Add to ORKGIn Chapter 2, we first introduce a generalized inverse differentiability for set-valued mappings and consider some of its properties. Then, we use this differentiability, Ekeland's Variational Principle and some fixed point theorems to consider constrained implicit function and open mapping theorems and surjectivity problems of set-valued mappings. The mapping considered is of the form F(x, u) + G (x, u). The inverse derivative condition is only imposed on the mapping x F(x, u), and the mapping x G(x, u) is supposed to be Lipschitz. The constraint made to the variable x is a closed convex cone if x F(x, u) is only a closed mapping, and in case x F(x, u) is also Lipschitz, the constraint needs only to be a closed subset. We obtain some c...
AbstractThis paper discusses the following viability problem of a differential inclusion, x′(t) + Ax...
summary:In the paper we study the topological structure of the solution set of a class of nonlinear ...
The general theory of Lyapunov stability of first-order differential inclusions in Hilbert spaces ha...
In Chapter 2, we first introduce a generalized inverse differentiability for set-valued mappings and...
We prove several equivalent versions of the inverse function theorem: an inverse function theorem fo...
Existence results are given for the implicit evolution inclusions $(Bx(t))'+A(t, x(t))\ni f(t)$ and...
AbstractExistence of solutions is established for a class of implicit differential inclusions equiva...
Let Z be a separable Banach space whose dual is uni-formly convex, A: D(A) e X ^ 2 ^ an m-dissipativ...
In this paper the authors consider the problem of finding Filippov estimates when suitable state con...
AbstractWe prove a generalization of Gravesʼ Open Mapping Theorem for a class of mappings which can ...
The celebrated Filippov's theorem implies that, given a trajectory x(1) : [0, + infinity[ \-> R-n of...
Properties of control systems described by differential inclusions are well established in the liter...
Sufficient conditions are given for a mapping to be $\gamma$-G inverse differentiable. Constrained i...
We study the controllability for a class of semilinear differential inclusions in Banach spaces. Sin...
The converse statement of the Filippov-Wazewski relaxation theorem is proven, more precisely, two di...
AbstractThis paper discusses the following viability problem of a differential inclusion, x′(t) + Ax...
summary:In the paper we study the topological structure of the solution set of a class of nonlinear ...
The general theory of Lyapunov stability of first-order differential inclusions in Hilbert spaces ha...
In Chapter 2, we first introduce a generalized inverse differentiability for set-valued mappings and...
We prove several equivalent versions of the inverse function theorem: an inverse function theorem fo...
Existence results are given for the implicit evolution inclusions $(Bx(t))'+A(t, x(t))\ni f(t)$ and...
AbstractExistence of solutions is established for a class of implicit differential inclusions equiva...
Let Z be a separable Banach space whose dual is uni-formly convex, A: D(A) e X ^ 2 ^ an m-dissipativ...
In this paper the authors consider the problem of finding Filippov estimates when suitable state con...
AbstractWe prove a generalization of Gravesʼ Open Mapping Theorem for a class of mappings which can ...
The celebrated Filippov's theorem implies that, given a trajectory x(1) : [0, + infinity[ \-> R-n of...
Properties of control systems described by differential inclusions are well established in the liter...
Sufficient conditions are given for a mapping to be $\gamma$-G inverse differentiable. Constrained i...
We study the controllability for a class of semilinear differential inclusions in Banach spaces. Sin...
The converse statement of the Filippov-Wazewski relaxation theorem is proven, more precisely, two di...
AbstractThis paper discusses the following viability problem of a differential inclusion, x′(t) + Ax...
summary:In the paper we study the topological structure of the solution set of a class of nonlinear ...
The general theory of Lyapunov stability of first-order differential inclusions in Hilbert spaces ha...