TY - JOUR
T1 - Inner and outer estimates for the solution sets and their asymptotic cones in vector optimization
AU - Flores-Bazán, Fabián
AU - Lara, Felipe
PY - 2012/10
Y1 - 2012/10
N2 - We use asymptotic analysis to develop finer estimates for the efficient, weak efficient and proper efficient solution sets (and for their asymptotic cones) to convex/quasiconvex vector optimization problems. We also provide a new representation for the efficient solution set without any convexity assumption, and the estimates involve the minima of the linear scalarization of the original vector problem. Some new necessary conditions for a point to be efficient or weak efficient solution for general convex vector optimization problems, as well as for the nonconvex quadratic multiobjective optimization problem, are established.
AB - We use asymptotic analysis to develop finer estimates for the efficient, weak efficient and proper efficient solution sets (and for their asymptotic cones) to convex/quasiconvex vector optimization problems. We also provide a new representation for the efficient solution set without any convexity assumption, and the estimates involve the minima of the linear scalarization of the original vector problem. Some new necessary conditions for a point to be efficient or weak efficient solution for general convex vector optimization problems, as well as for the nonconvex quadratic multiobjective optimization problem, are established.
KW - Asymptotic functions and cones
KW - Efficiency
KW - Linear scalarization
KW - Necessary conditions
KW - Nonconvex vector optimization
KW - Proper efficiency
KW - Weak efficiency
UR - https://www.scopus.com/pages/publications/84867193213
U2 - 10.1007/s11590-011-0366-3
DO - 10.1007/s11590-011-0366-3
M3 - Article
AN - SCOPUS:84867193213
SN - 1862-4472
VL - 6
SP - 1233
EP - 1249
JO - Optimization Letters
JF - Optimization Letters
IS - 7
ER -