Results 51 to 60 of about 335 (149)
, 2022 We characterize the subdifferential and the Fenchel conjugate of convex integral functions by means of respectively the approximate subdifferential and the conjugate of the associated convex normal integrands.
Hantoute, Abderrahim +1 more
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Subdifferential analysis of differential inclusions via discretization
, 2012 The framework of differential inclusions encompasses modern optimal control and the calculus of variations. Necessary optimality conditions in the literature identify potentially optimal paths, but do not show how to perturb paths to optimality. We first
Pang, C.H. Jeffrey
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A sufficient condition for metric subregularity of set-valued mappings between Asplund spaces based on an outer-coderivative-like variational tool. [PDF]
Heliyon, 2023 Maréchal M.
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, 2023 In this paper, in the absence of any constraint qualifications, we develop sequential necessary and sufficient optimality conditions for a constrained multiobjective fractional programming problem characterizing a Henig proper efficient solution in terms
Laghdir, Mohamed +2 more
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The Hadwiger theorem on convex functions, III: Steiner formulas and mixed Monge-Ampère measures. [PDF]
Calc Var Partial Differ Equ, 2022 Colesanti A, Ludwig M, Mussnig F.
europepmc +1 more source
An extension of the proximal point algorithm beyond convexity. [PDF]
J Glob Optim, 2022 Grad SM, Lara F.
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Fixed Points and Zeros for Set Valued Mappings on Riemannian Manifolds: A Subdifferential Approach
, 2008 In this paper we establish several results which allow to find fixed points and zeros of set-valued mappings on Riemannian manifolds. In order to prove these results we make use of subdifferential calculus. We also give some useful applications.Depto. de
Ferrera Cuesta, Juan +2 more
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On the constancy theorem for anisotropic energies through differential inclusions. [PDF]
Calc Var Partial Differ Equ, 2021 Hirsch J, Tione R.
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A more robust definition of multiple priors [PDF]
This paper provides a multiple-priors representation of ambiguous beliefs à la Ghirardato, Maccheroni, and Marinacci (2004) and Nehring (2002) for any preference that is (i) monotonic, (ii) Bernoullian, i.e.
Marciano Siniscalchi, Paolo Ghirardato
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The Structure of Density-Potential Mapping. Part I: Standard Density-Functional Theory. [PDF]
ACS Phys Chem Au, 2023 Penz M +4 more
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