We establish the following converse of the well-known inverse function theorem. Let g:U→V and f:V→U be inverse homeomorphisms between open subsets of Banach spaces. If g is differentiable of class Cp and f is locally Lipschitz, then the Fréchet derivative of g at each point of U is invertible and f must be differentiable of class Cp
International audienceThe objective of this short note is to provide an estimate of the generalized ...
Motivated by an attempt to find a general chain rule formula for differentiating the composition f ◦...
We study the statement that every locally lipschitz function is globally lipschitz for functions on ...
The purpose of this note is to give a proof, hopefully new, of the inverse function theorem as an ap...
In this article we formalize in Mizar [1], [2] the inverse function theorem for the class of C1 func...
AbstractA technical inverse function theorem of Nash-Moser type is proved for maps between Fréchet s...
AbstractWe generalize local and global inverse function theorems to continuous transformations in Rn...
The classical inverse/implicit function theorems revolves around solving an equation in terms of a p...
We study the global invertibility of non-smooth, locally Lipschitz maps between infinite-dimensional...
The paper shows that L. Thibault's limit sets allow an iff-characterization of local Lipschitzian in...
AbstractIt is known that a locally Lipschitz continuous function ƒ: Rn → Rn which is strongly B-diff...
This thesis contains two results. Firstly, we characterize locally convex spaces in which the theor...
Let X,Y be Banach spaces. Let F(x) be an operator mapping X into Y. We assume that F(x) is twice con...
It is obvious that the inverse function theorem holds in the Banach space for R . In my paper on the...
summary:In this paper we propose a procedure to construct approximations of the inverse of a class o...
International audienceThe objective of this short note is to provide an estimate of the generalized ...
Motivated by an attempt to find a general chain rule formula for differentiating the composition f ◦...
We study the statement that every locally lipschitz function is globally lipschitz for functions on ...
The purpose of this note is to give a proof, hopefully new, of the inverse function theorem as an ap...
In this article we formalize in Mizar [1], [2] the inverse function theorem for the class of C1 func...
AbstractA technical inverse function theorem of Nash-Moser type is proved for maps between Fréchet s...
AbstractWe generalize local and global inverse function theorems to continuous transformations in Rn...
The classical inverse/implicit function theorems revolves around solving an equation in terms of a p...
We study the global invertibility of non-smooth, locally Lipschitz maps between infinite-dimensional...
The paper shows that L. Thibault's limit sets allow an iff-characterization of local Lipschitzian in...
AbstractIt is known that a locally Lipschitz continuous function ƒ: Rn → Rn which is strongly B-diff...
This thesis contains two results. Firstly, we characterize locally convex spaces in which the theor...
Let X,Y be Banach spaces. Let F(x) be an operator mapping X into Y. We assume that F(x) is twice con...
It is obvious that the inverse function theorem holds in the Banach space for R . In my paper on the...
summary:In this paper we propose a procedure to construct approximations of the inverse of a class o...
International audienceThe objective of this short note is to provide an estimate of the generalized ...
Motivated by an attempt to find a general chain rule formula for differentiating the composition f ◦...
We study the statement that every locally lipschitz function is globally lipschitz for functions on ...