Add to ORKGAbstract We present a method for solving arbitrary systems of N nonlinear polynomials in n variables over an n-dimensional simplicial domain based on polynomial representation in the barycentric Bernstein basis and subdivision. The roots are approximated to arbitrary precision by iteratively constructing a series of smaller bounding simplices. We use geometric subdivision to isolate multiple roots within a simplex. An algorithm implementing this method in rounded interval arithmetic is described and analyzed. We find that when the total order of polynomials is close to the maximum order of each variable, an iteration of this solver algorithm is asymptotically more efficient than the corresponding step in a similar algorithm which relies on ...
AbstractGiven a system of polynomial equations and inequations with coefficients in the field of rat...
This paper discusses an algorithm to solve polynomial constraints over finite domains, namely constr...
In this paper we present methods for the computation of roots of univariate and bivariate nonlinear ...
We present a method for solving arbitrary systems of N nonlinear polynomials in n variables over an ...
AbstractThis paper presents a new algorithm for solving a system of polynomials, in a domain of Rn. ...
Abstract—In this paper we present an improvement of the algorithm based on recursive de Casteljau su...
International audienceThis paper presents a new algorithm for solving a system of polynomials, in a ...
We present an algorithm which computes all roots of a given bivariate polynomial system within a giv...
This paper discusses the processing of non-linear polynomial systems using a branch and prune algori...
International audienceThe tensorial Bernstein basis for multivariate polynomials in n variables has ...
Finding the solutions of a polynomial system is a fundamental problem with numerous applications in ...
Systems of polynomial equations arise naturally from many problems in applied mathematics and engine...
International audienceThis article reviews the properties of Tensorial Bernstein Basis (TBB) and its...
AbstractComputational methods for manipulating sets of polynomial equations are becoming of greater ...
A method for enclosing all solutions to a system of polynomial equations inside a given box is prese...
AbstractGiven a system of polynomial equations and inequations with coefficients in the field of rat...
This paper discusses an algorithm to solve polynomial constraints over finite domains, namely constr...
In this paper we present methods for the computation of roots of univariate and bivariate nonlinear ...
We present a method for solving arbitrary systems of N nonlinear polynomials in n variables over an ...
AbstractThis paper presents a new algorithm for solving a system of polynomials, in a domain of Rn. ...
Abstract—In this paper we present an improvement of the algorithm based on recursive de Casteljau su...
International audienceThis paper presents a new algorithm for solving a system of polynomials, in a ...
We present an algorithm which computes all roots of a given bivariate polynomial system within a giv...
This paper discusses the processing of non-linear polynomial systems using a branch and prune algori...
International audienceThe tensorial Bernstein basis for multivariate polynomials in n variables has ...
Finding the solutions of a polynomial system is a fundamental problem with numerous applications in ...
Systems of polynomial equations arise naturally from many problems in applied mathematics and engine...
International audienceThis article reviews the properties of Tensorial Bernstein Basis (TBB) and its...
AbstractComputational methods for manipulating sets of polynomial equations are becoming of greater ...
A method for enclosing all solutions to a system of polynomial equations inside a given box is prese...
AbstractGiven a system of polynomial equations and inequations with coefficients in the field of rat...
This paper discusses an algorithm to solve polynomial constraints over finite domains, namely constr...
In this paper we present methods for the computation of roots of univariate and bivariate nonlinear ...