We show how the use of rational parameterizations facilitates the study of the number of solutions of many systems of equations involving polynomials and square roots of polynomials. We illustrate the effectiveness of this approach, applying it to several problems appearing in the study of some dynamical systems. Our examples include Abelian integrals, Melnikov functions and a couple of questions in Celestial Mechanics: the computation of some relative equilibria and the study of some central configuration
AbstractLet K be a field of characteristic zero and M(Y) =N a system of linear differential equation...
This book starts with an overview of the research of Gröbner bases which have many applications in v...
Systems of algebraic equations with interval coefficients are very common in several areas of engine...
We show how the use of rational parameterizations facilitates the study of the number of solutions o...
AbstractA number of problems in celestial mechanics, some Hamiltonian systems and non-Hamiltonian on...
One of the keys of the qualitative theory of differential equations is the de-termination of equilib...
19 pages, 4 algorithms, 4 tables, 1 figureDetailed dynamical systems models used in life sciences ma...
This paper investigates the number of solutions of a simulta-neous set of polynomial equations. The ...
Thesis. Karmarkar\u27s algorithm to solve linear programs has renewed interest in interior point met...
In [3] we presented a technique to study the existence of rational solutions for systems of linear f...
Here we describe eight new methods, arisen in the last 60 years, to study solutions of a Hamiltonian...
The celebrated Hilbert\u27s 10th problem asks for an algorithm to decide whether a system of po...
Abstract. We give a necessary and sufficient condition for an ODE to have a rational type general so...
Given a system of differential equations, normally it is not possible to find the associated solutio...
Multiplicity of equilibria is a common problem in many economic models. In general, it is impossible...
AbstractLet K be a field of characteristic zero and M(Y) =N a system of linear differential equation...
This book starts with an overview of the research of Gröbner bases which have many applications in v...
Systems of algebraic equations with interval coefficients are very common in several areas of engine...
We show how the use of rational parameterizations facilitates the study of the number of solutions o...
AbstractA number of problems in celestial mechanics, some Hamiltonian systems and non-Hamiltonian on...
One of the keys of the qualitative theory of differential equations is the de-termination of equilib...
19 pages, 4 algorithms, 4 tables, 1 figureDetailed dynamical systems models used in life sciences ma...
This paper investigates the number of solutions of a simulta-neous set of polynomial equations. The ...
Thesis. Karmarkar\u27s algorithm to solve linear programs has renewed interest in interior point met...
In [3] we presented a technique to study the existence of rational solutions for systems of linear f...
Here we describe eight new methods, arisen in the last 60 years, to study solutions of a Hamiltonian...
The celebrated Hilbert\u27s 10th problem asks for an algorithm to decide whether a system of po...
Abstract. We give a necessary and sufficient condition for an ODE to have a rational type general so...
Given a system of differential equations, normally it is not possible to find the associated solutio...
Multiplicity of equilibria is a common problem in many economic models. In general, it is impossible...
AbstractLet K be a field of characteristic zero and M(Y) =N a system of linear differential equation...
This book starts with an overview of the research of Gröbner bases which have many applications in v...
Systems of algebraic equations with interval coefficients are very common in several areas of engine...