In this paper, we present some inverse function theorems and implicit function theorems for set-valued mappings between Fréchet spaces. The proof relies on Lebesgue's Dominated Convergence Theorem and on Ekeland's variational principle. An application to the existence of solutions of differential equations in Fréchet spaces with non-smooth data is given
A general existence and uniqueness result of Picard-Lindelöf type is proved for ordinary differentia...
Abstract. We prove a simplified version of the Nash-Moser implicit function theorem in weighted Bana...
We prove an inverse function theorem of the Nash-Moser type. The main difference between our method ...
Revised versionIn this paper, we present some implicit function theorems for set-valued mappings bet...
AbstractA technical inverse function theorem of Nash-Moser type is proved for maps between Fréchet s...
This paper deals with the proof of implicit function theorems for certain classes of set-valued func...
The implicit function theorem is part of the bedrock of mathematics analysis and geometry. Finding i...
AbstractIn the framework of the theory of normal coderivative for multifunctions, new implicit funct...
Abstract. Sufficient conditions are given for a mapping to be γ-G inverse differentiable. Constraine...
Sufficient conditions are given for a mapping to be $\gamma$-G inverse differentiable. Constrained i...
We prove several equivalent versions of the inverse function theorem: an inverse function theorem fo...
We present a criterion for local surjectivity of mappings between graded Frechet spaces in the spiri...
The implicit function theorem is one of the most important theorems in analysis and its many variant...
AbstractIn this paper, the inverse function theorem and the implicit function theorem in a non-Archi...
We obtain a global inverse function theorem guaranteeing that if a smooth mapping of finite-dimensio...
A general existence and uniqueness result of Picard-Lindelöf type is proved for ordinary differentia...
Abstract. We prove a simplified version of the Nash-Moser implicit function theorem in weighted Bana...
We prove an inverse function theorem of the Nash-Moser type. The main difference between our method ...
Revised versionIn this paper, we present some implicit function theorems for set-valued mappings bet...
AbstractA technical inverse function theorem of Nash-Moser type is proved for maps between Fréchet s...
This paper deals with the proof of implicit function theorems for certain classes of set-valued func...
The implicit function theorem is part of the bedrock of mathematics analysis and geometry. Finding i...
AbstractIn the framework of the theory of normal coderivative for multifunctions, new implicit funct...
Abstract. Sufficient conditions are given for a mapping to be γ-G inverse differentiable. Constraine...
Sufficient conditions are given for a mapping to be $\gamma$-G inverse differentiable. Constrained i...
We prove several equivalent versions of the inverse function theorem: an inverse function theorem fo...
We present a criterion for local surjectivity of mappings between graded Frechet spaces in the spiri...
The implicit function theorem is one of the most important theorems in analysis and its many variant...
AbstractIn this paper, the inverse function theorem and the implicit function theorem in a non-Archi...
We obtain a global inverse function theorem guaranteeing that if a smooth mapping of finite-dimensio...
A general existence and uniqueness result of Picard-Lindelöf type is proved for ordinary differentia...
Abstract. We prove a simplified version of the Nash-Moser implicit function theorem in weighted Bana...
We prove an inverse function theorem of the Nash-Moser type. The main difference between our method ...