Abstract
We study the concept of stabilization with internal loop for infinite-dimensional discrete time-varying systems in the framework of nest algebra. We originally give a parametrization of all stabilizing controllers with internal loop, and it covers the parametrization of canonical or dual canonical controllers with internal loop obtained before. We show that, in practical application, the controller with internal loop overcomes the awkwardness brought by the extra invertibility condition in the parametrization of the conventional controllers. We also prove that the strong stabilization problem can be completely solved in the closed-loop system with internal loop. Thus the advantage of the controller with internal loop is addressed in the framework of nest algebra.
1. Introduction
The closed-loop system whose stability is achieved by the controller with internal loop has attracted the attention of many authors in recent years (see [1–5]). This system was originally introduced by Weiss and Curtain in 1997 in [1]. When they extended the theory of dynamic stabilization to regular linear systems (a subclass of the well-posed linear systems), it was shown in Example 6.5 of [1] that even the standard observer-based controller is not a well-posed linear system as needed, correspondingly, its transfer function is not well-posed. To overcome this difficulty, a new type of controller, the so-called stabilizing controller with internal loop, was introduced. This controller is more general and useful than the standard feedback controller. Until now, only a special class of stabilizing controllers with internal loop called canonical controllers is widely investigated. In [1], a procedure was developed to design the canonical controllers for stabilizable and detectable plants. In [6], the parametrization for all canonical controllers is given which is clean and avoids the extra invertibility condition in the parametrization for the controller in the standard feedback system. In [7], the author extended the theory to non-well posed systems, and the robust stabilization problem is considered by using the canonical controller.
In recent years, the study of time-varying systems using modern mathematical methods has come into its own. This was a scientific necessity. After all, many common physical systems are time varying. In [8], A. Feintuch specifically introduced a framework of nest algebra and the control theory for linear time-varying systems was studied in this framework. Meanwhile, many stabilization problems for various nonlinear time-varying systems were widely considered as well (see [9–16]). Based on these cases, we are motivated to consider the new model of closed-loop feedback system with internal loop for time-varying systems.
In this paper, we study the concept of stabilization with internal loop for the linear time-varying system under the framework of nest algebra. We extend our study of controllers with internal loop to more general cases and originally give a parametrization of all stabilizing controllers with internal loop. It is found that the parametrization of the canonical controller obtained in [6] can be viewed as a special case of the parametrization obtained here. As we know, the parametrization of the conventional controller is not clean, and there is always an extra invertibility condition on the parameter. This in turn makes it awkward to use this parametrization to solve the practical problems. While the controller with internal loop overcomes this awkwardness. We take the sensitivity minimization problem as an example to show this advantage of the controller with internal loop. The strong stabilization problem is known as the design of a stable controller which stabilizes the given plant. In the framework of nest algebra, it is still an open problem and only a necessary condition is addressed in [17] for this problem. We prove that any stabilizable plant can be strongly stabilized by the controller with internal loop. This means that the strong stabilization problem can be completely solved in the system with internal loop. We also give a simple example to show how to design the strongly stabilizing controller with internal loop.
This paper is organized as follows. In Section 2, we recall some basic concepts of the linear systems in the framework of nest algebra. In Section 3, we introduce the closed-loop system whose stability is achieved by the controller with internal loop and firstly give a parametrization for all stabilizing controllers with internal loop. In Section 4, we focus on the canonical controller and show the benefit of the controller with internal loop in the practical application. In Section 5, we define the strongly stabilizing controller with internal loop and address an advantage of the controller with internal loop in the framework of nest algebra.
2. Preliminaries
Let be the complex infinite dimensional Hilbert sequence space: where denotes the standard Euclidean norm on with inner product . will denote the extended space: For each , let denote the standard truncation projection defined on and by A continuous linear transformation on with the standard seminorm topology ([8, Chapter 5]) is a causal linear system (or a linear system) if for each , . Let be the set of all linear systems on . Then any element of is a lower triangular matrix (with respect to the standard basis, see [8, Chapter 5]).
A linear system is stable if its restriction to is a bounded operator ([8, Chapter 5]). We denote the set of stable systems by , then is a weakly closed algebra containing the identity, referred to in the operator algebra literature as a nest algebra ([8, Chapter 5]).
For , we consider the standard feedback configuration with plant and controller shown in Figure 1.
, denote the externally applied inputs; , denote the inputs to the plant and compensator, respectively, and , denote the outputs of the plant and compensator, respectively. The closed loop system equations are The system is well posed if the internal input can be expressed as a causal function of the external input . This is equivalent to requiring that be invertible. This inverse can be easily computed and is given by the transfer matrix
Definition 2.1 (see [8]). The closed loop system is stable if all the entries of are stable systems on . The plant is stabilizable if there exists a causal linear system such that is stable.
Recall that the graph of a linear transformation with domain is . Then we can give the definitions of strong right representation and strong left representation.
Definition 2.2 (see [8]). A plant has a strong right representation with and stable if
,
there exist such that .
A plant has a strong left representation with and stable if
,
there exist such that .
The following result on strong right representation is proved in [8].
Theorem 2.3 (see [8]). Suppose . Then is a strong right representation of if and only if
there exist such that ,
M is invertible in .
We say that a plant has a right coprime factorization if there exist , , , such that and . The proof of Theorem 2.1 in [8] implies that is a strong right representation of if and only if is a right coprime factorization of . Similarly, is a strong left representation of if and only if is a left coprime factorization of .
The following theorem is the classical Youla Parametrization Theorem.
Theorem 2.4 (see [8]). A causal linear system is stabilizable if and only if has a strong right and a strong left representation. If this is the case, the representations can be chosen so that one has the double Bezout identity A causal linear system stabilizes if and only if it has a strong right representation and a strong left representation for some .
3. Controllers with Internal Loop
In this section, we investigate the stabilization of the time-varying system by controllers with internal loop in the framework of nest algebra. This system is illustrated in Figure 2.
The intuitively interpretation of Figure 2: is the plant and is a transfer map from to when all the connections are open. Then the connection from to is called internal loop. The closed loop system determined by the plant and the controller with internal loop is denoted by .
Partitioning into where , , the closed loop system equations are
We say that the system is well posed if is invertible and We denote this inverse by .
Definition 3.1. The closed loop system determined by the plant and the controller with internal loop is stable if all the entries of are stable. The plant is stabilizable by a controller with internal loop if there exists a such that is stable. In this case, is called a stabilizing controller with internal loop for .
In the previous papers, the study of stabilizing controller with internal loop is mainly focused on the case that and are both well-posed transfer functions (bounded and analytic on some right half plane). And in all applications, the controller is assumed to be stable and satisfy two conditions proposed in [1] (refer to Proposition 4.8 in [1]). While, in the framework of nest algebra, we extend the study to the more general case that , and need not to satisfy the two conditions proposed in [1].
Suppose is invertible in , then we have that
where
Remark 3.2. Notice that the upper left corner of the above transfer matrix is just the transfer matrix of the standard feedback system with the plant and the controller . This implies that the closed-loop system stabilized by controllers with internal loop is more general than the standard feedback system and its transfer matrix provides more information.
Now we can give a parametrization of all stabilizing controllers with internal loop with invertible in .
Theorem 3.3. Suppose and there exist , , , , , , , such that and are, respectively, strong right and left representation for that satisfy the double Bezout identity Then all stabilizing controllers with internal loop are parameterized by for some .
In order to prove this theorem clearly, we need the following result which is an improvement of Theorem 2.4. It is interesting that while the two representations for the controller in Theorem 2.4 are independent, the same will in fact work for both.
Theorem 3.4. Suppose satisfies the assumption in Theorem 2.4. Then the stabilizing controller for has the form for some .
Proof. Suppose stabilizes . By Theorem 2.4, we have that has a right coprime factorization for some . It is easy to check that Thus, This implies that On the other hand, for any , we have that is, Thus, Since we obtain that is a strong left representation of and . This completes the proof.
Now we can give the proof of Theorem 3.3.
Proof of Theorem 3.3. Suppose is stable, then every entry of the matrix
is in and , , , , . Note that (3.14) is just the transfer matrix for the standard feedback system. By Theorem 3.4, we see that has the following representation:
for some . In this case,
if and only if
It follows that
for some .
In the same way, we obtain that
for some . So we get
Since
we have
for some . Thus,
Then we can obtain the following representations for and :
Substituting the representations of , , , and into , we obtain
This completes the proof.
It was said in [1] that the controller with internal loop was particularly well suited for tracking, and a physical interpretation was given for the system with internal loop. In [6], the author described a seemingly impossible problem, the “intriguing control problem”, which can be easily solved by the system with internal loop. In the next two sections, we will show the other great advantages of the controller with internal loop.
4. Canonical Controllers and Dual Canonical Controllers
In this section, we focus on two special classes of controllers with internal loop called canonical controllers and dual canonical controllers, respectively. Here below it is given their definitions in the framework of nest algebra.
Definition 4.1. A controller with internal loop is called the canonical controller for the plant if it is of the form with ,. Analogously, a controller with internal loop is called a dual canonical controller for the plant if it is of the form with , .
For canonical controllers, we have the following results.
Theorem 4.2. The canonical controller stabilizes with internal loop if and only if is invertible in and , .
If has a strong right representation , then the canonical controller stabilizes if and only if is invertible in .
Proof. According to the system equations in (3.2), we have that, for the canonical controllers , the transfer matrix can be given by
Thus, if and only if , , , and are all in . Since and . We have that all the entries of are in if and only if and are in . Thus the first statement is proved.
Let us prove the second assertion in the theorem. If and , we have that and . By using the first result, we have that stabilizes . Conversely, if stabilizes . By the first result, we have that , are both in . Suppose that , , , and are as in Definition 2.2, then
Since and are in , we see that . This completes the proof.
There is a similar result for the dual canonical controller.
Theorem 4.3. The dual canonical controller stabilizes with internal loop if and only if is invertible in and , .
If has a strong left representation , then the dual canonical controller stabilizes if and only if is invertible in .
In [6], the parametrization of all canonical controllers and dual canonical controllers is given and it can be easily extended to our framework.
Theorem 4.4. Suppose satisfies the assumption of Theorem 3.3. Then all canonical controllers that stabilize are parameterized by
where and is invertible in .
Analogously, all dual canonical controllers that stabilize are parameterized by
where and is invertible in .
Remark 4.5. Indeed, if we choose the parameters in Theorem 3.3 such that , , and , we can obtain the same result of the above theorem. This implies that the result derived in [6] can be regarded as a special case of Theorem 3.3.
The following theorem gives a strong relation between the stabilization with canonical controller and the usual concept of stabilization.
Theorem 4.6. Suppose is invertible in , then can be stabilized by a canonical controller with internal loop if and only if is stabilizable in the framework of standard feedback system.
Proof . Suppose is stabilized by a canonical controller with invertible in . Then all entries of in (4.1) are in . By computation, we can easily obtain that the upper left corner of the transfer matrix is just the transfer matrix in the standard feedback system with the plant and the controller . It follows that is stabilizable in the standard feedback system.
On the other hand, suppose is stabilizable in the standard feedback system. Then, from Theorem 2.4, all the stabilizing controllers can be given by with some . Let , , then we obtain a canonical controller and it is easy to verify that stabilizes .
Naturally, there exists a dual result for the dual canonical controller.
Now we can explain the advantage of the controller with internal loop in the practical application.
Recall the parametrization of the conventional controllers in Theorem 2.4, it is not clean and an extra invertibility condition is imposed on the Youla parameter. This in turn makes it awkward to use this parametrization to solve the practical problems. For example, in [8, Section 7], the sensitivity minimization problem for the system described in Figure 3 is studied. The weighted sensitivity operator for this system is defined by and the weighted sensitivity minimization problem is to find
Suppose satisfy the condition in Theorem 2.4, then all stabilizing controllers can be given by with and is invertible in . By simple computation, we can obtain that the weighted sensitivity minimization problem is to find Obviously, the extra condition that is invertible in makes the practical control engineers difficult to continue their computations. So they have to choose to ignore the fact that the Youla parameter can not be taken for all the elements in .
Fortunately, the controller with internal loop overcomes this awkwardness. Let us consider the sensitivity minimization problem for the system with internal loop as described in Figure 4. We consider this problem for the dual canonical controller with , . When , it is easy to check that the weighted sensitivity operator for this system is and the weighted sensitivity minimization problem is to find By using the parametrization of the dual canonical controller given in Theorem 4.4, the weighted sensitivity minimization problem is to find Obviously, it avoids the extra invertibility condition for the parameter as it appears in the standard feedback system. This overcomes the difficulty arisen in the standard feedback system.
5. Strong Stabilization with Internal Loop
Practicing control engineers is reluctant to use unstable compensators for the purpose of stabilization. This motivated considering the strong stabilization problem whether among the stabilizing controllers for a given stabilizable plant , there exist stable ones. If there exists such a controller, is said to be strongly stabilizable and the stable controller is called the strongly stabilizing controller. In this section, we consider the strong stabilization problem for the system with internal loop and address another advantage of the controller with internal loop.
Definition 5.1. is said to be strongly stabilizable with internal loop if it can be stabilized by the controller with , . This controller is called the strongly stabilizing controller with internal loop.
Obviously, the canonical controller and dual canonical controller are both the strongly stabilizing controller with internal loop. From the parametrization of controllers with internal loop given in Theorem 3.3, we see that the strongly stabilizing controller with internal loop can be characterize by choosing the parameters , , , and in Theorem 3.3 such that and are invertible in . The following theorem shows the existence of the strongly stabilizing controller with internal loop.
Theorem 5.2. Suppose is stabilizable, then can be strongly stabilized by the controller with internal loop.
Proof. Suppose is stabilizable. From Theorem 2.4, the controller stabilizes has the parametrization that for some stable . Set , , and , then is a stable controller with internal loop and it strongly stabilizes the plant .
Remark 5.3. In [17], it is proved that a given plant with left coprime factorization can be strongly stabilized in the standard feedback system if is compact. While in the case where is not compact, it is still an open problem whether or not there exists a stable controller that stabilizes the plant. Theorem 5.2 shows that any stabilizable plant can be stabilized by a stable controller with internal loop. It implies that the strong stabilization problem can be completely solved by the controller with internal loop. And this addresses an advantage of the controller with internal loop in the framework of nest algebra.
From the proof of Theorem 5.2, we see that it also provides a method to design the strongly stabilizing controller with internal loop. We end our paper with a simple example to show this design method.
Example 5.4. Suppose , it is obviously stabilizable. Take From Theorem 2.4, we obtain the parametrization of the stabilizing controller for some stable . Take , then is unstable. In order to satisfy the practicing control engineers' requirement, we set , , and . Then we obtain a stable controller with internal loop which stabilizes the plant .
6. Conclusion
In this paper, the closed-loop system whose stability is achieved by the controller with internal loop is studied in the framework of nest algebra. The controllers with internal loop considered here are more general than those in the previous paper and they are not necessarily stable and need not to satisfy the two conditions proposed in [1]. We give a parametrization for all stabilizing controllers with internal loop which has never been studied before. Then we show that this parametrization covers the parametrization for canonical or dual canonical controllers obtained in [6]. By taking the sensitivity minimization problem as an example, we show that, in the practical application, the controller with internal loop solves the difficulty brought by the invertibility condition in the parametrization of the conventional controller. In the framework of nest algebra, the strong stabilization problem is still an open problem, and no sufficient and necessary condition was found to characterize the plant which can be strongly stabilized. While, with the help of the concept of stabilization with internal loop, we show that any stabilizable plant can be strongly stabilized by the controller with internal loop. This addresses an advantage of the controller with internal loop in the framework of nest algebra. By using the parametrization of the controller with internal loop, we are considering other questions in the control theory for the this model of closed-loop systems with internal loop.
Acknowledgments
The authors would like to thank Doctor Liu Liu for pointing out Lemma 3.1 and Doctor Gong Ting for her invaluable suggestions. This research is supported by NSFC, item number: 10971020.