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Condition Estimates for Pseudo-Arclength Continuation

Numerical Analysis 2007-05-23 v1

Abstract

We bound the condition number of the Jacobian in pseudo arclength continuation problems, and we quantify the effect of this condition number on the linear system solution in a Newton GMRES solve. In pseudo arclength continuation one repeatedly solves systems of nonlinear equations F(u(s),λ(s))=0F(u(s),\lambda(s))=0 for a real-valued function uu and a real parameter λ\lambda, given different values of the arclength ss. It is known that the Jacobian FxF_x of FF with respect to x=(u,λ)x=(u,\lambda) is nonsingular, if the path contains only regular points and simple fold singularities. We introduce a new characterization of simple folds in terms of the singular value decomposition, and we use it to derive a new bound for the norm of Fx1F_x^{-1}. We also show that the convergence rate of GMRES in a Newton step for F(u(s),λ(s))=0F(u(s),\lambda(s))=0 is essentially the same as that of the original problem G(u,λ)=0G(u,\lambda)=0. In particular we prove that the bounds on the degrees of the minimal polynomials of the Jacobians FxF_x and GuG_u differ by at most 2. We illustrate the effectiveness of our bounds with an example from radiative transfer theory.

Keywords

Cite

@article{arxiv.math/0603716,
  title  = {Condition Estimates for Pseudo-Arclength Continuation},
  author = {K. I. Dickson and C. T. Kelley and I. C. F. Ipsen and I. G. Kevrekidis},
  journal= {arXiv preprint arXiv:math/0603716},
  year   = {2007}
}

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14 pages