Seifu Endris Yimer scite author profile

In this paper, we introduce an iterative scheme with inertial effect using Mann iterative scheme and gradient-projection for solving the bilevel variational inequality problem over the intersection of the set of common fixed points of a finite number of nonexpansive mappings and the set of solution points of the constrained optimization problem. Under some mild conditions we obtain strong convergence of the proposed algorithm. Two examples of the proposed bilevel variational inequality problem are also shown through numerical results.

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Proximal Gradient Method for Solving Bilevel Optimization Problems

Yimer

Gebrie

2020

MCA

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In this paper, we consider a bilevel optimization problem as a task of finding the optimum of the upper-level problem subject to the solution set of the split feasibility problem of fixed point problems and optimization problems. Based on proximal and gradient methods, we propose a strongly convergent iterative algorithm with an inertia effect solving the bilevel optimization problem under our consideration. Furthermore, we present a numerical example of our algorithm to illustrate its applicability.

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Seifu Endris Yimer

An efficient gradient-free projection algorithm for constrained nonlinear equations and image restoration

Inertial Method for Bilevel Variational Inequality Problems with Fixed Point and Minimizer Point Constraints

Proximal Gradient Method for Solving Bilevel Optimization Problems

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