Abstract. The goal of this short note is to show that the main result of M. Aslantas [M. Aslantas, Finding a solution to an optimization problem and an application, J. Optim. Theory Appl., 194, 121- 141(2022)] which is related to existence of best proximity points for multivalued non-self mappings in the setting of partial metric spaces is a particular conclusion of a fixed point theorem due to J. Ahmed et al. [J. Ahmed, A. Azam and M. Arshad, Fixed points of multivalued mappings in partial metric spaces, Fixed Point Theory Appl., 2013:316].
Markin,J T. (2025). A New Approach to Existence of Best Proximity Points for Mixed Multivalued Maps in 0-Complete Partial Metric Spaces. Journal of Applied Mathematics & Data Analytics, 1(1), 17-21. doi: 10.311581/JAMDA.2508.1003.1.1.2
MLA
Markin,J T. "A New Approach to Existence of Best Proximity Points for Mixed Multivalued Maps in 0-Complete Partial Metric Spaces", Journal of Applied Mathematics & Data Analytics, 1, 1, 2025, 17-21. doi: 10.311581/JAMDA.2508.1003.1.1.2
HARVARD
Markin J T. (2025). 'A New Approach to Existence of Best Proximity Points for Mixed Multivalued Maps in 0-Complete Partial Metric Spaces', Journal of Applied Mathematics & Data Analytics, 1(1), pp. 17-21. doi: 10.311581/JAMDA.2508.1003.1.1.2
CHICAGO
J T Markin, "A New Approach to Existence of Best Proximity Points for Mixed Multivalued Maps in 0-Complete Partial Metric Spaces," Journal of Applied Mathematics & Data Analytics, 1 1 (2025): 17-21, doi: 10.311581/JAMDA.2508.1003.1.1.2
VANCOUVER
Markin J T. A New Approach to Existence of Best Proximity Points for Mixed Multivalued Maps in 0-Complete Partial Metric Spaces. JAMDA. 2025;1(1):17-21. doi: 10.311581/JAMDA.2508.1003.1.1.2
