Abstract

Li-Nickel ferrites with the chemical formula Li0.50.5𝑥Ni𝑥Fe2.50.5𝑥O4 (0.0𝑥1.0) have been prepared by the ceramic method. The spinel structure in homogenous state was realized by X-ray diffraction analysis. The lattice parameter has been determined for each composition and found to be nearly constant over the whole range of Ni concentration (= 0.83 nm ± 0.01). The cation distribution for each composition has been suggested. The experimental and theoretical lattice constants were found to be in good agreement with each other confirming the agreeability of the suggested cation distribution. The analysis of IR spectra indicates the presence of splitting in the absorption band due to the presence of small amounts of Fe2+ ions in the ferrite system. The force constants for tetrahedral and octahedral sites have been determined. Young’s modulus (E), rigidity modulus (G), bulk modulus (B), Debye temperature (𝜃𝐷), and transverse (𝑉𝑡) and longitudinal (𝑉𝑙) wave velocities have been determined. The variation of elastic moduli with composition has been interpreted in terms of binding forces between the atoms of spinal lattice.

1. Introduction

The substituted lithium ferrites are promising materials for microwave applications because of their low cost, excellent temperature performance, and squareness of the hysteresis loops [1]. Li ferrites are also suitable for the multilayer chip inductors (MLCIs) as the laminating ferrite layers because of their low sintering temperature, high Curie temperature, and excellent electromagnetic properties at high frequency [2].

There are many researches that have been reported in the literature on the studies of Li-Zn, Li-Mg, Li-Ti, Li-Cd, Li-Cu, and Li-Ga ferrites [38]. However, little information is available in the literature regarding the Li-Ni ferrite. The relative site preference of Li+1, Fe+3, and Ni+2 in the spinel lattice in the Li-Ni ferrite system was studied by Trivedi et al. [9]. The cation distributions have been determined through X-ray diffraction and confirmed by magnetization measurements. It was found that a greater percentage of Li+1 ions occupy the A-sites in the Ni-rich samples. Also, P.V. Reddy et al. have reported on the investigation of the cation distribution, magnetization, and dielectric properties of Li-Ni ferrite system [1012].

The elastic constants are of much importance because they reveal the nature of binding forces in solids and to understand the thermal properties of the solids. The ultrasonic pulse transmission technique (UPT) is the most common technique for elastic constants and Debye temperature determination [13]. A new method based on infrared spectroscopy has been developed by Modi et al., to study the elastic properties of spinel ferrites [14].

The aim of this present work is to investigate the structural and elastic properties of the ferrite system Li0.50.5𝑥Ni𝑥Fe2.50.5𝑥O4 (0.0 ≤ 𝑥 ≤ 1.0) through X-ray and IR analysis.

2. Experimental Technique

The measurements were carried out on polycrystalline samples of stoichiometric composition of Li0.50.5𝑥Ni𝑥Fe2.50.5𝑥O4, with (𝑥 = 0, 0.1, 0.3, 0.5, 0.7, 0.9, and 1.0). The samples were prepared by the usual ceramic technique. The starting oxides (Fe2O3, Li2CO3, and NiO) with high purity were mixed and grounded in a very fine powder. The mixtures were presintered at 800°C for 10 h. The powders were then regrounded, compressed in the toroidal and pelletized shape, and finally sintered at 1200°C for 10 hrs in static air. Then they were cooled gradually to room temperature with rate of 2°C per minute. A monophase spinel structure was recorded for all compositions using X-ray diffractometer, XRD, employing Cu Kα radiation (𝜆=1.5405Å) (type Philips X’Pert Diffractometer). The theoretical X-ray density (𝑑𝑥) of the samples was calculated using the formula (𝑑𝑥=8𝑀/𝑁𝑎3) where 𝑀 is the molecular weight, 𝑁 is Avogadro’s number, and 𝑎 is the lattice parameter. Also, the apparent density was measured using the Archimedes method by weighting the prepared samples in toluene employing the formula𝑑app=(𝑤1/(𝑤1𝑤2))𝑑tol, where 𝑤1, 𝑤2 are the weights of the sample in air and toluene, respectively, and 𝑑tol is the density of toluene. Further, The porosity percentage (P%) was calculated according to the relation 𝑝=(1𝑑app/𝑑𝑥)%. The scanning electron micrographs (SEMs) were taken for all samples using (JXA-840A Electro Probe Microanalyzer). The average grain diameter “D” was calculated by the line intercept method. IR spectra in the range from 200 to 1000 cm−1 were recorded at room temperature using the infrared spectrometer (model 1430, Perkin Elmer).

3. Results and Discussion

3.1. X-ray Diffraction Analysis

The single-phase cubic spinel formation of the compositions of the ferrite system, Li0.50.5𝑥Ni𝑥Fe2.50.5𝑥O4 (𝑥 = 0, 0.1, 0.3, 0.5, 0.7, 0.9, and 1.0), has been confirmed from X-ray diffraction patterns. Figure 1 depicts typical XRD patterns for all studied samples. No impurity phases have been detected from X-ray charts. The main reflection planes of the spinel structure have been shown and listed in Table 1 for all patterns with 𝑑-spacing values and relative intensity ratios in comparison with those of the JCPDS card of both Li0.5Fe2.5O4 and NiFe2O4 ferrites. The experimental lattice parameter (𝑎exp) was calculated according to the following equation: 𝑎exp=𝑑(𝑘𝑙)2+𝑘2+𝑙21/2,(1) where 𝑑 is the interplanar distance of each plane and (𝑘𝑙) are Miller indices. The obtained values of “𝑎exp” are listed in Table 2. From this table, it is found that 𝑎exp does not vary with 𝑥 (𝑎exp=0.83nm±0.01). This behaviour may be attributed to the values of ionic radii of the ions. The replacement of Fe3+ ions (0.064 nm) and Li+ ions (0.073 nm) by Ni2+ ions (0.069 nm) according to2Ni2+Li++Fe3+(0.14nm)(0.14nm)(2)

Table 1 
The calculated 𝑑-spacing of the recorded peaks and the corresponding relative intensities 𝐼/𝐼𝑜 with the data of (JCPDS card).
Table 2 
The Cation distribution, ionic radii of 𝐴- and 𝐵-sites, experimental and theoretical lattice constants and particle size of Li-Ni ferrite samples (with 0.0𝑥1.0).

Figure 1 
X-ray diffraction patterns of L i 0 . 5 N i 𝑥 F e 2 . 5 0 . 5 𝑥 O 4 (where 𝑥 = 0.0, 0.1, 0.3, 0.3, 0.5, 0.7, 0.9, and 1.0).

Since there is no difference between 𝑟Li++𝑟Fe3+ and 2𝑟Ni2+, the lattice parameter is constant over the whole concentration range.

3.2. Cation Distribution and Theoretical Lattice Parameter

It is known that there is a correlation between the ionic radii of both 𝐴- and 𝐵-sublattices and the lattice parameter. Then, the lattice parameter can be calculated theoretically using the following equation [15]: 𝑎th=833𝑟𝐴+𝑅𝑜+3𝑟𝐵+𝑅𝑜,(3) where 𝑅𝑜 is the radius of the oxygen ion (0.132 nm) and 𝑟𝐴 and 𝑟𝐵 are the ionic radii of tetrahedral (𝐴-site) and octahedral (𝐵-site), respectively. In order to calculate 𝑟𝐴 and 𝑟𝐵, it is necessary to suggest a suitable cation distribution. The knowledge of cation distribution and spin alignment is essential to understand the magnetic properties of spinel ferrite. The interesting electrical and magnetic properties of spinel ferrite arise from the ability of distribution of cations among the tetrahedral (𝐴) and octahedral (𝐵) sites. The investigation of cation distribution provides a mean to develop materials with desired properties which are useful for many devices [16]. In the light of the previous work reported on Li-Ni ferrite [9] the cation of the present studied samples has been suggested as listed in Table 2. Using the suggested cation distribution data, the mean ionic radii of tetrahedral A-site (𝑟𝐴) and octahedral B-site (𝑟𝐵) were calculated and given in Table 2. As observed from the table, 𝑟𝐴 and 𝑟𝐵 are constant for all values of 𝑥. This behaviour may be due to the constant value of the lattice parameter with different values of composition (𝑥). Furthermore, the values of the theoretical lattice parameters ath were calculated using formula (3). It is observed from the table that both 𝑎exp and ath are the same for all values of 𝑥, which confirms the agreeability of the suggested cation distribution.

The X-ray density (𝑑𝑥) for each composition was calculated. The effect of Ni-content (𝑥) on the variation of X-ray density is depicted in Figure 2. It is obvious from the figure that 𝑑𝑥 is increasing linearly with 𝑥. The observed increase in 𝑑𝑥 may be due to the increase in the molecular weight of the samples by increasing Ni-content according to formula (2), since the atomic weights of Ni, Fe, and Li are 58.69, 55.847, and 6.941, respectively. Further, the apparent density (𝑑app) of the above ferrite system was measured via the Archimedes method. The relation between the Ni-content (𝑥) and the apparent density was plotted in Figure 2. It is observed from this figure that 𝑑app increases as 𝑥 increases till 𝑥 = 0.5 only. Then it decreases by further increase in 𝑥 except for 𝑥 = 1.0. This behaviour matches well with the behaviour of 𝑑𝑥 only in the first range.


Figure 2 
The effect of Ni concentration ( 𝑥 ) on the variation of X-ray density d 𝑥 and the apparent density 𝑑 a p p .

The percentage porosity (𝑃%) of the samples was computed from the values of both 𝑑𝑥 and 𝑑app. The effect of composition 𝑥 on the porosity 𝑃% is shown in Figure 3. It is seen form this figure that the porosity is nearly constant in the range of 0.0 ≤ 𝑥 ≤ 0.5, but it increases in the range of 0.7 ≤ 𝑥 ≤ 1.0. The nearly constant value of 𝑃% in the former range may be due to that the percentage increasing in 𝑑app (about 6.43%) is bit lower than that of 𝑑𝑥 (about 6.93%), then one can expect that porosity remains nearly constant in this range. In the later range, the apparent density 𝑑app decreases by increasing 𝑥 except for 𝑥 = 1.0; however 𝑑𝑥 is still increasing in this range. The overall effect is the observed increase of porosity as shown clearly in Figure 3. Moreover, it was found that the values of the porosity lie in the range of 5–12%. Such these values indicate the highly dense structure of the prepared samples.


Figure 3 
The effect of Ni concentration ( 𝑥 ) on the variation of porosity ( 𝑃 %).

Depending on the broadening of the most 5 intense peaks in XRD patterns, (220), (311), (400), (511), and (440), the particle size of each sample was calculated using the well-known Sherrer’s equation [17]: 𝑡=0.9𝜆𝛽cos𝜃𝐵,(4) where 𝑡 is particle size, 𝜆 is wavelength of X-ray radiation, 𝜃𝐵 is Bragg’s angle, and 𝛽 is full width at half maximum. The data of the average particle size calculated for each all sample are reported in Table 2. As seen from the table, the calculated values of particle size lie in the range of 40–59 nm.

3.3. Grain Diameter

Magnetic and electrical properties are sensitively depending on the microstructure of ferrites. Grain diameter is more an important parameter affecting the magnetic properties of ferrites. Grain growth is closely related to the grain boundary mobility. Recrystallization and grain growth involve the movement of grain boundaries [18]. The SEM micrographs for the fractured surface of the samples are shown in Figure 4. The SEM micrographs indicate the distribution of grains with nonuniform size. The average grain diameter (D) of the samples was calculated from the SEM micrographs. The variation of grain diameter with Nickel content (𝑥) is shown in Figure 5. The values of the grain diameter lie in the range between 6 and 14 μm. These values are summarized in Table 2. The highest values were recorded for 𝑥 = 0.3 and 0.5, however the lowest for 𝑥=1.0 (i.e., NiFe2O4). This variation in grain diameter can be attributed to different factors such as diffusion coefficient and the concentration of dissimilar ions [19]. Obviously, the grains diameters observed by SEM are several times larger than the particle diameters calculated using XRD patterns, which indicates that each grain observed by SEM consists of several particles [20]. Regarding Figures 3 and 5, it is noticed that the larger the grain diameter, the lower the porosity. This behavior could be attributed to the fact that the samples with high porosity contain many pores which formed on the grain boundary.

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Figure 4 
SEM micrographs for 𝑥 = 0.0, 0.3, 0.5, 0.7, and 1.0.

Figure 5 
The effect of Ni-content ( 𝑥 ) on the grain diameter (D).
3.4. IR Spectral Analysis

The IR absorption spectra recorded in the range of 1000–200 cm−1 are shown in Figure 6. The absorption bands are summarized in Table 3. It is a well-known fact that the normal and inverse cubic spinels have four IR absorption bands signifying the four fundamentals (𝜈𝑎1,𝜈𝑎2,𝜈3, and 𝜈4) [21].

Table 3 
IR absorption bands of 𝐿𝑖0.50.5𝑥𝑁𝑖𝑥𝐹𝑒2.50.5𝑥𝑂4.

Figure 6 
The IR transmission spectra of L i 0 . 5 0 . 5 𝑥 N i 𝑥 F e 2 . 5 0 . 5 𝑥 O 4 ferrite.

The IR spectrum of pure Li-ferrite (𝑥 = 0.0) was discussed previously in more detail by our group [8, 22]. From Figure 6 it is noticeable that the main absorption bands (𝜈𝑎1 and 𝜈𝑎2) have appeared in all series of the investigated ferrite system. These two bands are common in almost all spinel ferrites. They are located around 600 and 400 cm−1, respectively. In the present work, the high frequency band 𝜈𝑎1 and the second absorption band 𝜈𝑎2 are found in the ranges 572–590 cm−1 and 382–404 cm−1, respectively. These are attributed to tetrahedral and octahedral site complexes in spinel structure [23]. The values of 𝜈𝑎1 are higher than those of 𝜈𝑎2 indicating that the normal mode of vibration of the tetrahedral complexes is higher than that of the corresponding octahedral site. This may be due to the shorter bond length of the tetrahedral site (𝑅𝐴=1.89 Å) than that of the octahedral site (𝑅𝐵=1.99 Å). Weaker band (𝜈3) around 327–331 cm−1 has been observed in the samples of 𝑥 = 0.0, 0.1, and 0.3 only. This band may be due to divalent metal ion-oxygen complexes in octahedral sites. Hence, its appearance can be considered as an evidence of the existence of the divalent iron ions Fe2+ [22]. Moreover, the decrease in the intensity of this band with composition 𝑥 indicates the decrement of Fe+2 ions by increasing Ni-content in the studied samples.

Another very small shoulders around 707, 667 and 543 cm−1 have appeared in the IR spectra of the samples (with 𝑥 = 0, 0.1, and 0.3) for tetrahedral site then completely disappeared for higher concentration of Ni2+. Such shoulders have been recorded also for Li0.5Fe2.5O4 by many authors [8, 24]. These bands are denoted by 𝜈1(1), 𝜈1(2), and 𝜈1*. It has been shown by Potakova et al. [25] that the presence of Fe2+ ions in ferrites can produce splitting or shoulder of absorption bands. It is attributed to Jahn-Teller distortion produced by Fe2+ ions which locally produce deformation in the crystal field potential and hence splitting of the absorption bands.

According to Tarte [26], the high frequency band 𝜈2(1) recorded only for 𝑥=0.0 and 𝑥=0.1 in the range 450–458 cm−1 could be assigned to Li+-O2- complexes on octahedral site. The intensity of this band goes on decreasing with the increase in 𝑥 since the Li+ content decreases with increasing in 𝑥, so it persists only up to 𝑥 = 0.1. Then it completely disappeared for 𝑥 ≥ 0.3.

The force constants, for tetrahedral site (𝑘𝑡) and octahedral site (𝑘𝑜), were calculated employing the method suggested by Waldron [27]. According to Waldron, the force constants for tetrahedral 𝐴-sites (𝑘𝑡) and octahedral 𝐵-sites (𝑘𝑜) are given by 𝑘𝑡=7.62𝑀𝐴𝜈21107𝑘𝑁/𝑚,o=10.62𝑀𝐵/2𝜈22107𝑁/𝑚,(5) where 𝑀𝐴 and 𝑀𝐵 are the molecular weights of cations on 𝐴- and 𝐵-sites, respectively, calculated from cation distribution formula suggested in Table 2. The values of the force constants are listed in Table 4. Figure 7 shows the variation of the force constants 𝐾𝑡 and 𝐾𝑜 with (𝑥). It can be seen that 𝐾𝑡 initially decreases at 𝑥 = 0.1. Then it increases as 𝑥 increases from 𝑥=0.3 up to 𝑥=1.0. However, 𝐾𝑜 increases linearly with 𝑥. Furthermore the calculated values of 𝐾𝑡 are greater than those of the corresponding values of 𝐾𝑜. However the values of the bond length of 𝐴-site (𝑅𝐴) are smaller than those of 𝐵-site (𝑅𝐵). This is due to the inverse proportionality between the bond length and the force constants [24].

Table 4 
The force constants and Elastic constants calculated for Li-Ni ferrite samples.

Figure 7 
The effect of composition on the variation of tetrahedral and octahedral force constants ( 𝐾 𝑡 and 𝐾 𝑜 ).
3.5. Elastic Properties

The ultrasonic pulse transmission technique (UPT) is the most conventional technique for elastic constants and Debye temperature determination [28]. To study the elastic properties of spinel ferrite and garnet systems, a new technique based on the infrared spectroscopy has been developed by Modi et al. [14, 29, 30]. The different elastic modulii can be evaluated using the following relations.

The bulk modulus (𝐵) of solids is defined as 1𝐵=3𝐶11+2𝐶12,(6) where 𝐶11 and 𝐶12 are the stiffness constants. But according to Waldron [27] for isotropic materials with cubic symmetry like spinel ferrites and garnets, 𝐶11𝐶12, therefore, 𝐵=𝐶11. Also, the force constant (𝑘) is related to the stiffness constant by [𝑘=𝑎𝐶11] [13], where 𝑘 is the average force constant (𝑘=(𝑘𝑡+𝑘𝑜)/2). Further, the values of the longitudinal elastic wave (𝑉𝑙) and the transverse elastic wave (𝑉𝑡) have been determined as follows [27, 28, 31]: 𝑉𝑙=𝐶11𝑑x1/2,𝑉𝑡=𝑉𝑙3.(7) The values of 𝑉𝑙 and𝑉𝑡 are used to calculate the elastic moduli and Debye temperature of the ferrite specimens using the following formulae [31]:

Rigidity modulus (𝐺)=𝑑𝑥𝑉2𝑡,

Poisson’s ratio (𝜎)=(3𝐵2𝐺)/(6𝐵+2𝐺),

Young’s modulus (𝐸)=(1+𝜎)2𝐺,

Mean elastic wave velocity 𝑉𝑚=(1/3)[(2/𝑉3𝑙)+(1/𝑉3𝑡)]1/3.

All the values of different elastic moduli of the studied Li-Ni ferrite system were calculated and reported in Table 4. From this table, it can be seen that, 𝐵, 𝐸, and 𝐺 increase with increasing Ni-content (𝑥). Following Wooster’s work [32], the variation of 𝐵, 𝐸, and 𝐺 with increasing Ni-content (𝑥) may be interpreted in terms of the interatomic bonding. Thus, it can be deduced from the increase of elastic moduli with concentration (𝑥) that the interatomic bonding between various atoms is being strengthened continuously. The values of Poisson’s ratio (σ) were found to be constant (𝜎=0.35) for all samples. Further these values lie in the range from −1 to 0.5 which is consistent with the theory of isotropic elasticity [33].

The Debye temperature was calculated employing the following formula reported by Raj et al. [31] and listed in Table 4: 𝜃Debyetemperature𝐷=𝑘𝐵3𝑁𝐴4𝜋𝑉𝐴1/3𝑉𝑚,(8) where 𝑉𝐴 is mean atomic volume given by (𝑀/𝑑𝑥)/𝑞, 𝑀 the molecular weight, 𝑞 is the number of atoms in the formula unit (i.e., 7), and 𝑁𝐴 is Avogadro’s number. Figures 8(a)8(d) show the variation of the Debye temperature (𝜃𝐷) with composition. It is well shown from the figure that (𝜃𝐷) decreases firstly in the range of 0.0𝑥0.3. Further increase of 𝑥 (0.3𝑥1.0), that is, in Ni-rich samples, leads to a corresponding increase in (𝜃𝐷). The observed increase in Debye temperature (𝜃𝐷) with nickel concentration (𝑥) in the range of 0.3𝑥1.0 suggested that lattice vibrations are hindered due to Ni-substitution. This may be due to the fact that strength of interatomic bonding increases with concentration (𝑥) as supported by our results on the variation of elastic moduli.

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Figure 8 
The effect of composition on the variation of Debye temperature and the different elastic moduli.

4. Conclusion

The single-phase cubic spinel formation of the compositions of the ferrite system, Li0.50.5𝑥Ni𝑥Fe2.50.5𝑥O4 (where, 𝑥 = 0, 0.1, 0.3, 0.5, 0.7, 0.9, and 1.0), has been confirmed from X-ray diffraction patterns. No impurity phases have been detected from X-ray charts. The lattice constant is constant over the whole range of Ni-substitution (𝑥). The experimental and theoretical lattice constants are in good agreement with each other confirming that the suggesting cation distribution is acceptable. X-ray density increases with Ni-substitution. The calculated values of particle size lie in the range 40–59 nm. The main absorption bands of spinel ferrite have appeared through IR absorption spectra recorded in the range of 1000–200 cm−1. The analysis of IR spectra indicates the presence of splitting in the absorption band due to the presence of small amounts of Fe2+ ions in ferrite. The force constants for tetrahedral and octahedral, elastic moduli, Debye temperature (𝜃𝐷), and transverse (𝑉𝑡) and longitudinal (𝑉𝑙) wave velocity have been determined. The variation of elastic moduli with composition has been interpreted in terms of binding forces between the atoms of spinal lattice.