Approaching the split common solution problem for nonlinear demicontractive mappings by means of averaged iterative algorithms
DOI:
https://doi.org/10.24193/subbmath.2025.2.10Keywords:
demicontractive, strong convergence, common solution, Hilbert space.Abstract
We consider new iterative algorithms for solving split common solution problems in the class of demicontractive mappings. These algorithms are obtained by inserting an averaged term into the algorithms previously used in [He, Z. and Du, W-S., Nonlinear algorithms approach to split common solution problems, Fixed Point Theory Appl. 2012, 2012:130, 14 pp] for the case of quasi-nonexpansive mappings. In this way, we are able to solve the split common solution problem in the larger class of demicontractive mappings, which strictly includes the class of quasi-nonexpansive mappings. Our investigation is based on the embedding of demicontractive operators in the class of quasi-nonexpansive operators by means of averaged mappings. For the considered algorithms we prove weak and strong convergence theorems in the setting of a real Hilbert space.
References
[1] Alakoya, T.O., Mewomo, O.T., Gibali, A., Solving split inverse problems, Carpathian J. Math., 39(2023), no. 3, 583-603.
[2] Berinde, V., Approximating xed points results for demicontractive mappings could be derived from their quasi-nonexpansive counterparts, Carpathian J. Math., 39(2023), no. 1, 73-84.
[3] Berinde, V., On a useful lemma that relates quasi-nonexpansive and demicontractive mappings in Hilbert spaces, Creat. Math. Inform., 33(2024), no. 1, 7-21.
[4] Berinde, V., P acurar, M., Recent developments in the fixed point theory of enriched contractive mappings. A survey, Creat. Math. Inform., 33(2024), no. 2, 137-159.
[5] Berinde, V., Saleh, K., New averaged type algorithms for solving split common fixed point problems for demicontractive mappings, Arab. J. Math. (Springer), 13(2024), no. 3, 679-688.
[6] Berinde, V., Saleh, K., An averaged Halpern type algorithm for solving fixed point problems and variational inequality problems, Axioms, 13(2024), no. 11, 756.
[7] Blum, E., Oettli, W., From optimization and variational inequalities to equilibrium problems, Math. Stud., 63(1994), 123-145.
[8] Chang, S.S., Lee, J.H.W., Chan, C.K., A new method for solving equilibrium problem fixed point problem and variational inequality problem with application to optimization, Nonlinear Anal., 70(2009), 3307-3319.
[9] Combettes, P.L., Hirstoaga, A., Equilibrium programming in Hilbert spaces, J. Nonlinear Convex Anal., 6(2005, 117-136.
[10] He, Z., The split equilibrium problem and its convergence algorithms, J. Inequal. Appl., 162(2012).
[11] He, Z., Du, W-S., Nonlinear algorithms approach to split common solution problems, Fixed Point Theory Appl., 2012(130)(2012), 1-14.
[12] Li, R., He, Z., A new iterative algorithm for split solution problems of quasi-nonexpansive mappings, J. Inequal. Appl., 131(2015), 1-12.
[13] Mouda , A., A note on the split common fixed-point problem for quasi-nonexpansive operators, Nonlinear Anal., 74(2011), 4083-4087.
[14] Onah, A.C., Osilike, M.O., Nwokoro, P.U., Onah, J.N., Chima, E.E., Oguguo, O.U., Asymptotically -hemicontractive mappings in Hilbert spaces and a new algorithm for solving associated split common fixed point problem, Carpathian J. Math., 40(2024), no.
3, 691-715.
[15] Opial, Z., Weak convergence of the sequence of successive approximations for nonexpansive mappings, Bull. Amer. Math. Soc., 73(1967), 591-597.
[16] Rathee, S., Swami, M., Algorithm for split variational inequality, split equilibrium problem and split common fixed point problem, AIMS Math., 7(2022), no. 5, 9325-9338.
[17] Wang, Y.H., Pan, C.J., Implicit iterative algorithms of the split common fixed point problem for Bregman quasi-nonexpansive mapping in Banach spaces, Front. Math. China, 17(2022), no. 5, 797-811.
[18] Yao, Y.H., Shahzad, N., Postolache, M., Yao, J.-C., Convergence of self-adaptive Tseng-type algorithms for split variational inequalities and xed point problems, Carpathian J. Math., 40(2024), no. 3, 753-768.
[19] Zhu, L.-J., Yao, J.-C., Yao, Y.H., Approximating solutions of a split fixed point problem of demicontractive operators, Carpathian J. Math., 40(2024), no. 1, 195-206.
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