[2] S. Banach. Sur les operations dans les ensembles abstraits et leur applications aux
equations integrales. Fund. Math., 3:133-181, 1922.
[3] V. Berinde. Picard iteration converges faster than Mann iteration for a class of qua-
sicontractive operators, Fixed Point Theory and Applications, 2004:97-105, 2004.
[4] V. Berinde. On the convergence of the Ishikawa iteration in the class of quasi con-
tractive operators. Acta Math. Univ. Comen. 73:119-126, 2004.
[5] S.S. Chang, L. Yang, X.R.Wang. Stronger convergence theorems for an innite family
of uniformly quasi-Lipschitzian mappings in convex metric spaces. Appl. Math. Comp.
217:277{282, 2010.
[6] R. Chugh, P. Malik and V. Kumar. On analytical and numerical study of implicit
xed point iterations. Cogent Mathematics, 2:1021623, 2015.
[7] Lj. B. Ciric, Raq, A., Cakic, N., & Ume, J. S. Implicit Mann xed point iterations
for pseudo-contractive mappings. Applied Mathematics Letters, 22:581-584, 2009.
[8] Lj. B. Ciric, Raq, A., Radenovic, S., Rajovic, M., & Ume, J. S. On Mann implicit
iterations for strongly accretive and strongly pseudo-contractive mappings. Applied
Mathematics and Computation, 198:128-137, 2008.
[9] Lj. B.Ciric, Ume, J. S. M., & Khan, S. On the convergence of the Ishikawa iterates
to a common xed point of two mappings. Archivum Mathematicum (Brno) Tomus,
39:123-127, 2003.
[10] C.O. Imoru, M.O. Olantiwo. On the stability of Picard and Mann iteration processes.
Carpath. J. Math. 19:155-160, 2003.
[11] A.R. Khan, M.A. Ahmed. Convergence of a general iterative scheme for a nite family
of asymptotically quasi-nonexpansive mappings in convex metric spaces and applica-
tions. Comput. Math. Appl. 59:2990-2995, 2015.
[12] S.H. Khan, I. Yildirim, M. Ozdemir. Convergence of an implicit algorithm for two
families of nonexpansive mappings. Comput. Math. Appl. 59:3084-3091, 2010.
[13] S. H. Khan. Common xed points of quasi-contractive type operators by a generalized
iterative process. IAENG Int. J. Appl. Math., 41(3):260-264, 2011.
[14] J. K. Kim, K. S. Kim, S. M. Kim. Convergence theorems of implicit iteration process
for for nite family of asymptotically quasi-nonexpansive mappings in convex metric
space. Nonlinear Analysis and Convex Analysis, 1484:40-51, 2006.
[15] U. Kohlenbach. Some logical metatherems with applications in functional analysis.
Transactions of the American Mathematical Society, 357:89-128, 2004.
REFERENCES 201
[16] Q.Y. Liu, Z.B. Liu, N.J. Huang. Approximating the common xed points of two
sequences of uniformly quasi-Lipschitzian mappings in convex metric spaces. Appl.
Math. Comp. 216:883-889, 2010.
[17] M.O. Osilike, A. Udomene. Short proofs of stability results for xed point itera-
tion procedures for a class of contractive-type mappings. Indian J. Pure Appl. Math.
30:1229-1234, 1999.
[18] S.M. Soltuz, T. Grosan. Data dependence for Ishikawa iteration when dealing with
contractive like operators. Fixed Point Theory Appl. Article ID 242916 (2008).
doi:10.1155/2008/242916, 2008.
[19] W. Takahashi. A convexity in metric space and nonexpansive mappings. Kodai Math.
Sem. Rep. 22:142-149, 1970.
[20] I. Yildirim, S. H. Khan. Convergence theorems for common xed points of asymp-
totically quasi-nonexpansive mappings in convex metric spaces. Applied Mathematics
and Computation, 218(9):4860-4866, 2012.
[21] T. Zamrescu. Fix point theorems in metric spaces. Arch. Math. 23:292-298, 1972.
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