Symmetric duality for fractional variational problems with cone constraints

We formulate a pair of multiobjective symmetric dual programs for pseudo-invex functions and arbitrary cones. Our model is unifying the Wolfe vector symmetric dual and the Mond-Weir vector symmetric dual models. We establish the weak, strong, converse and self duality theorems for our pair of dual m

A pair of higher-order Wolfe and Mond-Weir type symmetric dual models with cone constraints are formulated and usual duality theorems are established under higher-order η-invexity/η-pseudoinvexity assumptions. Symmetric minimax mixed integer primal and dual problems are also discussed. These duality

Wolfe and Mond-Weir type second-order symmetric duals are formulated and appropriate duality theorems are established under -bonvexity/ -pseudobonvexity assumptions. This formulation removes several omissions in an earlier second-order primal dual pair introduced by Devi [Symmetric duality for nonli

A Mond᎐Weir type symmetric dual for a multiobjective variational problem is formulated. Weak and strong duality theorems under generalized convexity assumptions are proved for properly efficient solutions. Under an additional condition on the kernel function that occurs in the formulation of the pro