Abstract
The prime objective of our discussions moves around the higher order variational symmetric dual pairs for which constraints are defined over cones and to explore relevant duality relations for the constructed duals. Making use of higher order \(\eta \)-invexity, we derive appropriate duality results and validate the obtained results with the help of numerical examples. Further, we discuss the static case of the considered dual problems.
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Khatri, S., Prasad, A.K. (2022). Higher Order Variational Symmetric Duality Over Cone Constraints. In: Rushi Kumar, B., Ponnusamy, S., Giri, D., Thuraisingham, B., Clifton, C.W., Carminati, B. (eds) Mathematics and Computing. ICMC 2022. Springer Proceedings in Mathematics & Statistics, vol 415. Springer, Singapore. https://doi.org/10.1007/978-981-19-9307-7_37
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