Plants, insects and animals have developed fascinating mechanisms for passive or active motility required for dispersal, defense and survival1,2,3,4,5,6,7,8,9,10. In 2010, we reported in amazement that in distant analogy with rapidly motile biological systems, when excited by heat or light certain molecular crystals are able to launch and propel themselves, travelling over large distances without chemical reaction/decomposition11. These thermosalient (TS) and photosalient (PS) effects12,13,14,15,16 are mechanistically impressive phenomena which demonstrate that dynamic molecular crystals can accumulate extraordinarily high elastic energy—a property that if controlled could be put to a good use within the realm of alternative transduction of thermal energy into mechanical work. Self-actuation of a still object, such as a crystal, requires that it navigates three challenges: (1) generation of stress by a phase transition or chemical reaction, (2) accumulation of elastic energy over long range, and (3) sudden release of the accumulated energy by rapid mechanical reconfiguration or ejection of debris. Typically, the TS and PS crystals reach an in-plane component of the speed of 0.2–0.8 m s−1 and carry kinetic energy on the order of 1–104 pJ17. The times to reach these velocities are incredibly short, with the debris being able to accelerate itself in less than a millisecond. The crystals or the debris travel distances that normally range from several millimeters to several centimeters (longer distances are anticipated in absence of drag from the air). The current record-holder in respect to the distance that crystals of TS materials can reach is N′-2-propylydene-4-hydroxybenzohydrazide, an imine of acetone (IMACET, Fig. 1) whose crystals were recently reported by some of us to be able to travel distances of up to one meter in air18. The mechanical effect in these crystals can be stimulated by a stochastic event or by applying localized external pressure to trigger the phase transition. The accumulated strain energy is accrued until the point when an instantaneous release is triggered that results in crystal explosion or hopping (Fig. 2). The strain energy is partitioned between the elastic energy of disintegration that accounts for crystal fracture and the kinetic energy that is carried away by the fragments that fly off. However, understanding of the structural subtleties that are specific to the exotic properties of these materials remains elusive. Here we report that the thermosalient effect in IMACET is preceded by anomalous distortion of the unit cell with remarkably strong biaxial positive expansion. The material also exhibits the largest uniaxial negative expansions reported thus far. To study the effects of the strength of intermolecular interactions and the molecular mass on the the thermosalient effect, two deuterated variants of IMACET were also prepared. When taken together with the previous studies, the results indicate that the occurence of the thermosalient effect could be used to identify solids with anomalous thermal behavior, including new materials with large negative expansion that are of essence to organic electronics. It is also concluded that the temperatures of the thermosalient transitions are sensitive to and can be altered by deuteration.

Figure 1
figure 1

Chemical structures and phase transitions of IMACET and its deuterated analogues.

Figure 2: Thermal behavior and thermosalient effect in crystals of protiated and deuterated variants of IMACET recorded by variable-temperature optical microscopy.
figure 2

(a) IMACET-H6 on cooling by liquid nitrogen. (b) IMACET on heating. (c) IMACET-D2 on cooling. (d) IMACET-D2 on heating. (e) IMACET-D6 on cooling. (f) IMACET-D6 on heating (the background of this set of images appears darker due to the use of polarizing filter). (g) IMACET and IMACET-D2 on heating. (h) Form I and form III of IMACET-D2 on heating.

Results and Discussion

IMACET was prepared according to a published procedure18 and its deuterated analogues were obtained by using deuterated precursors and characterized by 1H NMR spectroscopy (Supplementary Figures 1–4) and variable-temperature (VT) IR spectroscopy (Supplementary Figure 5). The thermal behavior of the polymorphs was characterized by differential scanning calorimetry (DSC; Fig. 3 and Supplementary Figure 6) and VT powder X-ray diffraction (Supplementary Figures 7 and 8). To obtain insight into the role of the intermolecular interactions on the TS transition, two isotopically labeled variants were also prepared and characterized—IMACET-D2, deuterated in the acidic protons, and IMACET-D6, deuterated in the methyl groups (typical habits obtained by recrystallization are shown in Supplementary Figure 9). The phase transitions were monitored by optical microscopy. Wherever possible, native crystals were used to avoid suppression of the effect by grinding17.

Figure 3: Thermal (DSC) profile of crystals of IMACET, IMACET-D2 and IMACET-D6 above room temperature showing the phase transitions between forms I–III.
figure 3

The two consecutive thermal cycles are shown in different colors.

IMACET has been classified as one of the only few materials that belong to the class III TS solids14,17—crystalline solids that are distinct from the other two classes by having networks of low-dimensional hydrogen bonds that can accumulate elastic strain due to molecular distortion thereby effectively temporarily suspending a structural phase transition. It can be switched thermally between three orthorhombic phases (forms I, II and III) of which only the irreversible transition from form I to form II is accompanied by a TS effect17,18. As shown with the images in Fig. 2, on heating all crystals undergo irreversible phase transition from form I to form II. The transition I → II is accompanied by a strong TS effect whereby the crystals fiercely explode and hop off the stage (Supplementary Movies 1–5). The deuterated crystals are also TS-active on heating (Supplementary Movies 6–10). These events are accompanied by endothermic effects and a saw-tooth profile in the differential scanning calorimetry (DSC) measurements—a signature of other TS solids17 and inorganic martensitic phases19,20.

The thermal (DSC) profile of the phase transitions of as-synthesized, unground crystals of IMACET, IMACET-D6 and IMACET-D2 show that the temperature of transition I → II is affected by deuteration (Fig. 3). Deuteration at the methyl groups (IMACET-D6) increases (425–428 K) while deuteration of the NH/OH groups (IMACET-D2) decreases (406–408 K) the transition temperature relative to the protiated (non-deuterated) compound (415.5–422.7 K). The opposite trend observed with the two isotopomers could indicate that the isotope effect on transition temperature is not a mere consequence of different crystal density related to the molecular mass, where retardation of the transition (shift to higher temperature) could be expected for both deuterated variants. Instead, the isotopic substitution appears to affect the transition by altering the hydrogen bonding strength (see below). This result highlights the role of the intermolecular interactions on the evolution and progression of the elastic waves that drive the TS effect. On cooling from 450 K all crystals of thermally generated form II undergo non-TS transition II → III, which is accompanied by exothermic effect at 353, 354 and 349 K for IMACET, IMACET-D6 and IMACET-D2, respectively. As shown with Supplementary Figure 6 and Supplementary Movies 11–13, no thermal effects could be detected below room temperature (down to 103 K). Unlike the irreversible transition I → II, in all deuterated variants the transition II ↔ III is reversible and can be repeated by heating-cooling cycles (Fig. 3). As a future prospect, one could control the temperature of mechanical response by using mixtures of deuterated and non-deuterated samples. Such temperature tuning of the effect could be relevant for applications of TS materials in energy transduction devices.

The rapid motion of IMACET crystals was observed with a microscope coupled to a hot stage and recorded with high-speed camera (frame rate (2–5)·103 s−1; Supplementary Movies 2–5). The kinematic analysis revealed that the motion is not uniform and occurs as a variety of kinematic effects ranging from small displacements to bursting to fierce hopping off the stage (Fig. 4d–g). For direct comparative assessment of the kinematics of deuterated and non-deuterated crystals and to account for eventual size effects, several batches of crystals of similar size were hand-picked and simultaneously heated. In line with the order of transition temperatures determined by DSC (Fig. 3), on heating to high temperature, the time required for stress accrual before the crystals hopped increases in the order IMACET-D2 < IMACET < IMACET-D6 (Fig. 4d–f; Supplementary Movies 14–16). This result confirmed that by affecting the TS transition temperature, the deuteration has strong effect on crystal motility. The contrasting effect on the transition temperature by D2- and D6-deuteration can be interpreted as a tradeoff between two factors, the strength of intermolecular interactions and molecular weight. The retardation of the phase transition by deuteration in the methyl positions (D6) is related to increase in molecular mass. Deuteration of the N/O protons (D2), on the other hand, brings about small increase in molecular mass, however the effect is outweighed by strengthening of the hydrogen bonding21,22,23,24. This conclusion parallels the key role that the intermolecular interactions play in the evolution of the mechanical effect of class III TS solids, in contrast with class I and class II. Due to difficulties with maintaining the optical focus on the crystals during the experiment, it was not possible to distinguish between the most common types of motion (kinematic patterns) of protiated and deuterated crystals.

Figure 4
figure 4

Face indices (a–c) and snapshots of the thermosalient effect in crystals of the three isotopic variants of IMACET (d–g). The images of protiated IMACET (denoted H6 for clarity; green circles), IMACET-D2 (D2, yellow circles) and IMACET-D6 (D6, purple circles) in panels (d–g) were extracted from high-speed video recordings (recording rate: (2-5)·103 s−1).

The anisotropic volume change of the crystals during the phase transition, which ultimately drives the TS effect, can be considered a result of differential growth of the crystal faces of form I upon its conversion to form II. A thermodynamic approach to understand this anisotropy is to calculate the surface formation energies within the Wulff’s theory that describes the thermodynamic equilibrium shape of the crystal25. Within this theorem, the equilibrium shape is considered a result of planes parallel to the faces whose distance from the barycenter is proportional to the surface formation energy.

The crystals of the three forms of IMACET and selected surfaces were modeled by employing the slab approach (for details of the calculations, see the Supplementary Methods). Thin films (2D periodic systems) parallel to the (hkl) planes that define the surfaces were sliced out from a previously optimized bulk structure. Being a wide band gap molecular insulator, the slab included only complete molecules. The properties rapidly converged with thickness (the convergence of the surface formation energy with slab thickness was confirmed). Depending on the spacing of the (hkl) lattice planes, the slab thickness necessary for convergence (based on the similarity with the bulk-like behavior in the middle of the slab) was in the range 1.5–2.0 nm. The surface formation energy (surface tension) γ was calculated26 for each crystal face of each crystallographic phase as γ = (EslabEbulk)/2nA, where Eslab is the total energy of the slab model, Ebulk is the energy of the bulk, n is the number of bulk unit cells present in the converged slab, and A is the area of the 2D unit cell in the slab (the factor 2 accounts for the two surfaces parallel to the given crystal face within the slab model).

The results from the calculations of the surface tension and relative area of the main crystal faces for the three orthorhombic polymorphs of IMACET are reported in Table 1, and the crystal models are depicted as Wulff-Gibbs polyhedra in Fig. 5a. In crystals of forms I and II, the widest faces are (100) and (011) and their Friedel/symmetry counterparts, (00) and (0). In line with the structural similarity between forms I and II inferred from the cell similarity index17, these two forms have very similar surface energies. The calculated surface tension conforms to the morphology observed with crystals of phase I which appear as elongated prisms with well developed (011), (01), (100) and (00) faces (note that indexing of the smaller crystal faces is irrelevant for the purpose of this study, and was not attempted). The calculated changes during the non-TS transition from form II to form III are much more pronounced; this transition is accompanied by expansion on (001) and (010) and shrinking on (011). We note that based strictly on morphology the mode of parting of crystals of form I during the TS transition appears to be related with the pattern of the calculated surface tensions. The new surfaces created upon splintering correspond to crystal faces with low surface tension, as reported in Table 1 (i.e., (100) and (010) for phase III).

Table 1 Surface tension (γ) and relative area (A) of selected crystal faces of phases I, II and III.
Figure 5: Correlation among surface tension, crystal habit and modes of parting of freely standing IMACET crystals during the thermosalient transition.
figure 5

(a) Wulff-Gibbs polyhedra calculated for forms I, II and III. (b) Face indices of the crystal before the transition (left), and of two typical fragments obtained after the phase transition (center, right). (c) SEM images of the typical fragments, schematically shown in panel b, that are obtained by splintering of the crystals in the course of the thermosalient transition (the first and the second image show different views of the same fragment).

In several experiments, free-lying individual single crystals of form I were taken in turn over the TS transition by heating on a hot plate, whereby they sprang off and/or splintered. Any large fragments that were obtained in addition to the smaller debris were collected, face-indexed by optical microscopy and examined by scanning electron microscopy (SEM). The one-to-one correspondence of the unit cells of the forms I and II17,18 facilitated structure comparison.

As a typical crystal habit, Fig. 5b shows schematic representation of a 1.5 mm-thick prismatic crystal with lozenge-shaped bases. The crystallographic axes b and c are parallel to the diagonals of the lozenge faces, while the a axis runs along the long side of the prism. After the TS transition, two large pieces were retrieved from the debris, which are also sketched in Fig. 5b. One of the fragments had faces (00) and (100) with comparable area to the parent crystal, however it was only 0.16 mm thick along a. Thus, this fragment had separated out from the parent crystal by parting along the planes (100) or (00). Similar to the first fragment, the second fragment also had wide (100) and (00) faces, but was thick 0.3 mm along a. Comparison of the crystal habits of the two fragments (Fig. 5b) indicates that the second fragment was obtained from a fragment similar to the first fragment that additionally split along (010) and lost a piece (the complementary piece was recovered from the debris). These two habits of the crystal debris were fairly consistent across multiple experiments, indicating that crystals typically disintegrate by splitting normal to the crystallographic axis a, and in some cases by splitting normal to the b axis. Inspection of the fragments by SEM (Fig. 5c) showed relatively smooth surface along the new faces (00) and (100). On the other hand, the newly generated faces (010) were uneven and had visible indentations, ditches and other defects. Thus, while the crystals split cleanly perpendicular to the a axis, splitting perpendicular to the b axis results in rugged surface.

Fixation of the crystals to solid support by using minimal amount of glue restrains their deformation prior to explosion and results in different kinematic outcome (Fig. 6). When the crystals are affixed with their large lateral faces (011) or (01), the TS transition usually results in transverse cracks and fissures, with minor parting of the fragments (Fig. 6a,b). Instead, when the crystals are affixed with their basal face (100) or (00), they explode into fragments of variable size (Fig. 6c,d). The basal part of the crystals remains attached, while the TS transition induces vertical propulsion of the leaving fragments that were found scattered over the microscope stage. Similar to free (unconstrained) specimens, these crystals split with a clean surface perpendicular to the a axis.

Figure 6: Correlation between the mode of splitting, crystal habit and thermal expansion during the thermosalient effect of affixed (constrained) IMACET crystals.
figure 6

(a) Schematic of a typical disintegration of a crystal glued on the (01) face. (b) SEM images of a typical crystal glued with its (01) face before (far left panel) and after the phase transition (the other panels). The circled areas are zoomed for clarity. (c) Schematic showing typical disintegration of a crystal that was glued with its (100) face onto the basis (d) SEM images before (the two panels on the far left) and after (the other panels) the transition of a typical crystal glued onto the surface with its (100) face. The dashed red arrow shows top view of the parent crystal before the transition. (e) Correlation between the mode of splitting of the crystal and the thermal expansion that causes build-up of stress.

Most of the TS phase transitions are isosymmetric, that is, the crystal group symmetry is preserved, and in many cases the changes in the unit cell volume as well as the structural changes at a molecular level are unexceptional14,16,17. Based on the preceding discussion, it can be concluded that the mode of splintering of IMACET is related to changes in the unit cell that occur before and during the transition. The fortuitous one-to-one correspondence between the unit cell parameters of forms I and II of IMACET allows direct comparison of their packing structures. The transition of form I (298 K) to form II (373 K) is accompanied by strongly anisotropic deformation where two axes, a (+8.8%) and b (+12.3%) expand. As shown in Fig. 7a–c, however, axis c contracts (~−15%) on transitioning of form I to form II. These changes that occur during the phase transition can be considered in view of the thermal expansion of the crystals of form I preceding the phase transition, a process that “prepares” the structure for switching to that of form II. Indeed, inspection of the temperature profile of the unit cell preceding the transition provides a hint for the reasons behind the observations. The thermal expansion along all three orthogonal axes in form I of all three isotopic variants is anomalous, with strong positive thermal expansion (PTE) along a and b axes of αa = 225.9 × 10−6 K−1 and αb = 238.8 × 10−6 K−1, respectively, and negative thermal expansion along the c axis, αc = −290.0 × 10−6 K−1 in case of the non-deuterated IMACET (Fig. 7a–c). These thermal expansion coefficients, calculated by using the equation αl = (1/l)(δlt)P27 are higher than the values that are commonly considered normal for molecular solids (0–20 × 10−6 K−1) and are extraordinarily high for an organic material. To the best of our knowledge, the NTE of IMACET along the c axis, −290.0 × 10−6 K−1, is the highest NTE values recorded for an organic crystal. It also surpasses the high NTE values reported for organic and metal-containing compounds, Ag3[Co(CN)6] (−130 × 10−6 K−1)28,29, metal organic framework FMOF-1 (−170 × 10−6 K−1)30, (S,S)-octa-3,5-diyn-2,7-diol (−205 × 10−6 K−1)31, Cd(34pba)(44pba)], MCF-82 (−218 × 10−6 K−1)32, and [Zn(L)2(OH)2]n·nCH3OH (L = 4-(1H-naphtho[2,3-d]imidazol-1-yl)benzoic acid; −21 × 10−6 K−1)33. This value seconds only the negative expansion reported recently for the metal-organic framework copper(II) tricyanomethanide, −407(28) × 10−6 K−134 (Note: An anonymous reviewer of this article has brought to the authors’ attention that this value was calculated over a temperature range where the expansion is nonlinear and therefore may not be directly comparable to the values reported here or to other reported values for colossal thermal expansion).

Figure 7: Thermal expansion and mechanism of the TS effect in IMACET.
figure 7

(a) Thermal variation of the unit cell axes (the standard deviations are shown as the thickness of the connecting lines). (b) Thermal expansion coefficients and plot of the expansivity indicatrices along the principal axes calculated as αl = (1/l) (δlt)P with PASCal27. The principal axes X1, X2 and X3 coincide with the crystallographic axes c, a and b, respectively. Red and blue colors represent positive and negative thermal expansion. (c) Change of the unit cell parameters across the TS phase transition (the standard deviations are smaller than the symbols). (d–f) Schematic representation of the intermolecular hydrogen bond O1—H1···O2 related to the negative thermal expansion along the c axis. (g,j) Variations of the distance between the donor (D) and the acceptor (A) in the hydrogen bonds O1—H1···O2 and N1—H1A···O2 that account for anisotropy in the thermal expansion. (h,i) Cartoon showing gradual decrease in the O1···O2 distance on heating that results in supramolecular jack-like distortion. This deformation causes concomitant positive thermal expansion along the b axis and negative thermal expansion along the c axis. (k,l) Cartoon showing the increase in the distance of the hydrogen bond N1···O2 that acts as hinge-screw. The elongation of this bond on heating accounts for the positive thermal expansion along the a axis.

In another organic TS solid, the chiral L-pyroglutamic acid, one of the two forms (β) associated with the TS phase transition (in this case, the high-temperature form) undergoes biaxial NTE (αa = −54.8(8) × 10−6 K−1, αc = −3.62(8) × 10−6 K−1) and exceptionally large uniaxial thermal expansion (αb = 303(1) × 10−6 K−1) (note that these values were obtained by fitting powder X-ray diffraction data with the same formula used in this work)16. In a palladium organometallic TS material, the thermal expansion coefficients of phase α that undergoes TS transition to form γ are αa = 260.4(3) × 10−6 K−1, αb = 39.4(4) × 10−6 K−1 and αc = −79.9(2) × 10−6 K−1 (these values were calculated along the three (non-orthogonal) crystallographic unit cell axes by using the equation p = p0{1 + αp(TT0)[1 + αp(TT0)]} from powder X-ray diffraction data)12. Together with the results on IMACET presented here, these results indicate that the anomalous thermal expansions is invariably associated with TS effect as a prerequisite for crystal motility and explosion. As shown by the expansive indicatrices and the thermal expansion coefficients in Fig. 7b and Supplementary Figure 10, the thermal expansion of the deuterated crystals follows identical trend with similar expansivities. The shapes of the expansion plots along different axes of IMACET and IMACET-D2 are also similar, however both are different from that of IMACET-D6, as expected from the differences in hydrogen bonding strength caused by H/D substitution24.

Comparison of single crystal data at 270 K and 400 K showed that variation of coordination framework arises from the anisotropic change in hydrogen bonding. The relevant hydrogen bonds are depicted in Supplementary Figure 11 (see also Supplementary Table 5). In a rather simplified representation of the crystal structure, the hydrogen bond between the amide nitrogen and carbonyl oxygen (N1—H1A···O2) acts like a “hinge screw”32 along the crystallographic a axis. These screws connect the molecules in the bc plane. As shown in the plots in Fig. 7j–l, this distance increases with increasing temperature (270–400 K) and accounts for the PTE along the a axis. The distance of the O1—H1···N2 hydrogen bond (roughly parallel to the a axis) also increases with increasing temperature and accounts for the PTE along the a axis (Supplementary Figure 12). On the contrary, increasing temperature brings about apparent contraction of the hydrogen bond O1—H1···O2 (Fig. 7g–i). This contraction causes shrinking of the unit cell and is responsible for the uniaxial NTE along the c axis. Since at a molecular level contraction of a hydrogen bond by heating is not viable, it is likely that this apparent “contraction” is in fact an effect of the expansion of a stronger hydrogen bond, that is, O1—H1···N2, where the bond rotates around the hydrogen atom H1. Supplementary Movie 17 contains stick models of the structure showing the changes that occur by heating of the crystal to the TS transition and during the transition. The anisotropic changes in the unit cell are reflected in “breathing” of the structure—reversible expansion and contraction of the crystal when it is thermally cycled over the reversible phase transition III ↔ II (Supplementary Movie 18). As shown in Fig. 7g,j, the uniaxial distortions along the unit cell axes are not mutually independent; the hydrogen bonding contraction along the c axis results in a jack-like deformation and expansion along the b axis, causing PTE in that direction (Fig. 7d–f, Supplementary Movie 17). The characteristics of the new faces that evolve upon parting of the crystals are in accord with this model of an anisotropic, yet flexible structure: while the amide-like chains predominate along the a axis, there are no hydrogen-bonded chains along the b axis.


The TS effect provides visually impressive demonstration of the action of elastic energy that can be stored within the crystal lattice of ordered solid matter. Mechanistically, these dynamic processes are related to diffusionless, synchronous (“military”) transitions whereby the accrued energy is suddenly released—if attained below a critical value—into kinetic energy and drives crystal reshaping. Higher energies take the crystal out of the elastic regime and lead to development of cracks, causing disintegration. Here we demonstrate that the elastic strain can be modulated by isotopic substitution. More importantly, the TS transitions are preceded by exceedingly strong anomalous expansion of the unit cell. At a supramolecular level, these peculiarities are rooted in the thermal anisotropy of hydrogen bonding interactions. Crystals of N′-2-propylydene-4-hydroxybenzohydrazide (IMACET) studied here can travel distances of up to about one meter when the strain energy related to strong biaxial thermal expansion and uniaxial negative thermal expansion is released during a thermosalient phase transition. In the crystal of this material, the expansion of the hydrogen bonding network causes PTE along the a axis, whereas shortening of the distance between the hydroxyl oxygen and carbonyl oxygen causes NTE along the c axis and results in the largest negative expansion in an organic compound observed thus far. Within a broader perspective, the results indicate that the TS effect can have predictive value in identifying organic materials with negative thermal expansion which can be utilized as non-expanding organic electronic components.


Synthesis and deuteration

IMACET was synthesized following a published procedure18. The deuterated analogues (99% D) were prepared by using deuterated reactants and solvents (for details on the synthetic, crystallization and characterization procedures, see the Supplementary Methods).

Optical microscopy

The thermal behavior was analyzed using an optical hot stage microscope composed of temperature-controlled stage THMS600-PS (Linkam) mounted on Q-imaging (Q32643) optical microscope. Samples were heated or cooled to specific temperature from room temperature (300 K) at a constant heating rate of 5 K min−1. The kinematic behavior was recorded with high-speed camera (HotShot 1280 CC, NAC) mounted on Stereozoom SMZ745T Trinocular Stereoscope (Nikon).

Electron microscopy

FESEM FEI Nova NanoSEM 450 instrument was used to image crystals with Scanning Electron Microscopy (SEM). The crystals were attached to a carbon tape and sputtered in a DentonVacuum Desk V HP sputterer using an alloy of gold/palladium target prior to observation.

X-ray diffraction (XRD) analysis

Single crystal XRD data were collected on a Bruker SMART APEX II diffractometer with monochromated MoKα radiation (λ = 0.71069 Å) equipped with CCD area detector. Data reduction was performed using the SAINT software and analyzed for agreement using XPREP35. Absorption correction was applied with SADABS36. All structures were determined by the methods included in the SHELXT program of the APEX software suite and refined using SHELXL-201437,38,39,40. The non-hydrogen atoms were refined anisotropically. The hydrogen atoms bonded to oxygen and nitrogen atoms were located from the electron density map and refined by using the AFIX 147 and AFIX 43 commands. The aromatic and aliphatic hydrogens were treated using AFIX 43 and AFIX 137, respectively. For deuterated molecules, the deuterium atoms were assigned by changing the scattering factor of the hydrogen atom and refined in the same manner. The crystallographic details are listed in Supplementary Tables 1–3. The crystallographic data are deposited with the Cambridge Crystallographic Data Centre (CCDC), no. 1415661–1415671, 1415711–1415718 and 1415680–1415684.

Thermal expansion

The thermal expansion coefficients were calculated from the lattice parameters obtained from variable temperature diffraction data collected from good single crystals of IMACET and its deuterated analogs (form I). The temperature was increased in 10 K increments from 270 K to 400–420 K, below the phase transition I → II. The axial thermal expansion coefficients along the principal axes were calculated by using the software PASCal27. The variable temperature unit cell parameters are listed in Supplementary Table 4.

Thermal analysis

Differential Scanning Calorimetry (DSC) was carried out on TA DSC-Q2000 instrument in dynamic helium atmosphere (flow rate 50 mL min−1). Crystals were taken on a Tzero aluminium pan and heated from room temperature (300 K) to the corresponding phase transition temperature at rate 10 K min−1 (300–430 K). The cooling rate was reduced to 5 K min−1 in the 298–173 K range and to 2 K min−1 in the 173–103 K range.

Computational methods

The calculations were performed using the CRYSTAL14 program41,42 and the B3LYP43 hybrid density functional. A Gaussian type orbital basis set was adopted of double zeta plus polarization quality44. The computational details are available as Supplementary Methods.

Additional Information

How to cite this article: Panda, M. K. et al. Strong and Anomalous Thermal Expansion Precedes the Thermosalient Effect in Dynamic Molecular Crystals. Sci. Rep. 6, 29610; doi: 10.1038/srep29610 (2016).