XRD measurements were executed on powdered glass samples to confirm their non-crystalline nature. XRD diffractograms, not shown here, for all samples are nearly the same with no observed sharp peaks, confirming the short-range order structure of the studied materials.

Fourier transform infrared, FTIR, absorption spectra are considered fingerprints for the building block units. It was used to determine the formative-structural units and bonds in each glass’ matrix of the studied samples, as seen in Fig. 1, which shows the FTIR charts for all studied samples in the spectral range from 2000 to 400cm−1. The observed bands can be assigned to their structural groups and their chemical bonds based on the previous studies. The band from 460–470cm−1 is attributed to the ZnO bond tetrahedral bending vibrations in the ZnO4 structural units [15,18,19]. The band centered around 700cm−1 is due to the bending modes of BOB bonds in BO3, while the broadband around 1075cm−1 may be attributed to the stretching vibrations of the BO bond in the BO4 tetrahedral units [18,20,21]. The broad bands around 1420, 1530, and 1670cm−1 may be attributed to the BO symmetric stretching vibration of BO3 units [18,22,23]. These results confirm the incorporation of the Zn atom in the glass matrix as a ZnO4 unit.

Fig. 1.

FTIR spectra for all samples.

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Transmission electron microscopy (TEM) studies were performed on the sample BBZ5, with the highest concentration of ZnO (x=20mol.%), Fig. 2. Low magnification, 200nm, and high magnification, 50nm, TEM images show that the particle size is 20nm on average, ranging from 16 to 25nm. Furthermore, some four-fold ZnO4 structural units (black spots) are well dispersed into the glass matrix, as glass former, with highly homogenous structure. Some large-sized particles may indicate that ZnO in this sample starts giving some sort of crystallinity to the system. This could be ascribed to the accommodation of some ZnO in the interstitial sites, however, this was not shown in XRD pattern, only broad humps were observed. This observation will be further confirmed by density, molar volume, and Urbach energy calculations.

Fig. 2.

TEM image for the sample BBZ5 with the highest concentration of ZnO (x=20mol.%). (A) Low magnification 200nm, and (B) high magnification 50nm.

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Density and molar volume are characteristic physical properties that are sensitive to any slight changes in the internal structure solid substances. In this regard, to study the effect of ZnO incorporation on the glass matrix, the densities were measured for all samples. Their molar volumes were calculated and recorded in Table 1. Density was measured by the fluid displacement method, and values were calculated using formula (1), where Wa, Wx, and ρx are the weight of the sample in air, the weight of the sample in Xylene, and Xylene density, respectively. Molar volume Vm was calculated using formula (2) where MW is the molecular weight of the samples.

The observed increase in the density (ρ) value is related to the increase in the molecular weight, which is attributed to the replacement of low-density oxide B2O3 (2.55g/cm3) by high-density oxide ZnO (5.61g/cm3). Simultaneously, the observed decrease in the molar volume (Vm) value may be attributed to the relative decrease in the total number of Oxygen atoms, in agreement with published results [18,24]. Additionally, the Van der Waals radius values for both Zn and B atoms are 139pm and 192pm, respectively. This means that the smaller Zn atom, when it replaces the bigger B atom, fills the spaces in the glass matrix, increasing the system's compactness. This behavior of both density and molar volume indicates that the glass system becomes more compact with the addition of ZnO, in which the Zn2+ has a contracting effect. Values of both the density and molar volume were then substituted in the empirical formula (3)[22] to calculate the samples’ average refractive indices.

The absolute optical absorbance Aλ is an important optical parameter and was calculated based on the measured optical transmittance Tλ and the measured optical reflectance Rλ for all samples over a range of the wavelengths from 200nm to 750nm, using relation (5). Normalized measured optical transmittance T and reflectance R are presented in Fig. 3A over the full range from 200 to 750nm.

Fig. 3.

(A) Measured transmittance T and measured reflectance R in the wavelength range from 200 to 750nm. (B) Optical Absorption spectra over the wavelength range from 200 to 750nm. Inset: A over the significant range of 200 to 400nm.

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The absolute optical absorbance A is plotted in the wavelength range from 200 to 750nm for all samples. However, interesting observations were shown only between 200 and 400nm, as depicted in Fig. 3B. The optical absorption of the studied samples was affected by the incident light's wavelength and the structural compositions. It is found that as the wavelength increases, the absorbance increases until it reaches a maximum value and then decreases. Additionally, samples containing more ZnO show higher absorbance; until the wavelength of about 338nm (near the value of ZnO energy band gap) is reached, the behavior is reversed.

What happens here is that at wavelengths below 338nm, the ZnO is mainly responsible for electronic (π→π*) excitation transitions until all electrons in the top of the valence band are transferred to the conduction band. Here, despite the existence of ZnO in the interstitial states, as confirmed by the FTIR analysis, the electronic transitions dominate the situation and weaken the role of ZnO from modifying the glass matrix. However, after 338nm, ZnO is no longer absorbing and hence playing the role of matrix modifier and starts to increase the glass transparency, until the glass is totally transparent in the visible region. Another important observation is the shift of the absorption band center to lower values of wavelength (blue shift) as the amount of ZnO increases. For the zinc-free sample BBZ1, the maximum absorbance is reached at a wavelength value of about 343nm; meanwhile, when the ZnO content is maximum in sample BBZ5, the band center shifts to wavelength of about 315nm. This means that the changes in chemical structure/environment affected the absorption spectrum of the studied glasses. This spectral shift refers to a decrease in the molar absorptivity when increasing ZnO content related to the increased density. From another point of view, this blue shift can be explained along with the increase in the optical basicity of the samples by replacing oxide B2O3 of low optical basicity (0.43) with oxide ZnO of high optical basicity (1.03) [25,26].

Furthermore, this shift may refer to an increase in the glass matrix polarizability by increasing ZnO content, which can be acceptable on the basis that the electronic polarizability of ZnO is approximate twice the value that of B2O3 regardless of BaO [11,27]. Also, it can be observed that both height and broadness of the absorbance peak are increased by increasing the ZnO content, which can be related to an extreme increase in the optical bandgap. Moreover, the relative decrease in the total number of oxygen atoms can be attributed to the glass central linker, which confirms the glass molar volume decrease. Hence, one should realize the decrease in optical transparency and increase the optical absorption by increasing the ZnO concentrations. These results suggest the studied glasses be used as high-energy UV-filters and optical switches.

Using the relevant relations mentioned elsewhere [28,29], both the absorption coefficient α and the linear refractive index n were calculated for all samples as shown in Figs. 4 and 5, respectively. These figures showed that, as the ZnO content increases, the absorption coefficient increases in the high energy region until the wavelength reaches the value of 338nm, then the behavior is reversed. The refractive index also shows an incremental behavior with the increment of the ZnO content. In the high-energy region, until the wavelength reaches the value of 348nm, then the behavior is also reversed. This coincides with the results of optical absorption and has the same explanation. These results indicate a direct proportional between the ZnO, the glass density, and the value of the frequency. However, for the low energy refractive index, after wavelength values of 348nm, the glass system becomes more transparent with increasing ZnO content, as explained previously. Then the refractive index shows a decremental behavior in the low energy region. This was predicted in the previous section using the measured density values and employing the empirical formula (3). Such behavior can be assigned to the occurred competence in the glass matrix due to the decrease in the molar volume and the relative number of oxygen atoms.

Fig. 4.

The absorption coefficient (α) over the wavelength range from 200 to 750nm. Inset: α over the significant range of 200–400nm.

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Fig. 5.

Linear refractive index n over the wavelength range from 200 to 750nm. Inset: n over the significant range of 200–400nm.

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The absorption coefficient was used in the calculations of the optical bandgaps for both the direct and indirect electronic transition in addition to Urbach energy, as tabulated in Table 2. The method of calculation is shown elsewhere [30]. Values for the indirect transition bandgap and the direct transition bandgap showed a slight increase, 0.14eV and 0.11eV, respectively, between BBZ5 (Zinc-rich sample) and BBZ1 (Zinc-free sample). This indicates the incorporation of ZnO in the system developed a wider bandgap. Additionally, Urbach energy values showed a very slight decrease by 0.017eV from the BBZ1 TO BBZ5. This may indicate a very slight decrease in the randomness peculiarities and a very slight increase in the system order due to the accommodation of Zn atom in the interstitial sites. This interpretation agrees with calculations of the molar volume and observations by transmission electron microscopy studies, as discussed previously.

Nonlinear optical parameters are very important to be considered when studying materials for potential optical and photonic device applications such as optical waveguides and optical fibers [31]. Following equations were used for calculating the nonlinear optical parameters, namely, third-order nonlinear susceptibility χ(3) (Eq. (8)) and nonlinear refractive index n2 (λ) (Eq. (9)) [28].

Figs. 6 and 7 depict the third-order nonlinear optical susceptibility and the nonlinear refractive index for all samples. As manifested in the data graphs, both parameters’ highest peak intensity is shown for the sample BBZ5, the ZnO-rich sample. Additionally, the said peak is centered around 340nm for both parameters, close to the reversion point – absorption peak – as discussed earlier. These results suggest this sample for potential applications in photo-electron devices such as frequency converters [32].

Fig. 6.

Third-order optical susceptibility over the significant wavelength range of 200–400nm.

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Fig. 7.

Nonlinear refractive index n2 over the significant range of 200–400nm.

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In other words, the increase of ZnO improves the nonlinear optical properties of the studied glasses, where the higher values of both the nonlinear refractive index and the third-order susceptibility suggest the rich ZnO-glasses for nonlinear optical applications [33].

Extinction coefficient k represent the imaginary part of the refractive index and is a function of the absorption coefficient and wavelength, where k=0.08αλ. The k-value represents the amplitude of the damping vibration of the electric field of light [34,35]. Fig. 8 depicts the variation of k-value with the wavelength of the incident photons. As seen in the figure, the k-Value increase when ZnO increase for all wavelengths shorter than 340nm, then shows opposite behavior for the wavelengths longer than 340nm. In other words, the point 340nm is an inversion point at which the k-value reaches its maximum limit. Such behavior means that the optical resistance, of the studied material, shows a breakdown at this point, where the light passes without any decay. This means that the increment of ZnO increases the optical energy loss in wavelength ranged from 200 to 340nm, then reverses its effect for wavelengths above 340nm. Such behavior may suggest the studied glasses to be uses as optical switchers [36,37].

Fig. 8.

Extinction coefficient K for all samples, over the significant range from 200 to 400nm.

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Dielectric parameters such as the dielectric constant ɛ′, the dielectric loss ɛ″, and the loss tangent or dissipation factor (tanδ) are very important to be considered when implementing studied glasses optoelectronic applications. They give information about the amount of energy lost in the system and electromagnetic wave dissipation within the material. These parameters were calculated using the optical parameters α and n, using the following relations [16,29,38].

(10)ε′=n2−αλ4π2

The behaviors of ɛ′ and ɛ″ with the increasing wavelength of the incident light are shown in Fig. 9 for all samples. As shown, there is an observable relaxation process where ɛ″ reached a maximum at which the relaxation time pass between two successive transitions τ=λcritical/2πc sec, where c is the speed of light in vacuum while the critical wavelength λcritical is the value of the wavelength at which ɛ″ reaches its maximum value [39].

Fig. 9.

Optical dielectric relaxation parameters versus wavelength, over the significant range from 200 to 400nm.

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Table 3 shows the λcritical and the corresponding relaxation time τ, for all samples. Notably, the relaxation time value decreases with increasing the amount of ZnO in the glass system. In this regard, as the amount of ZnO increases and as the ZnO resides in the interstitial states of the glass, the system becomes more compact, increasing the overall volume charge density. This leads to a faster charge carrier hopping and subsequent shorter relaxation time. This short relaxation time may indicate that the dominant conduction mechanics is due to electronic hopping. Additionally, the shape of the relaxation peak for the dielectric loss component ɛ″ indicates that this process is a Debye-type relaxation. Electrical dipoles are giving rise to polarization [39,40]. This is also confirmed by the peaks of the loss tangent behavior shown in Fig. 10 and by the shifts in the peak position, generally. These results agree with the Wemple-DiDomenico single oscillator model [41]. Our results, collectively, suggest the studied materials for several optoelectronic device applications such as high-energy optical filters, optical switches, and optical filtering. Additionally, the optical-dielectric behavior and the blue shift in the optical absorbance can suggest the studied materials as dielectric supercapacitors for advanced energy storage applications, but this needs more extensive studies.

Fig. 10.

Optical loss tangent versus wavelength, over the significant range from 200 to 400nm.

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