AbstractIn this paper, the author presents a new method for iteratively finding a real solution of an arbitrary system of nonlinear algebraic equations, where the system can be overdetermined or underdetermined and its Jacobian matrix can be of any (positive) rank. When the number of equations is equal to the number of variables and the Jacobian matrix of the system is nonsingular, the method is similar to the well-known Newton's method.The method is a hybrid symbolic-numerical method, in that we utilize some extended procedures from classical computer algebra together with ideas and algorithmic techniques from numerical computation, namely Newton's method and pseudoinverse matrices. First the symbolic techniques are used to transform an ar...
Iterative methods have been a very important area of study in numerical analysis since the inception...
AbstractThe computer generated symbolic Cayley-Hamilton recursion solution of the matrix equation dx...
Numerical algebraic geometry studies methods to approach problems in algebraic geometry numerically....
AbstractIn this paper, the author presents a new method for iteratively finding a real solution of a...
International audienceIn this work, we provide an overview of the classical symbolic techniques for ...
A new method for finding approximate solutions of nonlinear algebraic equations is proposed. Here we...
AbstractThe symbolic solution, x = exp(At)x(0), of the n-th order linear system, dx/dt = Ax, is appr...
Abstract: Iterative algorithms for solving a system of nonlinear algebraic equa-tions (NAEs): Fi(x j...
In numerical mathematics, there is a need for methods which provide a user with the solution to his ...
AbstractWe briefly survey several existing methods for solving polynomial systems with inexact coeff...
Iteration methods are very useful in solving nonlinear algebraic equations. The most famous such met...
AbstractThe Behavior of the Newton-Raphson method at the singular roots has been studied by a number...
AbstractWe propose an algorithm for isolating the real solutions of semi-algebraic systems, which ha...
Symbolic computation has been applied to Runge-Kutta technique in order to solve a two-point boundar...
AbstractBy modifying and combining algorithms in symbolic and numerical computation, we propose a re...
Iterative methods have been a very important area of study in numerical analysis since the inception...
AbstractThe computer generated symbolic Cayley-Hamilton recursion solution of the matrix equation dx...
Numerical algebraic geometry studies methods to approach problems in algebraic geometry numerically....
AbstractIn this paper, the author presents a new method for iteratively finding a real solution of a...
International audienceIn this work, we provide an overview of the classical symbolic techniques for ...
A new method for finding approximate solutions of nonlinear algebraic equations is proposed. Here we...
AbstractThe symbolic solution, x = exp(At)x(0), of the n-th order linear system, dx/dt = Ax, is appr...
Abstract: Iterative algorithms for solving a system of nonlinear algebraic equa-tions (NAEs): Fi(x j...
In numerical mathematics, there is a need for methods which provide a user with the solution to his ...
AbstractWe briefly survey several existing methods for solving polynomial systems with inexact coeff...
Iteration methods are very useful in solving nonlinear algebraic equations. The most famous such met...
AbstractThe Behavior of the Newton-Raphson method at the singular roots has been studied by a number...
AbstractWe propose an algorithm for isolating the real solutions of semi-algebraic systems, which ha...
Symbolic computation has been applied to Runge-Kutta technique in order to solve a two-point boundar...
AbstractBy modifying and combining algorithms in symbolic and numerical computation, we propose a re...
Iterative methods have been a very important area of study in numerical analysis since the inception...
AbstractThe computer generated symbolic Cayley-Hamilton recursion solution of the matrix equation dx...
Numerical algebraic geometry studies methods to approach problems in algebraic geometry numerically....