2004
DOI: 10.1023/b:svan.0000023396.58424.98
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Error Bounds and Implicit Multifunction Theorem in Smooth Banach Spaces and Applications to Optimization

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Cited by 58 publications
(38 citation statements)
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“…In recent years, error bound properties have been extensively studied (cf. [3,7,12,20,21,22,28,30,34] and references therein). In particular, studies on error bounds have been well carried out in terms of subdifferentials; these studies are mainly carried out in two directions of approach.…”
Section: D(x M (B)) ≤ L Y − B ∀(Y X) ∈ Gr(m ) Close To (B A)mentioning
confidence: 99%
“…In recent years, error bound properties have been extensively studied (cf. [3,7,12,20,21,22,28,30,34] and references therein). In particular, studies on error bounds have been well carried out in terms of subdifferentials; these studies are mainly carried out in two directions of approach.…”
Section: D(x M (B)) ≤ L Y − B ∀(Y X) ∈ Gr(m ) Close To (B A)mentioning
confidence: 99%
“…The pioneering works of Robinson [12][13][14][15] gave good samples for implicit function theorems and their applications. Later, Ledyaev and Zhu [7], Ngai and Théra [11] established sufficient conditions for the metric regularity of the implicit multifunction (1.2) in terms of Fréchet coderivatives in Banach spaces with Fréchet-smooth Lipschitz bump functions. By using the scheme given by Yen [19], Lee et al [8] showed some sufficient conditions for the nonemptiness, the lower semicontinuity, the metric regularity and the Lipschitz-like property of the implicit multifunction (1.2) in terms of normal coderivatives in Asplund spaces.…”
Section: Introductionmentioning
confidence: 99%
“…This concept goes back to the surjectivity of a linear continuous mapping in the Banach Open Mapping Theorem and to its extension to nonlinear operators known as the Lyusternik & Graves Theorem ( [40], [27], see also [15]) and [21]). For a detailed account the reader is referred to the books or works of many researchers, [3], [5], [9], [10], [11], [12], [13], [17], [18], [20], [22], [29], [30], [32], [34], [36], [37], [40], [42], [43], [41], [44], [45], [46], [50], [51], [52], [57] and the references given therein for many theoretical results on the metric regularity as well as its various applications. Metric regularity or its equivalent notions (covering at a linear rate) [38] or Aubin property of the inverse [1] is now considered as a central concept in modern variational analysis (see the survey paper by Ioffe [34]).…”
Section: Introductionmentioning
confidence: 99%