简介:本文提出了求解非线性方程组的一种非精确Broyden方法.该方法是文献[8]中精确Broyden方法的推广.在适当的条件下,我们证明了非精确Broyden方法具有全局收敛性和超线性收敛性.数值实验表明,该方法效果较好.
简介:AsacontinuationofpartIofthepaperunderthesametitle,wedevelopgeneralmonotonicenclosuremethodsforthecouplesystemsofthesplittingequations{x=G([x]a,[x]b,[y]c)y=G([y]a,[y]b,[x]c),whichmodelsthesystemofequationsassociatedwithhybridandaaynchronottsmonotonicityaswellasconvexity.Theresultingalgorithmsandconvergencetheoremsgeneralizeandunifyvariousknownmethodsandmonotonicenclosuretheorentsestablishedbyotherauthors.
简介:设X是实Banach空间,H:X→X是Lipschitz算子,T:X→X是一致连续的且值域有界,H+T是强增生的,则Mann和Ishikawa迭代程序几乎稳定地强收敛到方程Hx+Tx=f的唯一解.