APPROXIMATION RESULTS FOR SOLUTION OF STOCHASTIC HARD-SOFT CONSTRAINED CONVEX FEASIBILITY PROBLEM

UDOM, AKANINYENE UDO and NWEKE, CHIJIOKE JOEL and MBAEYI, GEORGE CHINANU and OSSAI, EVERESTUS O. (2022) APPROXIMATION RESULTS FOR SOLUTION OF STOCHASTIC HARD-SOFT CONSTRAINED CONVEX FEASIBILITY PROBLEM. Asian Journal of Mathematics and Computer Research, 29 (3). pp. 25-39. ISSN 2395-4213

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Abstract

In this work, a random-type iterative scheme is proposed and used for random approximation of the solution of stochastic convex feasibility problem involving hard constraints (that must be satisfied) and soft constraints (whose proximity function is minimized) in Hilbert space. The iterative algorithm is based on an alternating projection with lipschitzian and firmly non-expansive mapping. Convergence results of the random-type iterative scheme to the solution of the stochastic convex feasibility problem is proved. These will serve as an extension, unification and generalization of different established classic results in the literature.

Item Type: Article
Subjects: Universal Eprints > Mathematical Science
Depositing User: Managing Editor
Date Deposited: 12 Dec 2023 03:47
Last Modified: 12 Dec 2023 03:47
URI: http://journal.article2publish.com/id/eprint/3366

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