참고문헌
- Bull. Austral. Math. Soc. v.32 Quadratic equations and applications to Chandrasekhar's and related equations Argyros I.K.
- Pure Math. Appl. v.4 no.3 On the convergence of an Euler-Chebysheff-type method under Newton-Kantorovich hypotheses Argyros I.K.
- Funct. et. Approx. Comment. Math. v.23 Convergence results for the Super-Halley method using divided differences Argyros I.K.
- Appl. Math. Comp. v.58 A note on the Halley method in Banach spaces Argyros I.K.;Chen D.;Qian Q.S.
- The Theory and Applications of Iteration Methods Argyros I.K.;Szidarovszky F.
- SIAM J. Numer. Anal. v.16 no.1 Affine invariant convergence theorems for Newton's method and extension to related methods Deuflhard P.;Heindl G.A.
- Intern. J. Computer. Math. v.57 Accessibility of solutions by Newton's method Gutierez J.M.;Hernandez M.A.;Salanova M.A.
- Numer. Funct. Anal. Optimiz v.17 no.1;2 Resolution of quadratic equations in Banach spaces Gutierez J.M;Hernandez M.A.;Salanova
- Pub. Sem. G. Galdeano Serie 11 Convex acceleration of Newton's method Gutierez J.M.;Hernandez M.A.
- Num. Math. v.59 no.3 A note on Halley's method Hernandez M.A.
- Inter. J. Computer. Math. v.47 A family of Chebyshev-Haley type methods Hernandez M.A.;Salanova M.A.
- Functional Analysis Kantorovich L.V.;Akilov G.P.
- Dokl. Akad. Nauk SSSP v.88 An analog of the process of tangent hyperbolas for general functional equations(Russian) Mertvecova M.A.
- Usephi Mat. Nauk. v.9 On Chebysheff's method for functional equations(Russian) Necepurenko M.T.
- Numer. Math. v.34 Sharp error bounds for Newton's process Potra F.A.
- Numer. Funct. Anal. Optimiz v.7 no.1 An iterative algorithm of order 1.839...for solving nonlinear equations Potra F.A.