论文信息 - A variant of the Newton-Kantorovich theorem for nonlinear integral equations of mixed Hammerstein type

A variant of the Newton-Kantorovich theorem for nonlinear integral equations of mixed Hammerstein type

Abstract We study nonlinear integral equations of mixed Hammerstein type using Newton’s method as follows. We investigate the theoretical significance of Newton’s method to draw conclusions about the existence and uniqueness of solutions of these equations. After that, we approximate the solutions of a particular nonlinear integral equation by Newton’s method. For this, we use the majorant principle, which is based on the concept of majorizing sequence given by Kantorovich, and milder convergence conditions than those of Kantorovich. Actually, we prove a semilocal convergence theorem which is applicable to situations where Kantorovich’s theorem is not.

[1] Ioannis K. Argyros,et al. On the Newton-Kantorovich hypothesis for solving equations , 2004 .

[2] tetsuro Yammoto,et al. A convergence theorem for Newton-like methods in Banach spaces , 1987 .

[3] Ian H. Sloan,et al. A new collocation-type method for Hammerstein integral equations , 1987 .

[4] H. Davis. Introduction to Nonlinear Differential and Integral Equations , 1964 .

[5] José Antonio Ezquerro,et al. On an Application of Newton's Method to Nonlinear Operators with w-Conditioned Second Derivative , 2002, BIT Numerical Mathematics.

[6] Jon G. Rokne,et al. Newton's method under mild differentiability conditions with error analysis , 1971 .

[7] Kendall E. Atkinson,et al. A Survey of Numerical Methods for Solving Nonlinear Integral Equations , 1992 .

[8] José Antonio Ezquerro,et al. Halley's method for operators with unbounded second derivative , 2007 .

[9] Hikmet Caglar,et al. Dynamics of the solution of Bratu’s equation , 2009 .

[10] S. Amat,et al. A family of Halley-Chebyshev iterative schemes for non-Fréchet differentiable operators , 2009 .

[11] I. Argyros. Newton-like methods under mild differentiability conditions with error analysis , 1988, Bulletin of the Australian Mathematical Society.

[12] S. Amat,et al. Third-order iterative methods under Kantorovich conditions , 2007 .

[13] I. Argyros. The Newton—Kantorovich method under mild differentiability conditions and the Ptâk error estimates , 1990 .