Ca_0.9Sr_0.1Mn_1−xMo_xO₃ [CSMMO with x = 0.00, 0.02, 0.04, 0.06, and 0.08] ceramics were prepared utilizing a typical solid-state reaction process using the raw materials CaCO₃ (99.999%), SrCO₃ (99.99%), MoO₃ (99%), and MnO₂ (99%). To study the effects of changes in perovskite characteristics caused by dopants, a very small amount of Mo was doped rather than a higher-order dopant level. In an agate mortar, powders of the raw materials were combined according to stochiometric calculation and grounded with acetone. Each composition was milled for 6 hours to ensure a homogenous blend. After that, each composition was calcined at 900˚C for 3 hours in the furnace. The calcined powders were ground again for roughly 4 hours after calcination. By combining polyvinyl alcohol (PVA) with the weighted sample, disc- and toroid-shaped samples were created using a hydraulic press at 5 tons of uniaxial pressure. Finally, the green samples had been sintered at 1300˚C for 4 hours.

X-ray diffractometer (Rigaku Smart Lab, Japan) was used to determine the material’s crystal structure. The specimens were subjected to Cu-K_α radiation with a primary beam of 40 kV and 30 mA at a wavelength of λ = 1.54056 Å. The lattice parameters for orthorhombic structure were calculated using the formula:

$\frac{1}{d_{hkl}^2}=\frac{h^2}{a^2}+\frac{k^2}{b^2}+\frac{l^2}{c^2}$ (1)

and for the tetragonal structure, the following formula was used:

$\frac{1}{d_{hkl}^2}=\frac{h^2+k^2}{a^2}+\frac{l^2}{c^2}$ (2)

where $d_{hkl}$ is the d spacing between the crystal planes, and (h, k, l) are the Miller indices, and a, b, c are the values of the lattice parameter.

The JOEL 7500 scanning electron microscope was utilized to obtain the microstructural photographs of the samples to get a better understanding of grain structures. The Jusco FT-IR 6300 spectrophotometer was used to measure the Fourier Transformation Infrared Spectra (FTIR) at room temperature. Hitachi U-2900 UV–Vis Double Beam Spectrophotometer was used for measuring the UV–visible absorption spectra. Electrical properties, such as resistivity, ac conductivity, were collected by the Wayne Kerr Impedance Analyzer (WAYNE KERR 6500B). The samples’ ac conductivity (ac) was estimated using the following formula:

${\sigma }_{ac}=\omega {\epsilon }_o\epsilon \prime \tan {\delta }_E$(3)

where ω is the angular frequency.

The Wayne Kerr Impedance Analyzer (WAYNE KERR 6500B) was also utilized to determine the magnetic properties, such as permeability; at room temperature over the frequency range of 1 kHz to 100 MHz. The real part of the complex primary permeability ( ${{\mu }^{\prime }}_i$) was calculated using the following formula:

${{\mu }^{\prime }}_i=\frac{L_s}{L_o}$(4)

and ${{\mu }^{″}}_i={{\mu }^{\prime }}_i\tan \delta$(5)

where L_s is the sample core’s self-inductance and L_o = μ_oN²S/d is determined geometrically. L_o is the inductance of the winding coil without the sample core, N is the number of turns of the coil (N = 4), and S is the area of the toroidal sample’s cross-section.

The M-H hysteresis loops have been collected at room temperature and also at low temperature (5K) by using the Physical Properties Measurement System (PPMS), Quantum Design Dyna Cool to reveal the magnetic properties of the resulting materials.

XRD is a very important tool to determine the structural parameters of any materials. Figure 1 shows the XRD patterns of Ca_0.9Sr_0.1Mn_1−xMo_xO₃ (CSMMO) ceramics taken at room temperature (RT) using CuK_α (λ = 1.5406 Å) radiation. The diffraction patterns have been collected in the 2θ range of 20 to 80˚ for all bulk materials. All XRD peaks have been assigned using the JCPDS card No. #50-1746 [11] [12] , which corresponds to orthorhombic symmetry. With increasing doping content, the orthorhombic crystal structure of the samples is transformed into a tetragonal symmetry. The orthorhombic phase of these manganates’ changes into the tetragonal crystal structure when heated at high temperatures [13] . The phase transition from orthorhombic to tetragonal sintered at 1300˚C coincides with earlier research findings [14] . The substitution of Mo at the Mn site in CSMMO causes a structural transformation from an orthorhombic to a tetragonal crystal system, indicating that manganates have mixed valences of Mn. When there is an oxygen deficiency, the Mn⁴⁺ valence state decreases to Mn³⁺ for charge valence in the lattice. New peaks are shown in the X-ray diffraction pattern (at about a 33-degree angle) for x > 0.04 samples, which indicates the transformation of crystal symmetry and it might be responsible for the lattice distortion due to the Jahn teller ion Mn³⁺ [15] .

Figure 2 shows the enlarged view of (200) peaks and it confirms the shifting of peaks to the lower angle side. The phenomenon of shifting to lower angles with increasing Mo concentrations can be attributed to the size mismatch effect of Mn⁴⁺ (0.53 Å) and Mo⁶⁺ (0.59 Å) [16] . The shifting of the peaks is not only responsible due to the substitution of Mn⁴⁺ ions for Mo⁶⁺ ions, but, also, due to the conversion of Mn⁴⁺ by Mn³⁺ [17] . Since the samples have been synthesized at a relatively high temperature (1300˚C), such as in the present case, the possibility of oxygen loss cannot be ruled out given by the following equation:

$O_0\to \frac{1}{2}{O}_2\left(g\right)+V_{\ddot{O}}+2e^{\prime }$(6)

where the defects are written in terms of Kroger-Vink notation of defect. The presence of an electron in Equation (6) may reduce the valence state of Mn³⁺, given by the following equation:

${\text{Mn}}^{4+}+e^{\prime }\to {\text{Mn}}^{3+}$(7)

The ionic radius of Mn³⁺ (0.64 Å) is higher than Mn⁴⁺ (0.53 Å), which increases the volume of the unit cell. Therefore, a higher value of interplanar spacing/lattice parameters gives a lower Bragg angle and vice versa [16] . The Mn³⁺ ions are increased according to the formula:

${\text{CaMn}}_{1-3y}^{4+}{\text{Mn}}_{2y}^{3+}{\text{Mo}}_y^{6+}{\text{O}}_3$ (8)

Therefore, the effective valency of Mn is equal to ${\vartheta }_{\text{Mn}}=\left(4-6y\right)/\left(1-y\right)$, provided there is no oxygen deficiency [18] . A decreased Mn effective valency with doping, as shown in Equation (7), indicates the further generation of Mn³⁺, which causes orthorhombic distortion of MnO₆ octahedra in x = 0.00 to x = 0.04 sample, and then transform into tetragonal structure in x = 0.06 and x = 0.08 sample.

The lattice parameters and cell volume have been calculated as a function of doping atomic radii in structure optimization calculations and are shown in Table 1 . It can be observed that with increasing Mo⁶⁺ content, the lattice parameters “a”, “b” and “c” undergo an increase, with the overall increase in cell volume. This can be attributed to the substitution of Mn⁴⁺ ( $r_{{\text{Mn}}^{4+}}$ = 0.53 Å) with a larger ion Mo⁶⁺ ( $r_{{\text{Sr}}^{2+}}$ = 0.59 Å) [19] . The unit cell volume of the orthorhombic crystal can be derived from the formula, $V=a\times b\times c$ and for tetragonal, the formula is $V=a^2\times c$. A gradual rise in the lattice parameters and unit cell volume correlates with the increased concentration of big charge-compensating Mn³⁺ cations resulting from Mo doping. In accordance with the rise in crystal symmetry, the Mn-O-Mn bond angle has consistently approached 180˚ with respect to x, which is consistent with earlier work and it is evident that Sr substitution enlarges the Mn-O-Mn bond angle, assisting one electron transfer of the extra electrons generated by Mo substitution [14] . The substitution of Mo in the B-site promotes a mixed valence state for Mn. Therefore, the substitution of x mole% of Mo to the B-site generates 2x mole% of Mn. This established the effect of Mo substitution by demonstrating that the Fermi level is dominated by Mn³⁺ and O²⁻ states, which are only present when Mo replacement is performed on Mn-sites. The Mo substitution only has the effect of raising the concentration of electronic carriers, which in turn modifies the material’s electrical characteristics [20] .

In addition, all the materials doped with Mo have a larger volume than that of intrinsic CaMnO₃. The values of a and c have increased with Mo substitution on the B-site, and it is more significant in the a-c plane. As a consequence, the orthorhombicity factor (a/c) has decreased strongly where the c/a value has increased, from which it can be said that the tetragonality is increased with the increase in dopant contents [21] , which is listed in Table 1 .

The chemical flexibility of perovskite materials and the potential substitution of A and B-site metal ions may result in cell deformation. The distortion is characterized by the Goldschmidt tolerance factor “t”, which has the following definition [22] and leads to structural stability:

$t=\frac{R_A+R_O}{\sqrt{2}\left(R_B+R_O\right)}$(9)

where R_A, R_B, and R_O represent the ionic radius of the A-site cation, B-site cation, and O-anion. According to the previous research [23] , the perovskite structure will be cubic for 0.90 < t < 1.00 and orthorhombic for 0.75 < t < 0.90. The CaMnO₃ has a t of slightly less than 1.00, and for CSMMO, slightly greater than 0.82. In the case of Ca_0.9Sr_0.1Mn_1−xMo_xO₃ ceramics, the above equation can be written as,

$t=\frac{0.9R_{{\text{Ca}}^{2+}}+0.1R_{{\text{Sr}}^{2+}}+R_{{\text{O}}^{2-}}}{\sqrt{2}\left[\left(1-x\right)R_{{\text{Mn}}^{4+}}+x{R}_{{\text{Mo}}^{6+}}+R_{{\text{O}}^{2-}}\right]}$(10)

where $R_{{\text{Ca}}^{2+}}$, $R_{{\text{Sr}}^{2+}}$, $R_{{\text{Mn}}^{4+}}$, $R_{{\text{Mo}}^{6+}}$, and $R_{{\text{O}}^{2-}}$ are the ionic radii of Ca, Sr, Mn, Mo, and O, respectively, and their respective values are 1.34, 1.44, 0.53, 0.59, and 1.40 Å [24] .

The tolerance factor “t” is calculated for all samples and is listed in Table 1 . The variation of “t” with Mo concentration is plotted in Figure 3 . It was found that the tolerance factor deceased with increasing Mo concentration, and the value of “t” varies from 0.8296 to 0.8288. The tolerance factor decreased due to the increased radius of the dopant metal cations. This can lead to distortion and, eventually, decomposition of the perovskite structure. The values obtained for “t” agree well with the values observed due to Mo⁶⁺doping at the Mn sites with their ionic radii [25] .

The average crystallite size for CSMMO ceramics with varying dopant contents

has been calculated using the Scherrer equation below:

$D=\frac{k\lambda }{\beta \cos \theta }$(11)

where D is the average crystallite size (nm), θ is the angle of diffraction, k is Scherrer’s constant (k = 0.94), λ is the X-ray wavelength (0.15405 nm), and β is the full width at half maximum (FWHM) of the diffraction peak in radian [26] .

To determine the accurate value of crystallite size, as well as micro-strain for the prepared samples, the Williamson-Hall (W-H) plot was considered. According to the W-H plot, the FWHM of the XRD peak is related to the average crystallite size (D) and average micro-strain (ε) is determined by a mathematical equation given as follows [26] :

$\beta \cos \theta =\frac{0.9\lambda }{D}+4\epsilon \sin \theta$(12)

The value of average dislocation density, δ, is also calculated using the relationship [27] :

$\delta =\frac{1}{D^2}$ (13)

The values of D, ε, and δ have been calculated for all samples and the values are listed in Table 2 . It can be observed that the micro-strain (ε) is increased up to 2% and, then, suddenly decreased up to 4%, and, then, it again increased up to 8% Mo doping. This may be because, as the dopant increases, the system becomes less crystallized, and, therefore, the ε in the system becomes higher. Equation (12) shows that the D is inversely proportional to the FWHM of the XRD peak, so the FWHM becomes higher, and therefore, corresponding D is lower, and similarly, ε is higher [26] . Table 2 also shows the variation of δ with Mo doping. It is also noticed that the value of δ is enhanced with the doping content. Eq. 13 reveals that the square of δ is inversely proportional with D. So, as D is decreased with the dopant, the value of δ is increased [27] .

The average value of crystallite size (D) is found to be from 31.6418 to 35.6372 nm ( Table 2 ). The D decreased with the increase in Mo concentration up to 2% Mo, and further doping increases its value upto 4% and, then, decreases again upto 8% due to the ionic size mismatch of Ca²⁺ (1.34 Å) and Sr²⁺ (1.44 Å), and similarly for Mn⁴⁺ (0.53 Å) and Mo⁶⁺ (0.59 Å) ions or due to strain-induced on doping process [28] [29] .

The microstructure of the prepared samples is analyzed by FESEM. The typical FESEM images with 5000× magnification of various Ca_0.9Sr_0.1Mn_1−xMo_xO₃ (x = 0.0, 0.02, 0.04, 0.06, and 0.08) solid solution sintered at 1300˚C for 4 hours are shown in Figure 4 . Figure 4(a) depicts the microstructure of undoped Ca_0.9Sr_0.1MnO₃ ceramics and Figures 4(b) - (e) shows the images of Mo-doped various compositions. The FESEM images reveal that all the samples exhibit a compact arrangement of amalgamated, irregular, and inhomogeneous grains with spherical shape. Reasons for the agglomeration of the particles might be due to the presence of magnetic interactions among the particles. Roughness of surface and a very less amount of porosity is also occurring between the crystal grains, affecting the material density.

The grain size of the compositions has been estimated using the ImageJ software. The histogram of grain size distribution of various compositions is shown in Figures 5(a) - (e) , and the values of average grain size are listed in Table 2 . The observed grain sizes of the samples are 1.3, 1.45, 1.75, 2.36, and 3.01μm for x = 0.00, 0.02, 0.04, 0.06, and 0.08 samples, respectively.

The grain size is found to be increased with the increase in Mo contents in the compositions which suggests that Mo⁶⁺ might enhance the grain growth. Due to this grain growth, the average grain size goes higher and distribution of grains becomes wide. This can be explained by the tendency of the manganese to form more stable oxides than molybdenum [30] . As seen, the grain size increases with the molybdenum content, and it is further recommended that for Mo⁺ ions, less

energy is required to penetrate into the lattice for the formation of the Mo⁺⁶-O²⁻ bond, which is small as compared to the Mn³⁺-O²⁻ bond [12] . Consequently, bigger size grains have observed with increasing Mo⁺ doping in the prepared Ca_0.9Sr_0.1Mn_1−xMo_xO₃ ceramics. The result is in good agreement with the result of recent study on Mo doped CaMnO₃ solid solution system [7] .

The optical properties of Mo-doped Ca_0.9Sr_0.1MnO₃ ceramics have been analyzed by the Ultraviolet-visible (UV-vis) spectral studies and Fourier Transform Infrared Spectroscopy (FTIR). The UV-vis spectral studies give information on the energy gap and the transitions that form the optical absorption edge. Moreover, the optical properties of FTIR can be used to reveal the phase separation in the electron subsystem. The optical properties of Ca_0.9Sr_0.1Mn_1−xMo_xO₃ (x ≤ 0.08) polycrystals have been studied in the visible region. The purpose of this work is to study the effect of electron doping of CaMnO₃₋ based manganite’s, in which, Mn⁴⁺ ions are substituted by Mo⁶⁺ ions, on the band structure. The optical properties in the inter-band absorption have been investigated at room temperature (T = 300 K), i.e., in the paramagnetic phase. The majority of inorganic compounds, organic compounds, and some functional groups have been noticed transparent in the UV-visible area. In order to investigate the optical absorbance spectra and their corresponding optical band gaps, the absorption spectrum of the specimens was collected by ultrasonicating a small quantity of the specimen in distilled water. The distilled water was employed as the reference point in this instance. The absorbance is located within 200 - 800 nm, which has been determined from the absorption spectrum ( Figure 6 ). The energy of band gaps has been calculated for CSMMO ceramics using the Tauc plot method.

The Tauc equation is:

${\left(\alpha h\nu \right)}^{\gamma }=A\left(h\nu -E_g\right)$ (14)

where α is the absorption coefficient, h is the Planck’s constant, ν is the Photon’s frequency, A is the proportionality constant that corresponds to the inter-band transition probability, and E_g is the band gap energy.

The exponent γ is referred to as an index parameter that characterizes the kind of transitions occurring in electronic bands. Based on the type of transition, there are four potential values, such as 1/2, 1, 3/2, and 2 which correspond to allow indirect, forbidden indirect, forbidden direct, and allowed direct transitions, respectively [16] . Here,

$\text{Absorption}\text{Coefficient},\alpha =\frac{\text{absorbance}}{\text{thickness}}$(15)

According to the Beer-Lambert’s law and from the absorption spectrum, α has been calculated.

The energy has been calculated from the following equation:

$\text{Energy}=h\nu =hc/\lambda$ (16)

The onset absorption edge of each sample has been determined by extrapolating the absorption edge on the wavelength axis. The absorption edges have been found at 228, 253, 271, 264, and 275nm for x = 0.00, 0.02, 0.04, 0.06, and 0.08, respectively, owing to its charge transfer intermolecular π → π^∗ transitions taking place in CMO ceramics [31] .

To determine the optical band gaps of various samples of CSMMO ceramics, the plots of (αhν)^1/2 vs. energy are used as shown in Figure 7 . It is evident that the optical band gaps of CSMMO ceramics are indirect band gaps which are 2.05, 1.85, 3.00, 4.06, and 4.00 eV for x = 0.00, 0.02, 0.04, 0.06, and 0.08, respectively. The obtained values are presented in Table 3 . The optical band gap firstly

decreased with doping content up to 2% and, then, increased with 4% and 6% Mo contents, where it, again, slightly decreased for 8% Mo content. The variation of E_g with Mo content follows the variation of average grain size with the addition of Mo, as shown in Table 2 . It is a well-known quantum mechanical phenomenon

that, with increasing particle size, the band gap of the materials has been found to increase [32] . In the previous study of the optical properties of CaMnO_3–δ single crystals, the fundamental absorption edge corresponds to E_g = 1.55 eV and is determined by indirect transitions; the intense inter-band absorption bands at 2.2 and 3.1 eV are explained by the O(2p) →Mn(e_g)↑ and O(2p) → Mn(t_2g)↓ transitions; and the increase in absorption above 4.5 eV is related to the O(2p) Mn(e_g)↓ transitions. In the manganese oxides perovskite, Mn-e_g and Mn-t_2g orbitals form r and p bonding with O-2p orbitals, respectively [33] .

The energy band gap values exhibit a non-linear trend with the doping concentration. The samples containing low amount of Mo exhibit narrow band gap, whereas higher amount Mo doped samples show wide band gap. Hence, the prepared samples can be used for different purposes. Based on the optical studies, at the initial stage for x = 0.02, the value of E_g is found to reduce with the increase in Mo content and this might be attributed to the difference in the dopant’s electronic structure. The x = 0.02 sample can be used as a potential candidate for photocatalytic and photovoltaic applications, in the regime of Infrared detector and infrared vision. The x = 0.04 sample can be applied as a potential candidate in radiation filter, UV-detector, and UV-sensor, and x = 0.06 and 0.08 samples can be used in supercapacitor applications [16] [31] .

The FTIR spectroscopy was used to determine the purity and nature of calcium manganese oxide metals obtained via the solid-state reaction method, as well as to examine the structural behavior and detect the chemical bands. It is a very reliable tool for manganite systems, which gives information about different functional groups existing in a compound. The functional groups that are present in the studied compound are metal-oxygen (M-O) bands and metal-oxygen-metal (M-O-M) bands. Functional groups are important in materials performance because they are the portion of a molecule that is capable of characteristic reactions. Figure 8 depicts the FTIR spectra of various Ca_0.9Sr_0.1Mn_1−xMo_xO₃ceramics. There are several peaks present in the study range of 1000 cm⁻¹ to 350 cm⁻¹. The undoped samples have absorption peaks at 661, 583, 402, 369, and 360 cm⁻¹. The FTIR spectrum further confirms that the product is single phase. The bands at 661 and 583 cm⁻¹ can be assigned to the M–O (metal-oxygen bands)stretching bonds and O–M–O deformation modes of tetrahedral A- and octahedral B-sites of CaMnO₃. While the bending mode around 402 cm⁻¹ is due to changes in the Mn-O-Mn (metal-oxygen-metal bands) bond angle [22] [31] - [33] . It has also been noticed that the FTIR spectra for varying concentrations of Mo have been assigned to the Mn-O-Mn deformation and Mn-O stretching modes of CSMMO. It can be seen from the figure that, with increasing the doping level of Mo, the absorption peaks have been shifted toward a lower wave number, where ν₁ for x = 0.00 was 661 cm⁻¹, which was shifted to 660 cm⁻¹. Similarly, ν₂ at x = 0.00 was 583 cm⁻¹ and it was shifted to 577 cm⁻¹, ν₃ for x = 0.00 was 402 cm⁻¹, which was shifted to 395 cm⁻¹. This also confirms the formation of a single-phase compound of synthesized material without any impurity, as confirmed previously by the XRD analysis. The overall findings follow the XRD results. The changes mentioned above for doped samples are due to the sensitivity of vibration to octahedral distortion, and the variation of the bond length depends only on the level of doping of the atom and the nature of the atom [16] [34] . The FTIR spectrum was also taken for the doped samples and the peaks observed at 660, 577, 395, 364, and 355 cm⁻¹.

The resistivity (ρ) is an intrinsic property of electric materials and it is essential to know about the resistivity for device applications. Figure 9 shows the variation of ρ with frequency. It is observed that ρ decreases significantly with increasing frequency and is invariable at high frequencies. The consistent behavior of ρ suggests the possible release of interfacial polarization or buildup at the interface of homogeneous phases when subjected to an electric field [35] . It can also be seen that the ρ increases with doping concentration. This enhancement in ρ elevates the eddy current loss and to a lesser degree, the multiple scattering loss and resonance loss may also rise. Related research showed the similar behavior of ρ for B-site doped CaMnO₃ [36] . The x = 0.08 sample comprises the maximum ρ. This results from the generation of supplementary charge carriers caused by the presence of Mn³⁺ within the Mn⁴⁺ matrix. Besides, the distortion of the lattice and other crystal defects caused by Mo-doping produce more dipoles in the ac field [37] . For ceramic samples, ρ is significantly influenced by grain size, grain boundaries, density, porosity, oxygen concentration, and other factors, which may vary considerably among samples produced by different synthesis processes. According to the valence equilibrium, the substitution of Mo⁶⁺ in Mn³⁺ sites generates a substantial quantity of charge carriers, which can reduce ρ. Consequently, a rise in dopant concentration is expected to result in a steady reduction of ρ in this system. In previous research, it was demonstrated that larger concentrations of Mn³⁺ result in a decrease in resistivity. However, this interpretation is not clear since the behavior is highly impacted by the configuration of oxygen vacancies (V_o), which are intrinsic defects that cannot be avoided in perovskite materials [7] [38] . The presence of Mo doping defects is demonstrated to elevate the concentration of Mn³⁺. As a result, an increase in the amount of Mo in the experimental samples results in an augment in the value of ρ.

Figure 10 shows the AC conductivity (σ_ac) behavior of CSMMO ceramics in response to the frequency. In order to have a better understanding of the electrode polarization effect, the measurements of σ_ac were performed. Figure 10 illustrates that the variation of σ_ac comprises three unique zones: The low-frequency dispersive region I, the intermediate-frequency plateau region II, and the high-frequency dispersive zone III. The variation of σ_ac with frequency can be articulated according to Jonscher’s power law.

${\sigma }_{ac}\left(T\right)={\sigma }_0\left(0\right)+A{\omega }^n$ (17)

where σ_ac(T) is the total conductivity, σ(0) is the frequency-independent conductivity, i.e., dc conductivity in the low-frequency region. The second term Aωⁿ is assigned to the high-frequency dispersive region, where the exponent n (0 ˂ n < 2) corresponds to a localized or re-orientational short-range hopping motion within the grain. Thus, the conduction mechanism in the low-frequency dispersive zone (region-I) is attributed to long-range hopping linked to the grain boundaries [19] , while in the high-frequency dispersive area (region-III), it is due to localized or re-orientational short-range hopping within the grain [39] . The minor plateau in the middle frequency band (region-II) may be ascribed to random hopping [40] . The conductivity exhibits a significant rise with frequency, indicating conduction resulting from the hopping of charge carriers between ions through an oxygen atom. The relationship between σ_ac vs. logω should be linear, as per Jonscher’s power law. However, a divergence from the power law in the low-frequency band distinctly indicates the presence of an electrode polarisation effect across all compositions [28] . As shown in Figure 10 , the σ_ac is found maximum at higher frequencies which might be attributed to the compound’s thermal process because of the influence of charge carriers. The carriers of charge have sufficient time to build up at the sample-electrode surfaces in low-frequency settings, which leads to electrode polarization effects [12] . At low frequencies, conductivity is diminished due to the influence of active grain boundaries, resulting in a delay of mobile charge carriers [41] . The electrical properties of the prepared compound are studied here by observing resistivity and conductivity. The impact of Mo doping was evident in the conductivity analyses, enhanced conduction (ac conductivity) due to the presence of charge carriers and the largest effect was observed at 8% Mo dopant content. Here the charge carriers which are responsible to make change in the conduction process arise from the two mechanisms, one from the exchange of Mn³⁺ ↔ Mn⁴⁺ and other one is crystal defects caused by Mo-doping produce more dipoles in the ac field.

The permeability is a measurement of a material’s ability to strengthen the production of a magnetic field within itself. The most favourable magnetic properties of perovskite are to obtain high permeability with low loss at high frequency. The variation of the real part of initial permeability ( ${{\mu }^{\prime }}_i$) with composition is quite difficult to describe, because it depends on many factors, such as stoichiometry, grain size, impurity contents, coercive field, porosity etc. [42] . Therefore, the study of ${{\mu }^{\prime }}_i$ has been a subject of great interest from both theoretical and practical points of view. Figure 11(a) represents the variation of the ${{\mu }^{\prime }}_i$, as a function of frequency. It is evident that the value of ${{\mu }^{\prime }}_i$ of all samples initially increases gradually up to 2400Hz and, then, remains frequency-independent. The frequency at which ${{\mu }^{\prime }}_i$ reaches its highest value and then abruptly drops is referred to as resonance frequency (f_r). When the applied frequency and the natural frequency of the magnetic spins match, resonance happens [8] . The perovskites’ compositional stability and region of appropriateness are contingent upon a broad range of frequencies, within which the value of ${{\mu }^{\prime }}_i$ is observed to remain constant. The high-frequency stability of permeability renders the perovskite compatible with numerous high-frequency applications [43] . The value of ${{\mu }^{\prime }}_i$ has been found to decrease with the substitution of 2% Mo content and then increase upto 6% Mo content, where it again decreases at 8% Mo content. The highest value of ${{\mu }^{\prime }}_i$ has been found for 6% dopant. Two mechanisms could be resolved ${{\mu }^{\prime }}_i$, such as the domain wall displacement and the spin rotation in the domains, i.e., total domain spin. The permeability, resulting from the domain wall motion

is followed the equations [15] , ${{\mu }^{\prime }}_i-1=\frac{3\pi M_s^{2}D}{4\gamma }$, where, D represents the value

of grain size, $M_s^2$ is the saturation magnetization and $\gamma$ represents the domain wall energy. As shown of Figure 4 , the size of grains is increased with the concentration of Mo and this may contribute to improve the value of ${{\mu }^{\prime }}_i$. The initial decrease in ${{\mu }^{\prime }}_i$ suggests that the effect of stoichiometry play a dominant role at lower values of x. The mobility of the domain wall can be altered by the concentration of oxygen vacancies, which establishes a mechanical barrier to the domain wall [44] . On account of the fluctuation in the concentration of oxygen vacancies, the value of ${{\mu }^{\prime }}_i$ fluctuates in accordance with the amount of Mo present. Related research showed that the fluctuations of the ${{\mu }^{\prime }}_i$ may be caused by the size effect and the existence of the Mn-O bond [8] . The permeability is diminished because of decreasing grain size; however, the stability of permeability is increased due to the influence of the domain wall motion by the small grain size [8] [43] .

The frequency dependence of the magnetic loss tangent ( $\tan {\delta }_M$) of the compositions is shown in Figure 11(b) . The loss occurs as a result of the domain walls beginning to lag behind in following the applied alternating field, which can be attributed to the flaws that are present in the lattice.

It should be mentioned that $\tan {\delta }_M$ is susceptible to many views, such as the mobility of charge carriers, porosity, domain defects, the concentration of dipoles, hysteresis loss, eddy current loss, residual loss, etc. As observed from Figure 11(b) , the values of $\tan {\delta }_M$ for all samples initially decreased exponentially with the increase in the frequency (≤1000 Hz), and subsequently became almost constant up to 20 MHz. The drop in $\tan {\delta }_M$ with the increase in the frequency is caused, beyond some critical frequencies, because the domain wall motion cannot follow the applied electric field [7] [44] . The $\tan {\delta }_M$ can be observed to have a very small value at higher frequencies, which is one of the important requirements of the material to be used in microwave devices [45] . In the microwave frequency range, the magnetic loss of CaMnO₃ could almost be neglected. It implies that the microwave absorption property of CaMnO₃ is, usually, dependent on its magnetic loss [46] . The lowest $\tan {\delta }_M$ has been obtained for the samples x ≥ 0.06. Smaller values of $\tan {\delta }_M$ are required for high-frequency magnetic applications [10] . Magnetic permeability is the ability of magnetic material to support magnetic field development. Higher the magnetic permeability, higher is the material’s ability to produce field within it. In other words, it helps one to determine how much magnetic flux allows passing through a material. A material selected for a magnetic core in the electrical machine should have “high permeability” so that required magnetic flux can be produced in the core by fewer ampere-turns. So the studied the compound carrying high permeability may play an important role for high performance magnetic materials.

The magnetization vs. magnetic field (M-H) hysteresis loops of CSMMO ceramics were taken at room temperature (300 K) and also at low temperature (5 K). Figure 12(a) shows the field-dependent magnetization curves of the studied compound at room temperature (300 K). The M-H hysteresis loops were carried out using a Physical Property Measurement System (PPMS). The paramagnetic behavior is noticed at room temperature for the undoped Ca_0.9Sr_0.1MnO₃ solid solution. The various parameters, like coercivity (H_c), magnetization (M), and retentivity (M_r), for all compositions have been calculated from the PPMS analysis, and the values are listed in Table 4 . It can be observed that with the increase in Mo concentration, the decrease in the coercivity has occurred from 6% Mo content, and an increasing trend is exhibited for 2% to 4%. The M_r values increase up to 2% Mo content and, then, decrease. Enhanced M, with very small values, is seen, indicating an antiferromagnetic phase with weak ferromagnetism [17] for the prepared compositions. The reason for the observation of weak ferromagnetism in the Mo-doped ceramics may be attributed to the enhancement of oxygen vacancy in the sample and also the reduction of magnetic ions Mn³⁺ [47] [48] .

Figure 12(b) shows the field-dependent magnetization curves of Mo-doped

CSMMO ceramics at low temperatures (5 K). The figure shows the M-H curves for ceramics with an applied magnetic field up to ±20,000 Oe. Up to x = 0.02 sample, small magnetic hysteresis has been observed. Parent composition CaMnO₃ shows antiferromagnetic behavior at low temperatures, while substitution of Mo at Mn site shows melting of antiferromagnetic state. The various calculated parameters (M, M_r, and H_c) are tabulated in Table 4 . It can be observed that with increasing doping contents, M_r under goes a decrease. The value of M and the H_c also decreases linearly with dopant contents. But the values of M, M_r, and H_c are found to be larger at low temperatures than at room temperature. But complete saturation has not been observed even at 5 K, which reveals a superposition of both ferromagnetic and antiferromagnetic (AFM) components [15] [42] . With increasing the doping level of Mo, the M decreases due to the enhanced Mn³⁺/Mn³⁺ AFM interaction. The magnetization originated due to the competition between AFM and paramagnetic (PM) states with the substitution of Mo at the Mn site in CaMnO₃. This behavior of magnetization of Mo-doped compositions is due to the structural transformation of the compositions [3] . The competition between AFM and PM states has been found in the compositions of x = 0.02, 0.04, and 0.08. Further, the change in space group for composition x = 0.06 and 0.08 results in the complete transformation of the AFM state into the PM state. The substitution of Mo for manganese (Mn) in the CSMMO showed AFM with a C-type orbital polarization or associated with ordered stripes, significantly increasing with dopant concentration of Mo [36] . Besides, the orthorhombic CSMMO compositions have a magnetic state with G-type order corresponding to the coupling between Mn and the first Mn-neighbors in an AFM type, while the second Mn-neighbors are in an FM type. The AFM ordering is mainly favorable by the mutual interaction between Mn⁴⁺-Mn⁴⁺ cations via O²⁻ anion (i.e., Mn⁴⁺-O²⁻-Mn⁴⁺) [21] . It is also possible for CSMMO compositions, the G-type, and C-type AFM can result in orthorhombic to tetragonal structure, respectively, and the competition between correlations of a G-type AFM order and a C-type AFM order accompanying a 3d_3z²_−r² orbital order, leading to the more complicated magnetic phase diagram [14] .