A Study on an Easy-Plane FeSi3.5 Composite with High Permeability and Ultra-Low Loss at the MHz Frequency Band

An easy-plane FeSi3.5 composite with excellent magnetic properties and loss properties at MHz were proposed. The easy-plane FeSi3.5 composite has ultra-low loss at 10 MHz and 4 mT, about 372.88 kW/m3. In order to explore the reason that the Pcv of easy-plane FeSi3.5 composite is ultra-low, a none easy-plane FeSi3.5 composite, without easy-plane processing as a control group, measured the microstructure, and the magnetic and loss properties. We first found that the real reason why magnetic materials do not work properly at MHz due to overheat is dramatical increase of the excess loss and the easy-plane composite can greatly re-duce the excess loss by loss measurement and separation. The total loss of none easy-plane FeSi3.5 composite is much higher than that of easy-plane FeSi3.5 composite, where the excess loss is a major part in the total loss and even over 80% in the none easy-plane FeSi3.5 composite. The easy-plane FeSi3.5 composite can greatly reduce the total loss compared to the none easy-plane FeSi3.5 composite, from 2785.8 kW/m3 to 500.42 kW/m3 (3 MHz, 8 mT), with the main reduction being the excess loss, from 2435.2 kW/m3 to 204.93 kW/m3 (3 MHz, 8 mT), reduced by 91.58%. Furthermore, the easy-plane FeSi3.5 composite also has excellent magnetic properties, high permeability and ferromagnetic resonance frequencies. This makes the easy-plane FeSi3.5 composite become an excellent soft magnetic composite and it is possible for magnetic devices to operate properly at higher frequencies, especially at the MHz band and above.


Introduction
With the development of electrical and electronic technology, soft magnetic materials are used as core components in daily life. Their magnetic properties and loss properties directly affect the power density and conversion efficiency [1]. In the further development of electrical and electronic devices, magnetic devices (inductor, power converters, etc.) are required to develop in the direction of miniaturization and high efficiency [2][3][4][5]. In the past, soft magnetic materials do not need to operate at higher frequencies due to the low operating frequency of power semiconductors. But now, the appearance of the thirdgeneration wide bandgap semiconductors (WBG) has provided a high-frequency scenario to soft magnetic materials [6]. The conversion efficiency P th and size of soft magnetic materials in power devices (for example inductance, transformer, etc.) can be optimized because WBG increases the operating frequency, which can be described: where C is the conversion efficiency coefficient, f is the operating frequency, B m is the maximum magnetic flux density, A e is the effective sectional area, and W d is the number of turns. However, soft magnetic materials have developed a problem, which makes them unable to work properly due to overheating at higher frequencies when WBG increases the operating frequency above MHz. Especially with the commercialization of SiC and GaN, the problem that soft magnetic materials cannot work properly at higher frequencies becomes more serious. A review, published in 2018 in Science, noted that none of the soft magnetic materials available today can cope with this daunting challenge. However, it also pointed out that soft magnetic composites (SMCs) have the potential to solve this problem [6]. Traditional SMCs are often used in electric motors, transformers, inductors and sensors due to high permeability, high-saturation magnetization and high-ferromagnetic resonance frequency [7][8][9][10]. When the devices try to work at higher frequencies, SMCs also have the same problem, which makes them unable to work properly due to overheating, resulting in a huge loss [6,11]. This overheating was thought to be caused by the eddy current loss at higher frequencies in the previous research [11][12][13][14]. Addressing the sharp increase in the loss at higher frequencies will provide a means of dealing with WBG and making soft magnetic materials work effectively.
The easy-plane soft magnetic materials are materials with a special magnetic configuration, where easy magnetization axes distributed in parallel planes with the same type enables the formation of the easy magnetization plane. According to the physical origins for the formation of the easy magnetization plane, easy-plane soft magnetic materials are divided into the magnetocrystalline-easy-plane soft magnetic materials (the easy magnetization axes are determined by the minimal of the magnetocrystalline anisotropy energy) and the magnetostatic-easy-plane soft magnetic materials (the easy magnetization axes are determined by the minimal of the magnetostatic energy). In the easy magnetization plane, the magnetization of easy-plane soft magnetic material is more easily saturated, remanence and coercivity of easy-plane soft magnetic materials are lower and the easy-plane soft magnetic materials has higher permeability and ferromagnetic resonance frequencies. When prepared as composites, the easy-plane soft magnetic composites maintain the excellent properties of the easy-plane soft magnetic materials, and also have the advantages of the composites. In the field of wave absorption, excellent results have been achieved due to the excellent performance of easy-plane soft magnetic composites [15][16][17][18]. Therefore, the easy-plane soft magnetic composites have the potential to address challenges posed by energy problem and WBG.
In the up-to-date published SMCs, measurement frequency of most studies are 1 MHz and below, such as FeSiCr (µ = 37, 560 kW/m 3 at 1 MHz, 20 mT and µ = 47.5, 7086 kW/m 3 at 1 MHz, 50 mT) [19,20], Fe 73 Si 6 B 10 P 5 C 3 Mo 3 (µ = 34.63,~500 kW/m 3 at 1 MHz, 20 mT) [21], flake pure iron (µ = 67, 306.6 kW/m 3 at 1 MHz, 3 mT and µ = 10, 3.285 kW/m 3 at 3.5 MHz, 0.1 mT) [22], etc. There are almost no studies with high frequency and high maximum magnetic flux density. However, in this paper, we measured for the total loss P cv of the easy-plane FeSi 3.5 composite at 10 MHz and 4 mT, and we found that the easy-plane FeSi 3.5 composite has an ultra-low loss. The P cv of the easy-plane FeSi 3.5 composite and none easy-plane FeSi 3.5 composite was measured and analyzed at 3 MHz and 8 mT for this study; the reason for their ultra-low loss. We first found that the real reason why magnetic materials do not work properly at higher frequencies is due to overheating, which shows a dramatical increase in the excess loss of P exc , and the easy-plane FeSi 3.5 composite can greatly reduce the total loss of P cv , and the main part of the reduction is the P exc . The easyplane FeSi 3.5 composite has high permeability, high-ferromagnetic resonance frequencies and a lower loss compared with the none easy-plane FeSi 3.5 composite by measurement and separation of loss. It is found that the sharp increase in the excess loss combined with frequency far exceeded the eddy current loss, and the excess loss becomes the most main part of total loss. The easy-plane FeSi 3.5 composite not only has higher permeability and higher ferromagnetic resonance frequencies, but can also effectively reduce the excess loss. Thus, the easy-plane FeSi 3.5 composite has the potential to deal with the overheating of soft magnetic materials due to excessive loss at higher frequencies, and is effectively utilized for devices at higher frequencies, especially at MHz and above.

Experiment
FeSi 3.5 are the tradition spherical particles, obtained by purchasing. The tradition spherical FeSi 3.5 particles are easy-plane processed to obtain the easy-plane FeSi 3.5 particles, and the tradition spherical FeSi 3.5 particles are named the none easy-plane FeSi 3.5 particles. The easy-plane FeSi 3.5 particles were compounded with polyurethane (PU) to prepare a polyurethane-based composite with 60 vol% (optimal volume fraction obtained after extensive experiments), and oriented in a rotating magnetic field (1 T) for 10 min. After the composite was heated to 90 • C, it was pressed into a ring-shaped composite with an outer diameter of 7 mm, an inner diameter of 3.04 mm and a thickness of 1 mm. And the none easy-plane FeSi 3.5 composite was prepared using the same method.
The morphology of both particles and the composites were characterized by SEM (Apreo S, Thermo Fisher Scientific, Waltham, MA, USA). The vibrating sample magnetometer (VSM) (Microsence EV9, MicroSense, Lowell, MA, USA) was used to measure the hysteresis loop, and the degree of the plane orientation of two composites were also obtained by VSM data. The complex permeability of the composite was measured by a precision impedance analyzer (Agilent E4991B, Agilent, Santa Clara, CA, USA) and vector network analyzer (Agilent E8363B, Agilent, Santa Clara, CA, USA) at 1 MHz~18 GHz. The power loss was measured by a B-H analyzer (SY-8218, Iwatsu, Tokyo, Japan).

Result
The P cv of the easy-plane FeSi 3.5 composite was measured at 10 MHz and 4 mT. It is found that the easy-plane FeSi 3.5 composite has an ultra-low loss of about 372.88 kW/m 3 . The result is rare in SMC. In order to explore the reason that the P cv of the easy-plane FeSi 3.5 composite is ultra-low, the none easy-plane FeSi 3.5 composite, without easy-plane processing as a control group, measured the microstructure, magnetic properties and loss properties. Figure 1 shows the morphology and microstructures of the none easy-plane FeSi 3.5 particles (a,b) and the easy-plane FeSi 3.5 particles (d,e), cross sections of the none easy-plane FeSi 3.5 (c) and easy-plane FeSi 3.5 composite (f), respectively. The thickness of the none easy-plane FeSi 3.5 particles is 44.35 µm, and the thickness of the easy-plane FeSi 3.5 particles is 1.14 µm, thus the latter is much smaller than the former. The microstructures of the none easy-plane FeSi 3.5 composite are a homogenous mixture of none easy-plane FeSi 3.5 particles and PU; the microstructure of the easy-plane composite is an ordered laminar structure because of the orientation process.

Static Magnetic Performance and Degree of the Plane Orientation
where M s is the saturation magnetization, and M r, z−axis is the remanent magnetism in the z-axis direction. For the none easy-plane FeSi 3.5 composite, the hysteresis loops of the in-plane and out-of-plane direction coincide. Neither the in-plane direction or out-of-plane direction was magnetized to saturation (about 154 emu/g). For the easy-plane FeSi 3.5 composite, the hysteresis loops of the in-plane and out-of-plane direction are different. The in-plane direction is more easily magnetized to saturation (about 173.5 emu/g) than the out-of-plane direction (Table 1).   Figure 2 shows the static magnetic properties of FeSi3.5 particles (a), hysteresis loops and the degree of plane orientation (DPO) of the none easy-plane FeSi3.5 composite (b) and easy-plane FeSi3.5 composite (c). The saturation magnetization ( ) and the coercivity ( ) of original FeSi3.5 is 184 emu/g and 3.32 Oe. The degree of plane orientation was characterized by measuring hysteresis loops of the in-plane and out-of-plane direction. The DPO can be expressed by Equation (2) [23]:

Static Magnetic Performance and Degree of the Plane Orientation
where is the saturation magnetization, and , is the remanent magnetism in the z-axis direction. For the none easy-plane FeSi3.5 composite, the hysteresis loops of the in-plane and out-of-plane direction coincide. Neither the in-plane direction or out-ofplane direction was magnetized to saturation (about 154 emu/g). For the easy-plane FeSi3.5 composite, the hysteresis loops of the in-plane and out-of-plane direction are different. The in-plane direction is more easily magnetized to saturation (about 173.5 emu/g) than the out-of-plane direction (Table 1).    Figure 2 shows the static magnetic properties of FeSi3.5 particles (a), hysteresis loops and the degree of plane orientation (DPO) of the none easy-plane FeSi3.5 composite (b) and easy-plane FeSi3.5 composite (c). The saturation magnetization ( ) and the coercivity ( ) of original FeSi3.5 is 184 emu/g and 3.32 Oe. The degree of plane orientation was characterized by measuring hysteresis loops of the in-plane and out-of-plane direction. The DPO can be expressed by Equation (2) [23]:

Static Magnetic Performance and Degree of the Plane Orientation
where is the saturation magnetization, and , is the remanent magnetism in the z-axis direction. For the none easy-plane FeSi3.5 composite, the hysteresis loops of the in-plane and out-of-plane direction coincide. Neither the in-plane direction or out-ofplane direction was magnetized to saturation (about 154 emu/g). For the easy-plane FeSi3.5 composite, the hysteresis loops of the in-plane and out-of-plane direction are different. The in-plane direction is more easily magnetized to saturation (about 173.5 emu/g) than the out-of-plane direction (Table 1).   Table 1. The M s , M r and H c of the in-plane and out-of-plane direction and DPO of the none easyplane FeSi 3.5 composite and easy-plane FeSi 3.5 composite.

In-Plane
Out  Figure 3 shows the magnetic spectra and spectra simulation of the none easy-plane FeSi 3.5 and the easy-plane FeSi 3.5 composite with 60 vol%. For the none easy-plane FeSi 3.5 composite, the real part of permeability is 30. It has a resonance peak at 20 MHz in the imaginary part of permeability. For the easy-plane FeSi 3.5 composite, the real part of permeability is 62. Two resonance peaks appear in the imaginary part of the permeability. The domain wall resonance peak is observed in a lower frequency (100 MHz), and the natural resonance is observed in a higher frequency (1.5 GHz). According to the domain wall motion mechanism and spin rotation mechanism, magnetic spectra can be simulated by Equations (3) and (4) [24][25][26][27][28]:

Complex Permeability and Magnetic Spectra Simulation
where µ dw and µ spin are the real part of permeability for the domain wall motion mechanism and spin rotation mechanism, and µ dw and µ spin are the imaginary part of permeability for the domain wall motion mechanism and spin rotation mechanism, respectively. ω dw , χ dw and β are the domain wall resonance frequency, static susceptibility and damping factor for the domain wall component. ω spin , χ spin and α is the resonance frequency, static susceptibility and damping factor for the spin rotation component. ω is the frequency of the applied field (ω = 2π f ). According to Equations (3) and (4), the magnetic spectra are simulated and six parameters (ω dw , χ dw , β, ω spin , χ spin , α) are obtained (Figure 3b,c and Table 2).
FeSi3.5 and the easy-plane FeSi3.5 composite with 60 vol%. For the none easy-plane FeSi3. composite, the real part of permeability is 30. It has a resonance peak at 20 MHz in the imaginary part of permeability. For the easy-plane FeSi3.5 composite, the real part of per meability is 62. Two resonance peaks appear in the imaginary part of the permeability The domain wall resonance peak is observed in a lower frequency (100 MHz), and the natural resonance is observed in a higher frequency (1.5 GHz). According to the domain wall motion mechanism and spin rotation mechanism, magnetic spectra can be simulated by Equations (3) and (4)  where and are the real part of permeability for the domain wall motion mech anism and spin rotation mechanism, and and are the imaginary part of perme ability for the domain wall motion mechanism and spin rotation mechanism, respectively , and are the domain wall resonance frequency, static susceptibility and damping factor for the domain wall component.
, and is the resonance fre quency, static susceptibility and damping factor for the spin rotation component.
is the frequency of the applied field ( = 2 ). According to Equations (3) and (4), the magnetic spectra are simulated and six parameters ( , , , , , ) are obtained (Fig  ure 3b,c and Table 2).   Table 2. The six parameters in the magnetic spectra of the none easy-plane FeSi 3.5 composite and easy-plane FeSi 3.5 composite. µ i

Domain Wall Motion
Spin Rotation None easy-plane FeSi 3.  In general, the P cv rapidly increases with increasing frequency, and the maximum P cv of the easy-plane FeSi 3.5 composite (500.42 kW/m 3 ) is much lower than that of the none easy-plane FeSi 3.5 composite (2785.8 kW/m 3 ).

Easy-Plane
FeSi3.5 66 45 840 100 4 × 10 10 20 7 1.5 5 Figure 4 shows the power loss and loss separation of the none easy-plane FeSi3.5 composite and the easy-plane FeSi3.5 composite. The easy-plane FeSi3.5 composite exhibits a desired total loss of 500.42 kW/m 3 under the test conditions of 8 mT and 3 MHz. In general, the rapidly increases with increasing frequency, and the maximum of the easy-plane FeSi3.5 composite (500.42 kW/m 3 ) is much lower than that of the none easyplane FeSi3.5 composite (2785.8 kW/m 3 ). According to classic Bertottit's loss separation theory, the total loss of can be separated into three different parts: hysteresis loss , eddy current loss and excess loss . The expression can be described [29]:

Power Loss and Loss Separation
where and are the coefficients of hysteresis loss, is the coefficient of current eddy loss, and , and are the coefficients of excess loss. The coefficients in each term are shown in Table 3. According to classic Bertottit's loss separation theory, the total loss of P cv can be separated into three different parts: hysteresis loss P hyst , eddy current loss P eddy and excess loss P exc . The expression can be described [29]: where c hyst and α are the coefficients of hysteresis loss, c eddy is the coefficient of current eddy loss, and c exc , x and y are the coefficients of excess loss. The coefficients in each term are shown in Table 3. For the none easy-plane FeSi 3.5 composite, P exc is the largest proportion of the total loss, about 2435.2 kW/m 3 (8 mT and 3 MHz), and P hyst and P eddy are small percentages of the total loss, about 224.79 kW/m 3 and 125.77 kW/m 3 . For the easy-plane FeSi 3.5 composite, P eddy is the smallest proportion of the total loss, about 0.689 kW/m 3 , and P hyst and P exc are main part of total loss, about 294.8 kW/m 3 and 204.93 kW/m 3 . Although the P hyst of the none easy-plane FeSi 3.5 composite is less than that of easy-plane FeSi 3.5 composite, the difference between them is only 70 kW/m 3 under the test conditions of 8 mT and 3 MHz. For the P eddy and P exc , the advantages of the easy-plane FeSi 3.5 composite are shown. The P eddy of the easy-plane FeSi 3.5 composite is 1 200 for that of the none easy-plane FeSi 3.5 composite. The P exc of the easy-plane FeSi 3.5 composite is 1 20 for that of the none easy-plane FeSi 3.5 composite.

Discussion
The easy-plane FeSi 3.5 composite has excellent magnetic properties and loss properties at higher frequencies compared with the none easy-plane FeSi 3.5 composite. The easy-plane FeSi 3.5 composite has higher permeability and higher ferromagnetic resonance frequencies than the none easy-plane FeSi 3.5 composite, which is beneficial for reducing the excitation current, turns and achieving device miniaturization. And the P cv of the easy-plane FeSi 3.5 composite (500.42 kW/m 3 ) is lower and about 1 5 for than that of the none easy-plane FeSi 3.5 composite (2785.8 kW/m 3 ). It is emphasized that the easy-plane FeSi 3.5 composite has lower P cv compared with the none easy-plane FeSi 3.5 composite because of the significant reduction in P exc rather than the decrease of P eddy . The P eddy of the none easy-plane FeSi 3.5 composite and easy-plane FeSi 3.5 composite is only a small proportion of total loss (as shown in Figure 4b,c). The P eddy of the none easy-plane FeSi 3.5 composite and easy-plane FeSi 3.5 composite, respectively, only accounts for 4.5% and 0.14% of the total loss at 8 mT and 3 MHz (as shown in Figure 5b,e). Both the none easy-plane FeSi 3.5 composite and easy-plane FeSi 3.5 composite have a particle size of microns, and are composite materials (high resistivity). Therefore, they have a low intra-particle eddy current loss P intra eddy and inter-particle eddy current loss P inter eddy . And the easy-plane FeSi 3.5 composite with smaller particle thickness can have a lower P eddy (as shown in Figure 4e) compared with the none the easy-plane FeSi 3.5 composite. Therefore, the P eddy will not become a relatively large part of the loss and a major issue at higher frequencies of SMCs. problem to soft magnetic materials in higher frequency applications, especially after reaching the MHz band. Both of the none easy-plane FeSi3.5 composite and easy-plane FeSi3.5 composite can maintain a low loss at a lower frequency, but the easy-plane FeSi3.5 composite has an obvious advantage in the high-frequency band. For the none easy-plane FeSi3.5 composite the dramatical increase in alongside frequency leads to a rapid increase in total loss the is over at 250 kHz, about 20 kW/m 3 ; along with the rapid increase in frequency, the accounts for about 80% of the total loss at 1 MHz, about 342.8 kW/m 3 the reaches about 2435.2 kW/m 3 while the frequency continuously increases to 3 MHz (Figure 5c). For the easy-plane FeSi3.5 composite, the is about 0.75 kW/m 3 at 250 It is found that P exc becomes the main loss when increasing the frequency, according to the experimental results (as shown in Figure 4b,c). The P exc of none the easy-plane Whether the none easy-plane FeSi 3.5 composite or easy-plane FeSi 3.5 composite, the P exc both dramatically increases with frequency. For the none easy-plane FeSi 3.5 composite, the P exc sharply increases and becomes the main part of the total loss in the range of 200 kHz to 1200 kHz, accounting for about 80% of the total loss. For the easy-plane FeSi 3.5 composite, the main loss is P hyst at a low frequency. As the frequency increases, the P exc of the easyplane FeSi 3.5 composite rapidly increases and becomes one of the main losses. Therefore, as the frequency increases, the dramatical increase of P exc becomes a serious problem to soft magnetic materials in higher frequency applications, especially after reaching the MHz band.
Both of the none easy-plane FeSi 3.5 composite and easy-plane FeSi 3.5 composite can maintain a low loss at a lower frequency, but the easy-plane FeSi 3.5 composite has an obvious advantage in the high-frequency band. For the none easy-plane FeSi 3.5 composite, the dramatical increase in P exc alongside frequency leads to a rapid increase in total loss, the P exc is over P hyst at 250 kHz, about 20 kW/m 3 ; along with the rapid increase in frequency, the P exc accounts for about 80% of the total loss at 1 MHz, about 342.8 kW/m 3 ; the P exc reaches about 2435.2 kW/m 3 while the frequency continuously increases to 3 MHz (Figure 5c). For the easy-plane FeSi 3.5 composite, the P exc is about 0.75 kW/m 3 at 250 kHz, 24.61 kW/m 3 at 1 MHz and 204.93 kW/m 3 at 3 MHz (Figure 5f). Compared with the none easy-plane FeSi 3.5 composite, the P exc in the easy-plane FeSi 3.5 composite is lower. This phenomenon is possibly related to the domain wall resonance frequency, and we will continue to study this in the future. As shown in Figure 3, the domain wall resonance frequency of the easy-plane FeSi 3.5 composite and none easy-plane FeSi 3.5 composite is 100 MHz and 9 MHz, respectively. Due to the domain wall resonance frequency of the none easy-plane FeSi 3.5 composite being low, the P exc dramatically increases with frequency and the frequency is only 250 kHz when the P exc exceeds the P hyst (Figure 5c). For the easy-plane FeSi 3.5 composite, P exc still increases with frequency, but the rate of the increase of P exc with frequency is lower, due to the high-domain-wall frequency, and P exc exceeds the P hyst only when the frequency is higher than 3 MHz (Figure 5f). The high-domain-wall resonance frequency can push the frequency point, where the excess loss dramatically increases to a higher frequency, thus the easy-plane material with a higher domain wall resonance frequency can well inhibit the increase in excess loss with frequency.
The performance factor (PF) is a parameter that describes the energy transformation efficiency and can be expressed as the product of B m and f by Equation (1): The PF is calculated by simulated parameters in Table 2. It is found that PF and total loss of the easy-plane FeSi 3.5 composite is much more excellent than that of the none easy-plane FeSi 3.5 composite. This indicates that the easy-plane FeSi 3.5 composite has a higher transformation efficiency and lower loss compared with the none easy-plane FeSi 3.5 composite, and that the easy-plane FeSi 3.5 composite is more suitable for operating at higher frequencies. In addition, the currently published results of SMCs operating at higher frequencies are compared with those of the easy-plane FeSi 3.5 composite. The easy-plane FeSi 3.5 composite still has an advantage in permeability, operating frequency and transformation efficiency (as shown Figure 6b in Table 4).  higher transformation efficiency and lower loss compared with the none easy-plane FeSi3.5 composite, and that the easy-plane FeSi3.5 composite is more suitable for operating at higher frequencies. In addition, the currently published results of SMCs operating at higher frequencies are compared with those of the easy-plane FeSi3.5 composite. The easyplane FeSi3.5 composite still has an advantage in permeability, operating frequency and transformation efficiency (as shown Figure 6b in Table 4).

Conclusions
The easy-plane FeSi3.5 composite has an ultra-low loss at 10 MHz, 4mT (372.88 kW/m 3 ). The reason for the ultra-low loss of the easy-plane FeSi3.5 composite at higher frequencies is because of setting up a control group (the none easy-plane FeSi3.5 composite). For the first time, we found that the root cause of the failure in soft magnetic composites to work properly at higher frequencies was due to the dramatic increase in the . The rate of increase and the percentage of the is much larger than that of the and Figure 6. The PF calculate curve of the none easy-plane FeSi 3.5 composite and the easy-plane FeSi 3.5 composite at 500 kW/m 3 (a). The PF of different SMCs at 500 kW/m 3 (b) [19][20][21][22].

Conclusions
The easy-plane FeSi 3.5 composite has an ultra-low loss at 10 MHz, 4mT (372.88 kW/m 3 ). The reason for the ultra-low loss of the easy-plane FeSi 3.5 composite at higher frequencies is because of setting up a control group (the none easy-plane FeSi 3.5 composite). For the first time, we found that the root cause of the failure in soft magnetic composites to work properly at higher frequencies was due to the dramatic increase in the P exc . The rate of increase and the percentage of the P exc is much larger than that of the P hyst and the P eddy . The P exc accounts for a large portion of the P cv ; the portion continues to sharply increase with frequency, and conventional loss reduction methods have no effect on the P exc . In addition, we also found that the easy-plane composite can effectively reduce the P exc . Compared with the none easy-plane composite, the easy-plane composite can greatly reduce P exc from 2435.2 kW/m 3 to 204.93 kW/m 3 . This substantial reduction can greatly reduce the P cv . And the easy-plane composite also has excellent magnetic properties, high permeability and ferromagnetic resonance frequencies. Thus, the easy-plane composite has strong potential to be applied for inductor and transformer cores at higher frequencies, especially at the MHz band and above.