Abbas, M. and Nazir, T., 2014. A new faster iteration process applied to constrained minimization and feasibility problems, Matematicki Vesnik 66 (2014) 223-234.
Berinde, V., 2004. Picard iteration converges faster than Mann iteration for a class of quasi-contractive operators, Fixed Point Theory Appl. 2014 :1.
Fukhar-ud-din, H. and Berinde, V., 2016. Iterative methods for the class of quasi-contractive type operators and comparsion of their rate of convergence in convex metric spaces, Filomat 30, 223-230.
Harder, A.M. and Hicks, T. L., 1988. Stability results for fixed point iteration procedures, Mathematica Japonica, 33, 693-706.
Chugh, R., Malik, P. and Kumar, V., 2015. On a new faster implicit fixed point iterative scheme in convex metric spaces, J. Function Spaces , 2015, Article ID 905834.
Gursoy, F. and Karakaya, V., 2014. A Picard-S hybrid type iteration method for solving a diferential equation with retarded argument, arXiv preprint arXiv:1403.2546
Karahan, I. and Ozdemir, M., 2013. A general iterative method for approximation of fixed points and their applications, Advances in Fixed Point Theory, 3, 510-526.
Karakaya, V., Dogan, K., Gursoy, F. and Erturk, M., 2013. Fixed point of a new three-step iteration algorithm under contractive-like operators over normed spaces, Abstract and Applied Analysis, 2013, 9 pages.
Dogan, K. and Karakaya, V., 2014. On the convergence and stability results for a new general iterative process, The Scienti_c World Journal, 2014, 8 pages.
Sintunavarat, W. and Pitea, A., 2016. On a new iteration scheme for numerical reckoning fixed points of Berinde mappings with convergence analysis, J. Nonlinear Science Appl. 9, 2553-2562.
Suantai, S., 2005. Weak and strong convergence criteria of Noor iterations for asymptotically nonexpansive mappings, J. Math. Anal. Appl. 311, 506-517. Reich, S. and Safrir, I., 1990. Nonexpansive iteration in hyperbolic spaces, Nonlinear. Anal. 15, 537-558
Qihou, L., 2001. Iterative sequences for asymptotically quasi-nonexpansive mappings with error member, Journal of Mathematical Analysis and applications, 259(1), 18-24.
Berinde, V., 2003. On the approximation of fixed points of weak contractive mappings, Carpathian J. Math, 19, 7 - 22.
Berinde, V., 2007. Iterative Approximation of Fixed Points, Springer, Berlin, (2007). Phuengrattana, W. and Suantai, S., 2013. Comparison of the rate of convergence of various iterative methods for the class of weak contractions in Banach Spaces, Thai J. Math. 11, 217-226.
Krasnoselkii, M. A., 1961. On solving the equations with self-adjoint operators by the method of successive approximations, Progress of mathematical sciences, vol.15. Issue. 3. Picard, E., 1890. Memoire sur la theorie des equations aux derivees partielles et la methode des approximations successives, J. Math. Pures Appl., 6, 145-210.
Karakaya,V., Atalan, Y., DoganK., and El Houda Bouzara,N., 2017. Some fixed point results for a new three steps iteration process in Banach spaces, Fixed Point Theory, 18, No. 2, 625-640
. Mann, W.R., 1953. Mean value methods in iterations, Proc. Amer. Math. Soc., 4, 506-510.
Ishikawa, S., 1974. Fixed point by a new iteration method, Proceedings of the American Mathematical Society, 44, 147-150.
Noor, M.A., 2000. New approximation schemes for general variational inequalities, Journal of Mathematical Analysis and Applications, 251, 217-229.
Phuengrattana, W. and Suantai, S., 2011. On the rate of convergence of Mann, Ishikawa, Noor and SP iterations for continuous on an arbitrary interval, Journal of Computational and Applied Mathematics, 235, 3006-3914.
Chugh, R. Kumar, V. and Kumar, S., 2012. Strong convergence of a new three step iterative scheme in Banach spaces, American Journal of Computational Mathematics, 2, 345-357.
Khan, S.H., 2013. A Picard-Mann hybrid iterative process, Fixed Point Theory and Applications, 1, 1-10.
Abbas, M. and Nazir, T., 2014. A new faster iteration process applied to constrained minimization and feasibility problems, Matematicki Vesnik 66 (2014) 223-234.
Berinde, V., 2004. Picard iteration converges faster than Mann iteration for a class of quasi-contractive operators, Fixed Point Theory Appl. 2014 :1.
Fukhar-ud-din, H. and Berinde, V., 2016. Iterative methods for the class of quasi-contractive type operators and comparsion of their rate of convergence in convex metric spaces, Filomat 30, 223-230.
Harder, A.M. and Hicks, T. L., 1988. Stability results for fixed point iteration procedures, Mathematica Japonica, 33, 693-706.
Chugh, R., Malik, P. and Kumar, V., 2015. On a new faster implicit fixed point iterative scheme in convex metric spaces, J. Function Spaces , 2015, Article ID 905834.
Gursoy, F. and Karakaya, V., 2014. A Picard-S hybrid type iteration method for solving a diferential equation with retarded argument, arXiv preprint arXiv:1403.2546
Karahan, I. and Ozdemir, M., 2013. A general iterative method for approximation of fixed points and their applications, Advances in Fixed Point Theory, 3, 510-526.
Karakaya, V., Dogan, K., Gursoy, F. and Erturk, M., 2013. Fixed point of a new three-step iteration algorithm under contractive-like operators over normed spaces, Abstract and Applied Analysis, 2013, 9 pages.
Dogan, K. and Karakaya, V., 2014. On the convergence and stability results for a new general iterative process, The Scienti_c World Journal, 2014, 8 pages.
Sintunavarat, W. and Pitea, A., 2016. On a new iteration scheme for numerical reckoning fixed points of Berinde mappings with convergence analysis, J. Nonlinear Science Appl. 9, 2553-2562.
Suantai, S., 2005. Weak and strong convergence criteria of Noor iterations for asymptotically nonexpansive mappings, J. Math. Anal. Appl. 311, 506-517. Reich, S. and Safrir, I., 1990. Nonexpansive iteration in hyperbolic spaces, Nonlinear. Anal. 15, 537-558
Qihou, L., 2001. Iterative sequences for asymptotically quasi-nonexpansive mappings with error member, Journal of Mathematical Analysis and applications, 259(1), 18-24.
Berinde, V., 2003. On the approximation of fixed points of weak contractive mappings, Carpathian J. Math, 19, 7 - 22.
Berinde, V., 2007. Iterative Approximation of Fixed Points, Springer, Berlin, (2007). Phuengrattana, W. and Suantai, S., 2013. Comparison of the rate of convergence of various iterative methods for the class of weak contractions in Banach Spaces, Thai J. Math. 11, 217-226.
Krasnoselkii, M. A., 1961. On solving the equations with self-adjoint operators by the method of successive approximations, Progress of mathematical sciences, vol.15. Issue. 3. Picard, E., 1890. Memoire sur la theorie des equations aux derivees partielles et la methode des approximations successives, J. Math. Pures Appl., 6, 145-210.
Karakaya,V., Atalan, Y., DoganK., and El Houda Bouzara,N., 2017. Some fixed point results for a new three steps iteration process in Banach spaces, Fixed Point Theory, 18, No. 2, 625-640
. Mann, W.R., 1953. Mean value methods in iterations, Proc. Amer. Math. Soc., 4, 506-510.
Ishikawa, S., 1974. Fixed point by a new iteration method, Proceedings of the American Mathematical Society, 44, 147-150.
Noor, M.A., 2000. New approximation schemes for general variational inequalities, Journal of Mathematical Analysis and Applications, 251, 217-229.
Phuengrattana, W. and Suantai, S., 2011. On the rate of convergence of Mann, Ishikawa, Noor and SP iterations for continuous on an arbitrary interval, Journal of Computational and Applied Mathematics, 235, 3006-3914.
Chugh, R. Kumar, V. and Kumar, S., 2012. Strong convergence of a new three step iterative scheme in Banach spaces, American Journal of Computational Mathematics, 2, 345-357.
Khan, S.H., 2013. A Picard-Mann hybrid iterative process, Fixed Point Theory and Applications, 1, 1-10.
Doğan, K. (2018). Daha Hızlı Mann Sabit Nokta Yinelemesi Üzerine Bir Çalışma. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi, 18(3), 852-860.
AMA
Doğan K. Daha Hızlı Mann Sabit Nokta Yinelemesi Üzerine Bir Çalışma. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi. Aralık 2018;18(3):852-860.
Chicago
Doğan, Kadri. “Daha Hızlı Mann Sabit Nokta Yinelemesi Üzerine Bir Çalışma”. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi 18, sy. 3 (Aralık 2018): 852-60.
EndNote
Doğan K (01 Aralık 2018) Daha Hızlı Mann Sabit Nokta Yinelemesi Üzerine Bir Çalışma. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi 18 3 852–860.
IEEE
K. Doğan, “Daha Hızlı Mann Sabit Nokta Yinelemesi Üzerine Bir Çalışma”, Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi, c. 18, sy. 3, ss. 852–860, 2018.
ISNAD
Doğan, Kadri. “Daha Hızlı Mann Sabit Nokta Yinelemesi Üzerine Bir Çalışma”. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi 18/3 (Aralık 2018), 852-860.
JAMA
Doğan K. Daha Hızlı Mann Sabit Nokta Yinelemesi Üzerine Bir Çalışma. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi. 2018;18:852–860.
MLA
Doğan, Kadri. “Daha Hızlı Mann Sabit Nokta Yinelemesi Üzerine Bir Çalışma”. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi, c. 18, sy. 3, 2018, ss. 852-60.
Vancouver
Doğan K. Daha Hızlı Mann Sabit Nokta Yinelemesi Üzerine Bir Çalışma. Afyon Kocatepe Üniversitesi Fen Ve Mühendislik Bilimleri Dergisi. 2018;18(3):852-60.