Abstract

The proposed technique combines a slot antenna and a dielectric resonator antenna (DRA) to effectively design a dual band dielectric resonant antenna without compromising miniaturization or its efficiency. It is observed that the resonance of the slot and that of the dielectric structure merged to achieve extremely wide bandwidth over which the antenna polarization and radiation pattern are preserved. Here the effect of slot size on the radiation performance of the DRA is studied. The antenna structure is simulated using two simulators (Ansoft HFSS and CST-Studio software). The simulated results are presented and compared with the measured results. This DRA has a gain of 6 dBi and 5.5 dBi at 6.1 and 8.3 GHz, respectively, 10 dB return impedance bandwidth of nearly 4% and 6% at two resonating frequencies and 98% efficiency has been achieved from the configuration. It is shown that the size of the slot can significantly affect the radiation properties of the DRA, and there are good agreements between simulation and measured results.

1. Introduction

Modern broadband communication systems and radars require light weight compact antennas with high gain and wide bandwidth. However, Patch antennas are a popular choice for microwave electronically scanned array applications. They offer low-profile, light-weight, and low-cost solutions that can be readily integrated into microwave circuits. But the disadvantage is narrow impedance bandwidth (BW) where probe fed or proximity-coupled patch antennas are typically limited to ~5% BW. By using aperture-coupled patch antenna, bandwidth can be increased up to ~15% with moderate gain. Dielectric resonators have also received great interest in recent years for their potential applications in microwave and millimeter wave communication systems. They have been widely used as a tuning component in shielded microwave circuits such as filters, oscillators, and cavity resonators. With an appropriate feed arrangement, they can also be used as antennas, and they offer efficient radiation [1]. Dielectric resonator antennas (DRAs) in cylindrical, rectangular, and hemispherical shapes and other geometries may be used. Recently, the dielectric resonator antenna has been proposed as an alternative to the popular microstrip patch parallel with rapid progress in microwave communication that demands miniaturization of microwave circuits. Dielectric antennas have proved themselves to be ideal candidates for antenna applications by offering several advantages, which include mechanical simplicity, very low conductor loss, large impedance bandwidth [1], and simple coupling schemes to all commonly used transmission lines [2]. Very high radiation efficiency can be smaller than conventional metal antennas and more resistant to proximity detuning when placed close to another object. DRA can be easily varied by suitably choosing the dielectric constant of the resonator material and its dimensions [3]. Dielectric resonators (DRs) are preferred because they are easy to fabricate and offer a more degree of freedom to control the resonant frequency and quality factor. However, the high Q factor restricts the bandwidth, which limits its usefulness as an antenna [4]. Therefore, high permittivity DRs are preferred in the design of antenna. Some investigations have been conducted to enhance gain of a DRA by employing offset dual-disk DRs [5, 6] and stacking parasitic DRs with an air gap between the driven and parasitic DRs, and composite-layered high-permittivity DRs.

2. Design and Simulation

To increase the usable bandwidth of a DRA, a method is demonstrated that manipulates the aspect ratio of the DRA to obtain dual-mode operation such that both modes have a VSWR less than 2.0 and similar radiation patterns.

In this work, we propose a dual band dielectric resonator antenna. By using closed form of design equations, we design aperture-coupled dielectric resonator antenna on 3D simulator. Kumar et al. suggested various techniques for optimization of bandwidth and reduction of size by proportional formulae [7, 8]. The proposed technique is mechanically stable and easy to fabricate. Here, the main concern is to obtain dual band by optimized shape and compact size of slot on ground plane in DRA system.

The layered configuration of the DRA is shown in Figure 1. The dielectric resonator, which has a dielectric constant , is placed above a thin ground plane in which inductive rectangular slot inserted for matching the coupled power coming from feed line. Below ground plane is a dielectric segment with a dielectric constant of . The DR has a higher permittivity than that of the dielectric segment. The DRA is excited by a feed line. This arrangement is called aperture coupled dielectric resonator antenna. The DRAs investigated here have a rectangular shape. Similarly, the dielectric segment of lower permittivity has the same surface dimension as the ground plane. The design procedure is summarized as follows.

Set and estimate the initial values of the DR dimension using the dielectric waveguide model [1] where is permittivity of material and is the free-space wave number given by where is the speed of light in free space and is the operating frequency. For well-guided modes, the fields are confined within the guide and a further approximation can be made: This approximation is equivalent to assuming that magnetic walls exist at and .

The value can be defined as the fraction of a half cycle of the field variation in the -direction and is given by where , , and represent the width, length, and height of the dielectric resonator, respectively, and the resonant frequency is given by The symbols , , and represent the wave numbers in the , , and directions, respectively. The resonance frequency of the lowest mode of the DR is set close to the lower end of the desired operating band as the starting point. Since dielectric permittivity values are fixed, the parameters length, breadth, height of DR, and height of substrate are used to determine the overall operating band of the DRA and the parameters like length and width of slot can be used for fine-tuning of operating band and/or to achieve good impedance matching within a desired band. Following this method, a rectangular DRA was designed and optimized using CST-EM STUDIO and ANSOFT HFSS software. Several commercial software packages are available for analyzing three-dimensional electromagnetic problems, which can be used to predict the input impedance with a reasonably high degree of accuracy. These software tools are better suited for analysis than design, since the computational time can be lengthy, especially for high values of the dielectric constant. Although there are no simple equations for designing the slot dimensions of the various antenna parameters, the following guidelines can be used as a starting point for rectangular slots.

(1) The slot length is chosen large enough so that sufficient coupling exists between the DRA and the feed line but small enough so that it does not resonate within the band of operation, which usually leads to a significant radiated back lobe. A good starting value is 10 mm to 21 mm. By using the formula given below, we can predict the value of where and and are the dielectric constants of the DRA and substrate, respectively.

(2) A fairly narrow slot width is usually chosen to avoid a large backlobe component. A reasonable choice is , where and are width and length of the slot, respectively. At high frequencies, might result in a very narrow slot that may be difficult to fabricate due to etching limitations. At these frequencies, a wider slot width can be used.

In the design, the materials considered for the DR and dielectric segment are GaAs and Gil GML 1034, which have dielectric constants of 12.94 () and 3.38 (), respectively. The dimensions of DR are 12.8 × 7.3 × 6.35 mm3, and dimensions of slot are  mm and  mm. Using the tuning and optimization functions of EM simulator, a double-band DRA is obtained.

3. Model Analysis

This section examines the dielectric waveguide model, used to estimate the resonant frequency and Q-factor for the rectangular DRA. The dielectric waveguide model was first proposed by Marcatili [9] to determine the guided wavelength in dielectric guides with rectangular cross-section. The dielectric guide is shown in Figure 2(a), having a rectangular cross-section of width a in the -direction, height b in the -direction, and the waves propagating in the -direction. The field modes in the guide can be divided into TEy and TMy (where and denote the number of field in the - and -direction, resp., inside the guide). The fields within the guide are assumed to vary sinusoidally, while the fields outside the guide are assumed to decay exponentially. In order to simplify the analysis, the fields in the shaded regions of Figure 2(b) are assumed to be zero. By matching the fields at the boundary conditions, the wave propagation numbers in the -, -, and -directions (, , and ) (for and ) and the attenuation constants in the - and -directions (, ) (for and ) can be determined using (1) to (11).

This approximation is equivalent to assuming that magnetic walls exist at and . In the DRAs, to model the dielectric resonator antenna, the waveguide is truncated along the -direction at , as shown in Figure 3(b) with magnetic walls. This model can be used for an isolated DRA in free space (with dimensions , , and ) or as is used in practice, for a DRA (with dimensions , , and ) mounted on a ground plane, as shown in Figure 3(c). In this latter case, image theory was used to remove the ground plane and double the height of the DRA.

For a rectangular DRA with dimensions , , the lowest-order mode will be TEz11δ. Using the dielectric waveguide model, this leads to the following fields within the DRA: where where (7) and (8) are used for and , respectively. To solve for the resonant frequency of the DRA, (7), (8), and (9) are first substituted into (10), and this transcendental equation is solved for . The resonant frequency can then be obtained by solving for in (6), or we can directly use (11) for finding resonant frequencies for different modes.

The radiation -factor of the DRA is determined using where and are the stored energy and radiated power, respectively. These quantities are given by where is the magnetic dipole moment of the DRA: The impedance bandwidth (BW) of the DRA can be estimated from the radiation -factor using: where is the maximum acceptable voltage standing-wave ratio (VSWR). The above equations can be used to generate the graphs for factors for various values of dielectric constant and various values of . The normalized -factor is defined as The field distribution of the lowest-order mode of the rectangular DRA, determined by the dielectric waveguide model equations, is similar to that of a short magnetic dipole. The radiation patterns generated by the DRA can, therefore, be approximated using the short magnetic dipole. The equivalent model for a rectangular DRA was mounted on an infinite ground plane and excited in the TEz11δ mode. This corresponds to a horizontal magnetic dipole aligned along the -axis. The resulting radiation patterns assume that the DRA is mounted on an infinite ground plane. For practical applications, DRAs are mounted on finite ground planes, which will have an effect on the radiation patterns due to diffraction from the edges.

4. Result and Observation

The authors observed the dual-band dielectric resonant antenna with resonant frequency 6.0 GHz and 8.3 GHz, respectively. The bandwidth of each band is 280 MHz and 490 MHz, respectively. When we vary the dimension of various parameter of Dielectric Resonator (DR) and slot for optimization, we realize that the resonance frequency of DRA depends on the physical dimensions of the DR and slot. The physical structure of Antenna is shown in Figures 4 and 5.

In the given Figure 6, we can see the good agreement of simulated result and measured result. At lower mode the return loss in both the cases is approximately same but at higher frequency simulated return loss is more down then measured (Figure 7).

The input impedance of antenna at resonance frequencies is approximately 50.5 ohm (Figure 8).

The measured gain is less with respect to simulated which is clearly shown in Figure 9. Simulated results in both simulators are approximately the same. The deviation of measured and simulated may be due to measurement setup.

The gain plot at both the frequencies is shown in the Figures 10 and 11.

The E-field pattern at both the frequencies is shown in Figures 12 and 13.

Figures 14 and 15 shows the H field pattern at both frequencies, 6.1 GHz & 8.3 GHz.

In Figure 16, we observed that the curve has two peaks at resonance frequency where antenna has maximum radiation performance.

We can see here the flat stable gain response over entire 6 GHz to 9 GHz as shown in Figure 17. It is an advantage of antenna in application band.

5. Conclusion

Here we have successfully designed a simple structure and compact size of dual-band low-loss aperture-coupled dielectric resonator antenna, which has almost flat stable gain of approximately 6 dB in 6 to 9 GHz range. The antenna has high value as compared to conventional patch antenna whose is very low. Table 1 shows the values of various parameters at both the frequencies, 6.1 GHz & 8.3 GHz. Hence our designed antenna has more power handling capacity than patch antenna. This dual-band dielectric resonator antenna can find applications in - and -band-based communication applications such as satellite communication.

Acknowledgments

The authors are very thankful to Dr. A. K. Shrivastav, Program Director, SAMEER-CEM, Chennai, and Mr. Pramod kumar, Associate Professor, IPEC, Ghaziabad, for their support and guidance. They are also thankful to Antenna Division, SAMEER-CEM Chennai, for their support in simulation and measurements.