论文信息 - Convex Operators and Supports

Convex Operators and Supports

In this paper we show that if Z is a partially ordered linear space with the property that each set with an upper bound has a least upper bound, then any convex operator F from a linear space X into Z has a support at each x ∈ X i.e., for each x ∈ X, there exists an affine operator A such that Ax = Fx and Ay ≤ Fy for each y ∈ X. The results in this paper are actually in the context of a more general condition than convexity, called W-convexily. W-convexity is a pointwise property of an operator and is closely related to another generalization of convexity, called order-convexity, which was introduced by Ortega and Rheinboldt in 1967.

S. L. Brumelle | S. Brumelle

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