Syed Shakaib Irfan scite author profile

Abstract In this paper, we introduce a new class of resolvent operator, the η-proximal operator, and discuss some of its properties. We consider a new generalized variational-like inclusion problem involving relaxed monotone operators in Hilbert space and construct a new iterative algorithm for proving the existence of the solutions of our problem. Our results improve and generalize many corresponding results in the recent literature.

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Nonlinear ordered variational inclusion problem involving XOR operation with fuzzy mappings

Ahmad

Irfan

Farid

et al. 2020

J Inequal Appl

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In the setting of real ordered positive Hilbert spaces, a nonlinear fuzzy ordered variational inclusion problem with its corresponding nonlinear fuzzy ordered resolvent equation problem involving XOR operation has been recommended and solved by employing an iterative algorithm. We establish the equivalence between nonlinear fuzzy ordered variational inclusion problem and nonlinear fuzzy ordered resolvent equation problem. The existence and convergence analysis of the solution of nonlinear fuzzy ordered variational inclusion problem involving XOR operation has been substantiated by applying a new resolvent operator method with XOR operation technique. The iterative algorithm and results demonstrated in this article have witnessed a significant improvement in many previously known results of this domain.

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Syed Shakaib Irfan

Generalized variational inclusions and generalized resolvent equations in banach spaces

On completely generalized multi-valued co-variational inequalities involving strongly accretive operators

On generalized nonlinear variational-like inequality problems

Generalized variational-like inclusion involving relaxed monotone operators

Nonlinear ordered variational inclusion problem involving XOR operation with fuzzy mappings

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