Set-valued minimax fractional programming problems under ρ-cone arcwise connectedness

AHMAD, I. (2003) optimality conditions and duality in fractional minimax programming Involving generalized ρ-invexity. internat. J. Manag. Syst. 19, 165–180. Search in Google Scholar

AHMAD, I. and HUSAIN, Z. (2006) optimality conditions and duality in non-differentiable Minimax fractional programming with generalized convexity. J. Optim. Theory Appl. 129(2), 255–275.10.1007/s10957-006-9057-0 Search in Google Scholar

AUBIN, J.P. (1981) Contingent derivatives of set-valued maps and existence of solutions to nonlinear inclusions and differential inclusions. In: L. Nachbin (ed.), Mathematical Analysis and Applications, Part A. Academic Press, New York, 160–229. Search in Google Scholar

AUBIN, J.P. and FRANKOWSKA, H. (1990) Set-Valued Analysis. Birhäuser, Boston. Search in Google Scholar

AVRIEL, M. (1976) Nonlinear Programming: Theory and Method. Prentice-Hall, Englewood Cliffs, New Jersey. Search in Google Scholar

BECTOR, C.R. and BHATIA, B.L. (1985) Sufficient optimality conditions and duality for a minmax problem. Util. Math. 27, 229–247. Search in Google Scholar

BORWEIN, J. (1977) Multivalued convexity and optimization: a unified approach to inequality and equality constraints. Math. Program. 13(1), 183–199.10.1007/BF01584336 Search in Google Scholar

CAMBINI, A., MARTEIN, L. and VLACH, M. (1999) Second order tangent sets and optimality conditions. Math. Japonica 49(3), 451–461. Search in Google Scholar

CHANDRA, S. and KUMAR, V. (1995) Duality in fractional minimax programming. J. Austral. Math. Soc. (Ser. A.) 58, 376–386. Search in Google Scholar

CORLEY, H.W. (1987) Existence and Lagrangian duality for maximizations of set-valued functions. J. Optim. Theory Appl. 54(3), 489–501.10.1007/BF00940198 Search in Google Scholar

DAS, K. and NAHAK, C. (2014) Sufficient optimality conditions and duality theorems for set-valued optimization problem under generalized cone convexity. Rend. Circ. Mat. Palermo 63(3), 329–345.10.1007/s12215-014-0163-9 Search in Google Scholar

DAS, K. and NAHAK, C. (2016a) Optimality conditions for approximate quasi efficiency in set-valued equilibrium problems. SeMA J. 73(2), 183–199.10.1007/s40324-016-0063-3 Search in Google Scholar

DAS, K. and NAHAK, C. (2016b) Set-valued fractional programming problems under generalized cone convexity. Opsearch 53(1), 157–177.10.1007/s12597-015-0222-9 Search in Google Scholar

DAS, K. and NAHAK, C. (2017a) Approximate quasi efficiency of set-valued optimization problems via weak subdifferential. SeMA J. 74(4), 523–542.10.1007/s40324-016-0099-4 Search in Google Scholar

DAS, K. and NAHAK, C. (2017b) Set-valued minimax programming problems under generalized cone convexity. Rend. Circ. Mat. Palermo 66(3), 361–374.10.1007/s12215-016-0258-6 Search in Google Scholar

DAS, K. and NAHAK, C. (2020a) Optimality conditions for set-valued minimax fractional programming problems. SeMA J. 77(2), 161–179.10.1007/s40324-019-00209-7 Search in Google Scholar

DAS, K. and NAHAK, C. (2020b) Optimality conditions for set-valued minimax programming problems via second-order contingent epiderivative. J. Sci. Res. 64(2), 313–321.10.37398/JSR.2020.640243 Search in Google Scholar

FU, J. and WANG, Y. (2003) Arcwise connected cone-convex functions and mathematical programming. J. Optim. Theory Appl. 118(2), 339–352.10.1023/A:1025451422581 Search in Google Scholar

JAHN, J. and RAUH, R. (1997) Contingent epiderivatives and set-valued optimization. Math. Method Oper. Res. 46(2), 193–211.10.1007/BF01217690 Search in Google Scholar

LAI, H.C. and LEE, J.C. (2002) On duality theorems for nondifferentiable minimax fractional programming. J. Comput. Appl. Math. 146, 115–126. Search in Google Scholar

LAI, H.C., LIU, J.C. and TANAKA, K. (1999) Necessary and sufficient conditions for minimax fractional programming. J. Math. Anal. Appl. 230, 311–328. Search in Google Scholar

LALITHA, C., DUTTA, J. and GOVIL, M.G. (2003) Optimality criteria in set-valued optimization. J. Aust. Math. Soc. 75(2), 221–232.10.1017/S1446788700003736 Search in Google Scholar

LIANG, Z.A. and SHI, Z.W. (2003) Optimality conditions and duality for minimax fractional programming with generalized convexity. J. Math. Anal. Appl. 277, 474–488. Search in Google Scholar

LIU, J.C. and WU, C.S. (1998) On minimax fractional optimality conditions with (F, ρ)-convexity. J. Math. Anal. Appl. 219, 36–51. Search in Google Scholar

MISHRA, S.K. (1995) Pseudolinear fractional minmax programming. Indian J. Pure Appl. Math. 26, 763–772. Search in Google Scholar

MISHRA, S.K. (1998) Generalized pseudo convex minmax programming. Opsearch 35(1), 32–44.10.1007/BF03398537 Search in Google Scholar

MISHRA, S.K. (2001) Pseudoconvex complex minimax programming. Indian J. Pure Appl. Math. 32(2), 205–214. Search in Google Scholar

MISHRA, S.K., WANG, S.Y. and LAI, K.K. (2004) Complex minimax programming under generalized convexity. J. Comput. Appl. Math. 167(1), 59–71.10.1016/j.cam.2003.09.045 Search in Google Scholar

MISHRA, S.K., WANG, S.Y., LAI, K.K. and SHI, J.M. (2003) Nondifferentiable minimax fractional programming under generalized univexity. J. Comput. Appl. Math. 158(2), 379–395.10.1016/S0377-0427(03)00455-2 Search in Google Scholar

PENG, Z. and XU, Y. (2018) Second-order optimality conditions for cone-subarcwise connected set-valued optimization problems. Acta Math. Appl. Sin. Engl. Ser. 34(1), 183–196.10.1007/s10255-018-0738-x Search in Google Scholar

TREANTA, S. and DAS, K. (2021) On robust saddle-point criterion in optimization problems with curvilinear integral functionals. Mathematics 9(15), 1–13. Search in Google Scholar

WEIR, T. (1992) Pseudoconvex minimax programming. Util. Math. 42, 234–240. Search in Google Scholar

YADAV, S.R. and MUKHERJEE, R.N. (1990) Duality for fractional minimax programming problems. J. Austral. Math. Soc. (Ser. B.) 31, 484–492. Search in Google Scholar

YIHONG, X. and MIN, L. (2016) Optimality conditions for weakly efficient elements of set-valued optimization with α-order near cone-arcwise connectedness. J. Systems Sci. Math. Sci. 36(10), 1721–1729. Search in Google Scholar

YU, G. (2013) Optimality of global proper efficiency for cone-arcwise connected set-valued optimization using contingent epiderivative. Asia-Pac. J. Oper. Res. 30(03), 1340004.10.1142/S0217595913400046 Search in Google Scholar

YU, G. (2016) Global proper efficiency and vector optimization with cone-arcwise connected set-valued maps. Numer. Algebra, Control & Optim. 6(1), 35–44.10.3934/naco.2016.6.35 Search in Google Scholar

ZALMAI, G.J. (1987) Optimality criteria and duality for a class of minimax programming problems with generalized invexity conditions. Util. Math. 32, 35–57. Search in Google Scholar