International audienceThe objective of this short note is to provide an estimate of the generalized Jacobian of the inverse of a Lipschitzian mapping when Clarke’s inverse function theorem applies. Contrary to the classical C1 case, inverting matrices of the generalized Jacobian is not enough. Simple counterexamples show that our results are sharp
We study systems of equations, F(x)=0, given by piecewise differentiable functions F from R^n to R^k...
We extend a corollary in [2], yielding a sufficient and necessary condition for a polynomial map to ...
After a brief review of the relevant classical theory and a presentation of the concept of generaliz...
International audienceThe objective of this short note is to provide an estimate of the generalized ...
Primary objective of the thesis is proof of the statement that if for ∈ ℕ a ≥ 1 a bilipschitz mappin...
International audienceThis paper studies two important mathematical objects which are useful in tack...
We establish the following converse of the well-known inverse function theorem. Let g:U→V and f:V→U ...
The paper shows that L. Thibault's limit sets allow an iff-characterization of local Lipschitzian in...
We study the global inversion of a continuous nonsmooth mapping f : R-n -> R-n, which may be non-loc...
AbstractA brief and elementary proof is given for a theorem of Bass, Connell and Wright. Suppose F =...
We study the statement that every locally lipschitz function is globally lipschitz for functions on ...
The classical inverse/implicit function theorems revolves around solving an equation in terms of a p...
AbstractIn this paper, we give interpretations of the Jacobian condition (invertibility of the Jacob...
An abstract Lipschitz stability estimate is proved for a class of inverse problems. It is then appli...
We obtain a global inverse function theorem guaranteeing that if a smooth mapping of finite-dimensio...
We study systems of equations, F(x)=0, given by piecewise differentiable functions F from R^n to R^k...
We extend a corollary in [2], yielding a sufficient and necessary condition for a polynomial map to ...
After a brief review of the relevant classical theory and a presentation of the concept of generaliz...
International audienceThe objective of this short note is to provide an estimate of the generalized ...
Primary objective of the thesis is proof of the statement that if for ∈ ℕ a ≥ 1 a bilipschitz mappin...
International audienceThis paper studies two important mathematical objects which are useful in tack...
We establish the following converse of the well-known inverse function theorem. Let g:U→V and f:V→U ...
The paper shows that L. Thibault's limit sets allow an iff-characterization of local Lipschitzian in...
We study the global inversion of a continuous nonsmooth mapping f : R-n -> R-n, which may be non-loc...
AbstractA brief and elementary proof is given for a theorem of Bass, Connell and Wright. Suppose F =...
We study the statement that every locally lipschitz function is globally lipschitz for functions on ...
The classical inverse/implicit function theorems revolves around solving an equation in terms of a p...
AbstractIn this paper, we give interpretations of the Jacobian condition (invertibility of the Jacob...
An abstract Lipschitz stability estimate is proved for a class of inverse problems. It is then appli...
We obtain a global inverse function theorem guaranteeing that if a smooth mapping of finite-dimensio...
We study systems of equations, F(x)=0, given by piecewise differentiable functions F from R^n to R^k...
We extend a corollary in [2], yielding a sufficient and necessary condition for a polynomial map to ...
After a brief review of the relevant classical theory and a presentation of the concept of generaliz...