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https://hdl.handle.net/10321/5436
Title: | An inertial Tseng algorithm for solving quasimonotone variational inequality and fixed point problem in Hilbert spaces | Authors: | Kajola, Shamsudeen Abiodun Narain, Ojen Kumar Maharaj, Adhir |
Keywords: | Hilbert space;Quasimonotone;Strong convergence;Variational inequality | Issue Date: | Feb-2024 | Publisher: | Kyungnam University Press | Source: | Kajola, S.A., Narain, O.K. and Maharaj, A. 2024. An inertial Tseng algorithm for solving quasimonotone variational inequality and fixed point problem in Hilbert spaces. Nonlinear Functional Analysis and Applications. 29(3): 781-802. doi:10.22771/nfaa.2024.29.03.09 | Journal: | Nonlinear Functional Analysis and Applications; Vol. 29, Issue 3 | Abstract: | In this paper, we propose an inertial method for solving a common solution to fixed point and Variational Inequality Problem in Hilbert spaces. Under some standard and suitable assumptions on the control parameters, we prove that the sequence generated by the proposed algorithm converges strongly to an element in the solution set of Variational Inequality Problem associated with a quasimonotone operator which is also solution to a fixed point problem for a demimetric mapping. Finally, we give some numerical experiments for supporting our main results and also compare with some earlier announced methods in the literature. |
URI: | https://hdl.handle.net/10321/5436 | ISSN: | 1229-1595 (Print) | DOI: | 10.22771/nfaa.2024.29.03.09 2466-0973 (Online) |
Appears in Collections: | Research Publications (Applied Sciences) |
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NFAA Copyright clearance.docx | 147.07 kB | Microsoft Word XML | View/Open | |
Kajola_Narain_Maharaj_2024.pdf | 572.61 kB | Adobe PDF | View/Open |
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