Dynamical Systems Method (DSM) for solving nonlinear operator equations in Banach spaces
Dynamical Systems
2010-01-05 v1
Abstract
Let be an operator equation in a Banach space , , where , , if , is strictly growing on . Denote , where is the Fr\'{e}chet derivative of , and Assume that (*) , , , . Here may be a complex number, and is a smooth path on the complex -plane, joining the origin and some point on the complex plane, , where is a small fixed number, such that for any estimate (*) holds. It is proved that the DSM (Dynamical Systems Method) \bee \dot{u}(t)=-A^{-1}_{a(t)}(u(t))[F(u(t))+a(t)u(t)-f],\quad u(0)=u_0,\ \dot{u}=\frac{d u}{dt}, \eee converges to as , where , , and , where are some suitably chosen constants, Existence of a solution to the equation is assumed. It is also assumed that the equation is uniquely solvable for any , , and
Cite
@article{arxiv.1001.0368,
title = {Dynamical Systems Method (DSM) for solving nonlinear operator equations in Banach spaces},
author = {A. G. Ramm},
journal= {arXiv preprint arXiv:1001.0368},
year = {2010}
}