1. Introduction

Chiral liquid crystalline substances with three aromatic rings in a molecular core and partially fluorinated alkoxy chain [1,2,3,4,5,6,7,8] are desired materials in liquid crystal display (LCD) technology as they often exhibit a smectic ${\mathrm{C}}_{\mathrm{A}}^{*}$ (${\mathrm{SmC}}_{\mathrm{A}}^{*}$) phase, showing antiferroelectric properties in the surface-stabilized geometry [9]. Moreover, the tilt angle in these compounds often approaches 45°, which leads to the optical uniaxiality and, consequently, far better quality of the dark state compared to the ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phase with the smaller tilt angle [10,11]. For a few of the mentioned fluorinated smectogens, the glass transition of the ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phase was reported, even for slow cooling (1 K/min or at an even lower rate, enough to avoid crystallization) [12,13,14,15,16,17,18]. It allows for the obtainment of glass with anisotropic properties, whose practical application was already proposed both for smectic and nematic glassformers [19,20,21,22,23]. In this study, we report results regarding the vitrification of the ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phase and kinetics of the isothermal cold crystallization on subsequent heating for (S)-4′-(1-methylheptylcarbonyl)biphenyl-4-yl 4-[7-(2,2,3,3,4,4,4-heptafluorobutoxy)heptyl-1-oxy]benzoate, denoted in short as 3F7HPhH6. This compound belongs to a family of 3FmX₁PhX₂r compounds [4,5,6], with a general formula presented in Figure 1a. Differences in the molecular structure within the 3FmX₁PhX₂r family exist in the length of the alkoxy chain (m = 0, 2–7) and chiral alkyl chain (r = 4–9), as well as the fluoro substitution of the benzene ring (X₁, X₂ = {H, F}). The 3F7HPhH6 compound, chosen in this paper, was investigated by differential scanning calorimetry (DSC), polarizing optical microscopy (POM) and broadband dielectric spectroscopy (BDS). The obtained results were compared with those already reported for the 3F7HPhF6 [12,13] and 3F7HPhH7 [16,17,18] compounds with a similar molecular structure, in order to discuss the influence of the F substituent and the length of the -C_rH_2r+1 chain on the glassforming properties and cold crystallization kinetics. It was shown that 3F7HPhH6 has a smaller fragility index and crystallizes slower than the two previously studied compounds. The relationship between the molecular structure of the 3FmX₁PhX₂r compounds and the mentioned properties is still not fully explained and, therefore, it requires wide, systematic studies.

2. Materials and Methods

(S)-4′-(1-methylheptylcarbonyl)biphenyl-4-yl 4-[7-(2,2,3,3,4,4,4-heptafluorobutoxy) heptyl-1-oxy]benzoate, abbreviated as 3F7HPhH6, was synthesized according to the method described in [4,5] from the Institute of Chemistry of Military University of Technology in Warsaw, Poland.

DFT calculations for an isolated 3F7HPhH6 molecule were conducted in Gaussian 09 [24] with a B3LYP exchange-correlation potential, def2TZVPP basis set and Grimme’s 3D dispersion with Becke–Johnson damping. Preliminary calculations were performed in MOPAC2016 [25] with the semi-empirical PM7 method (see Figure S1 in the Supplementary Materials). Visualization was performed in Avogadro [26].

DSC measurements were performed for a sample weighing 8.460 mg, contained in a standard aluminum pan with the DSC 2500 (TA Instruments) calorimeter during cooling and subsequent heating, at rates of 2, 5, 10, 15, 20 K/min in the 153–413 K range. For the investigation of isothermal cold crystallization, the sample was cooled for each crystallization temperature from 393 K to 193 K at a rate of 10 K/min, heated to a selected temperature (273, 278, 283, 288, 293 K) at a rate of 10 K/min and kept in isothermal conditions until the end of crystallization, then heated to 393 K at a rate of 10 K/min. The results were analyzed with TRIOS software.

POM observations were performed for a sample between two glass slides without any aligning layer, under a Leica DM2700 P microscope with a Linkam temperature attachment. Textures were registered during cooling at a rate of 2 K/min in the 353–393 K range, and during cooling at a rate of 20 K/min and subsequent heating at a rate of 2 K/min in the 193–393 K range. The textures were analyzed numerically in the ImageJ program [27] using two methods. In the first method, textures were transformed into binary black-and-white images, and the fractal box count analysis [28,29] was applied for each texture, then the fractal dimension was plotted vs. temperature. In the second method, textures were split into red, green and blue components. The histogram of pixel luminance was made for each component, then the modal luminance of the blue component (the most sensitive to phase transitions) was plotted vs. temperature. Examples of numerical analysis are presented in the Supplementary Materials in Figures S2 and S3.

BDS measurements were performed for a sample of ca. 50 μm thickness between two gold electrodes with the Novocontrol Technologies spectrometer. The dielectric spectra were registered in the frequency range of 1–10⁷ Hz upon cooling and heating in the 173–383 K range. Additional measurements in the external bias field of 40 V were performed in the 363–383 K range during cooling to investigate the soft mode after suppression of the stronger Goldstone mode. In order to study isothermal cold crystallization, the sample was cooled directly from 383 K to 173 K, heated to a selected temperature (265, 268, 271, 273 K) and kept at this temperature until the end of crystallization.

3. Results and Discussion

3.1. Phase Sequence

The results of the DSC measurements (Figure 2, Table 1) show that 3F7HPhH6 is a glassformer undergoing the vitrification of the ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phase, even for the smallest applied cooling rate, 2 K/min. The glass transition temperature, obtained as an inflection point in the DSC curve in the 225–250 K range equals $T_g$ = 233 K for 2 K/min and increased with the increasing cooling rate to 234.5 K for 20 K/min. The spiky anomalies appearing below $T_g$ are probably caused by small fractures in the vitrified material. After heating back up above the glass softening temperature, cold crystallization was observed for only the 2 K/min heating rate (Figure 2a). The small anomalies between 260 K and 275 K on heating are connected with the pre-transitional effect. The larger exothermic anomaly, with the onset temperature of 275.7 K, originates from cold crystallization. The following two endothermic anomalies with onset temperatures of 287.2 K and 301.2 K are explained as the melting of two crystal phases, denoted as Cr2 and Cr1, respectively. For higher heating rates (5–20 K/min, Figure 2b) the cold crystallization was not observed, and the sample remained in the ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phase until the ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ → ${\mathrm{SmC}}^{*}$ transition. The transitions between the smectic phases took place close to the clearing temperature, and were revealed as small anomalies in the DSC curves, as presented in the insets in Figure 2a. The results from heating imply the presence of three smectic phases, which agrees with earlier results [5]. However, during cooling, an almost negligible additional anomaly was visible, merged with a larger anomaly connected with the Iso → ${\mathrm{SmA}}^{*}$ transition. It could be a sign of the presence of the fourth smectic phase, namely the ${\mathrm{SmC}}_{\mathsf{\alpha }}^{*}$ sub-phase, previously reported for the 3F5FPhF6 compound [30].

The observation of cold crystallization by POM was carried out for a sample cooled down at a rate of 20 K/min to 193 K (${\mathrm{SmC}}_{\mathrm{A}}^{*}$ glass) and heated back up at a rate of 2 K/min. The fractal box count analysis makes it easier and more objective to compare the POM results with the DSC curve registered during heating at the 2 K/min rate (Figure 3). The glass softening of the ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phase did not lead to any change in texture (Figure 3a,b), while the pre-transitional effect was noticeable as texture darkening (Figure 3c) and an increase of the fractal dimension above 253 K. Cold crystallization leads to the decrease of the fractal dimension above 275 K and the dark texture observed in the 278–293 K range (Figure 3d) is attributed to the Cr2 phase. The melting of the Cr2 was observed by POM at 294 K as an increase of the fractal dimension. The textures registered above 294 K are similar; however, the numerical analysis indicates a phase transition at ca. 306 K, interpreted as a melting of the Cr1 phase. The textures registered in the 295–306 K range are therefore attributed to a co-existence of the ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phase and developing Cr1 phase (Figure 3e), and textures observed above 306 K are attributed to the pure ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phase (Figure 3f).

The polymorphism of the smectic phases was investigated by POM upon cooling and heating at the 2 K/min rate (Figure 4). In order to unambiguously detect all transitions between the smectic phases, two methods of numerical analysis were necessary: a fractal box count analysis and the determination of the modal luminance of red, green and blue components of each texture. For clarity, only the results for the blue component are plotted in Figure 4. The POM results confirm the presence of the ${\mathrm{SmC}}_{\mathsf{\alpha }}^{*}$ sub-phase upon cooling (Figure 4a). The Iso → ${\mathrm{SmA}}^{*}$ transition is visible as the discontinuity in the fractal dimension at 379 K. In the 373–375 K range, the fractal dimension is much lower than in the ${\mathrm{SmA}}^{*}$ phase, while the texture colour is almost the same. This implies a transition to the ${\mathrm{SmC}}_{\mathsf{\alpha }}^{*}$ phase, which is characterized by a small tilt angle and a very short helix pitch [31,32]. The next phase transition upon cooling occurred at 372.5 K and lead to both the decrease of the fractal dimension and a change in texture color, indicating a more pronounced structural change. It is interpreted as a transition to the ${\mathrm{SmC}}^{*}$ phase, where the tilt angle is larger than in ${\mathrm{SmC}}_{\mathsf{\alpha }}^{*}$ [32]. The results of the numerical analysis indicate two further transitions at 365 K and 361.5 K. There are possible sub-phases between the ${\mathrm{SmC}}^{*}$ and ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phases [31], however, the DSC results indicate a direct ${\mathrm{SmC}}^{*}$ → ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ transition (Figure 2). This is why we interpret the textures observed in the 361.5–365 K range as a co-existence of the ${\mathrm{SmC}}^{*}$ and ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phases, which can occur over a relatively wide temperature range in thin samples, the fact which was confirmed experimentally, based on dielectric spectra, for other compounds [33,34]. A similar situation was observed during heating (Figure 4b). The ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ → ${\mathrm{SmC}}^{*}$ transition occurred with a coexistence region in the 366.5–369.5 K range. The change of texture color and increase of the fractal dimension at 374 K indicates either a ${\mathrm{SmC}}^{*}$ → ${\mathrm{SmC}}_{\mathsf{\alpha }}^{*}$ or ${\mathrm{SmC}}^{*}$ → ${\mathrm{SmA}}^{*}$ transition. The ${\mathrm{SmC}}_{\mathsf{\alpha }}^{*}$ → ${\mathrm{SmA}}^{*}$ transition temperature could not be determined; however, the width of the temperature range, between 374 K and 380 K (${\mathrm{SmA}}^{*}$ → Iso transition), is comparable with the sum of temperature ranges of the ${\mathrm{SmA}}^{*}$ and ${\mathrm{SmC}}_{\mathsf{\alpha }}^{*}$ phases upon cooling (Figure 4c,d). It leads to a conclusion that the ${\mathrm{SmC}}_{\mathsf{\alpha }}^{*}$ sub-phase is also present on heating, and that the transition observed at 374 K should be interpreted as ${\mathrm{SmC}}^{*}$ → ${\mathrm{SmC}}_{\mathsf{\alpha }}^{*}$.

3.2. Molecular Dynamics

The BDS spectra of 3F7HPhH6 registered without the bias field upon cooling and heating are gathered in Figures S4 and S5, respectively, of the Supplementary Materials. The absorption (imaginary) part ${\epsilon }^{″}$ of the complex permittivity is presented vs. frequency in Figure 5a,b for several temperatures. For the analysis of the dielectric relaxation processes of 3F7HPhH6, the Cole–Cole [35] and Havriliak–Negami [36] models were applied together with the contribution of the ionic conductivity to the absorption part [37], leading to the fitting formula:

(1)${\epsilon }^{*}\left(f\right)={\epsilon }_0+{{\displaystyle \sum }}_j\frac{∆{\epsilon }_j}{{\left(1+{\left(2\pi i{\tau }_{j}f\right)}^{1-{\alpha }_j}\right)}^{{\beta }_j}}-\frac{iS}{f},$

The first relaxation process upon cooling arose in the high frequency region of 10⁵–10⁶ Hz at 377 K, which corresponds to the Iso → ${\mathrm{SmA}}^{*}$ transition. This relaxation process is characterized by the Debye distribution (α = 0, $\beta$ = 1), the relaxation time increasing with decreasing temperature from 2.6·10⁻⁷ s to 1.2·10⁻⁶ s between 377 K and 373 K, and a small dielectric increment which increases, respectively, from 0.2 to 1.7 in the same temperature range. This process can, therefore, be identified as a soft mode, a collective fluctuation of the amplitude $\Theta$ of the complex order parameter $\Theta \exp \left(i\phi \right)$ of the smectic phase, where $\Theta$ is the tilt angle and $\phi$ is the azimuthal angle around the tilt cone [37]. Below 373 K, another relaxation process, described by the Debye distribution, with a large dielectric strength reaching 280, appears around the 10³ Hz frequency region. This process is identified as the Goldstone mode, a collective fluctuation of the azimuthal $\phi$ angle of the order parameter [37]. The ${\mathrm{SmC}}^{*}$ → ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ transition occurs at 370 K, when two additional relaxation processes appear in the frequency region between 5·10⁵ Hz and 10⁶ Hz. Three relaxation processes, with the symmetric distribution of relaxation times ($\beta$ = 1), were observed in total, down to 55 K below the transition to the ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phase, as shown in Figure 5a for 343 K. An unknown Y-process, with the lowest frequency, has a dielectric strength equal to 1–1.4 and the Cole–Cole distribution parameter $\alpha$ ≈ 0.17. Two other relaxation processes shown for 343 K can be identified as two phasons. The middle-frequency relaxation process ($f$ = 3·10³ Hz, $∆\epsilon$ = 0.2 at 343 K) is the P_L phason, the so-called antiferroelectric Goldstone mode, connected with in-phase fluctuations of the azimuthal angle $\phi$ in neighboring smectic layers. The high-frequency relaxation process ($f$ = 4·10⁵ Hz, $∆\epsilon$ = 0.6 at 343 K) is the P_H phason, i.e., the anti-phase fluctuations of the azimuthal angle $\phi$ in neighboring smectic layers [33,38,39]. Although the P_L process is a collective mode, its relaxation time shows the Arrhenius behavior (Figure 5d) with the activation energy $E_a$ = 110.8(4) kJ/mol. This is explained by the overlapping of P_L with the molecular s-process (rotations around the axis of the highest moment of inertia) [33]. This assumption agrees with the occurrence of the larger Cole–Cole parameter (wider distribution of $\tau$) for P_L ($\alpha$ = 0.1–0.2) than for P_H ($\alpha$ = 0). Below 300 K, the next high-frequency relaxation process with a dielectric strength of 2–3 was observed, as shown in Figure 5a for 273 K. This relaxation process is characterized by the asymmetric distribution of the relaxation time ($\alpha$ = 0.11, $\beta$ = 0.38 at 273 K), which is typical for the α-process, probably arising from the rotations of molecules around the axis of the smallest moment of inertia (l-process). The l-process is the molecular relaxation process; therefore, its relaxation time should follow the Arrhenius dependence on temperature. However, due to the glass transition in the ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phase, the relaxation time shows a non-linear dependence in the Arrhenius plot (Figure 5d), as described by the Vogel–Fulcher–Tammann formula [40]:

(2)${\tau }_{\alpha }={\tau }_{\infty }exp\left(\frac{B}{T-T_V}\right),$

(3)$m_f={\left.\frac{d\log {\tau }_{\alpha }\left(T\right)}{d\left(T_g/T\right)}\right|}_{T=T_g}=\frac{B{T}_g}{\ln 10{\left(T_g-T_V\right)}^2},$

On subsequent heating up to 253 K, the observed relaxation processes showed the same $∆\epsilon \left(T\right)$ and $\tau \left(T\right)$ dependences as upon cooling (Figure 5c,d). In the 255–265 K range, there is a splitting of the absorption peaks of the α-process (inset in Figure 5b), as similarly reported for 3F7HPhH7 [18]; the lower-frequency peak decreases and the higher-frequency peak increases with increasing temperature. The overlapping of two α-processes is too significant for a fitting of Equation (1). Upon cooling, only a single α-process was observed, and the splitting of this process occurred only on heating above the glass softening temperature; therefore, it can be explained as the rearrangements within the material (pre-transitional effect) before the beginning of crystallization. In the 265–279 K range, the $∆\epsilon$ values of P_H and α-processes decreased quickly with the increasing temperature, indicating cold crystallization, although they did not decrease to zero, which means that crystallization was not complete. Above 279 K, the Cr2 phase started melting, which was shown as an increase of dielectric strength in both processes. After reaching maximum at 289–291 K, the $∆\epsilon$ values decreased, which is a sign of crystallization to the Cr1 phase. The melting of Cr1 started at 295 K, leading to the increase of $∆\epsilon$ of the P_H and α-processes. At 303 K, the $∆\epsilon$ of P_H is the same as that obtained upon cooling, while the α-process is out of the fitting range. In the ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phase after the melting of Cr1, the relaxation processes show the same temperature dependences as observed upon cooling, while in the ${\mathrm{SmC}}^{*}$ phase, a strong X-process, not observed upon cooling, appears at low frequencies (Figure 5b). The unidentified Y-process and X-process both appear at small frequencies. One possible explanation is that they are related to the Maxwell–Wagner relaxation, although this process is more common for samples inside cells with aligning polymer layers [34,37,46]. In our case, the low-frequency processes may be caused by inhomogeneity in the distribution of ionic charge or by the distortion of the molecular alignment [47,48,49]. Since the Y-process appears only in the ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phase and the X-process only in the ${\mathrm{SmC}}^{*}$ phase, the most probable explanation is relaxations arising from different molecular alignments close to the interface and in the middle of the sample. For the X-process, the relaxation related to the phase boundaries is also a possible explanation, since the temperature range of the ${\mathrm{SmC}}^{*}$ phase is narrow.

The soft mode in the ${\mathrm{SmC}}^{*}$ phase is difficult to investigate because it is hidden under the Goldstone mode with a larger dielectric strength. Therefore, the dielectric spectra close to the clearing temperature were registered in the external constant bias field of 40 V. As can be seen in Figure S6 of the Supplementary Materials, the bias field suppresses the Goldstone mode, which enables us to study the weaker soft mode in a wider temperature range. The real part of the complex permittivity at 10⁴ Hz vs. the temperature obtained from the BDS measurement in the bias field is presented in Figure 6. The increase of ${\epsilon }^{\prime }$ at 380.5 K corresponds to the Iso → ${\mathrm{SmA}}^{*}$ transition (shifted to higher temperature compared to the BDS results without the bias field). Two sharp maxima, that appeared on further cooling at 377 K and 375 K are interpreted as the signs of the ${\mathrm{SmA}}^{*}$ → ${\mathrm{SmC}}_{\mathsf{\alpha }}^{*}$ and ${\mathrm{SmC}}_{\mathsf{\alpha }}^{*}$ → ${\mathrm{SmC}}^{*}$ transitions, respectively. In the ${\mathrm{SmC}}^{*}$ phase, the permittivity decreases with a decreasing temperature down to the transition to the ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phase at 372.5 K, below which ${\epsilon }^{\prime }$ has a constant value. The temperature dependence of the frequency and inverse dielectric increment of the soft mode confirm the presence of the ${\mathrm{SmC}}_{\mathsf{\alpha }}^{*}$ sub-phase (inset in Figure 6). According to theoretical predictions, both the frequency and $∆{\epsilon }^{-1}$ of the soft mode decrease with a decreasing temperature in the ${\mathrm{SmA}}^{*}$ phase and increase in the ${\mathrm{SmC}}^{*}$ phase, giving a V-shaped temperature dependence of these parameters [50,51]. For 3F7HPhH6, the decrease of $f$ and $∆{\epsilon }^{-1}$ of the soft mode with a decreasing temperature is observed down to 377 K, but within the 375–377 K range both considered parameters are almost temperature independent. Below 375 K, the values of $f$ and $∆{\epsilon }^{-1}$ apparently start increasing, although the fitting was not possible for temperatures lower than 374 K. The behaviour of the soft mode between 375 K and 377 K implies the presence of the ${\mathrm{SmC}}_{\mathsf{\alpha }}^{*}$ sub-phase, as similar observations were made for the ${\mathrm{SmC}}_{\mathsf{\alpha }}^{*}$ phase in the 3F5FPhF6 compound [30].

3.3. Kinetics of Cold Crystallization

The kinetics of the cold crystallization of 3F7HPhH6 was studied for two samples: the sample within an aluminum pan, used in the DSC measurement (denoted further as the DSC sample), and the sample in the form of a thin film of ca. 50 μm thickness between two gold electrodes, used in the BDS measurement (referred to as the BDS sample). Figure 7a shows the DSC curves registered in isothermal conditions after heating the sample above the glass softening temperature. For each studied crystallization temperature $T_{cr}$ from the 273–293 K range, an exothermal anomaly indicating cold crystallization, was observed. The crystallization degree $X\left(t\right)$ (the fraction of a crystal phase in the sample) was determined by the integration of the exothermal anomaly over time, from the initialization time $t_0$ to the time $t_{end}$ when crystallization finished [52]:

(4)$X\left(t\right)=\frac{{\int }_{t_0}^{t_{end}}\Phi \left(t\right)dt}{{\int }_{t_0}^t\Phi \left(t\right)dt}=\frac{{\int }_{t_0}^{t_{end}}\Phi \left(t\right)dt}{∆H_{cr}},$

The BDS method was used to investigate cold crystallization in the lower temperature range of 265–273 K. Crystallization was visible in the dielectric spectra as a decrease in the dielectric strength of relaxation processes, as shown for $T_{cr}$ = 268 K in Figure 7c. The crystallization degree (Figure 7d) was determined from the BDS spectra as [53]:

(5)$X\left(t\right)=\frac{{\epsilon }_{P_{H}max}^{″}\left(0\right)-{\epsilon }_{P_{H}max}^{″}\left(t\right)}{{\epsilon }_{P_{H}max}^{″}\left(0\right)},$

The modified version of the Avrami model [55,56,57] was applied to describe the crystallization degree vs. time dependence:

(6)$X\left(t\right)=A\left(1-exp\left(-{\left(\frac{t-t_0}{{\tau }_X}\right)}^n\right)\right),$

Comparing the BDS and DSC results (Table 3, Figure 7f), it can be seen that cold crystallization started and occurred much faster in the BDS sample than in the DSC one. In the BDS sample, crystallization started immediately after heating to a given crystallization temperature ($t_0$ = 0). The easier crystallization in the BDS sample, which was thinner than the DSC sample, can be explained by a more significant contribution of nucleation on the cell/sample interface to overall nucleation in the sample [58]. It is confirmed by the ${\tau }_{cr}\left(T\right)$ dependency, as the decrease of ${\tau }_{cr}$ from 800 s to 350 s with increasing temperature means that the crystallization rate is controlled more by the diffusion (crystal growth) rate rather than by the nucleation rate [59]. The ${\tau }_{cr}$ values for $T_{cr}$ = 268–273 K follow the Arrhenius dependence with a rather low activation energy $E_a$ = 35.1(7) kJ/mol (the respective activation energy determined by BDS for the isothermal cold crystallization of 3F7HPhH7 is ca. 130 kJ/mol [18]). The characteristic crystallization time for $T_{cr}$ = 273 K was smaller than expected from the Arrhenius dependence obtained for lower temperatures. The possible explanation is that in the 268–273 K range, the sample crystallizes only in the Cr2 phase, while in 273 K there is a co-crystallization of Cr2 and Cr1 phases, which leads to a change in crystallization kinetics. In the DSC sample, the initialization time in 273–278 K was $t_0$ ≈ 1400–1700 s, while for 293 K it decreased significantly. The ${\tau }_{cr}$ values also do not show a monotonous dependence on temperature. At 273 K, ${\tau }_{cr}$ ≈ 3100 s, in the 278–288 K range, the ${\tau }_{cr}$ value was almost constant and equal to 2000–2100 s, while in 293 K crystallization occurred considerably slower (${\tau }_{cr}$ ≈ 6700 s) than in the lower studied temperatures, despite the smaller initialization time. The results for the DSC sample are unusual. The obtained ${\tau }_{cr}\left(T\right)$ dependency suggests that in the 273–288 K range the crystallization rate depends almost equally on the rates of nucleation and diffusion, while for 293 K the crystallization process is governed mostly by nucleation. However, $t_0$ has the smallest value for 293 K, which implies that nucleation rate is higher than for 273–288 K. The explanation may lay in the fact that the Cr2 phase starts melting at 285–287 K. The likely scenario is that in the 273–283 K range, the nuclei of Cr2 phase are initially formed. On the other hand, DSC results show that the sample was entirely or mostly in the Cr1 phase after completed crystallization (Figure 7b), which requires the formation of the nuclei of Cr1. If we assume that the presence of Cr2 nuclei hinders the formation of Cr1 nuclei, it can explain the larger $t_0$ values in the 273–283 K range. During heating to $T_{cr}$ = 293 K, Cr2 nuclei formed in lower temperatures are destroyed, but they leave defects which can further be the basis for the heterogeneous nucleation of the Cr1 phase, leading to a smaller $t_0$ than in lower temperatures. Due to relatively fast (10 K/min) heating, the number of developed Cr2 nuclei is presumably smaller than during isothermal crystallization in the 273–283 K range, so the number of Cr1 nuclei formed by heterogeneous nucleation is also small. Moreover, the homogeneous nucleation does not occur easily for $T_{cr}$ = 293 K because of the proximity of the melting temperature of Cr1 (301 K), which leads to a small thermodynamic driving force of crystallization [58]. The results for $T_{cr}$ = 288 K suggest that there were still some surviving Cr2 nuclei in the sample, even if it was slightly above the melting temperature of Cr2 determined by DSC, as the crystallization kinetics more resembles that observed in the 273–283 K range. The melting temperatures of Cr1 and Cr2 determined in this study indeed show that they vary with crystallization conditions (Table 1 and Table 2).

The obtained Avrami exponents are smaller for the BDS sample ($n$ = 0.9–1.3) than for the DSC sample ($n$ = 1.7–3.4), which is caused by the smaller thickness of the former. The $n$ ≈ 1 value indicates a one-dimensional crystal growth with already formed nuclei [57], which agrees with assumption of a mostly heterogeneous nucleation in the BDS sample. In the DSC sample, for $T_{cr}$ = 273–288 K the Avrami exponent equals $n$ = 1.7–2.7, which implies a one-dimensional ($n$ = 2) or two-dimensional ($n$ = 3) crystal growth with a constant nucleation rate [57]. For $T_{cr}$ = 293 K the Avrami exponent is larger, $n$ = 3.4, which can be interpreted as a three-dimensional crystal growth with non-zero nucleation rate [57]. This is in accordance with the previously discussed temperature dependence of ${\tau }_{cr}$: nucleation occurs not only in the beginning of crystallization, but also simultaneously with the crystal growth, and reduced dimensionality of growing crystals at lower temperatures is likely caused by previously formed small domains of Cr2.

3.4. Comparison with the 3F7HPhF6 and 3F7HPhH7 Glassformers

The results regarding the glass transition of the ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phase and isothermal cold crystallization obtained herein for 3F7HPhH6 have been collected in Table 4, together with the corresponding results for 3F7HPhF6 (m = 7, X₁ = H, X₂ = F, r = 6, see Figure 1a) [12,13] and 3F7HPhH7 (m = 7, X₁ = H, X₂ = H, r = 7) [16,18]. Each compound differs from 3F7HPhH6 by one detail of the molecular structure: the fluoro substitution of the molecular core (3F7HPhF6) or the -C_rH_2r+1 chain length (3F7HPhH7). For 3F7HPhH6 and 3F7HPhF6, crystallization was never observed upon cooling, while for 3F7HPhH7, melt crystallization occurred for a very slow cooling rate (1 K/min). Since the type of the sample container was shown to influence the crystal growth, only the DSC results regarding cold crystallization kinetics have been compared. The exception is 3F7HPhF6, where the results obtained by X-ray diffraction (XRD) were also included, as they were in accordance with the DSC results. The BDS results have been used to compare the glass transition temperatures and fragility parameters. Looking at the results for 3F7HPhH6 and 3F7HPhF6, it can be noted that for r = 7, fluoro substitution at the X₂ position decreases the glass transition temperature $T_g$ and increases the cold crystallization rate. A comparison with 3F7HPhH7 implies that the increasing length of the -C_rH_2r+1 chain also leads to faster crystallization, but the $T_g$ is higher than that for 3F7HPhH6. The fragility parameter has the lowest value for 3F7HPhH6, making it the strongest glassformer among the three discussed compounds. There is also a significant difference in the cold crystallization mechanism between 3F7HPhH6 and the previously studied 3F7HPhF6 and 3F7HPhH7 [13,16]. For both 3F7HPhF6 and 3F7HPhH7, cold crystallization is controlled mostly by the diffusion rate, as the characteristic crystallization time decreases with the increasing temperature, according to the Arrhenius equation. The activation energies determined by DSC (and XRD for 3F7HPhF6) are 79 kJ/mol [13] and 133 kJ/mol [16] for 3F7HPhF6 and 3F7HPhH7, respectively. For 3F7HPhH6, instead, the cold crystallization investigated by DSC does not show the Arrhenius dependence of ${\tau }_{cr}\left(T\right)$, and both nucleation and diffusion have an equal impact on the crystallization kinetics. As is explained in Section 3.3, such a situation for 3F7HPhH6 is caused by the presence of two crystal phases. For 3F7HPhF6 and 3F7HPhH7, only one crystal phase was reported, which explains the simple Arrhenius dependence of the characteristic crystallization time.

The hindrance of cold crystallization by the presence of different crystal phases seems even more probable when one looks at the behavior of the 3F5HPhF6 compound [14] from the same homologous series as 3F7HPhF6. The DSC results for these homologues [12,14] show than for 3F5HPhF6, cold crystallization occurs much slower than for 3F7HPhF6 and, most importantly, in 3F5HPhF6 there are two crystal phases confirmed by the XRD measurement [14]. Although the detailed investigations of the cold crystallization kinetics for 3F5HPhF6 have not yet been published, there is a high possibility that the slowing down of crystallization is connected with a polymorphism of the crystal phases, as is suspected for 3F7HPhH6.

Finally, the 3F5HPhH6 compound (m = 5, X₁ = H, X₂ = H, r = 6) [60], from the same series as 3F7HPhH6 but with a shorter -C_mH_2m- chain and slightly higher fragility $m_f$ = 89, shows a much faster cold crystallization despite possessing two crystal phases. However, in 3F5HPhH6 there is a rather direct Cr2 → Cr1 transition, without the previous melting of the Cr2 phase as was observed here for 3F7HPhH6. This is why, for 3F5HPhH6, the presence of two crystal phases does not have a hindering effect on cold crystallization.

4. Conclusions

The phase transitions of the chiral 3F7HPhH6 compound were investigated in detail by complementary methods. Next to the reported earlier ${\mathrm{SmA}}^{*}$, ${\mathrm{SmC}}^{*}$ and ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ liquid crystal phases, an additional ${\mathrm{SmC}}_{\mathsf{\alpha }}^{*}$ sub-phase was observed in the DSC and POM results between the ${\mathrm{SmA}}^{*}$ and ${\mathrm{SmC}}^{*}$ phases; its presence was also confirmed by the temperature behavior of the soft mode in the BDS spectra. 3F7HPhH6 undergoes a glass transition of the ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phase, even for the lowest applied cooling rate (2 K/min). Analysis of the non-Arrhenius behavior of the characteristic time of the α-process in the supercooled ${\mathrm{SmC}}_{\mathrm{A}}^{*}$ phase allows for the obtainment of the fragility parameter $m_f$ = 72. 3F7HPhH6 is, therefore, a stronger glassformer with a weaker tendency to cold crystallization than the previously investigated 3F7HPhF6 and 3F7HPhH7, which have fragility parameters above 100. Upon heating, and close to the onset of cold crystallization, the splitting of the α-process was noticeable in the BDS spectra of 3F7HPhH6, as it was for 3F7HPhH7. The splitting is explained as a pre-transitional effect, as it is not observed upon cooling. Next to the α-process, the secondary β-process and γ-process are observed. Both are interpreted as intra-molecular motions. The β-process, according to the results of the DFT/B3LYP-TZVPP calculations, is attributed to the correlated rotations of the benzene ring and biphenyl within the molecular core, while the faster γ-process may be connected with conformational changes of flexible chains. An investigation of the isothermal cold crystallization of 3F7HPhH6 showed that crystallization occurs slower than in 3F7HPhF6 and 3F7HPhH7. Moreover, the characteristic crystallization time of 3F7HPhH6 did not show a simple Arrhenius dependence (diffusion-controlled process), as reported for the two mentioned compounds. The complicated dependence of the initialization time and crystallization time on temperature is explained by the presence of two crystal phases, the low-temperature Cr2 and high-temperature Cr1, which can co-nucleate below the melting temperature of Cr2. A comparison of the crystallization kinetics determined for two types of samples, the bulk DSC sample and the thin BDS sample, proves that different boundary conditions can lead to crucial differences in the crystallization rate. This is why, while comparing crystallization kinetics for various liquid crystalline substances, it is advised to compare results obtained by the same method if possible.

Publisher’s Note: MDPI stays neutral with regard to jurisdictional claims in published maps and institutional affiliations.

Enlarge this image.

Figure 1. General molecular formula of the 3FmX1PhX2r family (a) and 3F7HPhH6 molecules optimized with the DFT method (B3LYP/def2TZVPP) in an extended and two exemplary twisted conformations (b). The dipole moment vectors are shown, and the relative energy of each conformation is given in respect to the extended conformations in a figure.

Enlarge this image.

Figure 2. DSC curves of 3F7HPhH6 registered at the 2 K/min rate (a) and 5–20 K/min rates (b). The insets in (a) show the enlarged parts of the DSC curves for the 2 K/min rate close to the clearing temperature.

Enlarge this image.

Figure 3. (a–f) POM textures of 3F7HPhH6 collected during heating at the 2 K/min rate with the results of the fractal box count numerical analysis (squares) and DSC curve (line) registered with the same rate.

Enlarge this image.

Figure 4. POM textures of 3F7HPhH6 collected during cooling (a) and heating (b) with the 2 K/min rate and the corresponding results of the numerical analysis for cooling (c) and heating (d).

Enlarge this image.

Figure 5. Absorption part of the dielectric spectra of 3F7HPhH6 upon cooling (a) and heating (b), dielectric strength values vs. temperature (c) and Arrhenius plot of relaxation times (d). Inset in (b) is an enlarged part of the results from 258 K. The lines in (a,b) show the fitting results of Equation (1), separately for each relaxation process and with omitted ionic conductivity contribution. The lines in (d) show the fitting results of the Arrhenius formula for the PL process and β-process, and fitting results of the Vogel–Fulcher–Tammann equation (Equation (2) for the α-process. Panels (c,d) have a common legend; open and solid symbols in these panels correspond to results obtained upon cooling and heating, respectively.

Enlarge this image.

Figure 6. Dispersion part registered at 104 Hz upon cooling of the 3F7HPhH6 sample in a bias field of 40 V. The inset shows the frequency and inverse dielectric strength of the soft mode vs. temperature obtained by fitting Equation (1) to the spectra collected in the bias field.

Enlarge this image.

Figure 7. Isothermal cold crystallization of 3F7HPhH6: DSC curves registered during cold crystallization (a) and during subsequent heating with the 10 K/min rate (b); absorption part of the BDS spectra during cold crystallization in 268 K (c); crystallization degree [Forumla omitted. See PDF.] with fitting results of Equation (6) (d); Avramov plot for isothermal cold crystallization in 283 K (e); and the Arrhenius plot of the characteristic crystallization time [Forumla omitted. See PDF.] (f).

Supplementary Materials

The following are available online at https://www.mdpi.com/article/10.3390/cryst11121487/s1, Figure S1: Relative conformational energy calculated with PM7 and DFT-B3LYP/def2TZVPP methods for selected torsional angles within the isolated 3F7HPhH6 molecule, Figure S2: Textures of 3F7HPhH6 registered during heating from 173 K with 2 K/min rate analyzed with the fractal box count method, Figure S3: Textures of 3F7HPhH6 registered upon cooling with 2 K/min rate with histograms of luminance of red, green and blue components, Figure S4: Dielectric spectra of 3F7HPhH6 registered upon cooling without the bias field, Figure S5: Dielectric spectra of 3F7HPhH6 registered on heating without the bias field, Figure S6: Dielectric spectra of 3F7HPhH6 registered upon cooling in the 40 V bias field.

References

1. Piecek, W.; Raszewski, Z.; Perkowski, P.; Przedmojski, J.; Kędzierski, J.; Drzewiński, W.; Dąbrowski, R. Apparent Tilt Angle and Structural Investigations of the Fluorinated Antiferroelectric Liquid Crystal Material for Display Application. Ferroelectrics; 2004; 310, pp. 125-129. [DOI: https://dx.doi.org/10.1080/00150190490510573]

2. Stipetic, A.I.; Goodby, W.; Hird, M.; Raoul, Y.M.; Gleeson, H.F. High tilt antiferroelectric esters bearing a perfluorobutanoyloxy terminal chain: The influence of lateral fluoro substituents on mesomorphic behaviour, tilt angle, and spontaneous polarization. Liq. Cryst.; 2006; 33, pp. 819-828. [DOI: https://dx.doi.org/10.1080/02678290600722999]

3. Sokół, E.; Drzewiński, W.; Dziaduszek, J.; Dąbrowski, R.; Bennis, N.; Otón, J. The Synthesis and Properties of Novel Partially Fluorinated Ethers with High Tilted Anticlinic Phase. Ferroelectrics; 2006; 343, pp. 41-48. [DOI: https://dx.doi.org/10.1080/00150190600962051]

4. Żurowska, M.; Dąbrowski, R.; Dziaduszek, J.; Czupryński, K.; Skrzypek, K.; Filipowicz, M. Synthesis and Mesomorphic Properties of Chiral Esters Comprising Partially Fluorinated Alkoxyalkoxy Terminal Chains and a 1-methylheptyl Chiral Moiety. Mol. Cryst. Liq. Cryst.; 2008; 495, pp. 145-157. [DOI: https://dx.doi.org/10.1080/15421400802432428]

5. Żurowska, M.; Dąbrowski, R.; Dziaduszek, K.; Garbat, K.; Filipowicz, M.; Tykarska, M.; Rejmer, W.; Czupryński, K.; Spadło, A.; Bennis, N. et al. Influence of alkoxy chain length and fluorosubstitution on mesogenic and spectral properties of high tilted antiferroelectric esters. J. Mater. Chem.; 2011; 21, pp. 2144-2153. [DOI: https://dx.doi.org/10.1039/C0JM02015J]

6. Milewska, K.; Drzewiński, W.; Czerwiński, M.; Dąbrowski, R. Design, synthesis and mesomorphic properties of chiral benzoates and fluorobenzoates with direct SmC_A^*-Iso phase transition. Liq. Cryst.; 2015; 42, pp. 1601-1611. [DOI: https://dx.doi.org/10.1080/02678292.2015.1078916]

7. Żurowska, M.; Filipowicz, M.; Czerwiński, M.; Szala, M. Synthesis and properties of ferro- and antiferroelectric esters with a chiral centre based on (S)-(+)-3-octanol. Liq. Cryst.; 2019; 46, pp. 299-308. [DOI: https://dx.doi.org/10.1080/02678292.2018.1499147]

8. Urbańska, M.; Perkowski, P.; Szala, M. Synthesis and properties of antiferroelectric and/or ferroelectric compounds with the –CH₂O group close to chirality centre. Liq. Cryst.; 2019; 46, pp. 2245-2255. [DOI: https://dx.doi.org/10.1080/02678292.2019.1619852]

9. Fukuda, A.; Takanishi, Y.; Isozaki, T.; Ishikawa, K.; Takezoe, H. Antiferroelectric Chiral Smectic Liquid Crystals. J. Mater. Chem.; 1994; 4, pp. 997-1016. [DOI: https://dx.doi.org/10.1039/jm9940400997]

10. D’havé, K.; Rudquist, P.; Lagerwall, S.T.; Pauwels, H.; Drzewiński, W.; Dąbrowski, R. Solution of the dark state problem in antiferroelectric liquid crystal displays. Appl. Phys. Lett.; 2000; 76, pp. 3528-3530. [DOI: https://dx.doi.org/10.1063/1.126696]

11. Lagerwall, S.; Dahlgren, A.; Jägemalm, P.; Rudquist, P.; D’havé, K.; Pauwels, H.; Dąbrowski, R.; Drzewiński, W. Unique Electro-Optical Properties of Liquid Crystals Designed for Molecular Optics. Adv. Funct. Mater.; 2001; 11, pp. 87-94. [DOI: https://dx.doi.org/10.1002/1616-3028(200104)11:2<87::AID-ADFM87>3.0.CO;2-E]

12. Deptuch, A.; Jaworska-Gołąb, T.; Marzec, M.; Pociecha, D.; Fitas, J.; Żurowska, M.; Tykarska, M.; Hooper, J. Mesomorphic phase transitions of 3F7HPhF studied by complementary methods. Phase. Trans.; 2018; 91, pp. 186-198. [DOI: https://dx.doi.org/10.1080/01411594.2017.1393814]

13. Deptuch, A.; Jaworska-Gołąb, T.; Marzec, M.; Urbańska, M.; Tykarska, M. Cold crystallization from chiral smectic phase. Phase Trans.; 2019; 92, pp. 126-134. [DOI: https://dx.doi.org/10.1080/01411594.2018.1556270]

14. Deptuch, A.; Marzec, M.; Jaworska-Gołąb, T.; Dziurka, M.; Hooper, J.; Srebro-Hooper, M.; Fryń, P.; Fitas, J.; Urbańska, M.; Tykarska, M. Influence of carbon chain length on physical properties of 3FmHPhF homologues. Liq. Cryst.; 2019; 46, pp. 2201-2212. [DOI: https://dx.doi.org/10.1080/02678292.2019.1614685]

15. Kolek, Ł.; Jasiurkowska-Delaporte, M.; Massalska-Arodź, M.; Szaj, W.; Rozwadowski, T. Mesomorphic and dynamic properties of 3F5BFBiHex antiferroelectric liquid crystal as reflected by polarized optical microscopy, differential scanning calorimetry and broadband dielectric spectroscopy. J. Mol. Liq.; 2020; 320, 114338. [DOI: https://dx.doi.org/10.1016/j.molliq.2020.114338]

16. Drzewicz, A.; Juszyńska-Gałązka, E.; Zając, W.; Piwowarczyk, M.; Drzewiński, W. Non-isothermal and isothermal cold crystallization of glass-forming chiral smectic liquid crystal (S)-4′-(1-methyloctyloxycarbonyl) biphenyl-4-yl 4-[7-(2,2,3,3,4,4,4-heptafluorobutoxy) heptyl-1-oxy]-benzoate. J. Mol. Liq.; 2020; 319, 114153. [DOI: https://dx.doi.org/10.1016/j.molliq.2020.114153]

17. Drzewicz, A.; Juszyńska-Gałązka, E.; Zając, W.; Kula, P. Vibrational Dynamics of a Chiral Smectic Liquid Crystal Undergoing Vitrification and Cold Crystallization. Crystals; 2020; 10, 655. [DOI: https://dx.doi.org/10.3390/cryst10080655]

18. Drzewicz, A.; Jasiurkowska-Delaporte, M.; Juszyńska-Gałązka, E.; Zając, W.; Kula, P. On the relaxation dynamics of a double glass-forming antiferroelectric liquid crystal. Phys. Chem. Chem. Phys.; 2021; 23, pp. 8673-8688. [DOI: https://dx.doi.org/10.1039/D0CP06203K] [PubMed: https://www.ncbi.nlm.nih.gov/pubmed/33876028]

19. Wu, J.; Usui, T.; Hanna, J. Synthesis of a novel smectic liquid crystalline glass and characterization of its charge carrier transport properties. J. Mater. Chem.; 2011; 21, pp. 8045-8051. [DOI: https://dx.doi.org/10.1039/c1jm10890e]

20. Teerakapibal, R.; Huang, C.; Gujral, A.; Ediger, M.D.; Yu, L. Organic Glasses with Tunable Liquid-Crystalline Order. Phys. Rev. Lett.; 2018; 120, 055502. [DOI: https://dx.doi.org/10.1103/PhysRevLett.120.055502]

21. Elschner, R.; Macdonald, R.; Eichler, H.J.; Hess, S.; Sonnet, A.M. Molecular reorientation of a nematic glass by laser-induced heat flow. Phys. Rev. E; 1999; 60, pp. 1792-1798. [DOI: https://dx.doi.org/10.1103/PhysRevE.60.1792]

22. Shi, H.; Chen, S.H. Novel glass-forming liquid crystals. III Helical sense and twisting power in chiral nematic systems. Liq. Cryst.; 1995; 19, pp. 849-861. [DOI: https://dx.doi.org/10.1080/02678299508031109]

23. Chen, H.M.P.; Katsis, D.; Chen, S.H. Deterministic Synthesis and Optical Properties of Glassy Chiral-Nematic Liquid Crystals. Chem. Mater.; 2003; 15, pp. 2534-2542. [DOI: https://dx.doi.org/10.1021/cm030170l]

24. Frisch, M.J.; Trucks, G.W.; Schlegel, H.B.; Scuseria, G.E.; Robb, M.A.; Cheeseman, J.R.; Scalmani, G.; Barone, V.; Petersson, G.A.; Nakatsuji, H. et al. Gaussian 16, Revision C.01; Gaussian, Inc.: Wallingford, CT, USA, 2019.

25. Stewart, J.J.P. Optimization of parameters for semiempirical methods VI: More modifications to the NDDO approximations and re-optimization of parameters. J. Mol. Model.; 2013; 19, pp. 1-32. [DOI: https://dx.doi.org/10.1007/s00894-012-1667-x] [PubMed: https://www.ncbi.nlm.nih.gov/pubmed/23187683]

26. Hanwell, M.D.; Curtis, D.E.; Lonie, D.C.; Vandermeersch, T.; Zurek, E.; Hutchison, G.R. Avogadro: An advanced semantic chemical editor, visualization, and analysis platform. J. Cheminform.; 2012; 4, 17. [DOI: https://dx.doi.org/10.1186/1758-2946-4-17] [PubMed: https://www.ncbi.nlm.nih.gov/pubmed/22889332]

27. Schneider, C.A.; Rasband, W.S.; Eliceiri, K.W. NIH Image to ImageJ: 25 years of image analysis. Nat. Methods.; 2012; 9, pp. 671-675. [DOI: https://dx.doi.org/10.1038/nmeth.2089]

28. The FracLac Guide. Available online: https://imagej.nih.gov/ij/plugins/fraclac/FLHelp/BoxCounting.htm (accessed on 20 March 2021).

29. Falconer, K. Fractal Geometry: Mathematic Foundations and Applications; John Wiley & Sons: Chichester, UK, USA, 2003.

30. Lalik, S.; Deptuch, A.; Fryń, P.; Jaworska-Gołąb, T.; Dardas, D.; Pociecha, D.; Urbańska, M.; Tykarska, M.; Marzec, M. Systematic study of the chiral smectic phases of a fluorinated compound. Liq. Cryst.; 2019; 46, pp. 2256-2268. [DOI: https://dx.doi.org/10.1080/02678292.2019.1622044]

31. Hirst, L.S.; Watson, S.J.; Gleeson, H.F.; Cluzeau, P.; Barois, P.; Pindak, R.; Pitney, J.; Cady, A.; Johnson, P.M.; Huang, C.C. et al. Interlayer structures of the chiral smectic liquid crystal phases revealed by resonant x-ray scattering. Phys. Rev. E; 2002; 65, 041705. [DOI: https://dx.doi.org/10.1103/PhysRevE.65.041705]

32. Labeeb, A.; Gleeson, H.F.; Hegmann, T. Polymer stabilization of the smectic C-alpha* liquid crystal phase—Over tenfold thermal stabilization by confining networks of photo-polymerized reactive mesogens. Appl. Phys. Lett.; 2015; 107, 232903. [DOI: https://dx.doi.org/10.1063/1.4937564]

33. Buivydas, M.; Gouda, F.; Andersson, G.; Lagerwall, S.T.; Stebler, B.; Bomelburg, J.; Heppke, G.; Gestblom, B. Collective and non-collective excitations in antiferroelectric and ferrielectric liquid crystals studied by dielectric relaxation spectroscopy and electro-optic measurements. Liq. Cryst.; 1997; 23, pp. 723-739. [DOI: https://dx.doi.org/10.1080/026782997208000]

34. Marino, L.; Tone, C.M.; Ionescu, A.; Żurowska, M.; Czerwiński, M. Evidence of both unusual dielectric mode at low frequencies and the co-existence of antiferroelectric, ferroelectric and paraelectric phases in a novel antiferroelectric liquid crystals mixture. J. Mol. Liq.; 2017; 247, pp. 43-56. [DOI: https://dx.doi.org/10.1016/j.molliq.2017.09.055]

35. Cole, K.S.; Cole, R.H. Dispersion and Absorption in Dielectrics I. Alternating Current Characteristics. J. Chem. Phys.; 1941; 9, pp. 341-351. [DOI: https://dx.doi.org/10.1063/1.1750906]

36. Havriliak, S.; Negami, S. A complex plane analysis of α-dispersions in some polymer systems. J. Polym. Sci. Part C Polymer Symposia.; 1966; 14, pp. 99-117. [DOI: https://dx.doi.org/10.1002/polc.5070140111]

37. Haase, W.; Wróbel, S. Relaxation Phenomena: Liquid Crystals, Magnetic Systems, Polymers, High-Tc Superconductors, Metallic Glasses; Springer-Verlag: Berlin/Heidelberg, Germany, 2003; [DOI: https://dx.doi.org/10.1007/978-3-662-09747-2]

38. Panarin, Y.P.; Kalinovskaya, O.; Vij, J.K. The investigation of the relaxation processes in antiferroelectric liquid crystals by broad band dielectric and electro-optic spectroscopy. Liq. Cryst.; 1998; 25, pp. 241-252. [DOI: https://dx.doi.org/10.1080/026782998206399]

39. Perkowski, P.; Ogrodnik, K.; Piecek, W.; Żurowska, M.; Raszewski, Z.; Dąbrowski, R.; Jaroszewicz, L. Influence of the bias field on dielectric properties of the SmC_A* in the vicinity of the SmC*-SmC_A* phase transition. Liq. Cryst.; 2011; 38, pp. 1159-1167. [DOI: https://dx.doi.org/10.1080/02678292.2011.600836]

40. Donth, E. The Glass Transition: Dynamics in Liquids and Disordered Materials; Springer: Berlin/Heidelberg, Germany, 2001; [DOI: https://dx.doi.org/10.1007/978-3-662-04365-3]

41. Böhmer, R.; Ngai, K.L.; Angell, C.A.; Plazek, D.J. Nonexponential relaxations in strong and fragile glass formers. J. Chem. Phys.; 1993; 99, pp. 4201-4209. [DOI: https://dx.doi.org/10.1063/1.466117]

42. Jasiurkowska-Delaporte, M.; Juszyńska, E.; Kolek, Ł.; Krawczyk, J.; Massalska-Arodź, M.; Osiecka, N.; Rozwadowski, T. Signatures of glass transition in partially ordered phases. Liq. Cryst.; 2013; 40, pp. 1436-1442. [DOI: https://dx.doi.org/10.1080/02678292.2013.828330]

43. Johari, G.P.; Goldstein, M. Viscous Liquids and the Glass Transition. II. Secondary Relaxations in Glasses of Rigid Molecules. J. Chem. Phys.; 1970; 53, pp. 2372-2388. [DOI: https://dx.doi.org/10.1063/1.1674335]

44. Ngai, K.L.; Paluch, M. Classification of secondary relaxation in glass-formers based on dynamic properties. J. Chem. Phys.; 2004; 120, pp. 857-873. [DOI: https://dx.doi.org/10.1063/1.1630295] [PubMed: https://www.ncbi.nlm.nih.gov/pubmed/15267922]

45. Gonon, P.; Sylvestre, A. Dielectric properties of fluorocarbon thin films deposited by radio frequency sputtering of polytetrafluoroethylene. J. Appl. Phys.; 2002; 92, pp. 4584-4589. [DOI: https://dx.doi.org/10.1063/1.1505983]

46. Uehara, H.; Hanakai, Y.; Hatano, J.; Saito, S.; Murashiro, K. Dielectric Relaxation Modes in the Phases of Antiferroelectric Liquid Crystals. Jpn. J. Appl. Phys.; 1995; 34, pp. 5424-5428. [DOI: https://dx.doi.org/10.1143/JJAP.34.5424]

47. Novotna, V.; Glogarova, M.; Bubnov, A.M.; Sverenyak, H. Thickness dependent low frequency relaxations in ferroelectric liquid crystals with different temperature dependence of the helix pitch. Liq. Cryst.; 1997; 23, pp. 511-518. [DOI: https://dx.doi.org/10.1080/026782997208091]

48. Kumari, S.; Das, I.M.L.; Dąbrowski, R. Effect of DC bias and cell thickness on the characteristic dielectric parameters of the relaxation modes of an antiferroelectric liquid crystal. J. Mol. Liq.; 2011; 158, pp. 1-6. [DOI: https://dx.doi.org/10.1016/j.molliq.2010.09.011]

49. Panarin, Y.P.; Xu, H.; Lughadha, S.T.M.; Vij, J.K. Dielectric Response of Ferroelectric Liquid Crystal Cells. Jpn. J. Appl. Phys.; 1994; 33, pp. 2648-2650. [DOI: https://dx.doi.org/10.1143/JJAP.33.2648]

50. Roy, S.S.; Majumder, T.A.P.; Roy, S.K. Soft Mode Dielectric Relaxation Under the Influence of Bias Electric Field of a Ferroelectric Liquid Crystal Mixture. Mol. Cryst. Liq. Cryst.; 1997; 304, pp. 315-320. [DOI: https://dx.doi.org/10.1080/10587259708046976]

51. Carlsson, T.; Žekš, B.; Filipič, C.; Levstik, A. Theoretical model of the frequency and temperature dependence of the complex dielectric constant of ferroelectric liquid crystals near the smectic-C*–smectic-A phase transition. Phys. Rev. A; 1990; 42, pp. 877-889. [DOI: https://dx.doi.org/10.1103/PhysRevA.42.877] [PubMed: https://www.ncbi.nlm.nih.gov/pubmed/9904102]

52. Prasad, N.S.; Varma, K.B.R. Crystallization Kinetics of the LiBO₂–Nb₂O₅ Glass Using Differential Thermal Analysis. J. Am. Ceram. Soc.; 2005; 88, pp. 357-361. [DOI: https://dx.doi.org/10.1111/j.1551-2916.2005.00055.x]

53. Massalska-Arodź, M.; Williams, G.; Thomas, D.K.; Jones, W.J.; Dąbrowski, R. Molecular Dynamics and Crystallization Behavior of Chiral Isooctyloxycyanobiphenyl as Studied by Dielectric Relaxation Spectroscopy. J. Phys. Chem. B; 1999; 103, pp. 4197-4205. [DOI: https://dx.doi.org/10.1021/jp9845773]

54. Fukao, K.; Miyamoto, Y. Relaxation behavior of α-process of poly(ethylene terephthalate) during crystallization process. J. Non Cryst. Sol.; 1997; 212, pp. 208-214. [DOI: https://dx.doi.org/10.1016/S0022-3093(96)00652-7]

55. Avrami, M. Kinetics of Phase Change. I General Theory. J. Chem. Phys.; 1939; 7, pp. 1103-1112. [DOI: https://dx.doi.org/10.1063/1.1750380]

56. Avrami, M. Kinetics of Phase Change. II Transformation-Time Relations for Random Distribution of Nuclei. J. Chem. Phys.; 1940; 8, pp. 212-224. [DOI: https://dx.doi.org/10.1063/1.1750631]

57. Avramov, I.; Avramova, K.; Rüssel, C. New method to analyze data on overall crystallization kinetics. J. Cryst. Growth.; 2005; 285, pp. 394-399. [DOI: https://dx.doi.org/10.1016/j.jcrysgro.2005.08.024]

58. Çelikbilek, M.; Ersundu, A.E.; Aydın, S. Crystallization Kinetics of Amorphous Materials. Advances in Crystallization Processes; Mastai, Y. IntechOpen: Rijeka, Croatia, 2012; pp. 127-162.

59. Massalska-Arodź, M.; Williams, G.; Smith, I.K.; Conolly, C.; Aldridge, G.A.; Dąbrowski, R. Molecular dynamics and crystallization behaviour of isophentyl cyanobiphenyl as studied by dielectric relaxation spectroscopy. J. Chem. Soc. Faraday Trans.; 1998; 94, pp. 387-394. [DOI: https://dx.doi.org/10.1039/a706225g]

60. Deptuch, A.; Jasiurkowska-Delaporte, M.; Zając, W.; Juszyńska-Gałązka, E.; Drzewicz, A.; Urbańska, M. Investigation of crystallization kinetics and its relationship with molecular dynamics for chiral fluorinated glassforming smectogen 3F5HPhH6. Phys. Chem. Chem. Phys.; 2021; 23, pp. 19795-19810. [DOI: https://dx.doi.org/10.1039/D1CP02297K] [PubMed: https://www.ncbi.nlm.nih.gov/pubmed/34549752]