The problem of estimating the domain of attraction (DA) of equilibria is considered for odd polynomial systems. Specifically, the computation of the optimal quadratic Lyapunov function (OQLF), i.e. the quadratic Lyapunov function (QLF) which maximizes the volume of the largest estimate of the DA (LEDA), is addressed. In order to tackle this double non-convex optimization problem, a relaxation approach based on homogeneous polynomial forms is proposed. The first contribution of the paper shows that a lower bound of the LEDA for a fixed QLF can be obtained via linear matrix inequalities (LMIs) based procedures. Also, condition for checking tightness of the lower bound are provided. The second contribution is a strategy for selecting a good st...
The problem addressed in this paper is the construction of homogeneous polynomial Lyapunov functions...
Track: 729-038This paper addresses the problem of control synthesis for enlarging the robust domain ...
A relaxation of Lyapunov's direct method has been proposed recently that allows for an algorithmic c...
The problem of estimating the domain of attraction (DA) of equilibria is considered for odd polynomi...
Abstract: The problem of estimating the domain of attraction (DA) of equilibria of polynomial system...
The problem of computing the Largest Estimate of the Domain of Attraction (LEDA) of an equilibrium p...
The algorithms for computing estimates of the domain attraction of an equilibrium point consists of ...
This paper proposes a strategy for estimating the domain of attraction (DA) for non-polynomial syste...
Estimating the Domain of Attraction (DA) of equilibrium points is a problem of fundamental importanc...
Abstract: Estimating the Domain of Attraction (DA) of equilibrium points is a problem of fundamental...
Estimating the Domain of Attraction (DA) of equilibrium points is a problem of fundamental importanc...
The problem of computing controllers to enlarge the domain of attraction (DA) of equilibrium points ...
The problem addressed in this paper is the construction of homogeneous polynomial Lyapunov functions...
Abstract. In this paper, we present a method for computing a basin of attraction to a tar-get region...
We propose using (bilinear) sum-of-squares programming for obtaining inner bounds of regions-of-attr...
The problem addressed in this paper is the construction of homogeneous polynomial Lyapunov functions...
Track: 729-038This paper addresses the problem of control synthesis for enlarging the robust domain ...
A relaxation of Lyapunov's direct method has been proposed recently that allows for an algorithmic c...
The problem of estimating the domain of attraction (DA) of equilibria is considered for odd polynomi...
Abstract: The problem of estimating the domain of attraction (DA) of equilibria of polynomial system...
The problem of computing the Largest Estimate of the Domain of Attraction (LEDA) of an equilibrium p...
The algorithms for computing estimates of the domain attraction of an equilibrium point consists of ...
This paper proposes a strategy for estimating the domain of attraction (DA) for non-polynomial syste...
Estimating the Domain of Attraction (DA) of equilibrium points is a problem of fundamental importanc...
Abstract: Estimating the Domain of Attraction (DA) of equilibrium points is a problem of fundamental...
Estimating the Domain of Attraction (DA) of equilibrium points is a problem of fundamental importanc...
The problem of computing controllers to enlarge the domain of attraction (DA) of equilibrium points ...
The problem addressed in this paper is the construction of homogeneous polynomial Lyapunov functions...
Abstract. In this paper, we present a method for computing a basin of attraction to a tar-get region...
We propose using (bilinear) sum-of-squares programming for obtaining inner bounds of regions-of-attr...
The problem addressed in this paper is the construction of homogeneous polynomial Lyapunov functions...
Track: 729-038This paper addresses the problem of control synthesis for enlarging the robust domain ...
A relaxation of Lyapunov's direct method has been proposed recently that allows for an algorithmic c...