2.1. Function analysis

At first, this paper declares that the ECM is just a unified name of the mechanism with the two characteristics mentioned in Section 1, not a new mechanism. The main function of the ECM is to respond to terrain changes, and this function is named terrain adaptability in this paper. Compared with terrain adaptability (visualizes the adaptations of organisms with topographic models) proposed by Wright [Reference Arnold, Pfrender and Jones40], terrain adaptability in this paper is mainly used to evaluate the adaptability of the mechanism to the terrain surface.

The terrain adaptability can be divided into three aspects. The first, adaptability, is the ability of ECM to maintain a stable posture at that terrain point. The more adaptable the ECM is, the wider the terrain range the ECM can match, and the larger the volume of the ECM’s workspace is required. Second, the kinematic ability is the kinematical performance of the ECM when the mechanism follows the terrain change. When the mechanism has the stronger kinematic ability, it matches the terrain changes more quickly and efficiently. Third, stability is the ability of the ECM to resist overturning at the terrain point. The stronger the stability of the ECM, the greater the external disturbance it can resist in that terrain point, and the higher the reliability and safety of the system.

In summary, the general functional requirements of the ECM are strong adaptability, fast and efficient kinematic ability, and high stability.

2.2. Task analysis

According to different application scenarios, the functional tasks of the ECM are different. For the vehicle’s suspension and shock absorption system, the ECM is required to have a light impact on the vehicle body when the vehicle is in driving. For the adaptive landing gear of a vertical taking-off and landing aircraft, the ECM needs to adapt the terrain area as large as possible. For the construction machinery, the ECM needs a strong stability during the operation. Obviously, different functional tasks have different requirements for the ECM’s performance. However, these performance requirements correspond exactly to the three performance indexes in the terrain adaptability. Therefore, this paper uses these three performance indexes to evaluate the functional tasks of the ECM.

Before evaluating the performance of the ECM, the ECM’s task object needs to be clarified first. Considering that the terrain is the main contact object of the ECM, this paper takes the terrain as the description object of the functional task. The digital elevation map (DEM) is widely used to descript the terrain surface. The DEM model is a digital simulation of ground terrain through limited terrain elevation data. The DEM is expressed in the form of a set of ordered numerical matrix and is widely used in the hydrographic surveying and mapping, the meteorological geology, the engineering construction, etc. [Reference Wolock and Price41]. Therefore, the DEM model is adopted as the digital expression of the terrain in this paper.

Taking the DEM model as the functional task object, the ECM’s task scope could be further determined. The classical performance analysis of a mechanism takes the workspace of the mechanism as the task scope, and the comprehensive performance index of the mechanism is the integral result of the local performance index in the whole workspace. However, all the ECM’s working points on the specific terrain surface are nonuniformly distributed in the ECM’s classical workspace (the workspace solved by classical method [Reference Ceccarelli8, Reference Gosselin14]). So, the classical performance analysis method is unsuitable for specific functional tasks. Therefore, this paper analyzes the ECM’s performance based on the parametric terrain surface and uses its result as the quantitative index of the functional task.

2.3. Parametric conversion of the functional task

After the functional task analysis of the ECM, the parametric conversion of the functional task is transformed into the mapping relationship from the DEM model to the comprehensive performance index of the ECM. This section will derive the mapping relationship in detail.

The first step is to construct the terrain surface. The DEM model is obtained from aircrafts or satellites by scanning the ground. The DEM model is expressed in a matrix. The rows and columns of the matrix correspond to the latitude and longitude coordinates of the terrain point, while the value in the matrix is the height value. However, the matrix expression of the DEM has two limitations.

Limitation 1: The matrix is a set of finite values, and the height data are discretized. To analyze and solve the contact points of the ECM at the terrain point, it is necessary to make the discrete height data continuous. In this paper, the spline surface fitting method is used to realize the continuity of discrete points. Fifteen terrain points adjacent to the target terrain point are used to construct the fitting surface. The parameterized expression of the fitting surface S(u,v) at the terrain point is shown in Eq. (1).

(1) \begin{align} S\!\left(u,v\right) & =\sum\nolimits_{i=0}^{3}\sum\nolimits_{j=0}^{3}N_{i,p}\!\left(u\right)N_{j,p}\!\left(v\right)P_{i,j}\nonumber\\ N_{i,0}\!\left(u\right) & =\left\{\begin{array}{l} 1\!\left(\text{if }u_{i}\leq u\lt u_{i+1}\right)\\ 0\!\left(\text{otherwise}\right) \end{array}\right.\\ N_{i,p}\!\left(u\right) & =\frac{u-u_{i}}{u_{i+p}-u_{i}}N_{i,p-1}\!\left(u\right)+\frac{u_{i+p+1}-u}{u_{i+p+1}-u_{i+1}}N_{i+1,p-1}\!\left(u\right)\nonumber \end{align}

where P _i,j is the height at the ith and jth terrain point, N is the spline coefficient, and p = 3 is the order of the base function.

Limitation 2: The distance between the two adjacent terrain points is too far, and its order of magnitude (OFM) is decameter level. The OFM of the distance is higher than that of the mechanism dimension. It means that the performance solved from the DEM model may not completely equal to the actual situation. However, in the statistics, the calculation result can present the average value of the performance index in the adjacent areas. Therefore, this paper regards the performance calculated at the terrain point as the actual performance.

The second step is to solve the kinematic model of the ECM at the terrain point. The classical mechanism kinematics is the mapping function between the input variables (or driving variables) and the output variables of the mechanism. The terrain data of the ECM at the terrain point are neither the input variable nor the output variable of the mechanism. So, it is necessary to convert the terrain data into the kinematical variables of the mechanism first. According to the literature [Reference Tang, Zhang and Tian33, Reference Tang, Zhang and Tian34], the terrain data can be converted into the kinematical parameters of the moving platform through the VEPM model. The detailed conversion will be introduced in Section 3. Then, according to the kinematical model of the VEPM, the kinematical parameters of the ECM can be solved.

The third step is to solve the comprehensive performance index of the ECM. Referring to the classical comprehensive performance solution, the comprehensive performance index of the ECM can also be decomposed into two processes. The first process is to solve the local performance index of the ECM at the terrain point and to construct the local performance map based on the terrain map. The second process is the integral operation of the local performance map to solve the comprehensive performance index S _g of the ECM, as shown in Eq. (2).

(2) \begin{equation} S_{g}={\int_{T}S_{l}}\bigg/{V_{T}} \end{equation}

where T is the target terrain map, V _T is the workspace volume, S _l is the local performance index, and S _T is the workspace volume with the target terrain map.

The conversion process of the digital quantification of the functional task is shown in Fig. 1. First, according to the DEM model, the parametric surface at the terrain point is solved. Then, combining the VEPM model and the kinematical model of the original mechanism, the kinematical parameters of the ECM at the terrain points are solved. Finally, the comprehensive performance of the ECM with the functional task can be obtained by solving the local performance map of the ECM.

Figure 1.

The flowchart of the conversion process.

3.1. Virtual equivalent parallel mechanism model

According to the research on the VEPM in the literatures [Reference Tang, Zhang and Tian33, Reference Tang, Zhang and Tian34], the construction of VEPM model mainly includes three processes of the decomposition, construction, and combination. The main elements of the VEPM model include the original mechanism, the virtual restraint chain (VRC), the virtual kinematical chain (VKC), and the virtual moving platform (VMP). By comparing the conclusions of the two references [Reference Tang, Zhang and Tian33, Reference Tang, Zhang and Tian34], it can be found that the VMP’s structure varies according to the number of chains in the original mechanism, while the VRC’s and VKC’s structure are the same. In the existing industrial applications, three-leg (aircraft landing gear, etc.) and four-leg (car suspension, quadruped robot, etc.) layouts are the most widely used layout in the ECMs. Therefore, this paper will focus on the analysis of the three-leg and four-leg ECMs.

3.1.1. Construction of the VEPM

The construction of virtual components in the VEPM model mainly includes the construction of VMP, VRC, and VKC.

The virtual moving platform (VMP) is constructed according to the relative potion of the touch points. The number of the touch points depends on the number of chains in the original mechanism. The three-leg ECM has three touch points, and a plane passing through those three touch points can be used as the datum plane of the VMP. The four-leg ECM has four contact points, and a spatial tetrahedron can be used as the VMP. The parallelogram plane formed by the midpoints of the adjacent contact points is used as the datum plane of the main-VMP. Two sub-VMPs are constructed based on the diagonals of the spatial tetrahedron. The construction process of the VPMs is shown in Fig. 2.

Figure 2.

The construction of VPMs.

The VRC is set up to restrain the motion of the VMP. The datum plane of the VMP (or main-VMP) has two rotation DOFs and one translational DOF referring to the base coordinate system. Therefore, a universal (U) pair and a prismatic (P) pair are used as the VRC of VEPM, as shown in Fig. 3.

Figure 3.

The construction of VEPMs.

The VKC is constructed to connect the original kinematic chain of the ECM and the VMP. Then, the VKC must have a restricted force perpendicular to the datum plane of the VMP. In this paper, a spherical (S) pair and 2 P pairs are used as the VKC of the VEPM, as shown in Fig. 3.

Finally, the VEPM is obtained by combining the constructed virtual components with the original mechanism. The VRC connects the center of the ECM base and the center of the VMP. The VKC is connected with kinematic chain of the ECM and the VMP at the contact point.

3.1.2. Kinematics of the VEPM

The kinematical model of the VEPM is the relationship between the driving variables of the ECM and the kinematic variables of the VMP. The kinematical model can be derived through the position of the touch points.

First, according to the kinematical model of the original mechanism, the relationship between the driving variables and the position of the touch points is obtained, as shown in Eq. (3).

(3) \begin{equation} P_{i}=F_{f}\!\left(q_{i}\right) \end{equation}

where P _i and q _i are the touch point coordinates and the driving variable of the ith kinematic chain, and F _f is the forward kinematical model.

Then, based on the position of the touch points, the parametric equation of the datum plane of the VMP can be solved. Equation (4) shows the equations for the 3-legged mechanism, while Eq. (5) for the 4-legged mechanism.

(4) \begin{align} n_{z}\cdot P+d & = 0\nonumber\\ n_{z} & =R_{XY}\cdot \left\{\begin{array}{l@{\quad}l@{\quad}l} 0 & 0 & 1 \end{array}\right\}^{T}=\left\{\begin{array}{l@{\quad}l@{\quad}l} n_{z,x} & n_{z,y} & n_{z,z} \end{array}\right\}^{T}=\frac{\left(P_{2}-P_{1}\right)\times \left(P_{3}-P_{1}\right)}{norm\!\left(\left(P_{2}-P_{1}\right)\times \left(P_{3}-P_{1}\right)\right)} \end{align}

where n _z is the unit normal vector of the datum plane, and d is a constant d = h _c ·n _z .

(5) \begin{align} n_{z}\cdot P+d+\frac{1}{2}d_{m} & =0\nonumber\\n_{z}\cdot P+d-\frac{1}{2}d_{m} & =0\nonumber\\n_{z} & =R_{XY}\cdot \left\{\begin{array}{l@{\quad}l@{\quad}l} 0 & 0 & 1 \end{array}\right\}^{T}=\left\{\begin{array}{l@{\quad}l@{\quad}l} n_{z,x} & n_{z,y} & n_{z,z} \end{array}\right\}^{T}=\frac{\left(P_{3}-P_{1}\right)\times \left(P_{4}-P_{2}\right)}{norm\!\left(\left(P_{3}-P_{1}\right)\times \left(P_{4}-P_{2}\right)\right)} \end{align}

where d _m is the distance between the two sub-MPs.

Combining the Euler angle and the rotation matrix, the rotation variables θ _x and θ _y of the VMP can be calculated, as shown in Eq. (5).

(6) \begin{align} \theta _{x} & =\arcsin \!\left(-n_{z,y}\right)\nonumber\\ \theta _{y} & =\arctan \!\left({n_{z,x}}\!\bigg/\!{n_{z,z}}\right)\\ h_{c} & ={d}\!\bigg/\!{n_{z,z}}\nonumber \end{align}

The above calculation process is the forward kinematical model of the VEPM. Conversely, the inverse kinematics of the VEPM can be solved.

The Jacobian matrix of the VEPM is the mapping relationship between the velocities of the driving joint in the ECM and the motion speed of the VMP. At touch points, the velocities of the ECM are equal to that of the VMP, and the following relationship can be obtained in Eq. (6)

(7) \begin{align} J_{X}\dot{X} & =V_{T}=J_{q}\dot{q}\nonumber\\[3pt] J_{X} & =\left\{\begin{array}{l} \left\{\begin{array}{l@{\quad}l@{\quad}l} e_{X^{\prime}}\times r_{T1^{\prime}} & e_{Y^{\prime}}\times r_{T1^{\prime}} & e_{Z}\\[3pt] e_{X^{\prime}}\times r_{T2^{\prime}} & e_{Y^{\prime}}\times r_{T2^{\prime}} & e_{Z}\\[3pt] e_{X^{\prime}}\times r_{T3^{\prime}} & e_{Y^{\prime}}\times r_{T3^{\prime}} & e_{Z} \end{array}\right\}\left(3-\text{leg mechanism}\right)\\[20pt] \left\{\begin{array}{l@{\quad}l@{\quad}l@{\quad}l} e_{X^{\prime}}\times r_{T1^{\prime}} & e_{Y^{\prime}}\times r_{T1^{\prime}} & e_{Z} & e_{Z^{\prime}}\\[3pt] e_{X^{\prime}}\times r_{T2^{\prime}} & e_{Y^{\prime}}\times r_{T2^{\prime}} & e_{Z} & e_{Z^{\prime}}\\[3pt] e_{X^{\prime}}\times r_{T3^{\prime}} & e_{Y^{\prime}}\times r_{T3^{\prime}} & e_{Z} & e_{Z^{\prime}}\\[3pt] e_{X^{\prime}}\times r_{T4^{\prime}} & e_{Y^{\prime}}\times r_{T4^{\prime}} & e_{Z} & e_{Z^{\prime}} \end{array}\right\}\left(4-\text{leg mechanism}\right)\\ \end{array}\right. \end{align}

where ${\dot{X}}$ is the speed matrix of the VMP, ${\dot{q}}$ is the velocity of driving joints, Jq is the driving Jacobian matrix, V _T is the velocity matrix of contact points, J _X is the output Jacobian matrix, e _{X ^′} , e _{Y ^′,} and e _{Z ^′} are the unit vectors corresponding to the X ^′-, Y ^′-, and Z ^′- axes of the VMP, e _Z is the unit vector of the Z-axis corresponding to the base, and r _{Ti ^′} is the vector from the VMP center to the ith contact point.

3.2. Comprehensive Performance analysis

According to the introduction of the functional task in Section 2.1, this paper will mainly study four performance indexes of the VEPM, including the workspace, the stiffness, the motion transmission, and the stability.

3.2.1. Workspace

The workspace is a collection of the reachable areas of the mechanism. Monte Carlo method [Reference Rastegar and Fardanesh42] is a classical method to solve the workspace by traversing all points in the space. However, it is unsuitable for solving the workspace with a functional task. So, a task-oriented Monte Carlo method is proposed in this paper.

First, according to the fitting surface formula at the terrain point and the workspace of the original kinematic chain in the ECM, a feasible touch point set can be solved. Second, the driving variables of the ECM can be solved through the inverse kinematics. By judging whether the driving variable satisfies the stroke requirements, it is judged whether the touch point belongs to the workspace of the ECM. If the stroke requirements are satisfied, the motion variables of the VMP can be obtained based on the forward kinematics. By traversing the entire terrain map and integrating the motion variables of the VMP, the task-oriented workspace volume V _T can be obtained, as shown in Eq. (7).

(8) \begin{equation} V_{T}=\int _{T}\mathrm{d}W \end{equation}

3.2.2. Stiffness analysis

The static stiffness index [Reference Zhang and Gao11, Reference Lin, Shieh and Chen43] determines the motion accuracy and structural stability of a mechanism. When the stiffness index of the VEPM is larger, it means that the motion error caused by the external force is smaller, that the current configuration of the VEPM is farther away from the singular configurations, and that adaptability of the VEPM to the terrain is stronger. The stiffness matrix of the VEPM can be solved by Jacobian matrix. This paper takes the mean value of the diagonal elements in the stiffness matrix as the local stiffness index S _tl . The integral value of all the local stiffness index on the terrain map is used as the global stiffness index S _tg of the VEPM, as shown in Eq. (8).

(9) \begin{align} K & =J^{T}kJ\nonumber\\ S_{tl} & =E\!\left(tr\!\left(K\right)\right)\\ S_{tg} & =\int _{T}S_{tl}dW/V_{T}\nonumber \end{align}

where K is the stiffness matrix, $J = J^{-1}_{q} \cdot J_{X}$ is the Jacobian matrix, k is the stiffness matrix of the joint space, E() is the mean function, and t _r () is a vector made up with the matrix diagonal elements.

3.2.3. Motion/force transmission analysis

The motion/force transmission [Reference Brinker, Corves and Takeda16, Reference Liu, Wang and Pritschow17, Reference Shen, Xu and Li44] reflects the transfer efficiency between the input and output variables of the VEPM model. When the motion/force transmission index is higher, the ability of the ECM to adapt the terrain changes is stronger. The motion transmission index can be solved by analyzing the motion screw of the VEPM. The motion screw $\textit{\$}$ _Ap,i , $\textit{\$}$ _Tp,i, and $\textit{\$}$ _Op,i of the physical kinematical chain in the VEPM should be solved with the actual configuration and dimensional parameters of the ECM. The input motion screw $\textit{\$}$ _Av,i of the virtual kinematical chain in the VEPM is the output motion screw $\textit{\$}$ _Op,i of the physical kinematical chain. The transmission wrench $\textit{\$}$ _Tv,i of the virtual kinematical chain is a constraint force screw perpendicular to the datum plane of the VMP, as shown in Eq. (9).

(10) \begin{equation} \textit{\$} _{Tv,i}=\left\{O;\,e_{z^{\prime}}\right\} \end{equation}

The calculation of the output motion screw $\textit{\$}$ _voi,j in the virtual kinematical chain is different according to the VMP’s structure. For three-leg ECMs, the output motion of the VMP is a multiple motion including one rotation motion and one plane motion. The rotation is along the axis passing through the other two contact points. The plane motion is a 3-DOFs motion in the datum plane of the VMP, as shown in Eq. (10).

(11) \begin{equation} \left\{\begin{array}{l} \textit{\$}_{voi,1}=\left\{e_{i+1,i+3};\,r_{P,i+2}\times e_{i+2,i+4}\right\}\\[5pt]\textit{\$}_{voi,2}=\left\{O;\,e_{x^{\prime}}\right\}\\[5pt]\textit{\$}_{voi,3}=\left\{O;\,e_{y^{\prime}}\right\}\\[8pt]\textit{\$}_{voi,4}=\left\{e_{z^{\prime}};\,r_{P,i}\times e_{z^{\prime}}\right\} \end{array}\right. \end{equation}

where e _i,j is the unit vector from ith contact point to jth contact point, and r _P,k is the vector from original point to kth contact point.

For four-leg ECMs, the output motion of the moving platform is also a multiple motion including one rotation motion and one plane motion. The rotation axis passes through the diagonal contact point and is parallel to the vector passing through the two adjacent contact points. The plane motion is a 3-DOFs motion in the datum plane of the main-VMP, as shown in Eq. (11).

(12) \begin{equation} \left\{\begin{array}{l} \textit{\$}_{voi,1}=\left\{e_{i+1,i+3};\,r_{P,i+2}\times e_{24}\right\}\\[5pt]\textit{\$}_{voi,2}=\left\{O;\,e_{x^{\prime}}\right\}\\[5pt]\textit{\$}_{voi,3}=\left\{O;\,e_{y^{\prime}}\right\}\\[9pt]\textit{\$}_{voi,4}=\left\{e_{z^{\prime}};\,r_{P,i+2}\times e_{z^{\prime}}\right\} \end{array}\right. \end{equation}

Meanwhile, the motion of the VMP is also constrained by the VRC. Therefore, the output motion screw needs to be reciprocal with the constraint screw $\textit{\$}$ r m,i of the VMP, as shown in Eq. (12).

(13) \begin{equation} \left\{\begin{array}{l} \textit{\$}_{m,1}^{r}=\left\{e_{x^{\prime}};\,r_{P}\times e_{x^{\prime}}\right\}\\[5pt]\textit{\$}_{m,2}^{r}=\left\{e_{y^{\prime}};\,r_{P}\times e_{y^{\prime}}\right\}\\[5pt]\textit{\$}_{m,3}^{r}=\left\{O;\,e_{z}\right\} \end{array}\right. \end{equation}

The local motion/force transmission index S _ml of the VEPM is the minimum value among the input and output transmission indexes of all chains. The global motion/force transmission index S _mg of the VEPM is the integral value of the local motion/force transmission index on the terrain map, as shown in Eq. (13).

(14) \begin{align} \lambda _{i} & =\frac{\left| \textit{\$} _{Af,i}\circ \textit{\$} _{Tf,i}\right|\! \left| \textit{\$} _{Ab,i}\circ \textit{\$} _{Tb,i}\right| }{\left| \textit{\$} _{Af,i}\circ \textit{\$} _{Tf,i}\right| _{\max }\left| \textit{\$} _{Ab,i}\circ \textit{\$} _{Tb,i}\right| _{\max }}\nonumber\\[5pt] \eta _{i} & =\frac{\left| \textit{\$} _{Of,i}\circ \textit{\$} _{Tf,i}\right|\! \left| \textit{\$} _{Ob,i}\circ \textit{\$} _{Tb,i}\right| }{\left| \textit{\$} _{Of,i}\circ \textit{\$} _{Tf,i}\right| _{\max }\left| \textit{\$} _{Ob,i}\circ \textit{\$} _{Tb,i}\right| _{\max }}\\[5pt] S_{ml} & =\min\! \left\{\lambda _{i},\eta _{i}\right\}\nonumber\\[5pt] S_{mg} & = {\int _{T}S_{ml}\mathrm{d}W}\bigg/{V_{T}} \nonumber \end{align}

where λ _i and η _i represent the input and output transmission index corresponding to the ith kinematic chain.

3.2.4. Stability analysis

The stability [Reference Tang, Zhang and Tian33, Reference Tang, Zhang and Tian34, Reference Poulakakis and Buehler45] evaluates the ability of the ECM to resist external forces and prevent overturning. The higher the stability index, the greater the external force required to overturn the ECM, and the higher the safety of the ECM. The main force of the ECM to resist the overturning is the gravity of the system. Therefore, this paper uses the ratio k _Fwn of the minimum overturning force to the gravity to evaluate the stability in the external force direction, as shown in Eq. (14). The local stability index S _sl of the VEPM at the terrain point is the mean value of the stability index with all directions. The global stability index S _sg is the integral of the local stability index on the terrain map, as shown in Eq. (14).

(15) \begin{align} k_{{F_{wn}}} & = {F_{wn}}\bigg/{G}=\frac{\left| e_{{F_{wn}}}\times r_{wn}\cdot e_{F}\right| }{\left| e_{Z}\times r_{wn}\cdot e_{F}\right| }\nonumber\\[4pt] S_{sl} & =\text{mean}\!\left(k_{{F_{wn}}}\right),\theta _{Z}\in \left[0,2\pi \right]\\[4pt] S_{sg} & = {\int _{T}S_{sl}\mathrm{d}W}\bigg/{V_{T}}\nonumber \end{align}

where F _wn is the external force, G is the gravity, e _Fwn = {cos[θ _z ], sin[θ _z ], 0} is the unit vector with the direction of the external force, θ _z is the angle between the X-axis of the base and the external force direction, and e _F is the unit vector corresponding to the flip axis.

3.3. Hybrid optimization method

The dimension synthesis of a mechanism is essentially an optimization problem [Reference Vasiliu and Yannou46]. The optimization takes the comprehensive performance index of the mechanism as the objective function and solves the optimal structural dimension of the mechanism. The kinematics analysis and performance calculation of the VEPM involve a large number of high-order nonlinear calculations. So, the Brute-Force method that solves the optimal solution by traversing all feasible solution is unsuitable to solve the dimension optimization of the VEPM. Therefore, many advanced optimization solutions such as the genetics [Reference Hou and Zhao47], the particle swarm optimization [Reference Wang and Zhang48], and the neural network algorithm [Reference Zhang49] are introduced into the dimension optimization of the mechanism.

In this paper, the target of the dimension optimization is the specific functional task, and the task is descripted with the DEM model. The comprehensive performance index of the VEPM is established on the DEM model. According to the specific task, the size of the DEM map is different. For lunar exploration project, lunar surface area is about 3.79 × 1013 m², and the number of terrain points is astronomical. Obviously, traversing the entire terrain map for the optimal solution will consume a huge number of computing resources. Thus, this paper proposes a new hybrid optimization algorithm based on the particle swarm algorithm and the neural network algorithm. The flowchart of the new optimization algorithm is shown in Fig. 4. The entire optimization algorithm can be divided into two parts: the preparation and the optimization.

Figure 4.

The flowchart of the task-oriented comprehensive optimization algorithm.

In the preparation stage, the nonlinear calculation of the VEPM’s performance index will be converted into the linear calculation of a neural network. The core of the preparation phase is the training of the neural network. The samples of the neural network are collected form the performance analysis with the classical workspace. The input parameters of the sample are the motion variables of the VMP and the rod dimensions of the ECM. The output parameters of the sample are the performance indexes of the VEPM. The trained neural network is used to replace the calculation of the VEPM’s performance indexes.

In the optimization stage, this paper uses the particle swarm optimization algorithm to solve the optimal solution. First, a group of random particles are initialized, and their fitness value are calculated. The fitness value is the comprehensive performance index Ψ of the VEPM, as shown in Eq. (15).

(16) \begin{equation} \psi =k_{1}\frac{V_{W}}{\max \!\left(V_{W}\right)}+k_{2}\frac{S_{tg}}{\max \!\left(S_{tg}\right)}+k_{3}\frac{S_{mg}}{\max \!\left(S_{mg}\right)}+k_{4}\frac{S_{sg}}{\max \!\left(S_{sg}\right)} \end{equation}

where max(t) is the maximum value of t from the first iteration to the last iteration. k _i (0 ≤ k _i ≤ 1) is the scale factor, and its value is determined based on the task requirement of the landing gear.

Then, all the particles are updated through the update function (as shown in Eq. (16)), and the optimal solution of the particle and the optimal solution among the entire particles are calculated and updated. Finally, through continuous iteration and update, the global optimal solution will be the output.

(17) \begin{equation} \left\{\begin{array}{l} p_{i,k}=p_{i,k-1}+v_{i,k}\\[4pt] v_{i,k}=c\cdot v_{i,k-1}+\text{rand}\cdot \left(p_{g,Best}-p_{i,k}\right)+\text{rand}\cdot \left(p_{i,Best}-p_{i,k}\right)\\[4pt] c=0.5\!\left(i_{\max }-k\right)/i_{\max } \end{array}\right. \end{equation}

where p _i,k and v _i,k are the value and speed of the ith particle in the kth iteration, p _g,Best is the value of the global optimal particle, and p _i,Best is the optimal value of the ith particle.

4.1. Case introduction

There is a wide forested area in the western part of China. Due to the high altitude and sparsely population, this area is rich in natural resources [Reference Yang, Yao and Xu50]. To explore the resources in this area, the robot with the vertical taking-off and landing function can improve the detection efficiency [Reference Meshcheryakov, Salomatin, Senchuk and Shirokov51]. Considering that most of this area is unstructured terrain, so the robot is required to have a high terrain adaptability. This paper takes the terrain-adaptive landing gear as a case to optimize its dimensions.

This paper randomly selects the map of Zuogong City, Xinjiang Province as the functional task. The terrain map is supported for free by Bigmaper. The satellite map and the three-dimensional model of the terrain map are shown in Fig. 5.

Figure 5.

The satellite map (a), the DEM map (b), and the fitting terrain surface (c).

To comprehensively compare the performance of the landing gear with the three-leg and four-leg layouts (as shown in Fig. 6), this paper optimizes the two layout mechanisms. There are two engineering requirements in the design of the landing gear mechanism. The first one is the sufficient output stroke of the mechanism. The second one is the energy conservation that requires the driving joint of the mechanism having a self-locking function. Therefore, this paper uses a combination of a parallelogram mechanism and a link-slider mechanism as the kinematical chain of the landing gear, as shown in Fig. 6.

Figure 6.

Physical models of the three-leg (a) and four-leg (b) landing gear mechanisms and kinematic chain (c).

4.2. Kinematical model and dimension optimization

According to the introduction in Section 3, the VEPM models of the three-leg ECM and the four-leg ECM can be constructed, as shown in Fig. 7.

Figure 7.

The VEPM models of the three-leg and four-leg landing gear mechanisms.

Based on the structure of the kinematic chain, its kinematical model can be obtained through the vector method, as shown in Eq. (17). Combined with the introduction in Section 3, the kinematical model and Jacobian matrix of the two VEPM models can be obtained.

(18) \begin{equation} p_{z,i}=F_{f}\!\left(l\right)=\frac{2r_{c}}{r_{a}}\sqrt{r_{a}^{2}-{l^{2}}\bigg/{4}} \end{equation}

where p _z,i is the Z-axis coordinate of the ith touch point, l is the length of the driving slider, and r _a and r _c are rod lengths.

Figure 8.

The optimization processes of G1 (a), G2 (b), G3 (c), G4 (d).

To reduce the impact of objective conditions on the comparative experiment, this paper sets the layout of the ECMs to be symmetrically distributed around the center of the base. The distance from the connecting point of the kinematic chain to the base center is 500 mm. The value ranges and constraint conditions of the rods in the ECMs are shown in Eq. (18).

(19) \begin{align} & 100\,{\rm mm}\leq r_{a}\leq 160\,{\rm mm}\nonumber\\& 100\,{\rm mm}\leq r_{b}\leq 160\,{\rm mm}\\& r_{a}=r_{d}\nonumber\\& r_{c}=r_{a}+r_{b}\nonumber \end{align}

To compare and analyze the improvement of the new optimization approach in the ECM’s performance and to analyze the difference in the performance between the three-leg and four-leg layouts, four group experiments are set up in this case. Among them, the first (G1) and second (G2) groups correspond to the three-leg layout, while the third (G3) and fourth (G4) groups correspond to the four-leg layout. The mechanisms in G1 and G3 are optimized with the task-oriented optimization method proposed in this paper, while the mechanisms in G2 and G4 are optimized based on the classical workspace.

In the optimization processes, all the scale factors in the comprehensive performance index Ψ are set to 1, and 100 iterations with 100 particles are applied to the particle swarm optimization. The optimization processes of the four group experiments are shown in Fig. 8. In the result figures, the horizontal axis represents the number of iterations, while the vertical axis represents the fitness value. The blue curves represent the global optimal fitness value, while the red curves represent the average value of the optimal fitness values in all particles. It can be seen from the results that the particle swarm has obtained the global optimal solution before the 10th iteration, and all the particles reached the global optimal solution before the 100-th iteration. The optimization results of the four group experiments are shown in Table I.

Table I.

The dimension optimization results.

Figure 9.

The workspace maps of the G1 (a), G2 (b), G3 (c), G4 (d).

4.3. Comprehensive performance analysis

This section analyzes the performance of the VEPMs in four group experiments in detail.

Figure 9 shows the workspace map of the results. The horizontal and vertical axes, respectively, represent the latitude and longitude coordinates of the satellite map. The color value represents the area of the workspace at the coordinates. When a terrain point is given, the ECM’s posture changes with the changes of the azimuth angle θ _d (the angle between the X-axis of the base frame in the ECM and the north direction) and the ground clearance h _c . The aggregate of all the feasible azimuth angle and the ground clearance is expressed by the area. The result figures show that the workspace areas of G2 and G4 are significantly larger than those of G1 and G3. The results show that the task-oriented optimization method can better adapt to the terrain task. Longitudinal comparison shows that the workspace areas of G1 and G2 are slightly larger than those of G3 and G4. The results show that the workspace of the three-leg layout is larger than that of the four-leg layout.

Like the analysis of the workspace, the local stiffness, the motion/force transmission index, and the local stability index are simulated, and the specific results are presented in Appendix A-C. Combined with the results, some conclusions can be summarized and listed in Table II.

Table II.

The summary of the experiment results.

To quantitatively compare the results of the four group experiments, the global performance indexes based on the terrain map are solved, and the results are shown in Table III.

The result table shows that the classical workspace optimization has obvious advantages in the stiffness and the motion/force transmission with the great expense of the ECM’s workspace. On the other hand, the three-leg layout is superior to the four-leg layout in the stiffness and motion/force transmission. The results are not completely consistent with the results of the local performance analysis above, because the two layouts have different distributions in the local performance indexes.

4.4. Case summary

By analyzing the results of the four groups experiments, the following conclusions can be summarized:

1. (1) The task-oriented optimization can significantly increase the terrain adaptability of the ECM.

2. (2) The local performance indexes of the mechanism are less affected by the azimuth angle and more affected by the ground clearance.

3. (3) The three-leg layout performs better than the four-leg layout in mechanism’s kinematical performance.

4. (4) The four-leg layout is better than the three-leg layout in the stability.

5. (5) The workspace of the three-leg layout is slightly better than that of the four-leg layout.

The comparison and analysis of the performance between different layouts can guide the layout design of the ECM. For example, a three-legged layout can be selected to quickly respond to the terrain changes in the areas with steep terrains. In the area with flat terrains, a four-leg layout can be used to obtain greater stability and safety performance.