Add to ORKGInternational audienceIn this paper, another step on relaxation for Ta-kagi-Sugeno systems' stability analysis is addressed. Inspired from non-quadratic Lyapunov functions (NQLF), regarding to quadratic ones, a multiple polynomial Lyapunov function (MPLF) is proposed as an extension to polynomial Lyapunov function approaches. Following the latter post-LMI challenge, the obtained stability conditions are written in terms of a sum-of-squares (SOS) optimization problem. The proposed MPLF includes the well-studied NQLF ones as a special case. Moreover, the proposed SOS based stability conditions don't require unknown parameters in advance, as well as guarantee, when a solution exists, global stability. Therefore, these drawbacks of classical LM...
Summary. Recent advances in semidefinite programming along with use of the sum of squares decomposit...
This paper introduces a general framework for analysing systems that have non-polynomial, uncertain ...
Recent advances in semidefinite programming along with use of the sum of squares decomposition to ch...
A relaxation of Lyapunov's direct method has been proposed elsewhere that allows for an algorithmic ...
A relaxation of Lyapunov's direct method has been proposed recently that allows for an algorithmic c...
The sum of squares (SOS) decomposition technique allows numerical methods such as semidefinite progr...
A relaxation of Lyapunov's direct method has been proposed elsewhere that allows for an algorithmic ...
Despite the pervasiveness of sum of squares (sos) techniques in Lyapunov analysis of dynamical syste...
We propose using (bilinear) sum-of-squares programming for obtaining inner bounds of regions-of-attr...
Les travaux de cette thèse portent sur la stabilité et la stabilisation des systèmes non-linaires re...
Sum of Squares programming has been used extensively over the past decade for the stability analysis...
Abstract—Sum of Squares programming has been used exten-sively over the past decade for the stabilit...
This paper introduces a general framework for analysing nonlinear systems using absolute stability t...
Recent advances in semidefinite programming along with use of the sum of squares decomposition to ch...
In this paper, we show that local exponential stability of a polynomial vector field implies the exi...
Summary. Recent advances in semidefinite programming along with use of the sum of squares decomposit...
This paper introduces a general framework for analysing systems that have non-polynomial, uncertain ...
Recent advances in semidefinite programming along with use of the sum of squares decomposition to ch...
A relaxation of Lyapunov's direct method has been proposed elsewhere that allows for an algorithmic ...
A relaxation of Lyapunov's direct method has been proposed recently that allows for an algorithmic c...
The sum of squares (SOS) decomposition technique allows numerical methods such as semidefinite progr...
A relaxation of Lyapunov's direct method has been proposed elsewhere that allows for an algorithmic ...
Despite the pervasiveness of sum of squares (sos) techniques in Lyapunov analysis of dynamical syste...
We propose using (bilinear) sum-of-squares programming for obtaining inner bounds of regions-of-attr...
Les travaux de cette thèse portent sur la stabilité et la stabilisation des systèmes non-linaires re...
Sum of Squares programming has been used extensively over the past decade for the stability analysis...
Abstract—Sum of Squares programming has been used exten-sively over the past decade for the stabilit...
This paper introduces a general framework for analysing nonlinear systems using absolute stability t...
Recent advances in semidefinite programming along with use of the sum of squares decomposition to ch...
In this paper, we show that local exponential stability of a polynomial vector field implies the exi...
Summary. Recent advances in semidefinite programming along with use of the sum of squares decomposit...
This paper introduces a general framework for analysing systems that have non-polynomial, uncertain ...
Recent advances in semidefinite programming along with use of the sum of squares decomposition to ch...