AbstractWe consider a family of sparse polynomial systems denned by a directed graph and a bipartite graph which depend on certain parameters. A convex polyhedral cone serves as a representative of all positive solutions of the family. We study the boundary of this cone with Bernstein's second theorem and Viro's method. In particular we present new results about the parameter regions where several positive solutions appear. Since they are steady states of an underlying dynamical system of mass action kinetics, the resulting multistationarity has important implications for the dynamics of that system. Examples from applications illustrate the theoretical results
Abstract. We consider sparse elimination theory in order to describe the Newton polytope of the spar...
We address the long-standing problem of computing the region of attraction (ROA) of a target set (e....
Abstract. We consider real polynomials in finitely many variables. Let the variables consist of fini...
AbstractWe consider a family of sparse polynomial systems denned by a directed graph and a bipartite...
AbstractThe positive steady states of chemical reaction systems modeled by mass action kinetics are ...
International audienceWe investigate a version of Viro's method for constructing polynomial systems ...
The polynomial differential system modeling the behavior of a chemical reaction is given by graph t...
This thesis develops various aspects of Algebraic Geometry and its applications in different fields ...
Given a real sparse polynomial system, we present a general framework to find explicit coefficients ...
Consider a regular triangulation of the convex-hull $P$ of a set $\mathcal A$ of $n$ points in $\mat...
This thesis presents a study of polynomial dynamical systems motivated by both thewide spectrum of a...
AbstractA family of polynomial differential systems describing the behavior of a chemical reaction n...
A family of polynomial differential systems describing the behavior of a chemical reaction network w...
Let P1,..., Pn and Q1,...,Qn be convex polytopes in Rn such that Pi is a proper subset of Qi . It is...
We present a computational approach for constructing Sylvester style resultants for sparse systems o...
Abstract. We consider sparse elimination theory in order to describe the Newton polytope of the spar...
We address the long-standing problem of computing the region of attraction (ROA) of a target set (e....
Abstract. We consider real polynomials in finitely many variables. Let the variables consist of fini...
AbstractWe consider a family of sparse polynomial systems denned by a directed graph and a bipartite...
AbstractThe positive steady states of chemical reaction systems modeled by mass action kinetics are ...
International audienceWe investigate a version of Viro's method for constructing polynomial systems ...
The polynomial differential system modeling the behavior of a chemical reaction is given by graph t...
This thesis develops various aspects of Algebraic Geometry and its applications in different fields ...
Given a real sparse polynomial system, we present a general framework to find explicit coefficients ...
Consider a regular triangulation of the convex-hull $P$ of a set $\mathcal A$ of $n$ points in $\mat...
This thesis presents a study of polynomial dynamical systems motivated by both thewide spectrum of a...
AbstractA family of polynomial differential systems describing the behavior of a chemical reaction n...
A family of polynomial differential systems describing the behavior of a chemical reaction network w...
Let P1,..., Pn and Q1,...,Qn be convex polytopes in Rn such that Pi is a proper subset of Qi . It is...
We present a computational approach for constructing Sylvester style resultants for sparse systems o...
Abstract. We consider sparse elimination theory in order to describe the Newton polytope of the spar...
We address the long-standing problem of computing the region of attraction (ROA) of a target set (e....
Abstract. We consider real polynomials in finitely many variables. Let the variables consist of fini...