Journal of Mathematical Sciences: Advances and Applications[1] B. Aghezzaf, Second order mixed type duality in multiobjective
programming problems, J. Math. Anal. Appl. 285 (2003), 97-106.
[2] C. R. Bector, S. Chandra and V. Kumar, Duality for minimax
programming involving V-invex functions, Optimization 30
(1994), 93-103.
[3] K. L. Chew and E. U. Choo, Pseudolinearity and efficiency,
Mathematical Programming 28 (1984), 226-239.
[4] R. Egudo and M. A. Hanson, Second order mixed duality in
multiobjective programming, OPSEARCH 30 (1993), 223-230.
[5] M. A. Hanson, Second order invexity and duality in multiobjective
programming, OPSEARCH 30 (1993), 313-320.
[6] V. Jeyakumar and B. Mond, On generalized convex mathematical
programming, J. Austral. Math. Soc. Ser. B 34 (1992), 43-53.
[7] O. L. Mangasarian, Nonlinear Programming, McGraw-Hill, New York,
1969.
[8] O. L. Mangasarian, Second and higher-order duality in nonlinear
programming, J. Math. Anal. Appl. 51 (1975), 607-620.
[9] B. Mond and J. Zhang, Duality for multiobjective programming
involving second order V-invex functions, Proceeding of
Optimization Miniconference, B. M. Glover and V. Jeyakumar, editors,
University of New South Wales, Sydney, Australia, (1995), pp.
89-100.
[10] T. Weir, B. Mond and B. D. Craven, On duality for weakly
minimized vector optimization problems, Optimization 17 (1986),
711-721.
[11] T. Weir and B. Mond, Generalized convexity and duality in
multiple objective programming, Bull. Austral. Math. Soc. 39 (1989),
287-299.
