Unit cell response

The unit cell of the proposed absorber and its associated field directions are showcased in Fig. 1(a). The design is a conjunction of three resonating structures, viz. one is made of multiple square blocks at four corners, one is comprised of four half circles attached to four sides of the unit cell, and the third one is a butterfly shape pattern placed at the center of the unit cell. They are designated as Res X, Res Y, and Res Z, respectively, and combinedly exhibit three absorption peaks. Their dimensions are considered such that the absorption bands get merged together producing an overall bandwidth-enhanced response spanning across the X-band. A 0.30 mm thick FR4 substrate (ε_r = 4.4 and tan δ = 0.02) has been used as the dielectric, whereas the copper cladding has been used as the constituent metal layer.

Figure 1. (a) Unit cell design of the proposed structure and (b) its reflection coefficient (in dB) and absorptivity response. The geometric dimensions are: a = 16.5 mm, r = 3.76 mm, b = 3.52 mm, d = 7.52 mm, e = 8.6 mm, and f = 4.3 mm. The blue color indicates the metal layer, and the magenta color indicates the blank space (i.e. metal is etched at that position).

The unit cell geometry has been simulated in full-wave software with the floquet port excitations and master-slave boundary conditions. With the presence of the copper plate as the bottom layer, the transmission coefficient (S ₂₁) becomes zero. Then, the absorptivity (A) can be computed from the reflection coefficient (S ₁₁) [Reference Qiang, Han, Jia-Hao, Ben-Xin, Wen-Xiong and Huai-Qing22–Reference Ghosh, Nguyen and Lim25], as below:

(1)\begin{equation}A\left( \omega \right) = 1 - \left| {{S_{11}}{{\left( \omega \right)}^2}} \right| - \left| {{S_{21}}{{\left( \omega \right)}^2}} \right|, \end{equation}

Since S ₂₁ = 0,

(2)\begin{equation}A\left(\omega \right) = 1 - \left| {{S_{11}}{{\left( \omega \right)}^2}} \right|,\end{equation}

where |S ₁₁ (ω)|² and |S ₂₁(ω)|² are reflected power and transmitted power, respectively. The reflection coefficient and absorptivity response of the proposed geometry are presented in Fig. 1(b). Three resonances are observed at 9.44, 10.00, and 10.53 GHz with corresponding absorptivities of 99.9%, 99.6%, and 95.1%, respectively. The absorption peaks are very closely placed, thereby producing an enhanced bandwidth with a full width at half maximum (FWHM) of 1.48 GHz, as observed in the figure.

To verify the absorption behavior of the structure, the unit cell geometry has been studied under different polarized electromagnetic (EM) waves, and its co-polarized and cross-polarized reflectance are depicted in Fig. 2(a), whereas the polarization conversion ratio (PCR) is presented in Fig. 2(b). Assuming the incident EM wave y-polarized, the co-polarized reflectance (R_yy) is found matching with the actual reflection coefficient (S ₁₁) presented above, whereas the cross-polarized component (R_xy) is very small over the operating range. The PCR expression, as calculated in Equation (3), is also shown to have very small values (less than 0.05) across the X-band. Hence, the structure confirms to behave as an absorber, not a polarizer.

(3)\begin{equation}{{{R}}_{{{yy}}}} = {{ }}{{\left| {{{{E}}_{{{yr}}}}} \right|} \over {\left| {{{E}}{{{y}}_{{i}}}} \right|}},\;{{{R}}_{{{xy}}}} = {{ }}{{\left| {{{{E}}_{{{xr}}}}} \right|} \over {\left| {{{{E}}_{{{yi}}}}} \right|}},\;{\rm PCR} = {{ }}{{{{\left| {{{{R}}_{{{xy}}}}} \right|}^2}} \over {{{\left| {{{{R}}_{{{xy}}}}} \right|}^2} + {{\left| {{{{R}}_{{{yy}}}}} \right|}^2}}}{{ }},\end{equation}

Figure 2. (a) Co-polarization and cross-polarization reflectance and (b) polarization conversion ratio (PCR) of the proposed absorber structure.

Absorption mechanism

To check the contribution of different segments (Res-X, Res-Y, and Res-Z), each of the topologies is individually simulated and their responses are compared with that of the proposed final geometry in Fig. 3. It is observed that Res-X, Res-Y, and Res-Z exhibit absorption peaks at 8.69, 8.94, and 9.44 GHz, having absorptivities of 93%, 80%, and 90%, respectively. Although the absorption frequency of Res-Z seems to match well with one of the absorption peaks of the proposed design (but Res-X and Res-Y have shown some frequency offsets), actually all three segments have frequency shifts in the combined structure. The absorption response of Res-X actually shifts from 8.69 (occurred in the individual segment) to 9.44 GHz (occurred in the combined design), the response of Res-Y shifts from 8.94 to 10.00 GHz, and the response of Res-Z shifts from 9.44 to 10.53 GHz. These shifts are well illustrated in the below current distribution plots.

Figure 3. Illustration of the frequency shift of individual resonating structures, while they are integrated in the final design.

To explain the resonance phenomena at different absorption peaks as well as examine the frequency shifts of the individual components, the surface currents and electric fields of the overall structure are examined in Fig. 4. It is observed that the current at 9.44 GHz is primarily dominant in the corner squares, indicating the contribution of Res-X behind this resonance. This also confirms the frequency shift in the overall structure. Similarly, the current in the central butterfly structure (marked by Res-Y) is prominent at 10.00 GHz (occurrence of the second resonance), while at the third resonance (10.53 GHz), the maximum current density is observed at the edges of the circular resonators (marked by Res-Z). The electric field is equally excited at the corresponding points at those resonances. Further, it is observed that the currents at the top and bottom metallic layers are parallel but oppositely directed, thereby forming a circulating current. This assists in the magnetic field excitation in the structure. The absorptivity is maximal when the excitation of electric and magnetic takes place at the same frequency.

Figure 4. Surface current distributions at top and bottom surfaces and electric field distributions at resonant frequencies: (a) 9.44 GHz, (b) 10.00 GHz, and (c) 10.53 GHz.

Equivalent circuit model

After looking at the current distributions in different frequencies, the equivalent circuit model depicting the contribution of individual segments and total circuit model have been formulated and presented in Fig. 5(a) and (b), respectively. The top metallic layer comprises three parallel connections of R–L–C series circuits, and the substrate is modeled by a transmission line along with a short circuit at the end owing to the metal back. Each of the R–L–C circuits corresponds to one resonating structure. The lowest resonance (at 9.44 GHz) is generated by the outer square loops and is represented by the R ₁–L ₁–C ₁ circuit, where the inductance (L ₁) corresponds to the square elements and capacitance (C ₁) occurs between the gaps. The middle absorption peak (at 10.00 GHz) is primarily responsible for the central butterfly structure and offers another series R ₂–L ₂–C ₂ circuit. The inductance (L ₂) comes from the butterfly shape, whereas the capacitance (C ₂) arises between the inter-element spacing. The highest frequency (10.53 GHz) corresponds to the half-circular rings placed at four sides, which also exhibit inductance and capacitance, thereby leading to another R ₃–L ₃–C ₃ circuit (R′₃ and R″₃ combinedly give R ₃ and L′₃ and L″₃ combinedly give L ₃). The resistance in each case, although small in value, is generated due to the finite conductivity of copper metal. Therefore, the total input impedance of the structure is presented by:

(4)\begin{equation}Z_{in}=Z_1\parallel Z_2\parallel Z_3\parallel Z_h,\end{equation}

(5)\begin{align} {Z_1} & = {R_1} + j\omega {L_1} + {1 \over {j\omega {C_1}}},\;{Z_2} = {R_2} + j\omega {L_2} + {1 \over {j\omega {C_2}}}, \\ \qquad & {Z_3} = {R_3} + j\omega {L_3} + {1 \over {j\omega {C_3}}},\end{align}

(6)\begin{equation}{Z_h} = j{{{z_0}} \over {\sqrt {{\varepsilon _r}} }}\tan {\beta _0}h, \end{equation}

Figure 5. Equivalent circuit model of the proposed absorber: (a) contribution of individual segments and (b) total circuit model.

where Z ₁, Z ₂, and Z ₃ are the equivalent impedances due to resonators X, Y, and Z, respectively, β ₀ is the phase constant, ε _r is the dielectric constant of the substrate, h is the height of the substrate, Z _in is the input impedance of the geometry, and Z ₀ is the characteristic impedance in free space. A small amount of mutual coupling (not shown in the circuit model due to simplicity) also exists in every scenario and leads to a frequency shift toward the higher side, when compared with that of the individual contribution. All these three parallel R–L–C circuits, in synchronization with the short-circuited transmission line (represented by Z_h), give rise to three different frequencies. By controlling the L and C values, their resonances are brought together, thereby leading to enhanced bandwidth, whereas their resistance (R) values are tuned accordingly to obtain near-unity absorption magnitudes in all cases.

Parametric study

Various design parameters affecting the absorptivity behavior of the proposed structure are illustrated in Fig. 6. It is observed in Fig. 6(a) that the absorption magnitude reduces while increasing or decreasing the substrate height (h) from its optimum value (= 0.3 mm). One of the dimensions of the butterfly segment (e) is varied in Fig. 6(b), and subsequently, the middle absorption frequency relocates to the lower or higher side, although the other two responses remain almost the same. The square loop length (b) is regulated in Fig. 6(c) and the lower frequency shifts with the variation. Finally, the radius of the half-circular rings (r) is changed and the upper absorption band is found to be varying with the frequency in Fig. 6(d); however, the other resonances remain the same. This parametric variation has clearly demonstrated the contributions of different segments on different resonances and further validated our concept proposed in the previous section.

Figure 6. Study of variation in design parameters on the absorptivity responses: (a) h, (b) e, (c) b, and (d) r.

Oblique incidence and polarization angles responses

The simulated response has been examined for different incident angles (θ) under TE and TM polarization and presented in Fig. 7(a) and (b), respectively. It is observed that in both cases, the absorption magnitudes are sustained up to 45^o angle of incidence. Keeping the wave propagation direction constant, the directions of electric and magnetic fields are varied with different polarization angles (ϕ) to study the polarization performance of the geometry. The responses are depicted in Fig. 7(c) and found to remain constant at various angles of polarization (ϕ = 0^o to 90^o with a step size of 15^o), and thereby confirms the polarization-insensitive nature of the designed topology.

Figure 7. Simulated absorptivity patterns at varied angles of incidence (θ) under (a) TE polarization, (b) TM polarization, and (c) at different angles of polarization (ϕ).

Impedance matching

The normalized input impedance curves (both real and imaginary) have been depicted in Fig. 8, and the corresponding values at three absorption frequencies are presented in Table 1. It is well observed that the real part of the normalized input impedance is very close to 1 (i.e. close to free space impedance value), whereas the imaginary part is lying around 0 at the resonance frequencies. This verifies the impedance matching at these points and confirms near-unity absorption magnitudes.

Figure 8. Impedance (real and imaginary) of the proposed bandwidth-enhanced absorber.

Table 1. Values of real and imaginary impedances for the frequencies of resonances