We develop numerical homotopy algorithms for solving systems of polynomial equations arising from the classical Schubert calculus. These homotopies are optimal in that generically no paths diverge. For problems defined by hypersurface Schubert conditions we give two algorithms based on extrinsic deformations of the Grassmannian: one is derived from a Grobner basis for the Plucker ideal of the Grassmannian and the other from a SAGBI basis for its projective coordinate ring. The more general case of special Schubert conditions is solved by delicate intrinsic deformations, called Pieri homotopies, which first arose in the study of enumerative geometry over the real numbers. Computational results are presented and applications to control theory...
Abstract: We prove an elegant combinatorial rule for the generation of Schubert polynomials based on...
Homotopy algorithms combine beautiful mathematics with the capability to solve complicated nonlinear...
Numerical nonlinear algebra is concerned with the development of numerical methods to solve problems...
AbstractWe develop numerical homotopy algorithms for solving systems of polynomial equations arising...
We develop numerical homotopy algorithms for solving systems of polynomial equations arising from th...
Numerical homotopy continuation of solutions to polynomial equations is the foundation for numerical...
Abstract. Traditional formulations of geometric problems from the Schubert calculus, either in Plüc...
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...
Many aspects of Schubert calculus are easily modeled on a com-puter. This enables large-scale experi...
Schubert calculus refers to the calculus of enumerative geometry, which is the art of counting geome...
An enumerative problem asks the following type of question; how many figures (lines, planes, conies,...
A longstanding problem in algebraic combinatorics is to find nonnegative combinatorial rules for the...
Many applications modeled by polynomial systems have positive dimensional solution components (e.g.,...
We describe a Schubert induction theorem, a tool for analyzing intersections on a Grassmannian over ...
Abstract: We prove an elegant combinatorial rule for the generation of Schubert polynomials based on...
Homotopy algorithms combine beautiful mathematics with the capability to solve complicated nonlinear...
Numerical nonlinear algebra is concerned with the development of numerical methods to solve problems...
AbstractWe develop numerical homotopy algorithms for solving systems of polynomial equations arising...
We develop numerical homotopy algorithms for solving systems of polynomial equations arising from th...
Numerical homotopy continuation of solutions to polynomial equations is the foundation for numerical...
Abstract. Traditional formulations of geometric problems from the Schubert calculus, either in Plüc...
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...
Many aspects of Schubert calculus are easily modeled on a com-puter. This enables large-scale experi...
Schubert calculus refers to the calculus of enumerative geometry, which is the art of counting geome...
An enumerative problem asks the following type of question; how many figures (lines, planes, conies,...
A longstanding problem in algebraic combinatorics is to find nonnegative combinatorial rules for the...
Many applications modeled by polynomial systems have positive dimensional solution components (e.g.,...
We describe a Schubert induction theorem, a tool for analyzing intersections on a Grassmannian over ...
Abstract: We prove an elegant combinatorial rule for the generation of Schubert polynomials based on...
Homotopy algorithms combine beautiful mathematics with the capability to solve complicated nonlinear...
Numerical nonlinear algebra is concerned with the development of numerical methods to solve problems...