[[1] I. K. Argyros, Computational theory of iterative methods, Studies in Computational Mathematics 15, Elsevier Publ. Co., New York, U.S.A, 2007]Search in Google Scholar
[[2] I. K. Argyros and S. George, Extending the applicability of Newton’s method using Wang’s–Smale’s α-theory, Carpathian Journal of Mathematics, 33, No. 1, (2017), 27-3310.37193/CJM.2017.01.03]Search in Google Scholar
[[3] C. D. Chang, J. Wang, and J. C. Yao, Newton’s method for variational inequality problems. Smale’s point estimate theory under the γ − condition, Applicable Analysis, 94, (2015), 44-5510.1080/00036811.2013.854332]Search in Google Scholar
[[4] A. L. Dontchev, Uniform convergence of the Newton method for Aubin continuous maps, Serdica Math. J., 22, (1996), 385-398]Search in Google Scholar
[[5] M. C. Ferris and J. S. Pang, Engineering and economics applications of complementary problems, SIAM Rev., 39, (1997), 669-71310.1137/S0036144595285963]Search in Google Scholar
[[6] P. T. Harker and J. S. Pang, Finite-dimensional variational inequality and nonlinear complementary problems: a survey of theory, algorithms and applications, Math. Program, 48, (1990), 161-220]Search in Google Scholar
[[7] L. V. Kantorovich and G. P. Akilov, Functional Analysis, Pergamon Press, Oxford, 1982]Search in Google Scholar
[[8] M. Patriksson, Nonlinear programming and variational inequality problems: a unified approach, Kluwer Academic Publication, Dordrecht, 199910.1007/978-1-4757-2991-7]Search in Google Scholar
[[9] S. Smale, Newton’s method estimates from data at one point, In: Ewing R, Gross K, Martin C, editors. The merging of disciplines: new directions in pure, applied and computational mathematics, Springer, New York, 1986, 185-196]Search in Google Scholar
[[10] X. H. Wang, Convergence of Newton’s method and uniqueness of the solution of equations in Banach space, IMA. J. Numer. Anal., 20, (2000), 123-13410.1093/imanum/20.1.123]Search in Google Scholar
