Transmission Distance Improvement of a Two-Coil Magnetic Resonance Wireless Power Transmission System Using Transformers

Article information

J. Electromagn. Eng. Sci. 2021;21(4):329-335
Publication date (electronic) : 2021 September 30
doi : https://doi.org/10.26866/jees.2021.4.r.41
Department of Electrical Engineering, Hanyang University, Seoul, Korea
*Corresponding Author: Kwang-Cheol Ko (e-mail: kwang@hanyang.ac.kr)
Received 2020 November 20; Revised 2021 February 1; Accepted 2021 April 13.

Abstract

In this paper, a two-coil magnetic resonance wireless transmission system is studied to improve the transmission distance using transformers. A conventional two-coil and four-coil wireless power transmission (WPT) system as well as a two-coil WPT system with transformers are analyzed comparatively via circuit simulations and experiments. Circuit analysis was used to predict the transmission distance with the highest efficiency. To verify the improvement in the transmission distance of the proposed system, transformers with inductance values of 80, 100, and 140 μH were fabricated and analyzed through experiments and simulations. A maximum S21 parameter of 0.76 was noted when the inductance was 80 μH and the transmitting distance was 4 cm. The experimental results almost matched the simulation results. From the experiments, it was shown that the transmitting distance of a WPT system can be adjusted by using transformers. Additionally, it was found that the transmitting distance is inversely proportional to the transformer inductance, and the efficiency of the WPT system decreases with the transmitting distance.

I. Introduction

Wireless power transmission (WPT) is a promising technology used in charging electric devices such as mobile phones, tablet, and electric vehicles [13]. Two-types of WPT technology have been studied: a magnetic resonance method and an inductive coupling method [4]. Inductively coupled WPT has already been used in the industry. Moreover, the short transmission distance of inductively coupled WPT limits its applications. However, magnetic resonance WPT transmits farther than inductively coupled WPT, and this had led to magnetic resonance WPT being used widely in various applications [5, 6].

The magnetic resonance between resonance coils allows for power transmission from a few centimeters to a few meters. The impedance matching of the transmission and receiving coils allows for farther power transmission. Depending on the system, three or four coils are used in magnetic resonance WPT [79]. The magnetic resonance method has a specific transmitting distance with a high transmitting efficiency. The specific distance increases as the impedance of the source and the load is small while that of the transmitting and receiving coils is large. The disadvantages of magnetic resonance WPT include the difficulty involved in the impedance matching and the large volume of the system [10].

In this paper, a two-coil WPT system with transformers is studied to improve the transmission distance and reduce the system volume of the conventional WPT system. The conventional four-coil WPT system needs to be designed considering three coupling coefficients between the coils. However, the proposed system makes the impedance matching simpler by using a fixed coupling coefficient for the transformers, which is nearly 1 and the coupling coefficient between the transmitting and receiving coil.

To verify the proposed WPT, both the conventional and proposed WPT are analyzed comparatively through simulations and experiments. The magnetically coupled circuit model of the proposed WPT is simulated and analyzed using passive circuital elements. The circuit model is used in estimating the optimum transmitting distance with a maximum transferring efficiency. The proposed WPT is also studied by varying the inductance of the transformers to observe the change in the transmitting distance.

II. Two-Coil Magnetic Resonance WPT System with Transformers

Fig. 1 shows a schematic circuit of the two-coil magnetic resonance WPT system with transformers. The circuit is composed of the voltage source (Vs), the source resistance (Rs), the load resistance (RL), and capacitors for resonance (C1, C2, C3, C4). Helical coils were used as the transmitting (Tx) and receiving (Rx) coils. When an electric power with the same resonance frequency as the LC circuit is applied to the transformers (TR1, TR2), a magnetic field is generated from the transmitting coil. The generated magnetic field transmits electric power to the receiving coil. Then the receiving part of the coil operates analogous to the transmitting part. The receiving part of the coil is modeled by substituting the power source of the transmitting part to the load.

Fig. 1

The two-coil magnetically coupled wireless power transmission system with transformers.

The impedance matching circuit of the transmitting and receiving coils allows for mid-distance WPT. The transformer used in the proposed system provides impedance matching in the circuit.

By assuming that the loss from the inner resistance of the coil is neglected, it can also be assumed that the energy not transferred to the receiving coil remains in the transmitting coil at the resonance frequency. Therefore, the matched coils increase the transferring efficiency even though the mutual inductance is extremely small [11]. Although it has two coils, the proposed two-coil system has characteristics similar to the four-coil system and not the conventional two-coil system. The RLC circuit, sharing a mutual inductance, has a high transferring efficiency at frequencies higher and lower than the resonance frequency.

This phenomenon is called the frequency split, which converges to the resonance frequency as the mutual inductance of the coils decreases. The frequency split is a feature of mid-distance WPT and not observed in two-coil WPT [12].

III. Circuit Model

The circuit model of the proposed WPT system is shown in Fig. 2; it is used in the circuit simulation and can be analyzed numerically.

Fig. 2

Equivalent circuit of WPT with transformers.

The circuit model of the proposed WPT system is composed of two T-equivalent circuits. The resonance circuit is represented as a RLC circuit using lumped elements. The four-resonance circuit is magnetically coupled using transformers as well as the transmitting and receiving coils. Mtr1 and Mtr2 are the mutual inductances of transformers 1 and 2, respectively. The coupling coefficient of the transmitting and receiving coils is k23.

The first part of the transmitting circuit is composed of the power source (Vs), source impedance (Rs), primary leakage inductance of the transformer 1 (Ltr1-p), and internal resistance of transformer 1 (R1). The second part of the transmitting circuit is composed of the secondary leakage inductance of transformer 1 (Ltr1-s), the inductance of the transmitting coil (L1), and the composite resistance of the internal resistance of the transformer and the coil resistance (R2).

The capacitors are connected in a series to the first and second part of the transmitting circuit. The capacitance, C1, is determined by the sum of the primary leakage inductance (Ltr1-p) and mutual inductance (Mtr1). The capacitance, C2, is determined by sum of the secondary leakage inductance (Ltr1-s), mutual inductance (Mtr1), and inductance of the transmitting coil (L1). The receiving circuit is composed similarly to the transmitting circuit.

(1) Vs=I1(Rs+R1+jωLtr1-p+1jωC1)-I2jωMtr10=I2(R2+jωLtr1-s+jωL1+1jωC2)-I1jωMtr1-I3jωM230=I3(R3+jωLtr2-p+jωL2+1jωC3)-I2jωM23-I4jωMtr20=I4(RL+R4+jωLtr2-s+1jωC4)-I3jωMtr2

Eq. (1) is represented using Kirchhoff’s voltage law (KVL) to analyze the proposed WPT system. The current of each resonance circuit is calculated using KVL. The mutual inductance in Eq. (1) is substituted with the coupling coefficient using Eq. (2). Eq. (4), which is a power transfer function, ( VLVs), can be derived using Eq. (1) and Eq. (3). The S21 function can be calculated using Eq. (4) [13].

(2) Mmn=kmnLmLn
(3) Z1=Rs+R1+jωLtr1-p+1/jωC1,Z2=R2+jωLtr1-s+jωL1+1/jωC2,Z3=R3+jωLtr2-p+jωL2+1/jωC3,Z4=RL+R4+jωLtr2-s+1/jωC4

The WPT system is considered a two-port network. The S21 parameter is calculated using Eq. (4) and is represented in Eq. (5) [14]. (S21)2 represents the maximum power ratio and transferring efficiency of the WPT.

(4) VLVS=jω3ktr1k23ktr2Ltr1-pLtr1-sLtr2-pLtr2-sL1L2RLω4ktr12ktr22Ltr1-pLtr1-sLtr2-pLtr2-s+ω2(ktr12Ltr1-pLtr1-sZ3Z4+k232L1L2Z1Z4+ktr22Ltr2-pLtr2-sZ1Z2)+Z1Z2Z3Z4
(5) S21=2VLoadVSource(RsourceRLoad)12

Fig. 3 shows the transfer function of the proposed WPT system depending on the change in the coupling coefficient (k23) and frequency. The red-colored area represents a highly efficient operation. The figure shows a frequency split, a characteristic of a mid-distance WPT system. The values of the circuit elements used in calculating the transfer function are listed in Table 1.

Fig. 3

S21 graph based on the frequency of the two-coil WPT system with transformers and the coupling coefficient of the transmitting and receiving coil.

Circuit element values used in calculating the S21 graph

Moreover, kcritical represents the specific distance for high-efficiency operation when the system is in its resonance [12]. When k23 is larger than kcritical, the WPT system is over-coupled and has two frequencies with a high efficiency. As the coupling coefficient decreases, the frequency for a high S21 converges to the critical point. When k23 is smaller than kcritical, the transferred power decreases rapidly with distance.

Unlike conventional two-coil WPT, the proposed WPT shows a frequency split and is capable of mid-distance power transmission. The calculation of an optimum kcritical is necessary for efficient power transmission and is described in the next section.

IV. Derivation of Critical Coupling Coefficient

Using Eq. (4)kcritical, which provides a high transmission efficiency to the proposed WPT system, can be deduced. When the system is in resonance, the system impedance is represented as Eq. (6).

To simplify the equations, the inductance is substituted into the Q-factor. Eq. (7) represents the relationship between the inductance and Q-factor.

(6) Z1=Rs+R1Z2=R2Z3=R3Z4=RL+R4

Using Eq. (7), the transfer function is represented as shown in Eq. (8).

(7) Qn=ωLnZn,ωn=1LnCn

In Eq. (8), the Q-factor with the same inductance is organized to have the same value; Qtr1-p = Qtr2-p = QP, Qtr1-s = Qtr2-s = QS, and Q1 = Q2 = Qcoil. Because the coupling coefficient of the transformer is approximately 1, the coupling coefficient is substituted to ktr1 = ktr2 1. The modified equation is given as \Eq. (9). Under resonance, the voltage gain in Eq. (9) is the same as in Eq. (3).

(8) VLVS=jktr1k23ktr2Qtr1-pQtr1-sQtr2-pQtr2-sQ1Q2ktr12ktr22Qtr1-pQtr1-sQtr2-pQtr2-s+ktr12Qtr1-pQtr1-s+k232Q1Q2+ktr22Qtr2-pQtr2-s+1
(9) VLVS=k232QpQsQcoilk232Qcoil2+(QpQs+1)2

The critical coupling coefficient, kcritical, can be derived by differentiating Eq. (9). kcritical in Eq. (10) represents k23 at which the transmitting and receiving coil transmits maximum power. The distance between the coils is inversely proportional to k23.

(10) kcritical=QpQs+1Qcoil

According to Eq. (10), a small kcritical is attained when the inductance of the transformer is small, and the inductances of the transmitting and receiving coils are large. Fig. 4 shows the change in kcritical when the inductances of the transmitting and receiving coils are fixed, and the transformer inductance is 80, 110, and 140 μH. Depending on the transformer’s inductor, the red part of Fig. 4, which represents a high-efficient operation, varies. Although the transmitting distance is lengthened, when the transformer’s inductance decreases, the transmitting efficiency is reduced due to the reduced kcritical. The values of the circuit elements used in the calculation is shown in Table 1. The transformer’s inductance and capacitance are calculated based on the resonance frequency.

Fig. 4

The change in kcritical depending on the inductance of the transformers used in the proposed WPT system: (a) 80 μH, (b) 110 μH, and (c) 140 μH.

V. Experiments and Simulation

1. Comparison of the Proposed WPT System with the Conventional Two-Coil and Four-Coil WPT Systems

The proposed two-coil WPT system and conventional two-coil and four-coil WPT systems were studied through experiments. Fig. 5 shows the experimental system. The two-coil WPT system consists of transmitting and receiving coils as well as capacitors (C2, C3) [4]. The four-coil system consists of a two-coil system with the addition of a source coil and a load coil. In the four-coil system, the capacitors are connected in a series to compensate for the coil inductances [13]. The transmitting and receiving coils (with a diameter of 170 mm) are wound using a 0.05 mm enameled wire. The capacitance for the resonance operation is calculated using Eq. (7). The two-coil WPT system with transformers consists of a source transformer, transmitting and receiving coils, and a load transformer. Transformers with a ferrite core, which have a high permeability and high magnetic flux density, are used in the proposed WPT system to minimize the losses due to the frequency. To minimize the system volume, a PQ-type core is used in the transformers, which are wound using the same enameled wire used in the transmitting and receiving coils.

Fig. 5

A picture of the two-coil WPT system with transformers.

The three WPT systems were operated using a function generator, and the voltage and current were measured using the Tektronix DPO3054. The WPT systems were operated at 60 kHz, which is one of the frequencies available for high-power WPT systems enacted by the International Telecommunication Union (ITU). The system can operate at different frequencies when the resonant frequency of the transformers and the transmitting and receiving coils are the same. An acrylic structure is used to support the coils and adjust the distance between the coils. The distance between the coils is altered from 0 to 15 cm in 1 cm steps. Through the experiments, an average S21 parameter was measured. The values of the circuit elements used in the simulation and experiments are shown in Table 2.

Value of the circuit elements used in the conventional two-coil and four-coil WPT system as well as the proposed two-coil WPT system

Although the transmitting distance is slightly shorter than that of the four-coil system, the experiments show that the proposed WPT system lengthens the transmitting distance compared to the conventional two-coil WPT system. The maximum S21 parameter for the proposed system is 0.76 at a coil distance of 4 cm. The maximum S21 parameter for the conventional two-coil and four-coil system is 0.93 at a coil distance of 0 cm and 0.79 at a coil distance of 6 cm, respectively. The results are shown in Fig. 6.

Fig. 6

Experimental results of the conventional two-coil and four-coil WPT system as well as the two-coil WPT system with transformers (Tr).

According to the simulations, the maximum S21 parameter of the proposed WPT system and the conventional two-coil system and four-coil system is 0.9 at 5 cm, 0.93 at 1 cm, and 0.89 at 5 cm, respectively. The simulation results are shown in Fig. 7. The maximum S21 of both the conventional two-coil system and proposed system is 1 cm shorter compared to that in the simulation. However, the maximum S21 of the four-coil system is 1 cm farther compared to that of the simulation. Additionally, the experimental efficiency was measured as less than that of the simulation when the transmitting distance was greater. The difference between the experiment and the simulation results is presumed to be the measuring error of the inductance and capacitance.

Fig. 7

Simulation results of the conventional two-coil and four-coil WPT system, and the two-coil WPT system with transformers (Tr).

2. Transmitting Distance Change Depending on the Various Transformer Inductances

Transformers with inductance values of 80, 110, and 140 μH were fabricated to analyze the change in kcritical with the change in the transformer inductance. The three types of transformers were analyzed using the same transmitting and receiving coils.

From the experiments, it is shown that kcritical varies with the change in the transformer inductance. Fig. 8 shows the change in the S21 parameter with the transformer inductance. The maximum S21 for the transformer with 80 μH (Tr-1) is 0.76 at 4 cm. The maximum S21 for the transformer with 140 μH (Tr-3) is 0.87 at 0 cm.

Fig. 8

Experimental results of S21 depending on the transformer inductance.

Fig. 9 shows the simulation results. According to the simulation, the maximum S21 for the transformer with 80 μH is 0.9 at 5 cm. The maximum S21 for the transformer with 140 μH is 0.95 at 0 cm.

Fig. 9

Simulation results of S21 depending on the transformer inductance.

Although the kcritical and S21 values were mostly the same, S21 demonstrated a greater difference between the experiments and simulations. This difference tended to increase with the transmission distance. Due to the operation frequency limits of the transformer, the proposed system is operated at a lower frequency compared to the conventional magnetic resonant WPT system. The lower operating frequency and radiation losses are considered to be the cause of these differences.

VI. Conclusion

A two-coil WPT system with transformers was studied in this paper to increase the short transmission distance. According to the simulations and experiments, it was shown that the proposed WPT system transmits electric power farther than the conventional two-coil WPT system and has similar operating features as the four-coil WPT system. The system parameter was analyzed to find kcritical, thereby giving a high efficiency to the proposed WPT. The system parameter for the optimum distance could be found from the experiments. kcritical decreases as the transformer inductance decreases, and the decrease in kcritical leads to an increased transmission distance. Transformers with different inductances were used in the experiments and simulations to verify the hypothesis. A maximum S21 of 0.84 at 2 cm and 0. 76 at 4 cm were obtained with inductance values of 110 μH and 80 μH, respectively. Despite some slight errors, the simulations and experiments can be considered as having agreement with the results. These results will be studied in future work to obtain a WPT system with constant power transferring efficiencies regardless of the change in the transmitting distance.

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Biography

Chang-Jin Lee received a B.S. degree in Electrophysics from Hallym University, Chuncheon, Korea in 2015. He is currently pursuing a Ph.D. degree with the Applied High Power Engineering Laboratory at the Department of Electrical Engineering of the Hanyang University. His current research interests include wireless power transfer and its applications.

Se-Hoon Kim received a B.S. degree in Electrical Engineering from Hanyang University, Seoul, Korea in 2015. He is currently working toward his Ph.D. degree with the Applied High Power Engineering Laboratory at the Department of Electrical Engineering of the same university. His current research interests include the compact pulsed-power system, the high-power microwave system, and their applications.

Wan-Il Kim received a B.S. degree in Electrical Engineering from Hankyong University, Korea, in 2016, and then received a M.S. degree from Korea National University of Transportation in 2018. He is currently pursuing a Ph.D degree with the Department of Electrical Engineering of Hanyang University, Korea.

Kwang-Cheol Ko received his B.S. degree in Electrical Engineering from Hanyang University, Seoul, Korea in 1982, and M.S. and Ph.D. degrees from the Tokyo Institute of Technology, Tokyo, Japan in 1986 and 1989, respectively. From 1990 to 1995, he was an Assistant Professor with the Department of Electrical Engineering, Kyungwon University, Seongnam, South Korea. In 1995, he joined the faculty of the Department of Electrical Engineering, Hanyang University, where he is currently a professor. His current research interests include pulsed-power technologies and their applications.

Article information Continued

Fig. 1

The two-coil magnetically coupled wireless power transmission system with transformers.

Fig. 2

Equivalent circuit of WPT with transformers.

Fig. 3

S21 graph based on the frequency of the two-coil WPT system with transformers and the coupling coefficient of the transmitting and receiving coil.

Fig. 4

The change in kcritical depending on the inductance of the transformers used in the proposed WPT system: (a) 80 μH, (b) 110 μH, and (c) 140 μH.

Fig. 5

A picture of the two-coil WPT system with transformers.

Fig. 6

Experimental results of the conventional two-coil and four-coil WPT system as well as the two-coil WPT system with transformers (Tr).

Fig. 7

Simulation results of the conventional two-coil and four-coil WPT system, and the two-coil WPT system with transformers (Tr).

Fig. 8

Experimental results of S21 depending on the transformer inductance.

Fig. 9

Simulation results of S21 depending on the transformer inductance.

Table 1

Circuit element values used in calculating the S21 graph

Parameter Value
L1, L2 330 μH
Ltr1−p, Ltr1−s, Ltr2−p, Ltr2−s 100 μH
C1, C4 70.4 nF
C2, C3 16.2 nF
R1, R4 0.1 Ω
R2, R3 2 Ω
Rsource, RLoad 50 Ω
Mtr1, Mtr2 99 μH
k23 0.0001–0.5
f0 60 kHz
Frequency 0–120 kHz

Table 2

Value of the circuit elements used in the conventional two-coil and four-coil WPT system as well as the proposed two-coil WPT system

Unit 2-coil 4-coil 2-coil with Tr
LSource, μH - 111.8 -
Ltr1-p, Ltr1-S μH - - 80
L1 μH 346 335.6 346
L2 μH 346 336.2 346
Ltr2-p, Ltr2-s μH - - 80
LLoad μH - 107.8 -
C1, C4 nF - 64.2 87.3
C2, C3 nF 21.2 21.2 17.2
RSource, RLoad Ω 50 50 50