Thermoelectric materials have great advantages due to their specific ability of converting heat directly into electricity, and vice versa, and thus they are widely used in many fields, such as modern industry,^[1–4] military,^[5,6] and protection of the environment.^[7–9] The performance of a thermoelectric material is represented by figure of merit ZT, which is deduced from electric conductivity σ, thermal conductivity κ, and Seebeck coefficient S as^[10]

Quite a few continuum models have been developed to understand the overall efficiency of thermoelectric composites. Snyder and Ursell^[21] deeply discussed the thermoelectric efficiency and compatibility, and proved that components with dissimilar compatibility factors cannot be combined by segmentation into an efficient thermoelectric generator. Song textitet al.^[22] analyzed the unavoidable electric current caused by inhomogeneities and its influence on measured material parameters of thermoelectric materials. Rigorous continuum analysis has also been carried out for one-dimensional parallel^[23] and layered^[24–26] thermoelectrics, wherein the conception of optimal electric current is proposed, and thus the conversion efficiency of a composite can be slightly higher than its constituents as the optimal current density can be matched everywhere by tailoring the material properties. These analyses, however, were based on the model that the electric current always flows through the interface vertically and retains its direction. As such, components with dissimilar compatibility factors (or optimal current density) cannot be combined into an efficient thermoelectric generator, which greatly restricts the component matching of composite thermoelectric materials. It is thus highly desirable if arbitrary components can fit together and work well.

In this work, the problem of current refraction at the interface is studied. We attempt to derive a method that can greatly improve the compatibility of the components. Our results show that the current density in each component can be adjusted independently by adjusting the incidence current density and incidence angle, therefore components with dissimilar compatibility factors can also be combined into efficient thermoelectric generators. These results point to a new route for high efficiency thermoelectric composites.

To be specific, we consider a bi-layered thermoelectric medium, as shown in Fig. 1. The thermoelectric properties of layers 1 and 2 are σ₁, S₁, κ₁ and σ₂, S₂, κ₂, respectively. Our goal is to determine the refraction law of the electric current. To this end, at the far field in phase 1, the medium is subjected to imposed electric current , , and energy flux , . Furthermore, the two analytic functions introduced earlier, f[z] and g[z], are denoted as f₁[z], g₁ [z] in phase 1 and f₂ [z], g₂ [z] in phase 2 to be distinguished from each other.

Fig. 1.

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	Fig. 1. (color online) Schematic diagram of a bi-material thermoelectric medium.

By noticing the far field loadings, analytic functions f_i [z] and g_i [z] can be expressed as

In addition, the electric current density, energy flux, and thermal flux can be rewritten as

We now consider the field distributions within media 1 and 2, specifically the current density, energy flux, heat flux, temperature, and potential given by Eqs. (26)–(35). The spatial variations of these field variables can be better appreciated by an algebraic expansion of these equations using the nonzero coefficients derived in Section 3. In particular, the electric current density of media 1 and 2 are determined from Eqs. (30) and (31) as

The refractive index, on the other hand, can be expressed by θ₁ and θ₂ as

An important calculation result is shown in Fig. 2, with the material parameters detailed in Table 1, which clearly reveals that the refractive index |J₂/J₁| varies with the incidence angle θ₁ in a wide range, thus providing enough space to adjust the current density in medium 2.

Fig. 2.

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	Fig. 2. (color online) |J2/J1| varies with θ1.

Table 1.

Table 1.

Table 1. Material parameters of thermoelectric samples.[29,30] . Sample σ/S·m−1 S/μV · K1 κ/W·m−1 · K−1 BiSbTe 27700 213 0.7 Bi2Te3 110000 200 1.6

Table 1. Material parameters of thermoelectric samples.[29,30] .

From Eqs. (33) and (35), the refracted angle of heat flux and energy flux can be expressed as

Although the expression of the heat flux refraction angle (Eq. (42)) is significantly different from that of the current refraction angle (Eq. (39)), the numerical results in Fig. 3 show that there is only a slight difference between them. The heat flux refraction also affects the energy conversion efficiency. The inconsistency between the heat flux and current direction usually leads to the decrease of efficiency, but this effect is weak. Generally speaking, the current refraction plays a major role in improving the efficiency.

Fig. 3.

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	Fig. 3. (color online) Refracted angles of electric current θ2 and heat flux versus incident angle θ1.

The conversion efficiency is also calculated to demonstrate the analysis. In classical bi-layered thermoelectric systems, the electric current flows through the interface vertically and retains its direction, which leads to a uniform electric current density in the whole system. In our new system, as shown in Fig. 4(b), the electric current refraction occurs at the interface, both the density and the direction of the current change, and the shape of the system is also altered to adapt to the refraction of the current. In the classical bi-layered thermoelectric system, the conversion efficiency can be expressed as^[17]

Fig. 4.

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	Fig. 4. (color online) (a) Classical bi-layered thermoelectric system. (b) New bi-layered thermoelectric system.

We can compare the conversion efficiency of the new bi-layered thermoelectric system with the maximum conversion efficiency of the classical bi-layered thermoelectric system in Fig. 5, with y₁ = y₂ = 0.01 m, l = 0.0025 m, T_c = 300 K, and T_h = 500 K, where θ₁ is the incidence angle, and |J^∞| equals to the optimal current density of medium 1. It is again evident that the current densities in different components can be adjusted independently, which is impossible for the classic bi-layered thermoelectric system. By adjusting the incidence current density and incidence angle, the upper bound of the conversion efficiency is significantly improved. Besides, as the incident angle increases, the conversion efficiency first rises to the maximum and then falls down, which indicates the existence of the optimal incidence angle.

Fig. 5.

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	Fig. 5. (color online) Conversion efficiency versus θ1 at Tc = 300 K and Th = 500 K when J1 is the optimal electric current in the lower material.

The problem of current refraction at the interface is studied in this paper. The relationships between the incidence angle, the refraction angle, and the refractive index are discussed in detail. We also propose a new model based on the conception of current refraction, wherein the current densities in two components can be adjusted independently, thus the optimal current density can be matched in both components, and the conversion efficiency can be significantly increased. In the new model, components with dissimilar compatibility factors can also be combined into efficient thermoelectric generators. These results point to a new route for high efficiency thermoelectric composites.