References
- Bull. Austral. Math. Soc. v.45 On the monotone convergence of general Newton-like methods I.K. Argyros;F. Szidarovszky
- Appl. Math. Letters v.6 no.5 On the convergence of a Chebysheff-Halley type method under Newton-Kantorovich hypotheses I.K. Argyros
- Pure Mathematics and Applications v.4 no.3 On the convergence of an Euler-Chebysheff-type method under Newton-Kantorovich hypotheses I.K. Argyros
- Appl. Math. and Comp. v.58 A note on the Halley method in Banach spaces I.K. Argyros
- The Theory and Applications of Iteration Methods I.K. Argyros;F. Szidarovszky
- Acta Math. v.71 The method of successive approximation for functional equations L.V. Kantorovich
- Dokl. Akad. Nauk. SSSR v.88 An analog of the process of tangent hyperbolas for general functional equations (Russian) M.A. Mertvecova
- Uwephi Mat. Nauk. v.9 On Chebysheff's method for functional equations (Russian) M.T. Necepurenko
- Numer. Funct. Anal. and Optimiz. v.7 no.1 On an iterative algorithm of order 1.839... for solving nonlinear operator equations F.A. Potra
- Dokl. Akad. Nauk. SSSR v.158 Iteration methods with divided differences of the second order (Russian) S. Ul'm
- Sovitet Math. Dokl. v.5
- SIAM J. Numer. Anal. v.4 Newton's method for convex operators in partially ordered spaces J.A. Vandergraft