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Volume 1, Issue 1, 30 April 2019, Pages 29-38
Abstract. In this paper, we study the well-posedness for bilevel vector equilibrium problems (BVEP) and propose a generalized well-posed concept for the BVEP in Hausdorff topological vector spaces. We also discuss the relationship between the solution set and the approximating solution set for the BVEP. Finally, we establish a metric characterization for the generalized well-posedness in terms of the Kuratowski measure of the non-compactness of the approximating solution set.
How to Cite this Article:
Xingxing Ju, Suhel Ahmad Khan, Well-posedness for bilevel vector equilibrium problems, Appl. Set-Valued Anal. Optim. 1 (2019), 29-38.