A Polyhedral Method for Solving Sparse Polynomial Systems 论文
1995Mathematics of Computation引用 292
Advanced Numerical Analysis TechniquesPolynomial and algebraic computationCommutative Algebra and Its Applications
摘要
A continuation method is presented for computing all isolated roots of a semimixed sparse system of polynomial equations. We introduce mixed subdivisions of Newton polytopes, and we apply them to give a new proof and algorithm for Bernsteinâs theorem on the expected number of roots. This results in a numerical homotopy with the optimal number of paths to be followed. In this homotopy there is one starting system for each cell of the mixed subdivision, and the roots of these starting systems are obtained by an easy combinatorial construction.