From previous studies^[5–7] the Sc₂AlC compound is expected to crystallize under ambient conditions in the Cr₂AlC crystal structure, with space group P63/mmc (No. 194). The compound has eight atoms in each unit cell and the unit cell contains two formula units. The positions of atoms in Sc₂AlC are as follows: C atoms are placed at the positions (0,0,0), the Al atoms are at (1/3,2/3,3/4), and the Sc atoms are at (1/3,2/3,z_M).^[14] The lattice parameters a,c, and z_M are used to determine the crystal structure, where a and c are the lattice constants and z_M is the internal structural parameter. The optimized unit cell is shown in Fig. 1. The optimized values of structural parameters of Sc₂AlC are given in Table 1. Our results are in good agreement with the theoretical results in Refs. [5] and [7].

Fig. 1.

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	Fig. 1. Unit cell of Sc2AlC MAX nanolaminate.

Table 1.

Table 1.

Table 1. Optimized lattice parameters (a and c, in unit Å), hexagonal ratio c/a, internal parameter zM, unit cell volume V (in unit Å3) for MAX phases Sc2AlC. . Phase a c c/a zM V Ref. Sc2AlC 3.290 15.106 4.591 0.0821 141.600 This 3.2275 14.8729 4.6081 0.0824 134.167a LDA[5] 3.280 15.3734 4.687 143.230a GGA[7] a Calculated using V = 0.866a2c.

Table 1. Optimized lattice parameters (a and c, in unit Å), hexagonal ratio c/a, internal parameter zM, unit cell volume V (in unit Å3) for MAX phases Sc2AlC. .

Figure 2 presents the ground state (ambient) phonon dispersion curves and phonon density of states (PHDOS) along the high-symmetry directions of the crystal Brillouin zone. There are neither experimental nor theoretical data available at this moment; therefore, a comparison is not possible at this time. The corresponding frequencies for longitudinal optical (LO) and transverse optical (TO) modes at the zone centre are 17.3 THz and 12.2 THz, respectively.

Fig. 2.

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	Fig. 2. (a) Phonon dispersion curves and (b) phonon density of states of Sc2AlC.

The highest point for LO is not located at zone center but at the high symmetry point of M.

The separation between LO and TO in the zone center is 5.2 THz. A compound is considered to be dynamically stable if the phonon frequencies for all the wave vectors are positive. A compound, on the other hand, is treated as dynamically unstable, if there is any imaginary phonon frequency at any wave vector. Since, in our present case all the frequencies are positive, therefore the phase under consideration is dynamically stable. At this point it should be mentioned that Music et al.^[7] calculated the formation enthalpies of Sc₂AC (A = Al, Ga, In, Tl) MAX phases and found them to be chemically stable. Besides, Bouhemadou et al.^[5] and Cover et al.^[6] showed that the calculated elastic constants of Sc₂AlC satisfy the Born criteria^[15] for mechanical stability. Figure 2(a) also depicts that there is a clear gap between acoustic branch and optical branch in the whole BZ as indicated by the phonon dispersion curves and PHDOS in Fig. 2(b).

A complete description of a system equilibrium behavior is contained in its thermodynamic potentials. We obtain these thermodynamical potential functions such as Helmholtz free energy F, internal energy E, entropy S, and specific heat C_v of Sc₂AlC at zero pressure by using the calculated phonon density of states through employing the quasi-harmonic approximation.^[16] The following equations are used to calculate the F, E, S, and C_v:^[17]

The calculated results of F, E, S, and C_v are shown in Figs. 3(a)–3(d) in a temperature range from 0 K to 1000 K. Helmholtz free energy (F) of Sc₂AlC is displayed in Fig. 3(a), in which the free energy gradually decreases with increasing temperature. The decreasing trend of free energy is very common and it becomes more negative during the course of any natural process. The degree of decrease in free energy is determined by the entropy (S) of any system. The entropy of a system increases with increasing temperature since thermal agitation adds to disorder. This is shown in Fig. 3(c). Contrary to the free energy, the internal energy (E) shows an increasing trend with temperature rising as shown in Fig. 3(b).

Fig. 3.

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	Fig. 3. Temperature dependences of the calculated thermodynamic parameters of Sc2AlC under zero pressure: (a) Helmholtz free energy, (b) internal energy, (c) entropy, and (d) specific heat.

The behaviors of materials under different thermodynamical constraints can be explained in terms of the specific heat of a solid. It also determines how efficiently the material stores heat. The phonon contribution dominates C_v as a function of temperature. Figure 3(d) shows that the specific heat C_v of Sc₂AlC follows the Debye model which is proportional to T³, as expected.^[18] This model correctly predicts the temperature dependence of the heat capacity at constant volume and low temperature. It is seen that the heat capacity of Sc₂AlC increases rapidly with temperature rising up to 300 K. It is also found that the Dulong–Petit law is recovered at high temperatures.^[19]

In an ordinary metallic system, the total specific heat is composed of two components: one is due to the phonons and the other is due to the mobile charge carriers (electrons, for Sc₂AlC). From the published value of the electronic energy density of states at the Fermi level, N(ɛ_F), for Sc₂AlC,^[7] we calculate the coefficient of electronic specific heat, γ_e, given by

The Debye temperature, θ_D, is an important parameter related to many thermophysical properties. In general, a high Debye temperature implies strong bonding among the atoms and a higher phonon contribution to thermal conductivity. The estimated θ_D from the phonon spectrum is around 638 K. θ_D can also be calculated from various elastic constants. Following the procedure reported in Ref. [20], we also calculate θ_D from elastic constants, which is 558 K.

When an electromagnetic radiation is incident on the materials, different materials behave in different ways. The optical constants determine the overall response of the sample to the incident radiation. The complex dielectric function, defined as ɛ(ω) = ɛ₁(ω) + iɛ₂(ω), is one of the main optical characteristics of a solid. The other optical constants can be extracted from this complex function. The imaginary part ɛ₂(ω) is calculated by CASTEP^[21] numerically through directly evaluating the transition matrix elements between the occupied and unoccupied electronic states. The expression for the ɛ₂(ω) can be found elsewhere.^[22,23] The Kramers–Kronig (KK) relations are used to derive the real part ɛ₁(ω) of a dielectric function from the calculated imaginary part. The other optical constants described in this section are derived from ɛ₁(ω) and ɛ₂(ω) by using the equations given in Ref. [21]. Information regarding optical constants is important in display technology.

The optical parameters and optical conductivity of Sc₂AlC are shown in Fig. 4 (left and right panels) for the (100) polarization direction of the incident electric field. To smear out the Fermi level for effective k-points on the Fermi surface, we have used a 0.5-eV Gaussian smearing. A Drude term with an unscreened plasma energy of 3 eV and a damping term of width 0.05 eV have also been used.

Fig. 4.

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	Fig. 4. Energy dependences of the calculated optical parameters of Sc2AlC: (a) real part of dielectric constant, (b) imaginary part of the dielectric constant, (c) refractive index, (d) extinction coefficient, (e) absoption coefficient, (f) loss function, (g) reflectance, and (h) optical conductivity.

Optical parameters give a useful insight into the underlying electronic band structure. The electronic properties of crystalline material are mainly characterized by the imaginary part, ɛ₂(ω) of dielectric function ɛ(ω) which is related to the photon absorption phenomenon. The peaks in ɛ₂(ω) are associated with electron excitations. For the compound under study, there is only one prominent peak at 2.85 eV (Fig. 4(b)). The large negative value of ɛ₁ is also observed in Fig. 4(a), which is a clear indication of the Drude-like behavior seen in metal. The refractive index, n, is another technically important parameter for optoelectronic materials. The frequency-dependent refractive index is shown in Fig. 4(c). The extinction coeffient k is exhibited in Fig. 4(d). The extinction coefficient measures the degree of attenuation of electromagnetic radiation inside the solid.

Figure 4(e) shows the behavior of the absorption coefficient spectrum of Sc₂AlC. This reveals the metallic nature of the compound since the absorption coefficient is finite at zero energy. There is no discernible band gap, and the free carrier absorption dominates at low energies.

The loss function L(ω), is shown in Fig. 4(f). The loss function measures the energy loss of an electron with high velocity passing through the material. This curve features a peak at an energy which gives the bulk plasma frequency ω_p, that occurs at the onset of ɛ₂ < 1 and ɛ₁ = 0.

From Fig. 4(f), the value of the effective plasma frequency ω_p can be found to be ∼ 10.3 eV. A metal becomes transparent, when the frequency of incident photons is greater than ω_p. The reflectivity curve is shown in Fig. 4(g). It is seen that the reflectance curve starts with a high value of ∼ 0.90–0.98, decreases and then rises again to reach the maximum value in a range of ∼ 0.80–0.90 between 6 eV and 10 eV. The large reflectivity at very low energies indicates that the dynamical conductivity is quite high for Sc₂AlC in the low energy (frequency) region. Moreover, the peak of loss function is associated with the trailing edge of the reflection spectrum as expected theoretically.

Since the material under study has no band gap, the photoconductivity starts (with a high value) at zero photon energy as shown in Fig. 4(h) confirming the fact that Sc₂AlC is metallic in nature.