The approximate subdifferential of composite functions

A. Jourani; L. Thibault

doi:10.1017/S0004972700015276

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This paper deals with the approximate subdifferential chain rule in a Banach space. It establishes specific results when the real-valued function is locally Lipschitzian and the mapping is strongly compactly Lipschitzian.

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Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Jourani, A. and Thibault, L. 1994. A note on Fréchet and approximate subdifferentials of composite functions. Bulletin of the Australian Mathematical Society, Vol. 49, Issue. 1, p. 111.

Jourani, A. 1994. Constraint qualifications and Lagrange multipliers in nondifferentiable programming problems. Journal of Optimization Theory and Applications, Vol. 81, Issue. 3, p. 533.

Glover, B. M. and Craven, B. D. 1994. A Fritz John optimality condition using the approximate subdifferential. Journal of Optimization Theory and Applications, Vol. 82, Issue. 2, p. 253.

Jourani, Abderrahim 1994. Qualification conditions for multivalued functions in Banach spaces with applications to nonsmooth vector optimization problems. Mathematical Programming, Vol. 66, Issue. 1-3, p. 1.

Glover, B. M. and Ralph, D. 1994. First order approximations to nonsmooth mappings with application to metric regularity. Numerical Functional Analysis and Optimization, Vol. 15, Issue. 5-6, p. 599.

Ralph, D. 1994. A chain rule for nonsmooth composite functions via minimisation. Bulletin of the Australian Mathematical Society, Vol. 49, Issue. 1, p. 129.

Flåm, Sjur Didrik 1995. Corrigendum: Lagrange Multipliers in Stochastic Programming. SIAM Journal on Control and Optimization, Vol. 33, Issue. 2, p. 667.

Jourani, A. and Thibault, L. 1995. Metric regularity for strongly compactly Lipschitzian mappings. Nonlinear Analysis: Theory, Methods & Applications, Vol. 24, Issue. 2, p. 229.

IOFFE, A.D. 1997. DIRECTIONAL COMPACTNESS, SCALARIZATION AND NONSMOOTH SEMI-FREDHOLM MAPPINGS. Nonlinear Analysis: Theory, Methods & Applications, Vol. 29, Issue. 2, p. 201.

Thibault, Lionel 1997. Recent Advances in Optimization. Vol. 452, Issue. , p. 356.

Henrion, René 1997. Topological Properties of the Approximate Subdifferential. Journal of Mathematical Analysis and Applications, Vol. 207, Issue. 2, p. 345.

Jourani, A. and Thibault, L. 1999. Coderivatives of multivalued mappings, locally compact cones and metric regularity. Nonlinear Analysis: Theory, Methods & Applications, Vol. 35, Issue. 7, p. 925.

Ioffe, Alexander 1999. Nonlinear Analysis, Differential Equations and Control. p. 447.

Van Ngai, Huynh The Luc, Dinh and Théra, M. 2002. Extensions of Fréchet ϵ-Subdifferential Calculus and Applications. Journal of Mathematical Analysis and Applications, Vol. 268, Issue. 1, p. 266.

Jourani, Abderrahim 2003. On a class of compactly epi-Lipschitzian sets. Nonlinear Analysis: Theory, Methods & Applications, Vol. 54, Issue. 3, p. 471.

Dutta, Joydeep and Tammer, Christiane 2006. Lagrangian conditions for vector optimization in Banach spaces. Mathematical Methods of Operations Research, Vol. 64, Issue. 3, p. 521.

Bellaassali, S. and Jourani, A. 2008. Lagrange Multipliers for Multiobjective Programs with a General Preference. Set-Valued Analysis, Vol. 16, Issue. 2-3, p. 229.

Dutta, Joydeep 2012. Recent Developments in Vector Optimization. Vol. 1, Issue. , p. 127.

Guo, Lei Ye, Jane J. and Zhang, Jin 2013. Mathematical Programs with Geometric Constraints in Banach Spaces: Enhanced Optimality, Exact Penalty, and Sensitivity. SIAM Journal on Optimization, Vol. 23, Issue. 4, p. 2295.

Feng, Yanyan and Qiu, Qiusheng 2014. Optimality conditions for vector equilibrium problems with constraint in Banach spaces. Optimization Letters, Vol. 8, Issue. 6, p. 1931.

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