Abstract

particles with different particle sizes have been synthesized by sol-gel method. X-ray diffraction results show that all the samples are pure cubic spinel structure with their sizes ranging from 9 to 96 nm. The lattice constant significantly decreases with further increasing annealing temperature. The magnetic measurements show superparamagnetic nature below the particle size of 30 nm, while others show ferrimagnetic nature above the corresponding blocking temperature. The blocking temperature increases with the increase in particle size, which can be explained by Stoner-Wohlfarth theory. The saturation magnetization increases as the particle size increases, which can be explained by the cation redistribution on tetrahedral A and octahedral B sites and the domain wall motion. The variation of coercivity as a function of particle size is based on the domain structure.

1. Introduction

Spinel ferrites have attracted more and more attention due to their various technological applications in some fields, such as microwave absorption, high-speed digital tape, ferrofluid, magnetic recording, and photomagnetic materials [1–5]. Among the spinel ferrites, nickel zinc ferrite is one of the most versatile magnetic materials as they have high saturation magnetization, high Curie temperature, excellent chemical stability, low coercivity, and biodegradability [6]. It is a mixed spinel structure based on a face-centered cubic lattice of oxygen ions, with functional units of . Zn²⁺ and Ni²⁺ ions are known to have very strong preferences for the tetrahedral A and octahedral B sites as depicted by curled and square brackets [2], respectively, while Fe³⁺ ions partially occupy the A and B sites. In the case of ferrite, it was found that for greater than 0.5, Fe³⁺ moments in A and B sites have collinear arrangement, whereas for less than 0.5, Fe³⁺ moments in the B site have noncollinear arrangement [7]. The compositional variation can result in the redistribution of metal ions in the A and B sites, which can modify the properties of nickel zinc ferrites. The nickel concentration effect on structure and magnetic of has been reported [8]. The result showed the superparamagnetic nature of the samples for and whereas the material showed ferromagnetic for , but the crystallite size increased unobviously from 12 to 17 nm corresponding to . Therefore, the nickel concentration played an important role in determining the magnetic properties of . In our previous studies [9], it is found that Ni_0.5Zn_0.5Fe₂O₄ (NZFO) presents the best magnetic and microwave absorption ability in system. Therefore, it is necessary to further study the magnetic properties of NZFO nanoparticles.

George et al. [10] have studied finite size effects on the structural and magnetic properties of NiFe₂O₄ powders. They found the specific saturation magnetization decreased with decreasing grain size, which may be due to noncollinear magnetic structure and surface effects. The coercivity reached a maximum when the grain size was 15 nm and then decreased as the grain size increased further, which can be explained on the basis of domain structure. Chen and Zhang [11] have reported size effects on magnetic of MgFe₂O₄ spinel ferrite nanocrystallites. The MgFe₂O₄ nanoparticles showed typical superparamagnetism, which unambiguously correlated with the particle size from 6 to 18 nm. However, few groups have investigated size effects on magnetic properties of NZFO ferrite prepared by sol-gel method.

In the present work, the sol-gel method has been used to prepare NZFO with different heat treatment temperatures. To the best of our knowledge, it is the first time to systematically demonstrate size effects of nanocrystallite ferrite on the magnetic behavior. The possible mechanism is discussed here.

2. Experimental

In order to synthesize NZFO, stoichiometric amounts of nickel nitrate, zinc nitrate, and iron nitrate were dissolved in deionized water under heating and magnetic stirring. After stirring for 30 min, citric acid was slowly added to the mixed nitrates solution. The mole ratio of citric acid and total metal ions was controlled to be 1.5 : 1. Urea was added to adjust the pH value to 7. The mixed solution was stirred at 80°C until forming viscous brown gel. Then, the viscous brown gel was placed in the oven at 80°C for 1-2 days to obtain a dry gel. The as-burnt powders were obtained when the dry gel was calcinated at 350°C for 3 h. Finally, the as-burnt powders were annealed in the muffle furnace at different temperatures in the range 400–1100°C in steps of 100°C for 2 h with a heating rate of 5°C/min in air. The as-burnt powders with different annealing temperatures were named as NZFO-350, NZFO-400, NZFO-500, NZFO-600, NZFO-700, NZFO-800, NZFO-900, NZFO-1000, and NZFO-1100, respectively.

Phase analysis of the products was performed by Philips X’pert PRO X-ray diffractometer with Cu K_α radiation. TEM (JEM-2010) was used to show the morphology and particle size distribution. The magnetic properties of the NZFO ferrite powders were measured by using a superconducting quantum interference device magnetometer measurement system (SQUID, MPMS-5T). Zero-field-cooling (ZFC) and field-cooling (FC) magnetization curves were performed in the temperature range between 5 and 350 K under an applied magnetic field of 100 Oe.

3. Results and Discussion

3.1. Structure and Morphology

Figure 1 shows XRD patterns samples treated under different annealing temperatures. The XRD patterns have a good agreement with the standard JCPDS cards for nickel zinc ferrite (card no. 08-0234), which confirms single phase cubic spinel structure (space group ) of ferrite samples. Figure 1(a) shows that the as-burnt sample appears diffraction peak of spinel ferrite, but the crystallinity is still relatively low, with less defined diffraction peaks. Figure 1 shows that the corresponding diffraction peaks become narrower and sharper with increasing annealing temperature, which indicates the growth in crystallite size [12] and much better crystallinity. It is expected that if one introduces annealing temperature in the system much higher, the molecular concentration at the crystal surface will increase and hence the crystal growth will be promoted [13]. In addition, a higher temperature can enhance the atomic mobility and make grains get more energy to grow up.

Figure 1 

XRD patterns of Ni0.5Zn0.5Fe2O4 at different annealing temperatures. Inset (a) shows XRD patterns of as-burnt powders and annealed at 400°C. Inset (b) is refinement result of XRD patterns for NZFO-1000.

The lattice constant for the samples is shown in Table 1. The value obviously decreases as the annealing temperature increases from 400 to 700°C. The sample calcined at lower temperature is partially crystallization. So, surface defects can occur within the lattice, but the crystallization will enhance with the increase of annealing temperature, which can result in lattice contraction. The is also observed to increase as the annealing temperature increases from 700 to 800°C but again decrease for samples annealed at above 800°C. This increase and decrease of could be attributed to redistribution of cations between tetrahedral and octahedral sites and zinc loss from the sample [14], respectively. In addition, the redistribution of cations between tetrahedral and octahedral sites is also supported by the magnetic measurement, as discussed later in this paper. Figure 1(b) shows refinement value of XRD pattern for NZFO-1000. The similarity between the experimental and simulated pattern confirms single phase cubic spinel structure of nanoparticles. The average crystallite size for all NZFO nanoparticles is calculated from intensity (220), (311), (511), and (440) peaks by the Debye-Scherrer equation where is the crystallite size, is the wavelength of Cu K_α (1.540598 Å), θ is the angle of Bragg diffraction, and is the full width at half maxima (FWHM) broadening. The obtained crystallite size at different annealing temperature is listed in Table 1. The calculation results show that crystallite size increases from 9 nm to 96 nm with increasing annealing temperature, which may be due to the increasing crystallinity.

In addition, the Williamson and Hall (W-H) plots [15] are also used to calculate the crystallite size. The equation is as follows: where β (FWHM in radian) is measured for different XRD lines corresponding to different planes, is the Bragg angle, ε is the strain, and is the crystallite size. Equation (2) represents a straight line between 4 sin θ (x-axis) and β cos θ (y-axis). The values of ε and are obtained by the slope (ε) and intercept (λ/D) of line, respectively. The strain rapidly increases for smaller crystallite which can be due to the increasing defect density. The value of ε obviously decreases with increasing annealing temperature (listed in Table 1), which are consistent with those calculated from values. Figure 2 shows the linear fitting W-H plots of NZFO-500, NZFO-600, NZFO-800, and NZFO-1000. From the parameters of linear fitting, the λ/D values are 0.01528, 0.00475, 0.00432, and 0.00206, respectively, corresponding to NZFO-500, NZFO-600, NZFO-800, and NZFO-1000. Therefore, the calculation values are 10 nm, 32 nm, 36 nm, and 75 nm, respectively, which are consistent with the previous calculated crystallite size by the Debye-Scherrer equation. So the annealing temperatures play an important role in controlling the crystallite size of the nanocrystallites.

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Figure 2 

Williamson and Hall plot graphs for NZFO-500, NZFO-600, NZFO-800, and NZFO-1000.

Figure 3 shows the TEM morphology of NZFO-600 and NZFO-800. The particles are similar spherical and polyhedral shapes. For NZFO-800 sample, classical polygonal grain and grain boundary morphologies are present, which shows a higher degree of crystallinity than that of NZFO-600 sample. The insets in Figures 3(a) and 3(c) are particle size distribution graph by counting 200 nanoparticles. The histogram of the size distribution is characterized by a Gaussian function (solid line). It is found that average particle size of NZFO-600 and NZFO-800 is obtained as 23 nm and 46 nm, respectively, which are in agreement with those of the XRD patterns. Therefore, the average crystallite size obtained from XRD analysis is taken as the average particle size. High-resolution TEM (HRTEM) analysis is employed to determine the crystal facets and orientation, as shown in Figures 3(b) and 3(d). In Figure 3(d), two sets of lattices are present and they are oriented at a certain angle with the interfringe spacing of 0.24 nm and 0.25 nm, corresponding to spinel (222) and (311) lattice planes of NZFO-800 ferrite.

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Figure 3 

(a) TEM image of NZFO-600 ferrite: the inset is particle size distribution graph, (b) high magnification TEM image for NZFO-600 ferrite, (c) TEM image of NZFO-800 ferrite: the inset is particle size distribution graph, and (d) high magnification TEM image for NZFO-800 ferrite.

3.2. Magnetic Properties

Figure 4 shows the room temperature M-H curves for Ni-Zn ferrites particles with different particle sizes. A similar room temperature M-H curve result was also observed by Jiang et al. [16]. The inset in Figure 4 shows the magnified view of the M-H curves at lower applied field, which shows that hysteresis appears obviously when calcinated at 600°C. In Figure 4, the NZFO-350, NZFO-400, and NZFO-500 samples exhibit nonsaturated magnetization even at the maximum applied field of 10 kOe, and the coercivity and the remanent magnetization are almost zero, which indicate the superparamagnetic nature. The magnetic moment is obtained using nonlinear curve fit of Langevin function. The function is expressed as [17] where is the true magnetic moment of each particle, is the saturation magnetization, is the Boltzmann constant, and is the absolute temperature. The fit results are displayed in Figure 5.

Figure 4 

Room-temperature M-H loops for Ni-Zn ferrites with different particle sizes. The inset shows the magnified view of the M-H curves at lower applied field for a series of sample.

Figure 5 

The nonlinear curve fit of Langevin function for NZFO-350, NZFO-400, and NZFO-600.

Figure 6 shows M-H loops of the nanoparticles with different particle sizes at 10 K. NZFO nanoparticles show typical hysteresis behaviors. The values of are listed in Table 1.

Figure 6 

The M-H loops for Ni-Zn ferrites with different particle sizes at 10 K.

The variation of and with different particle size is shown in Figure 7. The magnetic moment for formula unit in Bohr magneton is calculated and the obtained data are displayed in Table 1. It is seen that decreases as the particle size decreases. Kumar et al. [18] had reported that the existence of spin canting, cation distribution, and disordered surface layer could result in decreased . The surface effects become significant as the particle size decreases, which can lead to the decrease of . Another possible factor is the redistribution of cations between A and B sites, which grows the net magnetic moment. According to Neel’s two sublattice model of ferrimagnetism, O₄ configuration has 6 for formula unit. The value is higher than our value, which confirms cation disorder and redistribution. Sreeja et al. [19] had confirmed an abnormal cation distribution of Ni_0.5Zn_0.5Fe₂O₄ with different annealing temperature by Mössbauer spectroscopic study. At lower sintering temperatures, weaker magnetic superexchange interaction and lattice defects can also lead to the smaller value of [20]. Figure 7 shows that increases rapidly as particle size increases with a maximum value of 58.2 Oe at 600°C (30 nm) and then decreases with further increases in particle size. The same observation of change with particle size in Ni-Zn ferrite was reported in earlier study [16]. From the inset of Figure 7, increases as the particle size increases, reaches a maximum value, and then decreases at 10 K as well as at 300 K. The values of decrease as the temperature of measurement increases. A critical particle size of 10 nm is obtained at 10 K. The critical particle size decreases as the temperature of measurement decreases from 300 K to 10 K. Thus, in Figure 7, the peak value of has shifted to the lower particle size when the temperature decreases from 300 K to 10 K. A similar result had been reported by George et al. [10]. The values of and near to zero for NZFO-350, NZF-400, and NZFO-500 display superparamagnetic nature at 300 K. Generally, the for magnetic nanoparticles is closely related to their particle size. Smaller particle sizes correspond to a lower .

Figure 7 

Saturation magnetization and coercivity at 300 K versus particle size of the nanosized Ni-Zn ferrites. The inset shows particle size dependence of the coercivity at 10 K.

This variation of the with particle size can be explained on the basis of domain structure, critical size, and the surface and interface anisotropy of the crystal. A crystallite will spontaneously break up into a number of domains in order to reduce the large magnetization energy if it is a single domain. The ratio of the energy before and after division into domains varied as [10], where is the particle size. So, the energy reduces as decreases, which suggests that the crystallite prefers to remain single domain behavior for quite small .

In the single domain region, the variation of coercivity as a function of particle size is expressed as [17] where and are constants and and are particle size and coercivity. Therefore, increases as increases in below a critical particle size.

In multidomain region, the particle size dependence of the coercivity is expressed as where and are constants and is particle size. So, the coercivity decreases as particle size increases above a critical particle size. These equations’ analysis results are corresponding to our experimental results.

As a result, it indicates a critical particle size for the transition from single domain to multidomain behavior close to 30 nm at 300 K. In the spherical particle model, the critical size from single domain to multidomain can be calculated with the following formula [21]: where is the domain wall energy, is Boltzmann constant, is Curie temperature, is magnetocrystalline anisotropy constant, a is the lattice constant, and is the saturation magnetization. The particle is considered to be single domain below , while the particles are multidomain above . For NZFO, , , , and  Gs. From (6), the calculation value of is about 25.9 nm, which is almost consistent with the experimental result (30 nm). So, the average particle size of NZFO-600 is close to the critical size. For , these nanocrystallites are single domain, and the surface effect becomes important. In the prepared NZFO powders, the low magnetization value can be attributed to noncollinear surface spins that present in the surface of nanoparticles. As a result, the decreases, which is confirmed by the experimental curve of that decreases more rapidly as the values of decrease. For , the magnetic domain structure appears. Compared with the single domain, multidomain particles require fewer magnetic fields to switch for domain wall motion, which improves saturation magnetization [22]. Moreover, the surface effects become weak for larger particle size and the sample reaches the saturation of bulk ferrite. Thus, the experimental curve of versus in Figure 7 is almost horizontal for higher value of . This can also be due to the low strain value. So, the effects of strain on the magnetic of NZFO-900, NZFO-1000 and NZFO-1100 can be ignored.

Figure 8 shows the variation of magnetization with temperature curves in an external field of 100 Oe recorded in ZFC and FC modes. The ZFC-FC curves separation at lower temperature can be speculated as a high field irreversibility behavior below a certain temperature, irreversibility temperature, . The irreversibility behavior also indicates that there is a nonequilibrium magnetization state. The difference between and values become much larger at a certain temperature with increasing particle size for all examples, which may have some reasons as follows. and of different magnetic systems are found to be related through the expression [23] where and are the applied field and coercivity, respectively. Here,  Oe, and varies with particle size. value is calculated by using the previous expression from the measured at different annealing temperatures. For example, according to (7), the value of and will be almost identical at 300 K because  Oe compared to  Oe for NZFO-400, which can be further proven ZFC and FC curve shapes of Figures 8(a), 8(b), and 8(c).

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Figure 8 

Temperature dependence of magnetization for field cooled (FC) and zero-field cooled (ZFC) Ni0.5Zn0.5Fe2O4 nanoparticles at applied field of 100 Oe.

The ZFC magnetization curves appear maximum at the blocking temperature at which the relaxation time equals the time scale of the magnetization measurements. From Figures 8(a), 8(b), and 8(c) curves, the ZFC and FC are almost overlapped above , indicating the presence of the small-sized particles [24]. The value of NZFO-350, NZFO-400, NZFO-500 are 121 K, 123 K, and 208 K, respectively, indicating that the different particle size is characterized by different average energy barrier. Note also that the measured value of NZFO above annealing temperature of 600°C is higher than 350 K, as shown Figure 8(d). The obtained M-T curves of NZFO above annealing temperature of 600°C are similar, so only the M-T curves of NZFO-800 is shown. According to the Stoner-Wohlfarth theory, the magnetocrystalline anisotropy of a single domain particle can be approximated as follows [25]: where is the magnetocrystalline anisotropy constant, is the volume of the nanoparticle, and is the angle between the magnetic direction and the easy axis of the nanoparticle. When is comparable with thermal activation energy, with as the Boltzmann constant, the magnetization direction of the nanoparticle starts to fluctuate and goes through rapid superparamagnetic relaxation. The is the threshold point of thermal activation. Above , thermal activation can overcome the anisotropy energy barrier and the nanoparticles become superparamagnetic with the magnetization direction randomly flipping. Therefore, a variation of magnetization with applied field at 300 K is shown in Figure 4, the particles have adequate thermal energy to attain complete thermal equilibrium with the applied field during the measurement time, and, hence, hysteresis disappears. In single domain, larger particles possess a higher and require a larger to become superparamagnetic. Therefore, increases as particle size increases. Below , the thermal energy is no longer able to overcome the magnetization anisotropy energy barrier, remanent magnetization and coercivity appear and then exhibit a hysteretic feature, just as shown in Figure 6. According to previous analysis, all the analysis results of ZFC and FC curves are in agreement with magnetization curves.

4. Conclusion

XRD analysis reveals that all samples are the single phase cubic spinel structure, and higher annealing temperature could lead to lattice shrinkage and grain growth. The strain is also induced during the annealing process. The particle size from TEM morphology is in close agreement with the crystallite size by W-H plots. The room magnetic measurement shows superparamagnetic nature for NZFO-350, NZFO-400, and NZFO-500 ferrites, and others show ferrimagnetic nature. The room temperature saturation magnetization increases as particle size increases, with a maximum value of 3.14 /f.u. corresponding the particle size of 96 nm. The coercivity increases with increasing particle size and reaches a maximum when the particle size reaches a critical size and then decreases as the particle size increases further. This is due to the transition from single domain to multidomain structure. ZFC and FC magnetization behaviors confirm systematically the effect of surface effects on magnetic behavior.

Acknowledgments

This work was financially supported by the National Nature Science Foundation of China (Grants nos. U1232210, 11274314, 51002156, and 11104098) and the Natural Science Major Foundation of Anhui Provincial Education Department (Grant no. KJ2012ZD14).