Let (E,xi) = ind(E-n,xi(n)) be an inductive limit of a sequence (E-n,xi(n))(n is an element of N) of locally convex spaces and let every step (E-n,xi(n)) be endowed with a partial order by a pointed convex (solid) cone S-n. In the framework of inductive limits of partially ordered locally convex spaces, the notions of lastingly efficient points, lastingly weakly efficient points and lastingly globally properly efficient points are introduced. For several ordering cones, the notion of non-conflict is introduced. Under the requirement that the sequence (S-n)(n is an element of N) of ordering cones is nonconflicting, an existence theorem on lastingly weakly efficient points is presented. From this, an existence theorem on lastingly globally properly efficient points is deduced.

• 出版日期2014-9
• 单位苏州大学