Add to ORKGWe derive the Lipschitz dependence of the set of solutions of a convex minimization problem and its Lagrange multipliers upon the natural parameters from an Inverse Function Theorem for set-valued maps. This requires the use of contingent and Clarke derivatives of set-valued maps, as well as generalized second derivatives of convex functions
This book aims to give an introduction to generalized derivative concepts useful in deriving necessa...
Diening L, Stroffolini B, Verde A. Lipschitz regularity for some asymptotically convex problems. ESA...
AbstractThis article studies the problem of minimizing ∫ΩF(Du)+G(x,u) over the functions u∈W1,1(Ω) t...
In this paper S.M. Robinson's result concerning the upper Lipschitz continuity of polyhedral multifu...
This survey of nonsmooth analysis sets out to prove an inverse function theorem for set-valued maps....
In this paper we make use of subdifferential calculus and other variational techniques, traced out f...
The motivations of nonsmooth analysis are discussed. Appiications are given to the sensitivity of op...
El objetivo de la presente tesis es el estudio de la estabilidad de problemas de optimizaci on line...
summary:In the paper necessary optimality conditions are derived for the minimization of a locally L...
summary:In the paper necessary optimality conditions are derived for the minimization of a locally L...
The author considers the problem of minimizing a convex function of two variables without computing ...
This is the publisher's version, also available electronically from http://epubs.siam.org/doi/abs/10...
This is the publisher's version, also available electronically from http://epubs.siam.org/doi/abs/10...
The paper shows that L. Thibault's limit sets allow an iff-characterization of local Lipschitzian in...
The present paper is concerned with optimization problems in which the data are differentiable funct...
This book aims to give an introduction to generalized derivative concepts useful in deriving necessa...
Diening L, Stroffolini B, Verde A. Lipschitz regularity for some asymptotically convex problems. ESA...
AbstractThis article studies the problem of minimizing ∫ΩF(Du)+G(x,u) over the functions u∈W1,1(Ω) t...
In this paper S.M. Robinson's result concerning the upper Lipschitz continuity of polyhedral multifu...
This survey of nonsmooth analysis sets out to prove an inverse function theorem for set-valued maps....
In this paper we make use of subdifferential calculus and other variational techniques, traced out f...
The motivations of nonsmooth analysis are discussed. Appiications are given to the sensitivity of op...
El objetivo de la presente tesis es el estudio de la estabilidad de problemas de optimizaci on line...
summary:In the paper necessary optimality conditions are derived for the minimization of a locally L...
summary:In the paper necessary optimality conditions are derived for the minimization of a locally L...
The author considers the problem of minimizing a convex function of two variables without computing ...
This is the publisher's version, also available electronically from http://epubs.siam.org/doi/abs/10...
This is the publisher's version, also available electronically from http://epubs.siam.org/doi/abs/10...
The paper shows that L. Thibault's limit sets allow an iff-characterization of local Lipschitzian in...
The present paper is concerned with optimization problems in which the data are differentiable funct...
This book aims to give an introduction to generalized derivative concepts useful in deriving necessa...
Diening L, Stroffolini B, Verde A. Lipschitz regularity for some asymptotically convex problems. ESA...
AbstractThis article studies the problem of minimizing ∫ΩF(Du)+G(x,u) over the functions u∈W1,1(Ω) t...