Polynomial systems of equations frequently arise in solid modelling, robotics, computer vision, chemistry, chemical engineering, and mechanical engineering. Locally convergent iterative methods such as quasi-Newton methods may diverge or fail to find all meaningful solutions of a polynomial system. Recently a homotopy algorithm has been proposed for polynomial systems that is guaranteed globally convergent (always converges from an arbitrary starting point) with probability one, finds all solutions to the polynomial system, and has a large amount of inherent parallelism. For this homotopy algorithm and a given decomposition strategy, the communication overhead for several possible communication stritegies is explored empirically in this pap...
AbstractThis paper presents a new algorithm for solving a system of polynomials, in a domain of Rn. ...
We extend classical methods of computational complexity to the setting of distributed computing, whe...
We present a study of the implementational aspects of iterative methods to solve systems of linear e...
Comparisons between problems solved on uniprocessor systems and those solved on distributed computin...
Certain classes of nonlinear systems of equations, such as polynomial systems, have properties that ...
This thesis examines the algorithmic and practical challenges of solving systems of polynomial equat...
AbstractThe solution of large sparse positive definite systems of equations typically involves four ...
Globally convergent, probability-one homotopy methods have proven to be very effective for find-ing ...
A system of multi variables polynomial equations arises in many fields of science and engineering. T...
The basic theory for probability one globally convergent homotopy algorithms was developed in 1976, ...
We consider the problem of tracking one solution path defined by a polynomial homotopy on a parallel...
AbstractThis paper defines a generalization of Newton’s method to deal with solution paths defined b...
Contents Chapter I. Introduction 1 1. Systems of polynomials with Integer coefficients 1 2. Global c...
AbstractIn this paper, an efficient parallel algorithm for solving hyperbolic Partial Differential E...
Homotopy algorithms combine beautiful mathematics with the capability to solve complicated nonlinear...
AbstractThis paper presents a new algorithm for solving a system of polynomials, in a domain of Rn. ...
We extend classical methods of computational complexity to the setting of distributed computing, whe...
We present a study of the implementational aspects of iterative methods to solve systems of linear e...
Comparisons between problems solved on uniprocessor systems and those solved on distributed computin...
Certain classes of nonlinear systems of equations, such as polynomial systems, have properties that ...
This thesis examines the algorithmic and practical challenges of solving systems of polynomial equat...
AbstractThe solution of large sparse positive definite systems of equations typically involves four ...
Globally convergent, probability-one homotopy methods have proven to be very effective for find-ing ...
A system of multi variables polynomial equations arises in many fields of science and engineering. T...
The basic theory for probability one globally convergent homotopy algorithms was developed in 1976, ...
We consider the problem of tracking one solution path defined by a polynomial homotopy on a parallel...
AbstractThis paper defines a generalization of Newton’s method to deal with solution paths defined b...
Contents Chapter I. Introduction 1 1. Systems of polynomials with Integer coefficients 1 2. Global c...
AbstractIn this paper, an efficient parallel algorithm for solving hyperbolic Partial Differential E...
Homotopy algorithms combine beautiful mathematics with the capability to solve complicated nonlinear...
AbstractThis paper presents a new algorithm for solving a system of polynomials, in a domain of Rn. ...
We extend classical methods of computational complexity to the setting of distributed computing, whe...
We present a study of the implementational aspects of iterative methods to solve systems of linear e...