Error bounds for set inclusions

Error bounds for set inclusions

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摘要 A variant of Robinson-Ursescu Theorem is given in normed spaces. Several error bound theorems for convex inclusions are proved and in particular a positive answer to Li and Singer's conjecture is given under weaker assumption than the assumption required in their conjecture. Perturbation error bounds are also studied. As applications, we study error bounds for convex inequality systems. A variant of Robinson-Ursescu Theorem is given in normed spaces. Several error bound theorems for convex inclusions are proved and in particular a positive answer to Li and Singer's conjecture is given under weaker assumption than the assumption required in their conjecture. Perturbation error bounds are also studied. As applications, we study error bounds for convex inequality systems.

作者郑喜印

机构地区 Department of Mathematics

出处《Science China Mathematics》 SCIE 2003年第6期750-763,共14页 中国科学：数学（英文版）

基金 This work was supported by the National Natural Science Foundation of China(Grant No.19861004) the Natural Science Foundation of Yunnan Province.

关键词 error bound metrical regularity CONVEX multifunction RECESSION cone NORMED space. error bound metrical regularity convex multifunction recession cone normed space

分类号 O189 [理学—基础数学]

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Science China Mathematics

2003年第6期

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Error bounds for set inclusions

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