Your search keyword '"Hua-Cheng Zhou"' showing total 6 results

1. ADMISSIBILITY AND OBSERVABILITY OF JEFFREYS TYPE OF OVERDAMPED SECOND ORDER LINEAR SYSTEMS.

Author

JIAN-HUA CHEN, XIAN-FENG ZHAO, and HUA-CHENG ZHOU

Subjects

LINEAR orderings, LINEAR systems, LINEAR differential equations, PARTIAL differential equations, HEAT conduction

Abstract

We study Jeffreys-type overdamped second order linear systems with observed outputs in the setting of Hilbert spaces. The state equation comes from an overdamped second order linear partial differential equation which is wave-like but was proposed to describe heat conduction. It results from adopting the Jeffreys law of constitutive relation for heat flux, rather than the usual Fourier law. Sufficient conditions for infinite-time admissibility of the system observation operator and system observability are obtained. In the general case, we obtain the infinite-time admissibility from that of the first order Cauchy system, which is done by employing the Hardy space approach. In the special case when the operator in the state equation is negative definite, we derive the infinite-time admissibility and system observability using a semigroup approach. Illustrative examples are given. [ABSTRACT FROM AUTHOR]

Published

2024

2. INFINITE-TIME ADMISSIBILITY OF THE GURTIN--PIPKIN SYSTEMS IN HILBERT SPACES.

Author

JIAN-HUA CHEN, LIN FU, and HUA-CHENG ZHOU

Subjects

HILBERT space, DIFFERENTIAL equations, HEAT conduction, EQUATIONS of state, COMPUTER simulation

Abstract

We study a class of integro--differential equation systems in Hilbert spaces which fits the Gurtin--Pipkin model of heat conduction with memory. Well-posedness of the system state equation is established using the operator semigroup approach. Sufficient conditions are then obtained under which infinite-time admissibility of the system observation operator follows from finite-time admissibility of the same observation operator for the associated second order Cauchy system without the first order term and convolution terms. This is done by combining the semigroup approach with the Hardy space method. An illustrative example is given, and the obtained theoretical results are verified by numerical simulations. [ABSTRACT FROM AUTHOR]

Published

2022

3. INFINITE HORIZON LINEAR QUADRATIC OVERTAKING OPTIMAL CONTROL PROBLEMS.

Author

JIANPING HUANG, JIONGMIN YONG, and HUA-CHENG ZHOU

Subjects

LINEAR control systems, CARLEMAN theorem, TIME perspective, COST functions, EQUATIONS of state

Abstract

A linear control system with quadratic cost functional over infinite time horizon is considered without assuming a controllability/stabilizability condition and the global integrability condition for the nonhomogeneous term of the state equation and the weight functions in the linear terms in the running cost rate function. Classical approaches do not apply for such problems. Existence and nonexistence of overtaking optimal controls in various cases are established. Some concrete examples are presented. These results show that the overtaking optimality approach can be used to solve some of the above-mentioned problems and at the same time, the limitation of this approach is also revealed. [ABSTRACT FROM AUTHOR]

Published

2021

4. OUTPUT FEEDBACK EXPONENTIAL STABILIZATION FOR ONE-DIMENSIONAL UNSTABLE WAVE EQUATIONS WITH BOUNDARY CONTROL MATCHED DISTURBANCE.

Author

HUA-CHENG ZHOU and WEISS, GEORGE

Subjects

*WAVE equation, *EXPONENTIAL stability, *MATHEMATICAL bounds, *BOUNDARY value problems, *FEEDBACK control systems

Abstract

We study the output feedback exponential stabilization of a one-dimensional unstable wave equation, where the boundary input, given by the Neumann trace at one end of the domain, is the sum of the control input and the total disturbance. The latter is composed of a nonlinear uncertain feedback term and an external bounded disturbance. Using the two boundary displacements as output signals, we design a disturbance estimator that does not use high gain. It is shown that the disturbance estimator can estimate the total disturbance in the sense that the estimation error signal is in L2[0;1). Using the estimated total disturbance, we design an observer whose state is exponentially convergent to the state of original system. Finally, we design an observer-based output feedback stabilizing controller. The total disturbance is approximately canceled in the feedback loop by its estimate. The closed-loop system is shown to be exponentially stable while guaranteeing that all the internal signals are uniformly bounded. [ABSTRACT FROM AUTHOR]

Published

2018

5. BOUNDARY FEEDBACK STABILIZATION FOR AN UNSTABLE TIME FRACTIONAL REACTION DIFFUSION EQUATION.

Author

HUA-CHENG ZHOU and BAO-ZHU GUO

Subjects

*EXISTENCE theorems, *BOUNDARY value problems, *UNSTABLE equilibrium (Physics), *HEAT equation, *FEEDBACK control systems

Abstract

In this paper, we consider boundary feedback stabilization for unstable time fractional reaction diffusion equations. New state feedback controls with actuation on one end are designed by the backstepping method for both Dirichlet and Neumann boundary controls. By the Riesz basis approach and the fractional Lyapunov method, we prove t he existence and uniqueness and the Mittag--Leffler stability for the closed-loop systems. For both cases, the observers and the observerbased output feedback are designed to stabilize the systems. [ABSTRACT FROM AUTHOR]

Published

2018

6. ACTIVE DISTURBANCE REJECTION CONTROL FOR REJECTING BOUNDARY DISTURBANCE FROM MULTIDIMENSIONAL KIRCHHOFF PLATE VIA BOUNDARY CONTROL.

Author

BAO-ZHU GUO and HUA-CHENG ZHOU

Subjects

*CLOSED loop systems, *DIFFERENTIAL equations, *FEEDBACK control systems, *ALGORITHMS, *LAPLACIAN matrices

Abstract

In this paper, an algorithm is developed to reject time and spatially varying boundary disturbances from a multidimensional Kirchhoff plate via boundary control. The disturbance and control input are assumed to be matched. The active disturbance rejection control approach is adopted for developing the algorithm. A state feedback scheme is designed to estimate the disturbance based on an infinite number of ordinary differential equations obtained from the original multidimensional system using infinitely many time-dependent test functions. The proposed control law cancels the disturbance using its estimated value. All subsystems in the closed loop are shown to be asymptotically stable. Simulation results are presented to validate the theoretical conclusions and to exhibit the reduction in the peaking phenomenon due to the use of time varying gains instead of constant high gains. [ABSTRACT FROM AUTHOR]

Published

2014