We develop a collection of numerical algorithms which connect ideas from polyhedral geometry and algebraic geometry. The first algorithm we develop functions as a numerical oracle for the Newton polytope of a hypersurface and is based on ideas of Hauenstein and Sottile. Additionally, we construct a numerical tropical membership algorithm which uses the former algorithm as a subroutine. Based on recent results of Esterov, we give an algorithm which recursively solves a sparse polynomial system when the support of that system is either lacunary or triangular. Prior to explaining these results, we give necessary background on polytopes, algebraic geometry, monodromy groups of branched covers, and numerical algebraic geometry
We introduce a general class of symmetric polynomials that have saturated Newton polytope and their ...
The combinatorial and geometric realization of polytopes are outlined in mathematical and computatio...
We design an algorithm to compute the Newton polytope of the re-sultant, known as resultant polytope...
We develop a collection of numerical algorithms which connect ideas from polyhedral geometry and alg...
2014 Spring.Numerical Algebraic Geometry (NAG) has recently seen significantly increased application...
We introduce and describe the Newton polyhedron related to a “minimal” counterexample to the Jacobia...
In this thesis, we study the effects of applying a modified Levenberg-Marquardt regularization to a...
We present a new software for computing Newton polytopes of resultant and discriminant polynomials...
The study of the Newton polytope of a parametric hypersurface is currently receiving a lot of attent...
Many interesting properties of polynomials are closely related to the geometry of their Newton polyt...
Numerical algebraic geometry studies methods to approach problems in algebraic geometry numerically....
We develop an incremental algorithm to compute the Newton polytope of the resultant, aka resultant ...
The classical Newton polygon is a device for computing the fractional power series expansions of alg...
Numerical nonlinear algebra is concerned with the development of numerical methods to solve problems...
AbstractWe use tropical geometry to compute the multidegree and Newton polytope of the hypersurface ...
We introduce a general class of symmetric polynomials that have saturated Newton polytope and their ...
The combinatorial and geometric realization of polytopes are outlined in mathematical and computatio...
We design an algorithm to compute the Newton polytope of the re-sultant, known as resultant polytope...
We develop a collection of numerical algorithms which connect ideas from polyhedral geometry and alg...
2014 Spring.Numerical Algebraic Geometry (NAG) has recently seen significantly increased application...
We introduce and describe the Newton polyhedron related to a “minimal” counterexample to the Jacobia...
In this thesis, we study the effects of applying a modified Levenberg-Marquardt regularization to a...
We present a new software for computing Newton polytopes of resultant and discriminant polynomials...
The study of the Newton polytope of a parametric hypersurface is currently receiving a lot of attent...
Many interesting properties of polynomials are closely related to the geometry of their Newton polyt...
Numerical algebraic geometry studies methods to approach problems in algebraic geometry numerically....
We develop an incremental algorithm to compute the Newton polytope of the resultant, aka resultant ...
The classical Newton polygon is a device for computing the fractional power series expansions of alg...
Numerical nonlinear algebra is concerned with the development of numerical methods to solve problems...
AbstractWe use tropical geometry to compute the multidegree and Newton polytope of the hypersurface ...
We introduce a general class of symmetric polynomials that have saturated Newton polytope and their ...
The combinatorial and geometric realization of polytopes are outlined in mathematical and computatio...
We design an algorithm to compute the Newton polytope of the re-sultant, known as resultant polytope...