Add to ORKGWe show how to use numerical continuation to compute the intersection C = A\B of two algebraic sets A and B, where A, B, and C are numerically represented by witness sets. Enroute to this result, we first show how to nd the irreducible decomposition of a system of polynomials restricted to an algebraic set. The intersection of components A and B then follows by considering the decomposition of the diagonal system of equations u v = 0 restricted to fu; vg 2 A B. One offshoot of this new approach is that one can solve a large system of equations by finding the solution components of its subsystems and then intersecting these. It also allows one to find the intersection of two components of the two polynomial systems, which is not possible w...
AbstractMany applications modeled by polynomial systems have positive dimensional solution component...
Homotopy continuation methods have proven to be reliable and efficient to approximate all isolated s...
Abstract. We present a new continuation algorithm to find all nondegenerate real solu-tions to a sys...
AbstractRecently we developed a diagonal homotopy method to compute a numerical representation of al...
Many applications modeled by polynomial systems have positive dimensional solution components (e.g.,...
In numerical algebraic geometry, algebraic sets are represented by witness sets. This paper presents...
Many applications modeled by polynomial systems have positive dimensional solution components (e.g.,...
We present a survey of some basic ideas involved in the use of homotopies for solving systems of pol...
Recently we developed a diagonal homotopy method to compute a numerical representation of all positi...
Based on techniques developed by Kuhn [1974, 1977, 1984] and Forster [1992] this paper investigates ...
Homotopy algorithms combine beautiful mathematics with the capability to solve complicated nonlinear...
Abstract. Globally, the solution set of a system of polynomial equations with complex coefficients c...
Abstract: Our problem is to decompose a positive dimensional solution set of a polynomial system int...
Homotopies for polynomial systems provide computational evidence for a challenging instance of a con...
Homotopies for polynomial systems provide computational evidence for a challenging instance of a con...
AbstractMany applications modeled by polynomial systems have positive dimensional solution component...
Homotopy continuation methods have proven to be reliable and efficient to approximate all isolated s...
Abstract. We present a new continuation algorithm to find all nondegenerate real solu-tions to a sys...
AbstractRecently we developed a diagonal homotopy method to compute a numerical representation of al...
Many applications modeled by polynomial systems have positive dimensional solution components (e.g.,...
In numerical algebraic geometry, algebraic sets are represented by witness sets. This paper presents...
Many applications modeled by polynomial systems have positive dimensional solution components (e.g.,...
We present a survey of some basic ideas involved in the use of homotopies for solving systems of pol...
Recently we developed a diagonal homotopy method to compute a numerical representation of all positi...
Based on techniques developed by Kuhn [1974, 1977, 1984] and Forster [1992] this paper investigates ...
Homotopy algorithms combine beautiful mathematics with the capability to solve complicated nonlinear...
Abstract. Globally, the solution set of a system of polynomial equations with complex coefficients c...
Abstract: Our problem is to decompose a positive dimensional solution set of a polynomial system int...
Homotopies for polynomial systems provide computational evidence for a challenging instance of a con...
Homotopies for polynomial systems provide computational evidence for a challenging instance of a con...
AbstractMany applications modeled by polynomial systems have positive dimensional solution component...
Homotopy continuation methods have proven to be reliable and efficient to approximate all isolated s...
Abstract. We present a new continuation algorithm to find all nondegenerate real solu-tions to a sys...