1. Introduction
With several methods and probes of many types such as coaxial and waveguide transmission lines (T/L), and cavity, many people have researched to know electrical properties such as permittivity and permeability of materials at microwave frequencies [1-5]. If we can know electrical properties of the materials in an area of interest, they will be utilized to predict and analyze electromagnetic effects. And the small change of the permittivity of the materials in the area will affect the electric and magnetic fields distribution, which means that the small change should be measured to increase the accuracy of the field analysis. Most materials have the potential for the permittivity change as the degradation process occurs or the temperature of the materials changes at normal circumstance.
It is difficult for the conventional T/L probes to measure such small permittivity changes because the permittivity variations may be less than the tolerance of them. The technique using T/L probes for permittivity measurement cannot give precise results of the permittivity change of a material because the measurement error is generated during a calibration process using the reference materials such as air, methanol and distilled water. The measurement error is about 6% and depends on a measurement method and calibration skill [1][2]. Also it would have the irreversible deformation of the probe filled with Teflon when measuring the material at over 40℃ [6].
Thus, we may need a more sensitive probe of the cavity type having high quality factor. In order to detect the small permittivity change, a cavity resonator would be desirable since the resonance frequency of a cavity resonator with high quality factor is noticeably shifted even if the permittivity of the material inside the cavity gets changed even below 0.1%. Thus, we have proposed a partially open cavity (POC), which partially has openings to circulate liquid materials at each corner, to measure complex permittivity. If a vector network analyzer to measure the resonance frequency can implement a narrower span over measurement frequencies, one may detect the smaller permittivity changes [7].
In this letter, the introduced partially open cavity probe can be applied to various monitoring systems for an insulating oil degradation, a temperature change of gas tank, and so on [8][9]
2. Design of Partially Open Cavity
Fig. 1 shows the proposed rectangular POC fed by a coaxial line. It has four apertures at each corner wall whose opening area is 10 mm by t mm. We can put open apertures at each corner without disturbing the dominant mode field distribution of the rectangular cavity because the electric field intensities at each corner are weak enough. The apertures will allow the test material of liquid type to circulate easily inside to outside of the POC while measuring.
Fig. 1.Structure of partially open cavity
The return loss was simulated using HFSS according to the width (t) of the aperture, t=0~6 mm, and the resonant frequency of the dominant mode were compared in Fig. 2. In the EM simulation using HFSS, the test material of the cavity was distilled water whose dielectric constant is 81. As shown in Fig. 2, when t < 2mm, the resonant frequency of the dominant mode is almost same as that of t=0 which is the entirely closed cavity. As the aperture width t increases, the field distributions are disturbed by the apertures because the electromagnetic power is leaked thru the apertures. The wider aperture allows test materials of liquid type to circulate easily, but it causes us to get inaccurate permittivity of the materials due to the distorted field distribution of TE101 mode and leakage power.
Fig. 2.Resonant frequencies of dominant mode according to t
Considering this trade-off, we have chosen the aperture width as 1 mm, which is about one twentieth of a guided wavelength of the 1st resonance mode. We assume that the cavity with the width, 1 mm, is the same as the entirely closed cavity when considering the graph of Fig. 2.
The picture of the proposed POC is shown in Fig. 3. It was made of aluminum plate whose the thickness is 3 mm, and was designed based on the structure in Fig. 1, but considered the thickness of aluminum plate.
Fig. 3.POC with t=1 mm; a=21 mm, b=16 mm, and d=26 mm.
3. Theory
3.1 Calculation for obtaining
Consider a rectangular cavity whose dimensions are a, b and d filled with dielectric material whose dielectric and magnetic constants are and , respectively. The resonant frequency of mnl mode of the cavity is given as (1).
where kmnl is a resonant wave number [10] and m=1, n=0, and l=1. Eq. (1) can be expressed as (2) including a calibration factor, Cf that is to calibrate the square root term including the physical length factors such as a, b, and d, by multiplying Cf. It was difficult to precisely fabricate the POC, which is very small size, about 20 mm. Once we know the and of a reference liquid inside the rectangular cavity and the resonant frequency f are measured, the physical length error can be calibrated with the calibration factor, Cf.
The reference liquid used in this letter is distilled water whose complex permittivity is calculated by Cole-Cole Eq. [1]. Once the resonant frequency is measured with the rectangular cavity, the Cf would be derived.
One of the main drawbacks of the proposed technique is that it can be applied in a narrow band because of the use of cavity resonance.
3.2 Calculation for obtaining loss tangent
In order to obtain loss tangent of a test material inside a rectangular cavity, we used the critical-points method [11] which is to obtain unloaded Q of a rectangular cavity including an electrical probe. Unloaded quality factor is that
where Q is unloaded quality factor, Qc is quality factor with lossy conducting walls, and Qd is quality factor with lossy dielectric filling. The Qd is the inverse number of loss tangent (tan𝛿) and the Qc can be written as
where
The unloaded Q can be derived as
If the denominator of the first term in (5) is large enough, the loss tangent, the second term, can be obtained by only deriving unloaded Q of a rectangular cavity.
4. Measurement
In this letter, we used saline as a test material that is a mixture of distilled water and NaCl and made three kinds of the test materials whose salinity are 0.3, 0.6 and 0.9%, respectively. The results, and tan𝛿, measured by the POC were compared with those by open-ended coaxial probe and Cole-Cole equation as shown in Table 1.
Table 1.Comparison of calculated and measured complex permittivity (at 23℃)
We immersed the POC and open-ended coaxial probe into test materials, saline, in a beaker, and measured the return loss of those probes in order to measure complex permittivity. The proposed POC has a calibration process using only one reference material, distilled water, as (2), whereas the open-ended coaxial probe used three materials, air, methanol and distilled water for the calibration. The measurement of complex permittivity using the proposed method showed the error of less than about 6% [1].
And the POC can measure small change of with high accuracy as the temperature of a liquid in a beaker is rising, but the open-ended coaxial probe is difficult to identify the small change. We showed the fact in Fig. 4. As mentioned, the open-ended coaxial probe is filled with a dielectric material of Teflon that can be easily deformed due to high temperature. Both of the POC and open-ended coaxial probe used distilled water of 20℃ for a calibration process and measured the distilled water of 20℃ to 30℃ and 25℃ to 60℃ as shown in Fig. 4(a) and (b). Fig.4(a) shows the open-ended coaxial probe has the error in measuring dielectric constant even if the irreversible deformation of the dielectric material in the coaxial cable due to high temperature was not present. However the results measured from the proposed POC showed a good agreement with those calculated using Cole-Cole Equation in the temperature of 20℃ to 60℃.
Fig. 4.Measured and calculated ɛ r' as function of temperature
5. Conclusion
The measuring technique with a partially open cavity (POC) was introduced to measure complex permittivity in a narrow band and to monitor any small dielectric constant changes as the temperature is slowly rising; it also demonstrated its feasibility by comparing with the conventional technique using open-ended coaxial probe and Cole-Cole equation.
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