| Volume 10, Number 6, 2020, Pages 2806-2825 DOI:10.11948/20180261 |
| Higher order duality for a new class of nonconvex semi-infinite multiobjective fractional programming with support functions |
| Tadeusz Antczak,Kalpana Shukla |
| Keywords:Semi-infinite multiobjective fractional programming, support function, Mond Weir dual, Schaible type dual, higher order $\left(\Phi,\rho,\sigma^{\alpha}\right)$-type I functions. |
| Abstract: |
| In the paper, a new class of semi-infinite multiobjective fractional programming problems with support functions in the objective and constraint functions is considered. For such vector optimization problems, higher order dual problems in the sense of Mond-Weir and Schaible are defined. Then, various duality results between the considered multiobjective fractional semi-infinite programming problem and its higher order dual problems mentioned above are established under assumptions that the involved functions are higher order $\left(\Phi,\rho,\sigma^{\alpha}\right)$-type I functions. The results established in the paper generalize several similar results previously established in the literature. |
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