Abstract

This paper describes the use of a multiobjective genetic algorithm for robust motion controller design. Motion controller structure is based on a disturbance observer in an RIC framework. The RIC approach is presented in the form with internal and external feedback loops, in which an internal disturbance rejection controller and an external performance controller must be synthesised. This paper involves novel objectives for robustness and performance assessments for such an approach. Objective functions for the robustness property of RIC are based on simple even polynomials with nonnegativity conditions. Regional pole placement method is presented with the aims of controllers’ structures simplification and their additional arbitrary selection. Regional pole placement involves arbitrary selection of central polynomials for both loops, with additional admissible region of the optimized pole location. Polynomial deviation between selected and optimized polynomials is measured with derived performance objective functions. A multiobjective function is composed of different unrelated criteria such as robust stability, controllers’ stability, and time-performance indexes of closed loops. The design of controllers and multiobjective optimization procedure involve a set of the objectives, which are optimized simultaneously with a genetic algorithm—differential evolution.

1. Introduction

Modern positioning systems require high performance and complex operation, which demand highly efficient and complex controller structures. Complex controller algorithms and their designs are mostly related to very complex design procedures and optimisation techniques, with which designers try to achieve the desired performance specification. To date, many advanced design methods have been developed, based on different structures of closed-loop systems and paradigms. The most widely used designs are based on disturbance observers [1–3], internal model control [4], and model based disturbance attenuation [5]. The disturbance observer designs have been mostly used in industrial environments because of its simple transparent structure and capability to ensure proper tradeoff between robustness and performance properties. Tradeoffs between criteria can be handled with heuristic optimization approaches or mathematical programming optimization techniques, abbreviated as LP, QP, SDP, NP, and so forth [6, 7]. Optimization-based methods in computer aided design (CAD) have proved to be a valuable tool in engineering practice, with which one can achieve proper performance and suitable controllers for closed-loop systems. In general, the optimization procedure can be divided into convex or nonconvex optimization problems.

Mathematical programming approaches, such as LP, QP, and SDP, are very efficient for convex problems, which cover many modern robust controller designs in state space approach [8–10]. However, there are also many control problems, where the evaluation of the objective is not strictly convex or where the desired criteria cannot be combined into a set of convex objective functions. For example, polynomial synthesis with fixed order controller in a transfer function form and controller structure optimization is a basically nonconvex problem [11, 12]. One way to overcome this problem is by combining heuristic optimization methods with new or conventional controller designs [13–15]. This combination provides a set of efficient tools to address complex multivariable problems with performance constraints [13]. There is much evidence which indicates high efficiency of the heuristic optimization technique, especially with genetic algorithms (GAs). The GA optimization technique with well-formulated objective functions can preserve satisfactory results of controlled systems while overcoming some problems and limitations of conventional designs [13, 16–18].

This paper considers a robust disturbance observer (DOB) in a robust internal compensator framework (RIC) with multiobjective optimization of different robustness and performance criteria. The DOB structure has already been studied in detail and has several different structural approaches [1, 19]. The more convenient and straightforward methods of DOB are based on Q-filter and inverse nominal models within the internal feedback branch [1, 20, 21]. The more advanced approaches are based on internal reference models in RIC framework [2, 20]. Both methods, Q-filter and RIC, deal well with disturbance attention and have similar approaches and structures [2, 20, 22]. However, the RIC approach is more transparent and reliable in comparison with the Q-filter design. The main difference between both approaches is in the design of their internal loops [5, 22]. The significant disadvantage of the DOB with Q-filter design is the usage of an inverse nominal model within the internal feedback loop. Most mechanical systems are presented as strict proper functions, which prevents direct usage of the model inverse. The second disadvantage is the internal-loop structure with a low-pass Q-filter within a partially positive feedback loop. The property of the Q-filter lowers the closed-loop’s stability and the selection is strictly empirical with some vague guidance for the first-, second-, and third-order filters [5, 21, 23, 24]. Each selection of approximated inverse function and Q-filter requires additional assessment of the closed-loop’s performance and robustness. The RIC on the other hand has better structural transparency and can be much easily incorporated into the optimization procedure. Internal and external controllers can be acquired from the optimization procedure, so that the robustness of the RIC system can be ensured [25, 26].

This paper describes the design of an RIC disturbance observer with optimization of robustness and performance criteria with multiobjective differential evolution (DE) [27, 28]. The main contribution of the presented paper is a multiobjective optimization approach with simultaneous optimization of a set of criteria for inner and outer loops of the RIC structure. The used robustness and performance criteria are derived directly from the property of the norm and uncertainty models [29, 30]. The criteria have the form of even polynomials, where simple quasi-convex control problems arise. Robust stability of the system can be quite straightforwardly assessed, if the nonnegativity condition of the polynomial is provided. Even polynomials can be directly used in the optimization technique within genetic algorithm, without any other additional transformation. The second contribution of this paper is the design of a simple parameterized controller structure with selected central characteristic polynomial. The central characteristic polynomial has an admissible region in the stable half plain prescribed so that it ensures the expected performance and stability of the RIC system. The basic idea comes from the pole-colouring technique and regional pole assignment method [31, 32]. In comparison to similar methods, the presented approach uses objective functions of the regional pole placement technique and can be used for nonparametric uncertainties. The presented objectives are optimized with a genetic algorithm, differential evolution (DE). DE has evident advantages over other similar techniques: simple structure, fast convergence, lower space complexity, adaptive parameter settings, and so forth [33]. All design criteria within the DE algorithm are evaluated over the nonnegativity property of robustness criteria and roots calculations of the closed-loop characteristic polynomial for regional pole placement.

This paper is divided into seven sections. In Section 2, we describe the RIC disturbance observer for a positioning system. Section 3 describes the regional pole placement for internal and external loops of the RIC system and applied parameterization of the controller structure. Thereafter, in Section 4, we describe performance and robustness properties with the metric , based on nonnegativity assessments of the even polynomial. Section 5 describes a multiobjective optimization approach with DE and a composite multiobjective function. After Section 5, a design example of an RIC system with multiobjective optimization results is provided in Section 6. The conclusions of the paper are summarized in Section 7.

2. RIC Disturbance Observer for Positioning Systems

A disturbance observer in the RIC framework is composed of internal and external loops [34–36]. The design of the internal loop is based on input disturbance attention, where most often appearing disturbances are reaction and load torque, friction, and unmodeled dynamics [20, 34]. The external loop is designed so that it ensures the overall performance of the closed-loop system. The RIC structure is shown in Figure 1, where , , , , , and are the internal controller, plant, reference model, and 2 DOF structures with an external controller and a prefilter, respectively. The internal loop with covers the angular velocity in relation to input torques and disturbance rejection , where is the transfer function of the rotary encoder. The transfer function of the rotary encoder is mostly treated as a system with pure integral behavior. The RIC transfer functions are

Figure 1 

Disturbance observer in an RIC framework.

The matrix form of the RIC system in Figure 1 is where ,  ,  ,  , and   are reference signal, input disturbance, output disturbance, internal noise, and external noise, respectively.

The closed-loop transfer function is

The RIC system in Figure 1 is slightly a modified classic structure. The internal loop in the modified structure embraces only the angular velocity, while the classical internal loop uses for the feedback branch the same output as for the external loop [21, 22]. The modified structure provides indirect decupling of the internal and external loops, where the poles of the internal loop do not directly influence the zeroes of the external loop. Most RIC designs include standard controller structures in internal loops [20, 24]. Standard controllers, like PID or PI, with integral behaviour improve disturbance rejection for low-frequency disturbance . On the other hand, internal integral behaviour causes a double-integrator effect on the external loop, which significantly lowers the stability domain and generates undesired responses on the output disturbances and reference signals. This paper will consider an RIC structure, shown in Figure 1, where the internal integral behaviour of the controller does not directly influence the external loop. For the sake of the RIC structure simplification, we assume that the prefilter function is constant and is equal to .

3. Regional Pole Placement of the RIC System

The design procedure of the RIC system can be addressed in two steps: the first step covers the internal loop controller design and the second step the external loop controller design. Both controllers are designed with the regional pole placement technique based on the selected central polynomial in the expected stable area. The expected area is freely chosen by the designer and exhibits closed-loop dynamic performance. The parameterization of controllers is applied to ensure good disturbance rejection and robustness properties.

Let us consider the internal loop of the system in Figure 1. The closed-loop system is where is the sensitivity function of the internal closed-loop. The characteristic polynomial is defined as

Equation (5) is the standard starting point of pole placement design. The solution of the equation is provided under strict polynomial degree conditions [37]. The presented approach uses only the conditions when an exact solution does not exist, . In this case, the controller structure does not depend on plant order, like in the classic pole placement design, and is arbitrarily selected by the designer. The only way to satisfy expression (5) is regional pole placement with a prescribed region and deviation assessment, as described in [32]. Deviation is assessed between the given polynomial and the candidate polynomial obtained with optimization. The term prescribed region of the closed polynomial is similar to the term domain stability [29, 38]. The prescribed region with the selected central polynomial offers more leeway for further multiobjective optimization of robustness and performance criteria. The polynomial equation for regional pole placement is where is the candidate polynomial obtained with the optimization with controller coefficient . The prescribed region of the desired pole location can be derived from the properties of the Laplace stability domain, , where holds true. The possible objective functions of the prescribed region for controllers , are described in the following subsections.

3.1. Settling-Time Objective Function

Roughly speaking, the settling time of the closed-loop system is inversely proportional to the real part of dominant poles in the complex domain . The objective function can be composed so that all closed-loop poles lie in a vertical stripe, bounded by parameters  and . The vertical stripe belongs to domain . Parameters  and specify the objective function criteria of the closed-loop settling time (see Figure 2).

Figure 2 

Settling-time objective function with settling-time boundaries and .

The proposed objective function iswhere and indicate the location of the stripe boundary and indicates the number of closed-loop poles. The right boundary  of the stripe prevents the possibility of obtaining poles with large negative real part values. Large negative real part pole values can cause a too high dynamic of the closed-loop system. A higher dynamic of the closed-loop can render proper real-time implementation of the discrete controller on the embedded system or cause improper behaviour of controller outputs. Improper higher dynamic of the controller output mostly manifests itself as tempestuous responses, which indicate nonoptimal energy behaviour of the closed-loop system.

The first term of the indicates a normalized value of the objective if all poles lie on the left of the vertical line . The second term assesses the deviation of the real part pole value between the desired and the optimized pole location, where is ,  .

3.2. Rise-Time Objective Function

The rise time of the closed-loop system is roughly proportional to the inverse of the dominant poles imaginary values and may be upper-bounded by the parameter . The objective function can be composed so that all closed-loop poles lie on the horizontally bounded stripe with bounds  (see Figure 3). The selected stripe belongs to domain .

Figure 3 

Rise-time objective function with a horizontal boundary .

The proposed rise-time objective function is

The objective function describes the desired stripe in the complex plain, where the first term indicates the position inside the horizontal stripe and the second the imaginary deviation between the desired and the optimized poles.

3.3. Damping-Ratio Objective Function

Damping ratio is also an important design criterion of the closed-loop dynamic performance and is related to the angle of the vectors between the negative real and the imaginary axis of the dominant poles [32]. The damping ratio is determined with the angle boundary (see Figure 4).

Figure 4 

Damping-ratio objective function with parameter .

The proposed damping-ratio objective function is

The proposed objective function represents the cone region of the desired poles. All objective functions represent min-optimization procedure, where all objectives are normalized on the interval [0-1].

3.4. The Composite Objective Function of the Dynamic Criteria

The composite objective function represents the intersection of objectives . A graphical presentation of the composite objective function is shown in Figure 5.

Figure 5 

Intersection of objectives .

The composite objective function can be presented as multiobjective criteria for DE, where the expected solution area is equal to

The multiobjective optimization approach will be discussed in the following sections.

3.5. Internal Controller Parameterization

Controller parameterization is an applied technique, which ensures satisfied properties of the closed-loop system. The internal controllers and can be parameterized so as to ensure good input disturbance rejection and robustness properties. In many applications, the input disturbance in positioning systems represents the load torque and Coulomb’s friction with a typical low-frequency characteristic [20]. The internal system can provide good elimination of low-frequency disturbances and reference tracking if the sensitivity function has a proper damping effect on the frequency span , . Under this assumption, the controller can be parameterized using different polynomial structures, with a known effect on the sensitivity function . Controller parameterization with integral action has a well-known influence on the sensitivity function at low-frequency characteristics, such as the known simple structures PI and PID. For the sake of operational safety, the integral action can in many cases be approximated with the stable pole ,  , where denominator polynomial is equal to . In this case, the damping of the sensitivity function  is lowered by parameter . The lowered damping value of  is not noticeable in real-time operation, especially if the absolute damping value is lower than the absolute measurement accuracy.

A minimized tracking error and good low-frequency input disturbance rejection can be achieved if the following holds true: where is the low-frequency span of the sensitivity function. Sensitivity function  for span with controller parameterization  is

Parameter determines the closed-loop tracking accuracy and the capability of disturbance rejection with characteristic polynomial . Controller structure is parameterized as

Parameter represents an additional parameter for further optimization of performance and robustness criteria. The polynomial equation with parametric solutions is

The solution of the optimization procedure is a proper set of polynomial coefficients, where the internal polynomial belongs to the and a strong proximity condition holds true.

3.6. The Design of the External Controller

Controller design technique is the same as for the internal controller , where the external characteristic polynomial is The possible controller parameterization is where polynomials and are

Coefficient can also be used as an additional parameter for criteria optimization in the same sense as parameter .

The controller is the proper solution of the optimization problem for external loop if the following conditions are satisfied:

Objective functions  have the same properties and meanings as objective functions .

4. Nonparametric Uncertainty and Robustness Criterion of RIC

The robustness of the RIC system is assessed using uncertainty models and a stable proper input weight . The uncertainty models describe model deviation within the given frequency space and are represented with a nominal model and stable uncertainty weights [30, 39]. Weights represent measured noise spectrum of the signal . For RIC design, we assume that the reference model is . The internal loop of the RIC with uncertainty models is shown in Figure 6.

Figure 6 

Internal loop with uncertainty models .

The robustness assessment of the internal loop should be considered with multiplicative and inverse uncertainty. The multiplicative uncertainty represents uncertainties by lower frequencies, while the inverse uncertainty represents uncertainties by higher frequencies [39].

Let us consider the multiplicative uncertainty model  with nominal plant . The closed-loop characteristic using the multiplicative uncertainty model is

Robust stability for the multiplicative uncertainty is preserved if the following holds true: where is a complementary sensitivity function of the internal loop.

The internal loop with inverse uncertainty is defined as The robustness for inverse models is satisfied if the following holds true: where is the sensitivity function of the internal loop.

The noise suppression of the internal loop can be assessed with the following criterion:

The robustness criterion of noise suppression with the uncertainty model is

After derivation of robust stability conditions of the internal loop, robust stability conditions for the external loop can be presented. The purpose of external controller design is to ensure overall performance characteristics like proper reference tracking , output disturbance rejection , and good measurement noise cancellation . The optimization structure of the external loop is shown in Figure 7.

Figure 7 

External loop optimization structure.

Selected weights , , belong to the PH_∞ domain. Input weights , represent the input spectral characteristics of disturbance and noise , where the performance weight is selected to ensure a smooth frequency characteristic of the external-loop sensitivity function . A smooth characteristic of the sensitivity function is also an additional indicator of the closed-loop time-performance characteristics.

The closed-loop characteristic of the external loop with weights , , is

The optimal solution of the optimization problem is

The main goal of expression (26) is to minimize the influences of inputs , on the sensitivity function  and to ensure final feedback performance with .

4.1. Robustness Criteria Assessment via Nonnegativity of the Even Polynomial

Let us consider the property of the norm related to robust stability with uncertainty models [30, 39]. The robust stability criterion is ensured with condition ,  where the criterion is derived for a given transfer function . The condition holds if the even polynomial is a strictly nonnegative function,

The property of the function is derived from the function , defined as in [30]:

Function is a strictly continuous function for all and has no imaginary zeroes. The norm of the function equals only if for all . The robustness property for nonparametric uncertainty can be assessed with even polynomial (27), where we assume that and , holds true.

Theorem 1. The norm of the system with polynomials is only if the corresponding polynomial , for all , is a strictly nonnegative function and belongs to .

Proof. The simple explanation of the norm is , where we assume that belongs to . The norm of the transfer function is only if the ratio of polynomials . It is obvious from the above-mentioned that the difference (27), , must be a strictly nonnegative function and that has no real zeroes. The positivity condition of the is an objective of robustness assessment.

Based on condition (27), the controllers’ robustness property can be achieved with the assessment of the nonnegativity of the even polynomial. Each single robustness criterion ((20), (22), (24), and (26)) can be presented in the form of an even polynomial and a nonnegativity condition.

4.2. Robust Stability Assessment with a Nonnegativity Condition for the Internal Loop

The internal-loop robustness conditions are presented with expressions (20), (22), and (24). Based on condition (27), the even polynomial for multiplicative uncertainty (20) is where the weight is.

Even polynomial for robust stability with inverse uncertainty model (22) with stable weight is

Even polynomial for condition (24) with stability weights and and input weight is