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• Misiak, A., n-inner product spaces, Math. Nachr., vol. 140, (1989), 299--319.
• Gähler, S., Linear 2-normietre räume, Math. Nachr., vol. 28, (1965), 1--43.
• Dutta, H., Some iterated convergence and fixed point theorems in real linear n-normed spaces, Miskolc Mathematical Notes, vol. 15, no. 2, (2014), 423-437.
• Gunawan, H. and Mashadi, M., On n-normed spaces, Int. J. Math. Math. Sci., vol. 2, (2001), 631--639.
• Chugh, R. and Sushma, L., On Generalized n-inner product spaces, Novi Sad J. Math., vol. 41, no. 2, (2011), 73-80.
• Owojori, O. O. and Imoru, C. O., New iteration methods for pseudocontractive and accretive operators in arbitrary banach spaces, Kragujevac J. Math., vol. 25, (2003), 97--110.
• Thianwan, S., Common fixed points of new iterations for two asymptotically nonexpansive nonself mappings in a banach space, J. Comput. Appl. Math., vol. 224, (2009), 688--695.
• Raphael, P. and Pulickakunnel, S., Fixed point theorems in normed linear spaces using a generalized Z-type condition, Kragujevac J. Math., vol. 36, no. 2, (2012), 207--214.
• Khan, S.H., Approximating Fixed Points by a Two-Step Iterative Algorithm,World Academy of Science, Engineering and Technology International Journal of Mathematical, Computational, Physical and Quantum Engineering, vol. 8, no. 6, (2014), 939-941.
• Bosede, A.O. and Rhoades, B.E., Stability of Picard and Mann iteration for a general class of functions, J. Adv. Math. Studies, vol. 3, no. 2, (2010), 23-25.
• Weng, X., Fixed point iteration for local strictly pseudocontractive mapping, Proc. Amer. Math. Soc., vol. 113, (1991), 727--731.
• Soltuz, S. M. and Grosan, T., Data dependence for Ishikawa iteration when dealing with contractive like operators, Fixed Point Theory Appl., vol. 2008, (2008), 7 pages.
• Urabe, M., Convergence of numerical iteration in solution of equations, Journal of Science of the Hiroshima University A, vol.19, (1956), 479--489.
• Ostrowski, A. M., The round-off stability of iterations, Z. Angew. Math. Mech., vol. 47, (1967), 77-81.
• Harder, A. M. and Hicks, T. L., Stability results for xed point iteration procedures, Math. Jap., vol. 33, no. 5, (1988), 693-706.
• Bosede, A. O.,Stability of Noor Iteration for a General Class of Functions in Banach Spaces, Acta Univ. Palacki. Olomuc., Fac. Rer. Nat., Mathematica, vol. 51, no. 2, (2012), 19--25.
• Khan, A. R., Kumar, V. and Hussain, N. Analytical and numerical treatment of Jungck-type iterative schemes, Appl. Math. Comput., vol. 231, (2014), 521-535.
• Imoru, C. O. and Olatinwo, M. O., On the stability of Picard and Mann iteration processes, Carp. J. Math., vol. 19, no. 2, (2003), 155-160.
• Gürsoy, F., Karakaya, V. and Rhoades, B. E., Some convergence and stability results for the Kirk multistep and Kirk-SP fixed point iterative algorithms, Abstr. Appl. Anal., vol. 2014, (2014), 12 pages.
• Osilike, M. O., Stability of the Mann and Ishikawa iteration procedures for-strong pseudocontractions and nonlinearequations of the-strongly accretive type, J. Math. Anal. Appl., vol. 227, no. 2, (1998), 319-334.
• Verinde, V. B., Summable almost stability of fixed point iteration procedures, Carpathian J. Math., vol. 19, (2003), 81-88.
• Ishikawa, S., Fixed points by a new iteration method, Proc. Amer. Math. Soc., vol. 44, (1974), 147--150.
• Mann, W. R., Mean value in iteration, Proc. Amer. Math. Soc., vol. 4, (1953), 506--510.
• Agarwal, R. P., O' Regan, D. and Sahu, D. R., Iterative construction of fixed points of nearly asymptotically nonexpansive mappings, J. Nonlinear Convex Anal., vol. 8, 2007, 61-79.
• Gürsoy, F., Karakaya, V. and Rhoades, B.E., Data dependence results of new multi-step and S-iterative schemes for contractive-like operators, Fixed Point Theory Appl., vol. 76, (2013), 12 pages.