Berinde, V. & Păcurar, M. (2017) Journal of Computational and Applied Mathematics [Matematică, Q2]

Publicat: 24 Noiembrie 2020

Berinde, V. & Păcurar, M. (2017) Corrigendum to: “Coincidence and fixed points for multi-valued mappings and its application to nonconvex integral inclusions”. Journal of Computational and Applied Mathematics, 311, 718-720.

DOI: https://doi.org/10.1016/j.cam.2016.08.006

✓ Publisher: Elsevier
✓ Web of Science Core Collection: Science Citation Index Expanded
✓ Categories: Mathematics, Applied
✓ Article Influence Score (AIS): 0.684 (2017) / Q2

Abstract: In a recent paper [H.K. Pathak, R.P. Agarwal, Y.J. Cho, Coincidence and fixed points for multi-valued mappings and its application to nonconvex integral inclusions, J. Comput. Appl. Math. 283 (2015)201-217.], the authors have studied some problems on coincidence points and fixed points of multi-valued mappings. In order to illustrate the generality of their main result (Theorem 3.2) with respect to older related results (Nadler's, Berinde-Berinde, Mizoguchi-Takahashi and Du's fixed point theorem), the authors presented two examples, i.e., Examples 3.3 and 3.4. The main aim of this note is to show that Example 3.3 fails in proving the generality of Theorem 3.2 over Berinde-Berinde's fixed point theorem.

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