This paper concerns the nonexistence of limit cycles in a class of nonlinear systems which are subject to norm-bounded parameter uncertainty in the state and input matrices. Based on Kalman-Yakubovich-Popov (KYP) lemma, sufficient conditions for the nonexistence of limit cycles in such uncertain nonlinear systems are derived in terms of linear matrix inequalities(LMIs) and an efficient way for estimation of the uncertainty bound is proposed by solving a generalized eigenvalue minimization problem. Based on the results, static state feedback controller and dynamic output feedback controller are designed ensuring the closed-loop uncertain nonlinear system has no limit cycles respectively. A concrete application to Chua's circuit shows th...
International audienceThis paper deals with the robust stabilization of uncertain discrete-time swit...
This paper proposes a convex approach to regional stability and ℒ₂⁻gain analysis and control synthes...
Dichotomy, or monostability, is one of the most important properties of nonlinear dynamic systems. F...
This paper focuses on the dichotomy of a class of nonlinear systems with norm-bounded parameter unce...
A reliable and accurate algorithm is proposed to compute the so-called limit cycle locus for separab...
This paper considers the existence of cycles of the second kind in uncertain pendulum-like systems w...
This paper focuses on a class of uncertain nonlinear systems which are subject to norm-bounded param...
This paper considers the problem of L-p stability checking for a feedback uncertain system which con...
Real world dynamic systems are frequently subjected to unknown disturbance inputs or perturbations. ...
summary:In this paper, we treat the class of nonlinear uncertain dynamic systems that was considered...
This paper considers robust performance analysis and H ∞ controller design for a class of systems wi...
The purpose of this paper is to study the problem of the stability of nonlinear systems with variabl...
The existence of cycles of the second kind was considered for Uncertain pendulum-like systems with s...
In this paper, properties of dichotomy for nonlinear systems with norm-bounded uncertainty are consi...
This paper is concerned with the problem of robust peak-to-peak gain minimization (the L1 or L?? ind...
International audienceThis paper deals with the robust stabilization of uncertain discrete-time swit...
This paper proposes a convex approach to regional stability and ℒ₂⁻gain analysis and control synthes...
Dichotomy, or monostability, is one of the most important properties of nonlinear dynamic systems. F...
This paper focuses on the dichotomy of a class of nonlinear systems with norm-bounded parameter unce...
A reliable and accurate algorithm is proposed to compute the so-called limit cycle locus for separab...
This paper considers the existence of cycles of the second kind in uncertain pendulum-like systems w...
This paper focuses on a class of uncertain nonlinear systems which are subject to norm-bounded param...
This paper considers the problem of L-p stability checking for a feedback uncertain system which con...
Real world dynamic systems are frequently subjected to unknown disturbance inputs or perturbations. ...
summary:In this paper, we treat the class of nonlinear uncertain dynamic systems that was considered...
This paper considers robust performance analysis and H ∞ controller design for a class of systems wi...
The purpose of this paper is to study the problem of the stability of nonlinear systems with variabl...
The existence of cycles of the second kind was considered for Uncertain pendulum-like systems with s...
In this paper, properties of dichotomy for nonlinear systems with norm-bounded uncertainty are consi...
This paper is concerned with the problem of robust peak-to-peak gain minimization (the L1 or L?? ind...
International audienceThis paper deals with the robust stabilization of uncertain discrete-time swit...
This paper proposes a convex approach to regional stability and ℒ₂⁻gain analysis and control synthes...
Dichotomy, or monostability, is one of the most important properties of nonlinear dynamic systems. F...