2015
DOI: 10.1007/s10957-015-0793-x
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Outer Limit of Subdifferentials and Calmness Moduli in Linear and Nonlinear Programming

Abstract: With a common background and motivation, the main contributions of this paper are developed in two different directions. Firstly, we are concerned with functions, which are the maximum of a finite amount of continuously differentiable functions of n real variables, paying special attention to the case of polyhedral functions. For these max-functions, we obtain some results about outer limits of subdifferentials, which are applied to derive an upper bound for the calmness modulus of nonlinear systems. When conf… Show more

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Cited by 25 publications
(21 citation statements)
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“…Thanks to (25) and (26), it follows from Theorem 2.1 that Er g(x) ≤ 2ξ . As ξ > 0 can be chosen arbitrarily small, we conclude that Er {Ptb l ( f ,x, ε)}(x) = 0, which proves (15). ⊓ ⊔ (14) for any |∂ f | bd (x) as well as the first equality in (12) in the case |∂ f | bd (x) = 0.…”
Section: Stability Of Local Error Boundsmentioning
confidence: 56%
See 1 more Smart Citation
“…Thanks to (25) and (26), it follows from Theorem 2.1 that Er g(x) ≤ 2ξ . As ξ > 0 can be chosen arbitrarily small, we conclude that Er {Ptb l ( f ,x, ε)}(x) = 0, which proves (15). ⊓ ⊔ (14) for any |∂ f | bd (x) as well as the first equality in (12) in the case |∂ f | bd (x) = 0.…”
Section: Stability Of Local Error Boundsmentioning
confidence: 56%
“…Many authors have recently studied error bounds in connection with the metric regularity and subregularity (cf. [21]) as well as Aubin property and calmness of setvalued mappings: [3,15,16,26,33,34,36,[39][40][41]54,56,58,59,68,69]. The connections between the error bounds and weak sharp minima were studied in [13].…”
Section: Introductionmentioning
confidence: 99%
“…We are now ready to generalise Theorem 3.1 from [4]. We first prove that for positively homogeneous functions the inclusion (23) can be replaced by an equality.…”
Section: Exact Representations For Piecewise Affine Functionsmentioning
confidence: 96%
“…where J is a finite index set. As in [4] define the collection D(x) of index subsets D ⊂ J(x) such that the following system is consistent with respect to d Proof. We begin by showing the following identity:…”
Section: Limiting Subdifferential For Pointwise Minimamentioning
confidence: 99%
“…Cánovas, R. Henrion, A. Kruger, J. Parra and M. Théra) are as follows: an expression for the calmness modulus of the mapping in linear programming under canonical perturbations (objective function and right-hand side of the constraints), involving limits of subdifferentials [10]; left-hand-side perturbations of the constraints system added into the analysis in [18]; and the outer limits of subdifferentials of max-functions and calmness moduli for feasible and optimal set mappings dealt with in [8]. -In [13,14,16], the distance to ill-posedness (in terms of the distance to infeasibility and to unsolvability) is studied.…”
Section: Stability In Sip Starting From 1995 Mainly In Collaborationmentioning
confidence: 99%