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Iterative Algorithms for Split Equality Fixed Point Problems and Some Non-Linear Problems in Banach Spaces With Applications

dc.contributor.authorRomanus, Ogonnaya Michael
dc.date.accessioned2022-11-23T15:09:29Z
dc.date.available2022-11-23T15:09:29Z
dc.date.issued2019-06-06
dc.identifier.urihttp://repository.aust.edu.ng/xmlui/handle/123456789/5104
dc.descriptionMain Thesisen_US
dc.description.abstractLet H1, H2, and H3 be real Hilbert spaces, T and S be non-linear maps defined on H1 and H2, respectively, and with non-empty fixed point sets, F ix(T) and F ix(S), respectively, A and B be linear maps respectively mapping from H1 and H2 to H3. The split equality fixed point problem (SEFPP) considered in this thesis is to find x ∈ F ix(T), y ∈ F ix(S) such that Ax = By. This problem has attracted the attention of numerous researchers due to its vast applications, for instance, in decomposition methods for partial differential equations (PDEs), applications in game theory, and in intensity-modulated radiation therapy, to mention but a few. Few iterative algorithms have been proposed in real Hilbert spaces for approx imating solutions of the SEFPP when they exist. However, the fact that these algorithms are confined in Hilbert spaces is a restriction, since the models of most real-life problems lives in spaces more general than Hilbert spaces. Besides, to guarantee the convergence of these algorithms, it is necessary to impose some compactness-type conditions on some of the involved mappings. In Chapter 3 of this thesis, we proposed the following iterative algorithm that approximates a solution of SEFPP in certain Banach spaces, in particular, in lp spaces 1 < p ≤ 2.  x1 ∈ E1, y1 ∈ E2, zn ∈ JE3 (Axn − Byn) xn+1 = J −1 E1en_US
dc.description.sponsorshipAUSTen_US
dc.language.isoenen_US
dc.publisherAUSTen_US
dc.subjectIterative Algorithms for Split Equality Fixed Point Problems and Some Non-Linear Problems in Banach Spaces With Applicationsen_US
dc.subjectRomanus Ogonnaya Michaelen_US
dc.subjectProfessor Charles Ejike Chidumeen_US
dc.subject2019 Pure and Applied Mathematics PhD Thesesen_US
dc.titleIterative Algorithms for Split Equality Fixed Point Problems and Some Non-Linear Problems in Banach Spaces With Applicationsen_US
dc.typeThesisen_US


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