Using rheometry to determine nucleation density in a colored system containing a nucleating agent

First of all, Fig. 1 shows that the structures formed during crystallization with nucleating agent do not show any unusual structure as was found by Lee Wo and Tanner (2010) for a similar system (a commercial iPP with different concentrations of U-Phthalocyanine), so the above method can be applied to convert the time evolution of the rheological properties into kinetics of space filling. Figure 2 shows the time evolution of the storage modulus G ^′ of the nucleating agent system during crystallization at different temperatures. First of all, it should be noticed that for T = 145°C the initial value of G ^′ is not the same as those for the other temperatures. The method is based on the assumption of isothermal crystallization. If the degree of undercooling is large with respect to the cooling rate, crystallization already sets in during cooling. The problem is made even worse due to the 2-min delay time we used in order to equilibrate the sample temperature. This is the case for T = 145°C; crystallization has already started before we begin to track the rheological evolution (indicated by an increased initial value of G ^′). Faster cooling rates are required when studying higher levels of undercooling. Nevertheless, we still want to show this result to demonstrate the limitations of the method.

The related space filling, determined by Eq. 1, is shown in Fig. 3. For the high experimental temperature range used here, the growth rate is better captured by Eq. 4 (Eder and Janeschitz-Kriegl 1997; Zuidema et al. 2001), so this expression was applied. Figure 4 shows the diffraction patterns of NA-iPP samples after quiescent crystallization and demonstrates that nucleating agent crystallization results in the same α modification as crystallization of the neat iPP. Consequently, the same growth kinetics, Eq. 4, applies. The number density of nuclei determined by Eq. 3 is plotted versus space filling in Fig. 5. It is nearly constant between ϕ ≈ 0.1 and ϕ ≈ 0.9, except for the experiment at T = 145°C, where crystallization has already set in before the dynamic measurements have started. Much higher values are found in the early stage, but N(T) becomes nearly constant when ϕ ≈ 0.4 for all temperatures. The influence of the unknown initial space filling is relatively smaller for higher degrees of space filling, i.e., in later stages of the process. We have taken the average value for a space filling between ϕ = 0.5 and ϕ = 0.9 as a reasonable approximation. Nucleation densities from all experiments are plotted as a function of the experimental temperature in Fig. 6. It can be concluded that this type of nucleating agent is very effective as it increases the nucleation density by up to six decades. Notice that the temperature dependency of the nucleation density is very similar for the neat iPP and the NA-iPP and that the results for T = 145°C, although less reliable for ϕ  < 0.4, are well in line with the results for higher temperatures. Results for relatively low temperatures should be treated with some caution.

First we compare the results of Housmans et al. (2009), obtained with the same method and for the same iPP, to the results presented here. For a temperature T = 138°C, they found, for quiescent conditions, a nucleation density N = 8 × 10¹¹ m^− 3, while we obtain the (interpolated) value N = 6 × 10¹² m^− 3. We ascribe this difference to the sample preparation procedure. Our neat iPP and nucleated samples were processed by injection molding, which means that the sample preparation step already induced extra nuclei due to the applied (uncontrolled) flow. The samples used by Housmans et al. (2009) were prepared by means of compression molding.

We repeated our experiments to check for reproducibility. The time lapse between the two series of experiments was about 8 weeks. The results of these repeated experiments (second series) are shown in Fig. 7, together with the previous results (first series). We want to stress the importance of a good temperature control. An error of 1°C typically gives a factor two difference in the number density of nuclei. Notice that in the second series of experiments we managed to get good results for temperatures as low as T = 143°C while in the first series we already encountered problems at T = 145°C.

Figure 8 shows the evolution of G ^′ during crystallization at 148°C under quiescent conditions and after shear (fixed shear rate and variable shear time). For a shear rate of 60 s^− 1, a shear time of 2 s shows clearly accelerated kinetics. Further increase of the shear time to 4 s does not change the kinetics much. The acceleration of crystallization seems to become (nearly) independent of the shear time beyond 4 s, indicating that the shear-enhanced point-like nucleation saturates. This effect was also observed by Housmans et al. (2009) for this and two other iPPs. The time evolution of the storage modulus of the sheared nucleating agent system has the same shape as in the quiescent nucleating agent system, meaning that the growth mechanism is the same and only spherulites are formed. This implies that our method can still be applied to determine space filling for crystallization after shear. Moreover, the results can be compared to those of Housmans et al. (2009).

For flow-induced crystallization experiments, an adequate measure of the flow strength is the Weissenberg number, based on the stretch relaxation time of the HMW tail of the MWD distribution: Recent modeling work (Steenbakkers 2009) suggests that the creation rate of point-like nucleation precursors depends not only on the average stretch of the HMW molecules but also explicitly on the temperature: The prefactor of the creation rate was found to be proportional to the time–temperature shift factor a _T . Therefore, we use a _T Wi _s as a criterion to compare experiments, which scales as \(a_{T}^{2}\). From the linear viscoelastic data and the stretch relaxation time \(\tau_{\rm s}^{\rm HMW}\) reported by Housmans et al. (2009), we find \(W\!i_{\rm s} (148^{\circ}\mathrm{C}) = 13\), \(W\!i_{\rm s} (151^{\circ}\mathrm{C}) = 12\), and where \(W\!i_{\rm s} (138^{\circ}\mathrm{C}) = 8\) for the strongest flow applied by Housmans et al. (2009) to the same neat iPP as used here. Hence, these two data sets are reasonably comparable in terms of flow conditions.

The calculated nucleation densities are plotted in Fig. 9. The saturated nucleation density after shear is around 40 × 10¹⁶ m^− 3, six times higher than 7 × 10¹⁶ m^− 3 for quiescent crystallization, i.e., adding typically ∼10¹⁷ m^− 3 nuclei. This elevated number is much more than what was added by imposing shear to the neat iPP in the experiments of Housmans et al. (2009); mild flow raised the point-like nucleation density of the neat iPP by one to two decades before the shear effect saturated, i.e., adding typically ∼10¹³ m^− 3 nuclei. This indicates that, in the presence of nucleating agent, shear-induced point nucleation can be much more effective. This should be directly related to the nucleating agent, i.e., the local amplification of flow effects due to the presence of the nucleation particles, see for example Hwang et al. (2006), and not to a change in the rheological properties, which we expect to be very small due to the, in this respect, still very very low space filling due to nuclei.