Artículos de revistas
Newton's method and a mesh independence principle for certain semilinear boundary value problems
Fecha
2016-01Registro en:
Dratman, Ezequiel; Matera, Guillermo; Newton's method and a mesh independence principle for certain semilinear boundary value problems; Elsevier Science; Journal Of Computational And Applied Mathematics; 292; 1-2016; 188-212
0377-0427
CONICET Digital
CONICET
Autor
Dratman, Ezequiel
Matera, Guillermo
Resumen
We exhibit an algorithm which computes an ϵ-approximation of the positive solutions of a family of boundary-value problems with Neumann boundary conditions. Such solutions arise as the stationary solutions of a family of semilinear parabolic equations with Neumann boundary conditions. The algorithm is based on a finite-dimensional Newton iteration associated with a suitable discretized version of the problem under consideration. To determine the behavior of such a discrete iteration we establish an explicit mesh-independence principle. We apply a homotopy-continuation algorithm to compute a starting point of the discrete Newton iteration, and the discrete Newton iteration until an ϵ-approximation of the stationary solution is obtained. The algorithm performs roughly O((1/ϵ)1/2 ) flops and function evaluations.