1.0 Introduction

As satellite technologies continue to advance, and the demand for systems that offer high resolution, exceptional agility and cost-effectiveness intensifies, there is a noticeable trend toward the integrated design of satellite platforms and their corresponding payloads. This tendency is particularly gaining importance concerning earth observation satellites and space telescopes due to the continuous evolution of optical payloads, which are becoming increasingly advanced and sensitive. Reaction wheels (RWs) are common actuators in the attitude control system of satellites, generating the desired torque for stability and orientation requirements. High control precision of reaction wheels is therefore a key device to meet the required pointing accuracy of the satellite. However, the rotation of the reaction wheel induces torque and force disturbances which degrade the satellite attitude stability quality. Hence, the vibrational loads and torque disturbances are inherent in this type of rotating actuator. Reaction wheels are the main disturbance source onboard the satellite as they create microvibrations [Reference Zhang, Yang and Pang1–Reference Cui, Feng and Liu3].

The choice of reaction wheels for a microsatellite is determined by mission requirements, including size, weight, power constraints and performance specifications. Several off-the-shelf suppliers offer a variety of options, such as Goodrich Corporation (types AA, A, B, C and E), Honeywell International (HR0610), L-3 Communications (RWA-15, MWA-50), Maryland Aerospace, Inc. (MAI-101 and MAI-201), Bradford Engineering (W05, W18, and W45), Microsat Systems Canada Inc. (MicroWheel 200, 1,000, and 4,000), Rockwell Collins (TELDIX RWs) and Surrey Satellite Technology Ltd. (10SP-M, 100SP-M, and 200SP) [Reference Rinard, Chapman and Ringler4]. RW’s disturbances can originate from various wheel-internal sources, such as inertia wheel imbalance, bearing torque noise due to imperfections, bearing friction effects, motor torque ripple and motor cogging [Reference Dennehy5]. Due to anomalies potential issues, the use of each RW’s model require that every single wheel undergoes meticulous balancing and individual noise disturbance testing. Consequently, the level of disturbance noise of the same wheel class should be measured by test.

Micro-vibrations occurring within spacecraft represent a distinct form of vibration characterised by their small amplitude and high frequency, typically exerting negligible influence on the structural integrity. Nevertheless, these micro-vibrations, stemming from various sources, traverse the satellite’s structure, provoking resonant modes in both the structure and instrument components, thereby affecting their performance [Reference Toyoshima, Takashi, Takahashi, Toshihiko, Nakagawa and Katsuyoshi6, Reference Xia, Qin, Wang and Xu7]. Microvibrations are usually within the g scale but their frequency content may vary from 1 Hz to 2 kHz [Reference Dennehy5]. Nonetheless, when it comes to sub-meter satellites, micro-vibrations have emerged as an essential factor significantly impacting the quality of high-resolution images [Reference Li, Zhou, Zhu, Dai and Liang8].

The disturbances are mainly due to static and dynamic imbalances of the wheel which affect pointing accuracy and consequently the imaging quality [Reference Nagabhushan and Fitz-Coy9–Reference Mankour, Smahat, Guy, Wang and Khatir11]. There are two types of imbalances that are usually distinguished. The first is the static imbalance, which appears when the RW centre of mass is not located at its rotation axis. The second is the dynamic imbalance, which corresponds to the misalignment between the RW principal axis of inertia and the rotation axis [Reference Tkachev, Mashtakov, Ivanov, Roldugin and Ovchinnikov12]. The dynamic imbalance induces the torque directly on the satellite body. These disturbances affect the attitude stability quality of the spacecraft, and cannot ensure the required precision pointing [Reference Masterson, Miller and Grogan13, Reference Liu, Maghami and Blaurock14].

Reaction wheels are the dominant source of high-amplitude jitter disturbance in several satellite missions due to static and dynamic imbalances within reaction wheel assemblies. Each imbalance can be modeled as shown in Fig. 1 [Reference Taniwaki, Kudo, Sato and Ohkami15, Reference Hatutori, Ohkami and Taniwaki16]. Static imbalance is the condition where the principal inertia axis of a rotor is offset from and parallel to the axis of rotation.

Figure 1. Disturbance model of (a) static imbalance and (b) dynamic imbalance.

Static imbalance can theoretically be adjusted by adding a single correction mass. Thus, the disturbance caused by the static imbalance can be expressed as follows:

(1) \begin{align}{F_s} &= {M_r}{\omega ^2}\nonumber\\ &= \Delta {m_s}r{\omega ^2}\nonumber\\ &= {u_s}{\omega ^2}\end{align}

where: $\Delta $ m _s is the unbalance mass that causes static imbalance, u_s is the static imbalance, r is the radius of the wheel and $\omega $ is the angular velocity of the wheel.

If the reaction wheel is mounted at a distance “l” from the centre of gravity (CG), then the disturbance torque caused by the static imbalance is:

(2) \begin{align}{T_s} = {u_s}{\omega ^2}l\end{align}

where: T _s is the static disturbance torque, $l$ is the distance from the wheel CG.

Dynamic imbalance is the condition where the principal inertia axis is not parallel to rotation axis, as shown in Fig. 1. The disturbance torque caused by the dynamic imbalance is quantified as follows:

(3) \begin{align}{T_d} &= \Delta {m_d}rd{\omega ^2}\\[5pt] &= {u_d}{\omega ^2}\nonumber\end{align}

where: T _d is the dynamic disturbance torque, ${u_d}$ is dynamic imbalance and d is the axial length between the imbalance masses.

Note that the rotor imbalance induces a centripetal force at the frequency of the rotation.

For these reasons, reducing the imbalances of the rotating flywheel is necessary during the wheel manufacturing stage [Reference Bialke17, Reference Taniwaki and Ohkami18]. Hence, the influence of disturbances on the quality of the attitude control should be analysed prior to the application of the wheels on the satellite [Reference Shengmin and Hao19]. In addition, predicting wheel disturbances due the manufacturing imperfection remains an open challenge [Reference Hodge, Stabile, Aglietti and Richardson20].

The accurate measurement of disturbance generated by reaction wheels and understanding the factors influencing their magnitude are crucial for various aspects of satellite design. These include monitoring the health of reaction wheels, designing attitude control systems, enhancing payload performance and validating satellite finite element models. The test results can inform the development of strategies for microvibration isolation or suppression by adjusting the transmission path through the structural design of the spacecraft or payload [Reference Luyang21, Reference Mankour22], thus facilitating the design of effective isolation systems to mitigate microvibration impact. Additionally, these results contribute to optimising the rotational speed of RWs used in designing attitude control profiles [Reference Inamori, Wang, Saisutjarit and Nakasuka23].

There are a number of approaches used to reduce RW vibrations’ influence. In the study of Ref. [Reference Inamori, Wang, Saisutjarit and Nakasuka23], small and low-speed RWs are used to reduce the effect of jitter and power consumption. In the study of Ref. [Reference Lee, Park and Han24], a special platform is proposed and studied. A similar platform and mass dampers are described by the authors of Ref. [Reference Zhang, Guo, He, Zhang, Liu and Zhou25, Reference Kong and Huang26] to achieves low-frequency motion transmission and high-frequency vibration isolation. In the study of Ref. [Reference Luo, Li and Jiang27], a two-stage scheme is proposed for the satellite with precise optical payload. In general, different vibration isolation techniques are presented in the survey in Ref. [Reference Yun, Liu, Li and Yang28]. The RW construction improvement is also considered. Hence, the results of liquid RWs in flight operation are presented in the study of Ref. [Reference Li, Wang, Yuan, Zheng, Wu, Sui and Zhong29], and they show low vibration level. Enhancing the design of the disturbance source to refine machining accuracy or altering the spacecraft’s structural design to modify the transmission path of micro-vibrations involves higher costs and longer qualification processes. Although, implementing vibration isolation devices offers an efficient strategy for micro-vibration suppression without requiring major spacecraft design changes. Placing these devices strategically, between the spacecraft bus and the disturbance source to curtail micro-vibration propagation to the spacecraft platform [Reference Kamesh, Pandiyan and Ghosal30], or between the spacecraft and sensitive payloads to attenuate micro-vibration transmission [Reference Poncet, Glynn, Heine, Cugny, Sodnik and Karafolas31], has been recognised as a highly effective approach [Reference Li, Wang, Yuan, Zheng, Wu, Sui and Zhong29, Reference Weiyong and Dongxu32].

This paper presents an experimental investigation into the disturbance noise behaviour originating from rotating reaction wheels closely replicating on-orbit configuration within the proto-flight model of the ALSAT 1B observation satellite (Fig. 2). The study aims to accurately measure disturbance levels transferred to the satellite structure, with a specific focus on assessing the impact of manufacturing imperfections and trends in rotational speed variation on its magnitude. To ensure compliance with balance requirements, static and dynamic balancing procedures were conducted on the three reaction wheels prior to conducting the disturbance noise test. Subsequently, each reaction wheel assembly (RWA) mounted on the spacecraft underwent individual tests to measure the disturbance level generated and transferred to the satellite structure. The analysis focuses on key factors, including the influence of manufacturing imperfections on disturbance levels and noise trend according to rotational speed variations. Note that the worst-case scenario of wheel rotation allocated for satellite stabilisation during imaging is highlighted in Fig. 3.

Figure 2. ALSAT 1B observation satellite.

Figure 3. Alsat-1B wheel rotational speed profile.