AbstractGiven a polynomial x∈Rn↦p(x) in n=2 variables, a symbolic-numerical algorithm is first described for detecting whether the connected component of the plane sublevel set P={x:p(x)⩾0} containing the origin is rigidly convex, or equivalently, whether it has a linear matrix inequality (LMI) representation, or equivalently, if polynomial p(x) is hyperbolic with respect to the origin. The problem boils down to checking whether a univariate polynomial matrix is positive semidefinite, an optimization problem that can be solved with eigenvalue decomposition. When the variety C={x:p(x)=0} is an algebraic curve of genus zero, a second algorithm based on Bézoutians is proposed to detect whether P has an LMI representation and to build such a re...
The notion of sos-convexity has recently been proposed as a tractable sufficient condition for conve...
We address the long-standing problem of computing the region of attraction (ROA) of a target set (e....
This paper considers the problem of solving certain classes of polynomial systems. This is a well kn...
International audienceGiven a polynomial $x \in {\mathbb R}^n \mapsto p(x)$ in $n=2$ variables, a sy...
AbstractGiven a polynomial x∈Rn↦p(x) in n=2 variables, a symbolic-numerical algorithm is first descr...
Abstract: Many practical problems can be formulated as convex optimization problems over the cone of...
Many problems of systems control theory boil down to solving polynomial equations, polynomial inequa...
In the complex plane, the frequency response of a univariate polynomial is the set of values taken b...
The set of controllers stabilizing a linear system is generally non-convex in the parameter space. I...
AbstractHyperbolic or more generally definite matrix polynomials are important classes of Hermitian ...
Polynomial and homogeneous polynomial Lyapunov functions have recently received a lot of attention f...
We present an algebraic approach to the classical problem of constructing a simplicial convex polyto...
First, we consider how to efficiently determine whether a piecewise-defined function in 2D is convex...
In the past twenty years, a strong interplay has developed between convex optimization and algebraic...
A 0,±1 matrix is balanced if it does not contain a square submatrix with two nonzero elements per ro...
The notion of sos-convexity has recently been proposed as a tractable sufficient condition for conve...
We address the long-standing problem of computing the region of attraction (ROA) of a target set (e....
This paper considers the problem of solving certain classes of polynomial systems. This is a well kn...
International audienceGiven a polynomial $x \in {\mathbb R}^n \mapsto p(x)$ in $n=2$ variables, a sy...
AbstractGiven a polynomial x∈Rn↦p(x) in n=2 variables, a symbolic-numerical algorithm is first descr...
Abstract: Many practical problems can be formulated as convex optimization problems over the cone of...
Many problems of systems control theory boil down to solving polynomial equations, polynomial inequa...
In the complex plane, the frequency response of a univariate polynomial is the set of values taken b...
The set of controllers stabilizing a linear system is generally non-convex in the parameter space. I...
AbstractHyperbolic or more generally definite matrix polynomials are important classes of Hermitian ...
Polynomial and homogeneous polynomial Lyapunov functions have recently received a lot of attention f...
We present an algebraic approach to the classical problem of constructing a simplicial convex polyto...
First, we consider how to efficiently determine whether a piecewise-defined function in 2D is convex...
In the past twenty years, a strong interplay has developed between convex optimization and algebraic...
A 0,±1 matrix is balanced if it does not contain a square submatrix with two nonzero elements per ro...
The notion of sos-convexity has recently been proposed as a tractable sufficient condition for conve...
We address the long-standing problem of computing the region of attraction (ROA) of a target set (e....
This paper considers the problem of solving certain classes of polynomial systems. This is a well kn...