, also contains a database survey of geometries and interactions of crystal structures containing —CSSC— moieties.

Figure 1 The molecular structure of L-cystine at ambient temperature and pressure showing atom labelling. Ellipsoids are drawn at the 30% probability level, and H atoms are shown as spheres of arbitrary radius.

Both the tetragonal and hexagonal phases of L-cystine crystallize with the molecule in its zwitterionic form. The S—S bond distances in the two polymorphs [2.042 (6) and 2.043 (2) Å, respectively] do not differ significantly from the average for such bonds in the CSD [2.039 (2) Å]. The same comment applies to the C—S—S—C torsion angle, which is positive in both forms [69.3 (2)° and 75.18 (5)°, respectively]. The hydrochloride and hydrobromide salts of L-cystine have both been structurally characterized in the anhydrous forms and as dehydrates; interestingly, these all have negative C—S—S—C torsion angles in the range −79° to −83°. The length of S—S bonds in compounds containing C—S—S—C moieties has been shown to be dependent on the torsion angle about the S—S bond: torsion angles which approach 90° result in short S—S bonds because π-interactions are optimized and repulsions between S-based lone pairs are minimized (Dahaoui et al., 1999). The values of χ1 and χ2 (i.e. the torsion angles N1—C2—C1—S1 and C2—C1—S1—S1′) are 56.1 (5)° and 80.1 (3)°, respectively; these values are relatively less common in proteins (see Introduction).

In this study the effect of pressure on the crystal structure of the hexagonal phase was studied. The principal intermolecular interactions take the form of unusually short S⋯S contacts and NH⋯O hydrogen bonds, formed between the ammonium and carboxylate moieties. The NH⋯O hydrogen bonds lead to the formation of layers which lie perpendicular to the c-axis. The layers can be considered to be formed from the intersection of two primary C(5) chain motifs (Bernstein et al., 1995), one via N1—H4⋯O1 interactions, the other via N1—H5⋯O2 interactions (Fig. 2a). The first of these interactions is substantially bifurcated (Jeffrey & Maluszynska, 1982) with donor-to-acceptor distances (i.e. N⋯O) in N1—H4⋯O1/O2 measuring 2.792 (5)/3.147 (5) Å.

Figure 2 (16) ring motifs in (a) hexagonal L-cystine and (b) α-glycine, as viewed perpendicular to the c- and b-axes, respectively; the figures correspond to N⋯O distances in N—H⋯O hydrogen bonds. (c) (16) ring motifs created by interlaced CH⋯O and NH⋯O interactions in cystine as viewed perpendicular to the c-axis. The black dotted lines represent the ring motif as created by NH⋯O hydrogen bonds [cf. (a)], while the orange dotted lines show the interlaced ring motif as created by CH⋯O interactions. In (a) and (c) only the basic α-amino acid unit involved within the ring motif is shown for the sake of clarity. Colour scheme: C, grey; H, white; O, red; N, blue.

The structure of the layers is strongly reminiscent of layers formed perpendicular to the b-axis in α-glycine (Fig. 2b; Boldyreva et al., 2003). In both cases intersection of the C(5) chains leads to formation of a secondary-level (16) ring motif. In the asymmetric unit of LCYSTI14, and all the structures reported here, the chains based on N1—H4⋯O1 and N1—H5⋯O2 interactions are respectively formed along lattice repeats in the [010] and [110] directions, but these directions interchange for successive layers generated by the 6₁ screw axis. Head-to-tail NH⋯OOC motifs are often observed in amino acid structures and are usually associated with a cell dimension of ∼5.5 Å. This is also observed in L-cystine with an a-axis length of 5.4203 (5) Å.

The hydrogen-bonded layers are linked to other such layers on one side by covalent S—S bridges and on the other by NH⋯O hydrogen bonds (Fig. 3). The latter are formed via N1—H6⋯O1 interactions, which connect pairs of molecules in successive layers, forming an R₂²(10) ring motif (Fig. 4).

Figure 3 Hydrogen-bonded glycine-like double layers linked down the c-axis by disulfide bridges. This view is along a, with the c-axis running from left to right. The dashed black lines correspond to N⋯O hydrogen bonds; the dashed orange lines are S⋯S contacts. Sulfur is shown in yellow, but otherwise the colour scheme is as Fig. 2.

Figure 4 R22(10) ring motif as viewed perpendicular to the c-axis. (a) Standard ball-and-stick model; (b) space-filling model of (a) on the same scale. Half of each L-cystine molecule has been removed for clarity. Note the apparent lack of free space at the centre of the R22(10) ring.

Weak CH⋯O hydrogen bonds are also present at ambient pressure and can play an important role in stabilizing medium-strength hydrogen bonds, e.g. NH⋯O (Desiraju & Steiner, 1999; Derewenda et al., 1995). Under ambient pressure two such interactions are present, both of which occur within the glycine-like layers already described. The first of these, C1—H1⋯O2, runs approximately parallel to N1—H4⋯O1 and bisects the (16) ring motif described above, while the second, C2—H3⋯O1, runs in the same direction as N1—H5⋯O2. If all other hydrogen-bonding interactions are ignored, these weak C—H⋯O interactions combine to produce an (16) ring motif of their own (Fig. 2c).

At ambient pressure, S⋯S intermolecular interactions are formed (Fig. 3); the S⋯S distance [3.444 (4) Å] is much shorter than the sum of the van der Waals radii of the S atoms (3.7 Å). At 110 K this distance is 3.4264 (4) Å (Dahaoui et al., 1999). These interactions run perpendicular to the c-axis direction, and the S⋯S contact is approximately co-linear with the S—S covalent bond. Trends in the geometries of such interactions have been shown to be consistent with donation of a lone pair into an S—S-based σ* molecular orbital (Dahaoui et al., 1999).

3.2. The response of hexagonal L-cystine to pressure up to 3.7 GPa

Hexagonal L-cystine was found to be stable up to 6.4 GPa. However, no structural data could be extracted above 5.0 GPa, and even at this pressure the refined parameters are imprecise. Therefore only structural data to 3.7 GPa were used for comparison with the ambient pressure structure. The S—S distance appears to decrease from 2.043 (2) to 2.038 (5) Å, though this is not statistically significant. Other bond distances and angles were restrained during refinement to their ambient pressure values, and so no conclusions about their variation with pressure should be drawn from these data. Significant changes do occur in the torsion angles, however. The C—S—S—C torsion angle reduces from 75.20 (7)° at ambient pressure to 72.3 (4)° at 3.7 GPa, while the N1—C2—C3—O2 torsion angle (also referred to as NCαCO or ψ in macromolecular crystallography) also reduces from 166.12 (8)° to 164.1 (7)°.

3.2.1. Lattice parameters

The response of the lattice parameters of hexagonal L-cystine to pressure is anisotropic, with the principal component of the strain tensor acting in the c-axes direction. Between ambient pressure and 6.4 GPa the c-axis reduces in length by 6.8%; the reduction in the a-axis length is 4.4%. The volume change in the initial 0.4 GPa range is approximately 1.0%, while from 0.4 to 6.4 GPa the volume changes by approximately 2.8% every 1.0 GPa until the sample became polycrystalline.

Changes in unit-cell dimensions and volume as a function of pressure are plotted in Fig. 5. The strain induced within molecular systems by pressure is usually anisotropic, and in layered structures the greatest direction of strain is often observed to be normal to the layers. Such behaviour has been observed, for example, in the monoclinic and orthorhombic polymorphs of paracetamol (Boldyreva et al., 2000, 2002) and is also observed in L-cystine, where the direction of greatest compressibility is normal to the glycine-like layers formed within the structure.

Figure 5 Variation of lattice parameters (a, c) (Å) and volume (Å3) of hexagonal L-cystine as a function of pressure (GPa).

The bulk modulus (K₀), refined for a Birch–Murnaghan equation of state (Birch, 1947; Angel, 2004) to second order, is 29.1 (4) GPa. The data set used to calculate this quantity is admittedly rather limited, and the values of V₀, K′ and K′′ were fixed at 1424.3 ų, 4 and −0.1337 GPa⁻¹, respectively; the values of V₀ and K′ did not change significantly from these values on refinement. Molecular solids typically have K₀ < 30 GPa (Angel, 2004), and the value obtained for L-cystine-I is towards the high end of this range. Slebodnick et al. (2004) quote the following K₀ values which are useful for comparison: Ru₃(CO)₁₂ 6.6 GPa, NaCl 25 GPa, quartz 37 GPa, ceramics 50–300 GPa and diamond 440 GPa.

4.1. Anisotropic compression of L-cystine

In pressure studies of α-glycine and L-serine-I we have ascribed trends in the relative compressibilities of C—H⋯O and N—H⋯O hydrogen bonds to the closing up of voids existing in the structure at ambient pressure. At pressure these voids contract with the shortening of N—H⋯O and C—H⋯O interactions. Similar conclusions on the importance of void closure were drawn in a study of Ru₃(CO)₁₂. Recent work by Blatov & Shevchenko (2003) makes it possible to analyse the sizes and distributions of voids in crystal structures using the Voronoi-Dirichlet formalism.

The environment of an atom in a crystal structure can be visualized using a Voronoi-Dirichlet polyhedron or VDP (Peresypkina & Blatov, 2000a,b). Voronoi-Dirichlet analysis is a method for partitioning space amongst points which occupy that space. A point is separated from a neighbouring point by a plane which bisects the vector between them. This construction is repeated for every pair of points to yield a subdivision of the space into cells which each contain one point. VDP analysis carried out using individual atoms to define the points leads to a molecular VDP, and these correspond to a complete partitioning of space in a crystal structure. Interatomic interactions occur at the points in the structure where faces of VDPs meet, whereas the topological definition of a void is a point at which the vertices of VDPs meet (Blatov & Shevchenko, 2003).

Fig. 6(a) shows the distribution of voids in the crystal structure of L-cystine at ambient pressure. The largest void conglomerate in the structure occurs in the vicinity of the S atoms; this is labelled 1 in Fig. 6(a). These voids straddle the short intermolecular S⋯S contact of 3.444 (4) Å, and the contraction of this distance to 3.263 (4) Å at 3.7 GPa is consistent with the orientation of the void conglomerates in this region of the structure.

Figure 6 (a) The distribution of voids in cystine under ambient conditions, viewed with the c-axis vertical. The numbers 1–4 refer to regions of the structure, as discussed in the text. (b) Voids in the glycine-like (16) layers under ambient conditions. The colour scheme represents the volumes of the VDPs of the voids (in Å3) as discussed by Blatov & Shevchenko (2003); the largest void is shown in white, voids then progressively decrease in volume from blue to red; precise values are given in the legend.

Fig. 6(b) shows the distribution of voids in the region of the (16) rings formed in the glycine-like layers; this region is labeled 2 in Fig. 6(a). Fig. 7 illustrates the sizes of the voids in cystine at ambient pressure; the close correspondence between the positions of the voids in Fig. 7(a) and the largest void positions in Fig. 6(b) is readily apparent. On compression to 3.7 GPa the sizes of the voids in the (16) ring are reduced, leading to the observed shortening in the CH⋯O and NH⋯O hydrogen bonds which form within these layers. It is notable that the S⋯S interaction is approximately parallel to the N1—H4⋯O1 C(5) chains, and the change of −0.18 Å in the former is reflected in the −0.15 Å change in the latter.

Figure 7 Space-filling plots showing (16) ring-motifs L-cystine at ambient temperature and pressure (a), 2.3 GPa (b) and 3.7 GPa (c), and α-glycine at ambient temperature and pressure (d) and at 2 GPa (e). Note the reduction in the sizes of the voids in the middle of the ring motifs with increasing pressure.

There is a collection of voids between the glycine-like sheets in the region labeled 3 in Fig. 6(a). Voids are less evident within the R₂²(10) ring motifs, which connect pairs of glycine-like layers, than in the (16) rings formed within the layers (see also Fig. 4). This may explain why the N1—H6⋯O1 hydrogen bond is the least compressible of the N—H⋯O interactions in the system. Larger voids do exist elsewhere in region 3 though, as shown in Fig. 6(a). There is a marked contraction of the void between the two O atoms labeled O2 in Fig. 8, with the O⋯O distance reducing from 3.643 (4) to 3.350 (15) Å, between ambient pressure and 3.7 GPa. The reduction of the N1—C2—C3—O2 torsion angle from 166.12 (8)° to 164.1 (7)° may also be associated with the void closure in this region of the structure. Overall the distance between the planes containing the C2 (or C_α) atoms in neighbouring glycine-like layers (labelled A in Fig. 9) reduces from 3.729 (2) Å at ambient pressure to 3.539 (21) Å at 3.7 GPa.

Figure 8 Voids formed between glycine-like layers at ambient pressure (a and b) and at 3.7 GPa (c). Note the reduction in the sizes of the voids in (b) and (c) with increasing pressure.

Figure 9 Ball-and-stick models of L-cystine at (a) ambient pressure and (b) 3.7 GPa as viewed down (). The red planes are through the Cα atoms in each glycine-like layer running perpendicular to the c-axes of each plot. The overall compression of L-cystine caused via the `twisting' of the molecules can be seen in compression between the layers (A), and between pairs of layers (B). The distance between layers A and B reduces from 3.729 (2) to 3.539 (21) Å, and 5.597 (2) to 5.386 (22) Å from ambient to 3.7 GPa, respectively. The distance between the first and last adjacent pairs of layers for both the ambient and 3.7 GPa data sets is shown.

The final conglomerate of voids (4) occurs in the region formed by the NH₃—CH—CH₂—S moieties. The C—S—S—C torsion angle reduces from 75.27 (18)° at ambient pressure to 72.3 (4)° at 3.7 GPa. Since the S—S bond is approximately perpendicular to the c-axis the conformational change reduces the height of the molecule in the c-direction, and the distance between the planes containing the C_α atoms either side of the disulfide bridges (labelled B in Fig. 9) reduces from 5.597 (2) Å at ambient pressure to 5.386 (22) Å at 3.7 GPa. The twisting action of the L-cystine molecules could be described as a molecular `spring', whose action allows the compression of the structure along the c-axis direction.

4.2. Comparison of compression in α-glycine and L-cystine

We have previously determined the crystal structure of α-glycine at 2.0 GPa (Dawson et al., 2005), and in this paper we report the crystal structure of L-cystine at 2.3 GPa. Given the similarity in the layer structures of L-cystine and α-glycine it is interesting to compare the effect of pressures around 2 GPa on this part of the two crystal structures. Fig. 7 compares the voids in the two structures as a function of pressure.

α-Glycine is the more compressible of the two structures and at 2 GPa its unit-cell volume is 90% of its ambient pressure value; the corresponding figure of cystine is 93%. Comparison of Figs. 7(a) and 7(d) suggests that the voids in the centres of the (16) rings are slightly larger in α-glycine than in cystine, and this observation can be quantified by comparison of the respective areas of the ac and ab unit-cell faces in the two structures.² At ambient pressure these areas are 25.904 (2) Ų for glycine and 25.444 (3) Ų for cystine. At 2 GPa the areas are remarkably similar: 24.429 (8) Ų for glycine and 24.446 (1) Ų for cystine.

The overall similarity of the structures of the glycine-like layers is reflected in the similarity of the mean values of the principal components of the strain tensor which reside in the layers in both structures, viz. −0.03 for glycine and −0.02 for cystine. That the value for glycine is slightly higher than for cystine is presumably ascribable to the more efficient packing in cystine at ambient pressure.

Compression in the ab plane of cystine is constrained by the crystal symmetry to be isotropic, and this is reflected in the similar responses of the N1—H4⋯O1 and N1—H5⋯O2 hydrogen-bond distances to pressure (Table 2), which shorten by 0.10 and 0.08 Å, respectively. In α-glycine [which is monoclinic with the b-direction perpendicular to the view shown in Figs. 7(d) and 7(e)] the strain is markedly anisotropic. The largest strain component (−0.06) acts to close up the voids in the structure by forming a CH⋯O interaction as shown in Figs. 7(d) and 7(e). The N—H⋯O hydrogen bond which forms parallel to this C—H⋯O interaction shortens by 0.10 Å, whereas the other barely changes in length at all.