Multiobjective optimization of active suspension predictive control based on improved PSO algorithm
Qiang Zhao^{1} , Baoquan Zhu^{2}
^{1, 2}School of Traffic and Transportation, Northeast Forestry University, Harbin, China
^{1}Corresponding author
Journal of Vibroengineering, Vol. 21, Issue 5, 2019, p. 13881404.
https://doi.org/10.21595/jve.2018.19580
Received 28 December 2017; received in revised form 29 November 2018; accepted 11 December 2018; published 15 August 2019
JVE Conferences
The design and control for active suspension is of great significance for improving the vehicle performance, which requires considering simultaneously three indexes including ride comfort, packaging requirements and road adaptability. To find optimal suspension parameters and provide a better tradeoff among these three performances, this paper presents a novel multiobjective particle swarm optimization (MPSO) algorithm for the suspension design. The mathematical model of quartercar suspension is first established, and it integrates the hydraulic servo actuator model. Further a model predictive controller is designed for the suspension by using the control strategies of multistep forecast, rolling optimization and online correction of predictive control theory. To use vehicle body acceleration, tire deflection and suspension stroke to represent the above three performances respectively, a multiobjective optimization model is constructed to optimize the suspension stiffness and damping coefficients. The MPSO algorithm includes extra crossover operations, which are applied to find the Pareto optimal set. The rule to update the Pareto pool is that the newly selected solutions must have two better performances compared with at least one already existed in the Pareto pool, which ensures that each solution is nondominated within the Pareto set. Finally, numerical simulations on a vehicletype example are done under Blevel road surface excitation. Simulation results show that the optimized suspension can effectively reduce the vertical vibrations and improve the road adaptability. The model predictive controller also shows high robustness with vehicle under null load, half load and full load. Therefore, the proposed MPSO algorithm provides a new valuable reference for the multiobjective optimization of active suspension control.
 Model predictive control (MPC) for hydraulic active suspension.
 Novel multiobjective particle swarm optimization (MPSO) algorithm with crossover operations.
 Pareto optimization for suspension parameters using MPSO algorithm under MPC.
Keywords: hydraulic active suspension, multiobjective optimization, model predictive control (MPC), particle swarm optimization, crossover operations.
1. Introduction
Suspension system is one of the crucial parts relative to vehicle ride comfort and road adaptability. A welldesigned vehicle suspension is able to isolate the disturbance from road excitation, and meanwhile guarantees better driving smoothness and road adaptability. The traditional passive suspension with fixedstiffness spring and nonadjustable passive damper is difficult to satisfy the above requirements. The hydraulic active suspension introduces a valvecontrolled hydraulic servo cylinder as active actuator parallel to the passive damper and spring. This actuator can present realtime adjustable actuating force according to the vertical acceleration of vehicle body and therefore can greatly improve the performances.
In recent years the study of active suspension has gained the increasing attraction. Fateh and Alavi [1] applied the impedance control in an active vehicle suspension system operated by a hydraulic actuator. Witters and Swevers used a multilayer perception neural network to identify a continuously variable electrohydraulic semiactive damper for a passenger car and successfully described the complex nonlinear damper dynamics [2]. The skyhook control [3, 4] suits well to improve the comfort but is limited to improve road holding. The linear quadratic control [5] can provide both ride comfort and road holding improvements, but it requires the full state measurement or estimation. The optimal control [6] can provide good performance for the suspension, but it is a wellknown fact that the derivation of the control needs the vehicle dynamics to be accurately expressed as a linear model, whereas the vehicle dynamics generally includes nonlinearities and uncertainties. Chen and Huang [7] proposed an adaptive sliding control method for hydraulic active suspension and used function approximation technique to describe the actuator with timevarying uncertainties, further designed a sliding mode control law to make the actuator track the desired skyhook damping asymptotically. Wang and Song et al. [8] used cultural algorithm and niche algorithm to design a FuzzyPID controller for active suspension and optimized its fuzzy rules. Besides, backstepping control [9], optimal sliding mode control [10] and robust faulttolerant control were provided [11, 12].
The method of nonlinear model predictive control (MPC) [13] can be used in different levels of the process control structure and is also able to handle a wide variety of process control constraints systematically. The core idea of predictive control system is to forecast the future output variation trend using the past and the present information. By the method of limited receding horizon optimization, the deviation between the control amount and the target amount should be as small as possible, and the optimization of system control is realized. Literature [14] presented an embedded realtime implementation of the generalized predictive control (GPC) algorithm for automotive active suspension systems and tested it on a hardwareintheloop test bench. Literature [15] proposed a new model predictive control algorithm for semiactive air suspension with a multimode switchable damper. Up to now, the MPC has been used in the speed tracking control of autonomous ground vehicle [16, 17], lateral stability control and energy management of electric vehicle [1820]. The above researches all demonstrated the effectiveness of model predictive control, so, in this present study, a nonlinear model predictive controller is designed to improve the performance of hydraulic active suspension.
The design and control of active suspension also involves the key performance indices: ride quality, road adaptability and packaging, and these three terms are represented by sprungmass acceleration, tire deflection and suspension stroke (also known as the rattle space) respectively. The performance index of vehicle suspension needs to combine these three performance measures using a single objective optimization by assigning adjustable weights to the three performance terms or using the multiobjective optimization based on Pareto solutions. The latter can provide a Pareto set including many Pareto solutions, which ensures the designer to have more options depending on their requirements.
In the last decades, many evolutionary and swarm intelligence algorithms, such as Genetic Algorithm (GA), Ant Colony Optimization (ACO) and Particle Swarm Optimization (PSO) algorithm have been used in the multiobjective optimization domain. As for the suspension optimization without explicit mathematical model and analytic solutions, the above intelligent optimization algorithms show strong power and adaptability, especially the PSO algorithm for its simpler structure and higher computing efficiency. The PSO algorithm is put forward by Kennedy and Eberhart in 1995 [21], and it simulates the foodhunting behavior of bird swarm. The PSO algorithm and its variants have been successfully applied to solve many optimization problems such as intelligent feedback linearization control or fuzzy control of electrohydraulic active and Magnetorheological semiactive suspension systems [22, 23]. Besides some operations of Genetic Algorithm, especially its effective crossover operations, are easily combined with other algorithms [24] to provide us a thought to integrate it into the PSO algorithm to solve the multiobjective optimization problem of active suspension by carrying out further crossover operations among subswarms for different optimization objectives.
To solve the tradeoff of the above three performance indexes, this paper employs the Paretoset based multiobjective optimization to find the optimal suspension parameters which can ensure the suspension with the best performance under the model predictive controller. An improved PSO algorithm with crossover operations is used to solve the multiobjective optimization model, and the Pareto optima are finally obtained.
This paper is organized as follows. The system dynamics of a quartercar suspension including a hydraulic actuator are derived in Section 2. A model predictive controller is designed in Section 3 using the control strategies of multistep forecast, rolling optimization and online correction of the predictive control theory. In Section 4, the multiobjective optimization model for the suspension is established, and the improved PSO optimization algorithm is proposed to solve the model. In Section 5, the Simulink model of the hydraulic active suspension with the MPC controller is built, and the optimization program is completed and is run to obtain the Pareto optimal set. The control results of traditional passive mode, PID and the model predictive control are compared under the optimal suspension parameters. Simulations of a vehicle with the operating conditions of null load, half load and full load were done to test the robustness of the MPC controller. Finally, some conclusions are drawn in the last section.
2. Model for active suspension
In the active suspension system, an active actuator (hydraulic cylinder) is placed between the sprung mass and unsprung mass parallel to the other suspension elements. Even though this actuator malfunctions, the suspension system can work in the form of passive suspension. The model of quarter car active suspension is shown in Fig. 1. The system consists of two parts of the machinery and hydraulic system. The car body acceleration sensor gets the signal of the car body acceleration and feedbacks it to the controller. The controller figures out the control electric current and sends it to the servo valve. Then the flow of servo valve and the output force of the hydraulic cylinder will be regulated in real time. Therefore, the purpose of attenuating the vehicle body vibration and tire dynamic load can be achieved.
Fig. 1. Model of quarter car active suspension
2.1. Dynamics model of suspension
Vehicle suspension system is a very complicated nonlinear system. Based on the modeling process of active suspension, in order to simplify the control model and to extrude the major aspects of research problems, the car body is regarded as a rigid body, and its related parts are taken as linear elements. So, a two DOF model for active suspension is established (Fig. 1). Considering that the tire model is the main factor influencing the optimization result, herein the Ftire (Flexible ring tire model) is selected since it is generally recognized as the preferred tire model for vehicle ride comfort, durability and handling simulation. As shown in Fig. 2(a), the Ftire model includes ${C}_{rad}$, ${C}_{bend}$, ${C}_{belt}$, and ${C}_{tang}$ four parts to describe the random bending and to transfer the nonlinear stiffness and damping in rotation, longitudinal, lateral direction. In the model, the ride comfort analysis only involves the ${C}_{rad}$ part, which includes springfriction, Maxwell, damper and spring totally four elements to describe the tire radial stiffness with small hysteresis. Herein using the ${C}_{rad}$ and the tire experiment loading curve (Fig. 2(b)) to determine the equivalent stiffness value ${k}_{1}$ of the tire. Based on Newton’s Second Law, the motion equations of the suspension are derived as:
where ${m}_{1}$ and ${m}_{2}$ are the unsprung and the sprung masses, respectively; ${c}_{2}$ is the average damping coefficient of the dampers; ${k}_{1}$ is the tire stiffness; ${k}_{2}$ is the stiffness of the spring connecting the sprung and unsprung masses; ${z}_{2}$ and ${z}_{1}$ are the displacements of the sprung and unsprung masses, respectively, and ${z}_{0}$ is the variation in height of road surface. $F$ is the hydraulic actuation force.
Fig. 2. Ftire model
a) Mechanical model
b) Radial characteristic
2.2. Dynamics model of hydraulic actuator
The hydraulic actuator adopts the form of servo valve to control the hydraulic cylinder, the servo valve receives the control electric current and further regulates the hydraulic actuation force, which is a typical servo force system as shown in Fig. 3.
Fig. 3. Model of valve controlled hydraulic cylinder
The flow continuity equation of hydraulic cylinder is derived as:
where ${p}_{s}$ and ${p}_{L}$ are the supply pressure and the load pressure, respectively; ${\beta}_{e}$ is the bulk modulus; ${C}_{tc}$ and ${C}_{ta}$ are the total leakage coefficient and system leakage coefficient, respectively; ${A}_{1}$ and ${V}_{1}$ are the cross section area and volume of the cylinder, respectively; $\eta $ is the area ratio of two chambers in the cylinder. ${x}_{p}$ is the displacement of the hydraulic cylinder piston rod.
The output force equation of hydraulic cylinder piston rod is derived as:
where ${B}_{e}$ is the viscosity damping coefficient; $k$ is the stiffness coefficient of load.
The linear flow equation of servo valve is given as:
where ${K}_{q}$ and ${K}_{c}$ are the servo value flow gain and flowpressure coefficient, respectively; ${x}_{v}$ is the displacement of the valve spool.
Fig. 4 presents the block diagram of hydraulic actuator according to Eqs. (2), (3) and (4). In this figure, the transfer function of the input current to the valve spool displacement can be simplified as a second order oscillation element:
where ${\omega}_{sv}$ is natural frequency of the servo valve, ${\delta}_{sv}$ is its damping coefficient, and ${K}_{sv}$ is its gain. The transfer function of the servo amplifier can be simplified as a proportion element: $I$/$U={K}_{a}$, because its frequency band is much higher than the hydraulic natural frequency.
Fig. 4. Block diagram of electrohydraulic actuator
2.3. Integrated model of suspension system
The dynamics models of suspension and hydraulic actuator are integrated to form the whole system model. First, the state vector is selected as $X={[{z}_{1},\mathrm{}{z}_{2},\mathrm{}{\dot{z}}_{1},\mathrm{}{\dot{z}}_{2},\mathrm{}{p}_{l},\mathrm{}{x}_{p},\mathrm{}{\dot{x}}_{p}]}^{T}$ then based on Eqs. (1) to (4), the statespace equations are obtained as:
where:
$D=\left[\begin{array}{lll}0& 0& 0\\ 0& 0& 0\\ 0& 0& {k}_{1}\end{array}\right],U=\left[\begin{array}{l}{x}_{v}\\ {P}_{S}\\ {z}_{0}\end{array}\right],Y=\left[\begin{array}{c}{\ddot{z}}_{2}\\ {z}_{1}{z}_{2}\\ {k}_{1}({z}_{0}{z}_{1})\end{array}\right].$
The body acceleration, suspension dynamic deflection and tire dynamic load are selected as the output variables. So, in the output vector of $Y$, ${\ddot{z}}_{2}$ is the body acceleration, ${z}_{1}{z}_{2}$ is the suspension dynamic deflection, and ${k}_{1}$(${z}_{0}{z}_{1}$) is the tire dynamic load.
3. Model predictive control for active suspension system
The core idea of model predictive control system is to forecast the future output variation trend using the past and the present information. By the method of limited receding horizon optimization, the deviation between the control amount and the target amount should be as small as possible, and the optimization of system control is realized [13]. The MPC controller for a hydraulic active suspension mainly includes four parts, namely the prediction model, receding horizon optimization, online correction and reference trajectory. The structure diagram of the suspension predictive control system is shown in Fig. 5.
Fig. 5. Structure diagram of suspension predictive control
3.1. Design of reference trajectory
In the running process of model predictive control, the output will be along a predefined curve gradually to approximate the designed expectation, and this curve is the reference trajectory of predictive control. The suspension control belongs to an optimal regulator problem, so the prediction acceleration is defined as zero. Then the system output gradually approaches to zero.
3.2. Design of prediction model
The function of the prediction model is based on the history information of the controlled suspension: $\left\{u\right(kj),y(kj\left)\rightj\ge 1\}$ and future input: $\left\{u\right(k+j1\left)\rightj=1,\cdots ,m\}$ to forecast the future output $\left\{y\right(k+j\left)\rightj=1,\cdots ,p\}$. The predictive control model is discrete, because it uses the receding horizon optimization control. Combining the characteristics of predictive control theory and the real driving conditions, the difference equation can be derived from Eq. (5) [13]:
where ${y}_{u}\left(k\right)=\left[{k}_{1}\right({z}_{0}{z}_{1}){]}^{T}$ is the unmeasured output of system, ${y}_{m}\left(k\right)=[\begin{array}{ll}{\ddot{z}}_{2}& {z}_{1}{z}_{2}\end{array}{]}^{T}$ is the measured output, $u\left(k\right)=[{x}_{v}{]}^{T}$ is the manipulated variable, $v\left(k\right)=[{p}_{s}{]}^{T}$ is the measured disturbance, $d\left(k\right)=[{z}_{0}{]}^{T}$ is the unmeasured disturbance.
3.3. Receding horizon optimization
The purposes of receding horizon optimization is to determine the future manipulated variable through minimizing the performance index, and this index can be described as:
where ${Q}_{y}=\mathrm{d}\mathrm{i}\mathrm{a}\mathrm{g}\left(\begin{array}{llll}{q}_{1}& {q}_{2}& \cdots & {q}_{p}\end{array}\right)$ and ${R}_{u}=\mathrm{d}\mathrm{i}\mathrm{a}\mathrm{g}\left(\begin{array}{llll}{r}_{1}& {r}_{2}& \cdots & {r}_{m}\end{array}\right)$, respectively. They are weighting matrices of output variables and manipulated variables. The optimization objective only cares about the dynamic performance of system in the prediction horizon, and it applies the first of the optimal control sequence to the controlled suspension. At time $k$, the manipulated variable increment is defined as $\mathrm{\Delta}u\left(k\right)={d}^{T}(W{Y}_{0})$, in which the variable $d$ may work out ahead of time in an offline way. The new manipulated variable sequence will be obtained by solving the optimization problem after getting a new measurement value in the next sampling moment, and the receding horizon optimization can be realized. The conditions of receding horizon optimization are introduced as below [14]: (1) The mechanical structure of suspension limits its dynamic deflection: $\left{z}_{1}{z}_{2}\right\le {l}_{\mathrm{m}\mathrm{a}\mathrm{x}}$; (2) To ensure the tire’s grounding performance, the dynamic load should be less than the static load: $\left{k}_{1}({z}_{0}{z}_{1})\right\le mg$; (3) The engine power restricts the hydraulic actuating force: $\leftF\right\le {F}_{\mathrm{m}\mathrm{a}\mathrm{x}}$.
3.4. Online correction algorithm
After applying the manipulated variable at moment $k$, the actual output $y$($k+1$) is not equal to the prediction output of moment $k+$1 because of the uncertainty of the suspension parameters and environment. The predictive error is then represented as [13]:
This error is weighted and then the prediction output is corrected:
where ${\widehat{Y}}_{p}=\left[\stackrel{~}{y}\right(k+1),\stackrel{~}{y}(k+2),\cdots ,\stackrel{~}{y}(k+p){]}^{T}$ is the predictive output after the error correction at the time $t=(k+1)T$, $h=[{h}_{1},{h}_{2},\cdots ,{h}_{p}{]}^{T}$ is the error correction vector, and ${h}_{1}=$ 1.
The predictive output ${\widehat{Y}}_{p}$ is corrected as the predictive initial value in the next moment. The output of the future moment $t=(k+2)T,\cdots ,(k+p+1)T$ is predicted using the predictive initial value at moment $t=(k+1)T$:
Then the predictive initial value at the next sample moment is expressed as:
The system is transformed into a closeloop negative feedback system because of the introduction of the correction, which plays an important role in improving the system performance.
4. Multiobjective optimization for suspension parameters
4.1. Overview of particle swarm optimization
The PSO algorithm first randomly initializes a swarm of particles. Each particle is represented as ${\mathbf{x}}_{1}=({x}_{1},{x}_{i,2},\dots ,{x}_{i.n})$, $i=\mathrm{1,2},\dots ,{n}_{0}$, where ${n}_{0}$ is the swarm size, and $n$ is the total dimension number of each particle. Each particle adjusts its trajectory towards its own previous best position $pbes{t}_{i}$, and the previous global best position $gbest$ attained by the whole swarm. In the $k$th iteration, the $i$th particle with respect to the $j$th dimension is updated by:
where ${x}_{i,j}^{\left(k\right)}$ and ${v}_{i,j}^{\left(k\right)}$ are the current position and velocity, respectively. ${c}_{1}$and ${c}_{2}$ are both acceleration constants and generally ${c}_{1}={c}_{2}=$ 2, and ${r}_{1}$ and ${r}_{2}$ are both random numbers within the interval of [0, 1].
The procedure of the PSO algorithm for optimization can be described as follows:
(1) Initializing: Generate ${n}_{0}$ particles with random positions ${\mathbf{x}}_{1},{\mathbf{x}}_{2},...,{\mathbf{x}}_{{n}_{0}}$, and velocities ${\mathbf{v}}_{1},{\mathbf{v}}_{2},...,{\mathbf{v}}_{{n}_{0}}$.
(2) Evaluate the fitness of each particle based on the objective function of the problem.
(3) Individual and global best positions updating: If $f\left(pbes{t}_{i}\right)>f\left({\mathbf{x}}_{i}\right)$, then let $pbes{t}_{i}={\mathbf{x}}_{i}^{}$, and search for the minimum value ${f}_{\mathrm{m}\mathrm{i}\mathrm{n}}$ among $f\left(pbes{t}_{i}\right)$, If $f\left(gbest\right)>{f}_{\mathrm{m}\mathrm{i}\mathrm{n}}$, let $gbest={\mathbf{x}}_{min}$, ${\mathbf{x}}_{\mathrm{m}\mathrm{i}\mathrm{n}}$ is the particle associated with ${f}_{\mathrm{m}\mathrm{i}\mathrm{n}}$.
(4) Velocity updating: update the $i$th particle velocity using the Eq. (14).
(5) Position updating: update the $i$th particle position using Eq. (15).
(6) Repeat steps (2) to (5) until the given maximum number of iterations is achieved.
4.2. Multiobjective optimization based on PSO algorithm with crossover operations
The aim of this paper is to find the socalled Pareto optimum (or nondominated solution). Its definition is as follows:
Definition. A solution ${z}^{0}\in Z$ is the Pareto optimum for the minimum problem if and only if no other solution $z\in Z$ exists to satisfy [25]:
where $Z$ is denoted as the feasible region in the criterion space as:
and $\mathbf{S}$ is denoted as the feasible region in the decision space.
To find the Pareto solutions, a new multiobjective PSO algorithm with crossover operations are used as follows. First, three subswarms of particles are randomly initialized, and these subswarm moves with ${f}_{i}\left(x\right)$ ($i=\mathrm{}$1, 2, 3) as its single optimization objective using the above procedure in Section 4.1, respectively. So, after a certain number of iterations, these three subswarms revealed some better solutions for each optimization objective respectively. Then the algorithm randomly selects two particles from any two subswarms as parent particles and takes the crossover operations between them as follows:
where $\alpha $ is a random number extracted from region (0, 1). ${\mathbf{x}}_{i}$ and ${\mathbf{x}}_{j}$ are parent particles. ${\mathbf{x}\mathrm{\text{'}}}_{i}$ and ${\mathbf{x}\mathrm{\text{'}}}_{j}$ are new offspring’s created by crossover operations.
The above crossover operations enable to produce nondominated Pareto solutions. An additional computing memory called as the Pareto pool is allocated, and it is used to accept and store the Pareto solutions. It is noted that any two offspring’s from crossover operations must be made with mutual comparison before their recruitment into the Pareto pool, and only the dominating one is directly selected into the Pareto pool. If the two offspring’s are nondominated by each other, one will be selected with the probability into the Pareto set. Further the Pareto pool will also executes selfexamination and updating operation in each iteration to remove the newly dominated ones.
4.3. Suspension parameters optimization with MPSO algorithm
For the suspension parameters optimization problem, the decision vector is selected as $x=\left\{{x}_{i}\right\}=\{{k}_{2},{c}_{2}\}$. Considering that there are three performance requirements for the suspension: body acceleration ${\ddot{z}}_{2}$, suspension dynamic deflection ${z}_{1}{z}_{2}$ and tire dynamic load ${k}_{1}$(${z}_{0}{z}_{1}$), the objective function set is defined as:
with three constraints: (1) suspension dynamic deflection $\left{z}_{1}{z}_{2}\right\le {l}_{\mathrm{m}\mathrm{a}\mathrm{x}}$; (2) tire dynamic load $\left{k}_{1}({z}_{0}{z}_{1})\right\le mg$; (3) hydraulic actuating force $\leftF\right\le {F}_{\mathrm{m}\mathrm{a}\mathrm{x}}$. Additionally, decision variables also have their range limits as ${x}_{i,\mathrm{m}\mathrm{i}\mathrm{n}}\le {x}_{i}\le {x}_{i,\mathrm{m}\mathrm{a}\mathrm{x}}$, $i=$ 1, 2.
A multiobjective optimization is used to determine the decision vector in order to present the Pareto solutions with the above three performance requirements as the optimization objectives. Based on the above ideas in Section 4.2, the procedure of the multiobjective optimization algorithm is shown in Table 1.
The detailed flowchart of the above optimization algorithm is shown in Fig. 6, whose main program employs the Matlab language (m file) and calls the Simulink model of active suspension controlled by the MPC algorithm.
5. Numerical test
The numerical simulation is completed with the main program written in the Maltab M language, which employs the above optimization algorithm to search the Pareto set and calls the suspension model (with MPC) when evaluating the fitness of each solution. The suspension model with MPC controller is established in Matlab/Simulink as shown in Fig. 7.
The prediction horizon, control horizon and sample time are defined as $P=$ 20, $C=$ 10, and $T=$ 0.002 s. After selecting the constraint limits of input and output, the weighting matrices of manipulated variable and output variable are set respectively. In the Simulink model, the signal type, initial value, simulation time, and so on are selected for the point and disturbance. The simulation parameters setting, referring to the offroad heavy vehicle parameters in literature [26], is shown in Table 2.
Table 1. Multiobjective particle swarm optimization algorithm for active suspension
Begin:
Set swarm parameters, and set suspension and controller parameters
Initialize three subswarms
Repeat //outer iteration
For
$i=$ 1 to 3 //corresponding to 3 objectives
Repeat //inner iteration
Subswarm moves with as its objective
Until the expected number of iterations achieved
End
Repeat
Crossover operation between the three subswarms
Select a better offspring into the Pareto pool
Select a better offspring into new subswarms
Until the expected number of iterations achieved
Replace the old subswarms with new subswarms
Selfexamine and update the Pareto pool
Until the termination condition achieved //outer iteration
Output the Pareto set
End

Fig. 6. Flowchart of improved PSO algorithm to optimize active suspension with MPC
Fig. 7. Simulink simulation model
Table 2. Simulation parameters
Parameter names

Parameter values

Parameter names

Parameter values

Unsprung mass ${m}_{1}$ / kg

325

Servo value flowpressure coefficient ${K}_{c}$ / m^{5}·N^{1}·s^{1}

2.61×10^{12}

Sprung mass ${m}_{2}$ / kg

1925

Supply pressure ${P}_{s}$ / Pa

25×10^{6}

Tire stiffness coefficient ${k}_{1}$ / N·m^{1}

2.1×10^{5}

Load pressure ${P}_{L}$ / Pa

16×10^{6}

Servo value natural frequency ${\omega}_{sv}$ / rad·s^{1}

800

Cross section area ${A}_{1}$ / m^{2}

31.17×10^{4}

Damping coefficient ${\delta}_{sv}$

0.6

Cross section volume ${V}_{1}$ / m^{3}

3.12×10^{4}

Servo value gain
${K}_{sv}$ / M^{3}·S^{1}·A^{1}

9.82×10^{2}

Total leakage coefficient
${C}_{tc}$ / m^{5}·N^{1}·s^{1}

7.39×10^{13}

Viscous damping coefficient ${B}_{e}$ / N·S·m^{1}

4×10^{5}

System leakage coefficient
${C}_{ta}$ / m^{5}·N^{1}·s^{1}

0.01×10^{13}

Load stiffness coefficient $k$ / N·m^{1}

8×10^{4}

Bulk modulus ${\beta}_{e}$ / Pa

7×10^{8}

Servo value flow gain ${K}_{q}$

3.2

Area ratio $\eta $

0.68

Assume the vehicle speed $v=$ 20 m/s, and the road input is a Blevel road surface, which is realized with the white noise through a forming filter. the differential of Blevel road surface is expressed as ${\dot{x}}_{r}=2\pi {f}_{0}{x}_{r}\left(t\right)+2\pi \sqrt{{G}_{0}v}\omega \left(t\right)\text{,}$ where, ${x}_{r}\left(t\right)$is the road surface vertical displacement, ${f}_{0}$ is the lower cutoff frequency of road input, ${f}_{0}=$ 0.01 m^{1}, ${G}_{0}$ is the road roughness coefficient, $\omega \left(t\right)$ is the bandlimited white noise.
The parameters of the MPSO algorithm are set as follows. ${n}_{0}=$ 20, $n=$ 2, the iteration number of outer iteration is 100, and the inner iteration number is 100. the size of Pareto pool is set as 10. After the simulation is completed, the resultant Pareto set is obtained as shown in Table 3.
The Pareto frontier is shown in Fig. 8 which describes the Pareto solutions distribution in the 2D solution space. the 2D relations of any two of the three objective functions ${f}_{1}\left(x\right)$, ${f}_{2}\left(x\right)$ and ${f}_{3}\left(x\right)$ are shown in Fig. 9.
Table 3. Pareto set and objective functions
No.

Pareto solutions

Objective function values


${x}_{1}$

${x}_{2}$

${f}_{1}\left(x\right)$

${f}_{2}\left(x\right)$

${f}_{3}\left(x\right)$


1

1.4483493899e+004

2.0344337400e+003

7.3939789709e002

3.0195903020e003

1.8679178782e+002

2

1.1597931546e+004

2.2268045635e+003

7.3986498861e002

3.0234406867e003

1.8668873656e+002

3

1.1582372225e+004

2.2278418516e+003

7.3836048522e002

3.0275542613e003

1.8669886603e+002

4

1.1323563038e+004

2.2450957974e+003

7.4025973644e002

3.0224399708e003

1.8644974937e+002

5

1.3484795845e+004

2.1010136103e+003

7.4191307109e002

3.0156942092e003

1.8650566772e+002

6

2.1022957177e+004

1.5984695214e+003

7.4169155349e002

3.0018611568e003

1.8717702837e+002

7

1.2145038674e+004

2.1903307550e+003

7.3884619974e002

3.0267336711e003

1.8655649147e+002

8

1.3866006410e+004

2.0755995726e+003

7.3784280486e002

3.0244601120e003

1.8673275366e+002

9

1.3047742023e+004

2.1301505317e+003

7.4146517631e002

3.0149096846e003

1.8686995429e+002

10

1.3255734738e+004

2.1162843507e+003

7.3956382200e002

3.0212819006e003

1.8659202173e+002

Fig. 8. Pareto frontier
Fig. 9. Objective function values of Pareto set
a)${f}_{1}\left(x\right){f}_{2}\left(x\right)$ comparison
b)${f}_{1}\left(x\right){f}_{3}\left(x\right)$ comparison
Based on the application conditions and other requirement of suspension, the second solution of the Pareto set is finally selected as the ultimate solution. the performance of the suspension with these optimized parameters is further analyzed. Based on the Simulink model in Fig. 7, the body acceleration, suspension dynamic deflection and tire dynamic load of the suspension under null load, half load and full load conditions are simulated to verify the optimized parameters. the passive mode (without control) and the PID control of the suspension are also completed as the comparison to testify the performance of the MPC control.
(1) With the operating conditions of null load, the simulation results of vehicle body acceleration, suspension dynamic deflection and tire dynamic load are shown in Fig. 10.
Fig. 10. Simulation results under null load
a) Vehicle body acceleration
b) Suspension dynamic deflection
c) Tire dynamic load
According to Fig. 10, the simulation comparison results of suspension performance index can be obtained under the operating conditions of null load. the results are shown in Table 4, the values listed in this table are all maxima.
Table 4. Suspension performance comparison
Performance index

Acceleration (m/s^{2})

Dynamic deflection (m)

Dynamic load (N)

Passive

0.62

0.019

866

PID

0.26

0.018

815

MPC

0.11

0.025

629

MPC compared with passive

82 %

–32 %

27 %

MPC compared with PID

58 %

–39 %

23 %

(2) With the operating conditions of half load, the simulation results of vehicle body acceleration, suspension dynamic deflection and tire dynamic load are shown in Fig. 11.
According to Fig. 11, the simulation comparison results of suspension performance index can be obtained under the operating conditions of half load. the results are shown in Table 5, and the values listed in this table are the maxima.
(3) With the operating conditions of full load, the simulation results of vehicle body acceleration, suspension dynamic deflection and tire dynamic load are shown in Fig. 12.
According to the Fig. 12, the simulation comparison results of suspension performance index can be gotten under the operating conditions of full load. the results are shown in Table 6, the values listed in this table are all maxima.
Fig. 11. Simulation results under half load
a) Vehicle body acceleration
b) Suspension dynamic deflection
c) Tire dynamic load
Table 5. Suspension performance comparison
Performance index

Acceleration (m/s^{2})

Dynamic deflection (m)

Dynamic load (N)

Passive

0.49

0.029

1065

PID

0.21

0.020

861

MPC

0.11

0.025

640

MPC compared to passive

78 %

14 %

40 %

MPC compared to PID

48 %

–25 %

26 %

Table 6. Suspension performance comparison
Performance index

Acceleration (m/s^{2})

Dynamic deflection (m)

Dynamic load (N)

Passive

0.40

0.032

1142

PID

0.18

0.021

900

MPC

0.11

0.025

670

MPC compared with passive

72 %

22 %

41 %

MPC compared with PID

39 %

–19 %

26 %

From the Tables 46 with the operating conditions of null load, half load and full load, the effect of the optimal matching of the main parameters of the tire and suspension on the ride comfort under the model predictive control can be summarized as follows: There are 39 % to 82 % and 23 % to 41 % reductions in the body acceleration and the tire dynamic load compared with those of the passive suspension and the active suspension with PID controller. the suspension dynamic deflection had no notable deterioration compared with that of the passive suspension, and the maximal deflection is still within the permitted range of suspension stroke. The above results mean that the optimized hydraulic active suspension system with a model predictive controller can effectively reduce the vibrations caused by road surface excitation, apparently improved the ride smoothness and road adaptability.
Fig. 12. Simulation results full half load
a) Vehicle body acceleration
b) Suspension dynamic deflection
c) Tire dynamic load
6. Conclusions
Based on the active suspension with hydraulic servo actuator, a model predictive controller was designed. the simulation results show that vehicle body acceleration and tire dynamic load were reduced 39 % to 82 % and 23 % to 41 %, and the suspension dynamic deflection had no notable variation as compared with that of the passive suspension with the maximum value of 32 %, with the operating conditions of null load, half load and full load, the optimized active suspension with a model predictive controller can well meet the needs of ride smoothness.
This paper realizes not only the optimal controller by using the MPC but also the optimal suspension parameters by using multiobjective particle swarm optimization algorithm. if the weighted coefficient of input/output, prediction horizon and control horizon of the MPC are optimized, the predictive control effects will be improved in a further study.
Acknowledgements
The research work is supported by the Heilongjiang Province Science Foundation (Grant No. LC2015019).
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Cited By
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Jimoh O. Pedro, Sakhile M.S. Nhlapo, Lindokuhle J. Mpanza

2020
