AbstractThe computation of solution paths for continuation problems requires the solution of a sequence of nonlinear systems of equations. Each nonlinear system can be solved by computing the solution of a succession of linear systems of equations determined by Jacobian matrices associated with the nonlinear system of equations. Points on the solution path where the Jacobian matrix is singular are referred to as singular points and require special handling. They may be turning points or bifurcation points. In order to detect singular points, it is essential to monitor the eigenvalues of smallest magnitude of the Jacobian matrices generated as the solution path is traversed. We describe iterative methods for the computation of solution paths...
A tutorial on continuation and bifurcation methods for the analysis of truncated dissipative partial...
Standard homotopy continuation methods for solving systems of nonlinear equa-tions require the conti...
We study the behavior of the bordering algorithm (a form of block elimination) for solving nonsingul...
AbstractThe computation of solution paths for continuation problems requires the solution of a seque...
AbstractWe study and develop efficient and versatile Predictor—Corrector continuation methods for la...
AbstractIn numerical continuation and bifurcation problems linear systems with coefficient matrices ...
We investigate multi-grid methods for solving linear systems arising from arc-length continuation te...
AbstractMany problems give rise to polynomial systems. These systems often have several parameters a...
International audienceContinuation methods are efficient to trace branches of fixed point solutions ...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/1...
We discuss in this paper a new combination of methods for solving nonlinear boundary value problems ...
abstract: It is very important to calculate the multiple solutions of nonlinear equations, because t...
This thesis presents a new algorithm to find and follow particular solutions of parameterized nonlin...
AbstractThis paper describes a way of approximating the optimal extrapolation of iterative technique...
Frozen Jacobian iterative methods are of practical interest to solve the system of nonlinear equatio...
A tutorial on continuation and bifurcation methods for the analysis of truncated dissipative partial...
Standard homotopy continuation methods for solving systems of nonlinear equa-tions require the conti...
We study the behavior of the bordering algorithm (a form of block elimination) for solving nonsingul...
AbstractThe computation of solution paths for continuation problems requires the solution of a seque...
AbstractWe study and develop efficient and versatile Predictor—Corrector continuation methods for la...
AbstractIn numerical continuation and bifurcation problems linear systems with coefficient matrices ...
We investigate multi-grid methods for solving linear systems arising from arc-length continuation te...
AbstractMany problems give rise to polynomial systems. These systems often have several parameters a...
International audienceContinuation methods are efficient to trace branches of fixed point solutions ...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/1...
We discuss in this paper a new combination of methods for solving nonlinear boundary value problems ...
abstract: It is very important to calculate the multiple solutions of nonlinear equations, because t...
This thesis presents a new algorithm to find and follow particular solutions of parameterized nonlin...
AbstractThis paper describes a way of approximating the optimal extrapolation of iterative technique...
Frozen Jacobian iterative methods are of practical interest to solve the system of nonlinear equatio...
A tutorial on continuation and bifurcation methods for the analysis of truncated dissipative partial...
Standard homotopy continuation methods for solving systems of nonlinear equa-tions require the conti...
We study the behavior of the bordering algorithm (a form of block elimination) for solving nonsingul...