AbstractWe prove a generalization of Gravesʼ Open Mapping Theorem for a class of mappings which can be approximated at a reference point by a set-valued one having particular properties. The nonlinear mapping is restricted to a closed convex subset of a Banach space. We apply the results to derive necessary and sufficient conditions ensuring the existence of a differentiable selection for the inverse mapping. A slight generalization of a sufficient condition by J. Klamka on so-called constrained exact local controllability of nonlinear and semi-linear dynamic systems is also proved
Abstract. In the present paper finite-dimensional dynamical control systems described by semilinear ...
In this paper we study the linear openness of the composition of set-valued maps carried out thanks...
AbstractThis paper deals with some new generalizations of Farkas' theorem for a class of set-valued ...
AbstractWe prove a generalization of Gravesʼ Open Mapping Theorem for a class of mappings which can ...
Some constrained open mapping theorems are obtained via Ekeland’s variational principle. The constra...
AbstractIn this paper infinite-dimensional dynamical systems described by nonlinear abstract differe...
The Bartle-Graves theorem extends the Banach open mapping principle to a family of linear and bounde...
AbstractWe establish an open mapping theorem which is independent of continuity and linearity of con...
AbstractWe prove an open mapping principle for set-valued maps on Banach spaces using “kth order var...
In the paper we study the existence of constrained graph approximations of set-valued maps with non-...
It is certainly well known that a mapping between metric spaces is continuous if and only if it pres...
In Chapter 2, we first introduce a generalized inverse differentiability for set-valued mappings and...
The paper gives sufficient conditions for projections of certain pseudoconcave sets to be open. More...
We prove an open mapping principle for set-valued maps on Banach spaces using “kth order variations”
This paper deals with the stability of the feasible set mapping of linear systems of an arbitrary nu...
Abstract. In the present paper finite-dimensional dynamical control systems described by semilinear ...
In this paper we study the linear openness of the composition of set-valued maps carried out thanks...
AbstractThis paper deals with some new generalizations of Farkas' theorem for a class of set-valued ...
AbstractWe prove a generalization of Gravesʼ Open Mapping Theorem for a class of mappings which can ...
Some constrained open mapping theorems are obtained via Ekeland’s variational principle. The constra...
AbstractIn this paper infinite-dimensional dynamical systems described by nonlinear abstract differe...
The Bartle-Graves theorem extends the Banach open mapping principle to a family of linear and bounde...
AbstractWe establish an open mapping theorem which is independent of continuity and linearity of con...
AbstractWe prove an open mapping principle for set-valued maps on Banach spaces using “kth order var...
In the paper we study the existence of constrained graph approximations of set-valued maps with non-...
It is certainly well known that a mapping between metric spaces is continuous if and only if it pres...
In Chapter 2, we first introduce a generalized inverse differentiability for set-valued mappings and...
The paper gives sufficient conditions for projections of certain pseudoconcave sets to be open. More...
We prove an open mapping principle for set-valued maps on Banach spaces using “kth order variations”
This paper deals with the stability of the feasible set mapping of linear systems of an arbitrary nu...
Abstract. In the present paper finite-dimensional dynamical control systems described by semilinear ...
In this paper we study the linear openness of the composition of set-valued maps carried out thanks...
AbstractThis paper deals with some new generalizations of Farkas' theorem for a class of set-valued ...