DocumentCode
2830833
Title
A Urabe type convergence theorem for a constructive simplified Newton method in infinite dimensional spaces
Author
Oishi, Shin´ichi ; Kashiwagi, Masahide ; Makino, Mitsunori ; Horiuchi, Kazuo
Author_Institution
Sch. of Sci. & Eng., Waseda Univ., Japan
fYear
1991
fDate
11-14 Jun 1991
Firstpage
1236
Abstract
A constructive simplified Newton method is presented for calculating solutions of infinite dimensional nonlinear equations, which uses a projection scheme from an infinite dimensional space to finite dimensional subspaces. A convergence theorem of the method is shown based on Urabe´s theorem. For a class of successive approximation methods containing an infinite dimensional homotopy method, a stopping criterion is shown using the convergence theorem. The authors show that under a certain condition the stopping criterion is satisfied in finite cycles of iteration
Keywords
approximation theory; convergence of numerical methods; iterative methods; nonlinear equations; Urabe type convergence theorem; constructive simplified Newton method; finite dimensional subspaces; infinite dimensional homotopy method; infinite dimensional spaces; iteration; nonlinear equations; projection scheme; stopping criterion; successive approximation methods; Convergence; Error analysis; Iron; Newton method;
fLanguage
English
Publisher
ieee
Conference_Titel
Circuits and Systems, 1991., IEEE International Sympoisum on
Print_ISBN
0-7803-0050-5
Type
conf
DOI
10.1109/ISCAS.1991.176592
Filename
176592
Link To Document