International Journal of Soft Computing
Year:
2016
Volume:
11
Issue:
4
Page No.
270 - 275
References
Chun, C., M.Y. Lee, B. Neta and J. Dzunic, 2012. On optimal fourth-order iterative methods free from second derivative and their dynamics. Appl. Math. Comput., 218: 6427-6438.
Direct Link | Cordero, A., E. Martinez and J.R. Torregrosa, 2009. Iterative methods of order four and five for systems of nonlinear equations. J. Comput. Appl. Math., 231: 541-551.
Cordero, A., J.L. Hueso, E. Martinez and J.R. Torregrosa, 2010. A modified Newton-jarratt's composition. Numer. Algorithms, 55: 87-99.
CrossRef | Direct Link | Darvishi, M.T. and A. Barati, 2007. A third-order Newton-type method to solve systems of nonlinear equations. Appl. Math. Comput., 187: 630-635.
Direct Link | Hafiz, M.A. and A.E. Alamir, 2012. High-order iterative methods for solving nonlinear systems. J. Math. Comput. Sci., 2: 1859-1867.
Direct Link | Hafiz, M.A. and A.E. Alamir, 2014. Solving nonlinear systems using fourth order iterative method. Br. J. Math. Comput. Sci., 4: 90-103.
Direct Link | Hafiz, M.A. and M.S. Bahgat, 2012. Extended and modified Halley's iterative method for solving nonlinear systems. J. Math. Comput. Sci., 2: 1512-1521.
Direct Link | Hafiz, M.A. and S.M. Bahgat, 2012. Modified of householder iterative method for solving nonlinear systems. J. Math. Comput. Sci., 2: 1200-1208.
Direct Link | Homeier, H.H.H., 2005. On Newton-type methods with cubic convergence. J. Comput. Applied Math., 176: 425-432.
CrossRef | Direct Link | Khan, W.A., K.I. Noor, K. Bhatti and F.A. Ansari, 2015. A new fourth order Newton-type method for solution of system of nonlinear equations. Appl. Math. Comput., 270: 724-730.
Direct Link | Khattri, S.K. and S. Abbasbandy, 2011. Optimal fourth order family of iterative methods. Mathematicki Vesnik, 63: 67-72.
Direct Link | Khirallah, M. and M.A. Hafiz, 2013. Extension of homotopy perturbation method for solving nonlinear systems. Eur. Sci. J., Vol. 9,
Khirallah, M.Q. and M.A. Hafiz, 2012. Novel three order methods for solving a system of nonlinear equations. Bull. Math. Sci. Appl., 1: 1-14.
CrossRef | Khirallah, M.Q. and M.A. Hafiz, 2013. Solving system of nonlinear equations using family of jarratt methods. Intl. J. Differ. Equations Appl., Vol.12,
Mohamed, M.S. and M.A. Hafiz, 2012. An efficient two-step iterative method for solving system of nonlinear equations. J. Math. Res., 4: 28-34.
Direct Link | Noor, M.A. and M. Waseem, 2009. Some iterative methods for solving a system of nonlinear equations. Comput. Math. Appl., 57: 101-106.
Direct Link | Noor, M.A., M. Waseem, K.I. Noor and E.A. Said, 2013. Variational iteration technique for solving a system of nonlinear equations. Optim. Lett., 7: 991-1007.
CrossRef | Direct Link | Ostrowski, A.M., 1966. Solutions of Equations and Systems of Equations. Academic Press, New York, USA.,.
Sharma, J.R., R.K. Guha and R. Sharma, 2013. An efficient fourth order weighted-Newton method for systems of nonlinear equations. Numer. Algorithms, 62: 307-323.
CrossRef | Direct Link |