Add to ORKGThis survey of nonsmooth analysis sets out to prove an inverse function theorem for set-valued maps. The inverse function theorem for the more usual smooth maps plays a very important role in the solution of many problems in pure and applied analysis, and we can expect such an adaptation of this theorem also to be of great value. For example, it can be used to solve convex minimization problems and to prove the Lipschitz behavior of its solutions when the natural parameters vary--a very important problem in marginal theory in economics
The classical inverse/implicit function theorems revolves around solving an equation in terms of a p...
This thesis contains two results. Firstly, we characterize locally convex spaces in which the theor...
This paper presents a survey of results related to quasidifferential calculus. First we discuss diff...
We derive the Lipschitz dependence of the set of solutions of a convex minimization problem and its ...
We prove several equivalent versions of the inverse function theorem: an inverse function theorem fo...
The motivations of nonsmooth analysis are discussed. Appiications are given to the sensitivity of op...
AbstractWe extend the classical inverse and implicit function theorems, the implicit function theore...
AbstractA technical inverse function theorem of Nash-Moser type is proved for maps between Fréchet s...
This book aims to give an introduction to generalized derivative concepts useful in deriving necessa...
The paper shows that L. Thibault's limit sets allow an iff-characterization of local Lipschitzian in...
19 pagesWe give several versions of local and global inverse mapping theorem for tame non necessaril...
International audienceThis paper proposes a learning framework and a set of algorithms for nonsmooth...
ness in analysis and optimization, which is of course not new, but to the attempts to consider diffe...
AbstractIn this paper we use tools from topology and dynamical systems to analyze the structure of s...
We describe four instances where set-valued maps intervene either as a tool to state the results or ...
The classical inverse/implicit function theorems revolves around solving an equation in terms of a p...
This thesis contains two results. Firstly, we characterize locally convex spaces in which the theor...
This paper presents a survey of results related to quasidifferential calculus. First we discuss diff...
We derive the Lipschitz dependence of the set of solutions of a convex minimization problem and its ...
We prove several equivalent versions of the inverse function theorem: an inverse function theorem fo...
The motivations of nonsmooth analysis are discussed. Appiications are given to the sensitivity of op...
AbstractWe extend the classical inverse and implicit function theorems, the implicit function theore...
AbstractA technical inverse function theorem of Nash-Moser type is proved for maps between Fréchet s...
This book aims to give an introduction to generalized derivative concepts useful in deriving necessa...
The paper shows that L. Thibault's limit sets allow an iff-characterization of local Lipschitzian in...
19 pagesWe give several versions of local and global inverse mapping theorem for tame non necessaril...
International audienceThis paper proposes a learning framework and a set of algorithms for nonsmooth...
ness in analysis and optimization, which is of course not new, but to the attempts to consider diffe...
AbstractIn this paper we use tools from topology and dynamical systems to analyze the structure of s...
We describe four instances where set-valued maps intervene either as a tool to state the results or ...
The classical inverse/implicit function theorems revolves around solving an equation in terms of a p...
This thesis contains two results. Firstly, we characterize locally convex spaces in which the theor...
This paper presents a survey of results related to quasidifferential calculus. First we discuss diff...