Numerical algebraic geometry provides a number of efficient tools for approximating the solutions of polynomial systems. One such tool is the parameter homotopy, which can be an extremely efficient method to solve numerous polynomial systems that differ only in coefficients, not monomials. This technique is frequently used for solving a parameterized family of polynomial systems at multiple parameter values. Parameter homotopies have recently been useful in several areas of application and have been implemented in at least two software packages. This article describes Paramotopy, a new, parallel, optimized implementa-tion of this technique, making use of the implementation in the Bertini software package. The novel features of this implemen...
Globally convergent, probability-one homotopy methods have proven to be very effective for find-ing ...
PHCpack is a software package to solve polynomial systems via homotopy continuation methods. In the ...
Homotopies for polynomial systems provide computational evidence for a challenging instance of a con...
Numerical algebraic geometry provides a number of efficient tools for approximating the solutions of...
A system of multi variables polynomial equations arises in many fields of science and engineering. T...
Homotopy algorithms combine beautiful mathematics with the capability to solve complicated nonlinear...
2014 Spring.Numerical Algebraic Geometry (NAG) has recently seen significantly increased application...
We present the canonical Gröbner Cover method for discussing parametric polynomial systems of equati...
We present a survey of some basic ideas involved in the use of homotopies for solving systems of pol...
Many applications modeled by polynomial systems have positive dimensional solution components (e.g.,...
AbstractA polynomial programming problem is a nonlinear programming problem where the objective func...
Numerical algebraic geometry is the area devoted to the solution and manipulation of polynomial syst...
The polyhedral homotopy continuation method is known to be a successful method for finding all isola...
The polyhedral homotopy continuation method is known to be a successful method for finding all isola...
Many applications modeled by polynomial systems have positive dimensional solution components (e.g.,...
Globally convergent, probability-one homotopy methods have proven to be very effective for find-ing ...
PHCpack is a software package to solve polynomial systems via homotopy continuation methods. In the ...
Homotopies for polynomial systems provide computational evidence for a challenging instance of a con...
Numerical algebraic geometry provides a number of efficient tools for approximating the solutions of...
A system of multi variables polynomial equations arises in many fields of science and engineering. T...
Homotopy algorithms combine beautiful mathematics with the capability to solve complicated nonlinear...
2014 Spring.Numerical Algebraic Geometry (NAG) has recently seen significantly increased application...
We present the canonical Gröbner Cover method for discussing parametric polynomial systems of equati...
We present a survey of some basic ideas involved in the use of homotopies for solving systems of pol...
Many applications modeled by polynomial systems have positive dimensional solution components (e.g.,...
AbstractA polynomial programming problem is a nonlinear programming problem where the objective func...
Numerical algebraic geometry is the area devoted to the solution and manipulation of polynomial syst...
The polyhedral homotopy continuation method is known to be a successful method for finding all isola...
The polyhedral homotopy continuation method is known to be a successful method for finding all isola...
Many applications modeled by polynomial systems have positive dimensional solution components (e.g.,...
Globally convergent, probability-one homotopy methods have proven to be very effective for find-ing ...
PHCpack is a software package to solve polynomial systems via homotopy continuation methods. In the ...
Homotopies for polynomial systems provide computational evidence for a challenging instance of a con...