广义距离函数的导数与广义最近点的存在性

J. Approx. Theory Pub Date : 2002-03-01 DOI:10.1006/jath.2001.3651

Chong Li, R. Ni

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引用次数: 38

摘要

研究了Banach空间中广义距离函数的方向导数与广义最近点存在性的关系。设G为紧致局部一致凸巴拿赫空间中的任意非空闭子集。证明了如果与G有关的广义距离函数在x处的单侧方向导数等于1或-1，则G到x的广义最近点存在。本文还对S. Fitzpatrick (1989, Bull.)提出的开放问题给出了部分答案(定理3.5)。南国。数学。Soc.39, 233 - 238)。

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Derivatives of Generalized Distance Functions and Existence of Generalized Nearest Points

The relationship between directional derivatives of generalized distance functions and the existence of generalized nearest points in Banach spaces is investigated. Let G be any nonempty closed subset in a compact locally uniformly convex Banach space. It is proved that if the one-sided directional derivative of the generalized distance function associated to G at x equals to 1 or -1, then the generalized nearest points to x from G exist. We also give a partial answer (Theorem 3.5) to the open problem put forward by S. Fitzpatrick (1989, Bull. Austral. Math. Soc.39, 233-238).

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J. Approx. Theory

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