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On continuous selections of finite-valued set-valued mappings
Zhukovskiy S.E.
Set-valued mappings with finite images are considered. For these mappings, a theorem
Periodic Trajectories and Coincidence Points of Tuples of Set-Valued Maps
Gel’man B.D.
A fixed-point theorem is proved for a finite composition of set-valued Lipschitz maps
Caristi’s Inequality and α-Contraction Mappings
Gel’man B.D.
of complete metric spaces is developed (in both the single- and set-valued cases). On the basis
A hybrid fixed-point theorem for set-valued maps
Gel’man B.D.
and set-valued); the images of such maps are always compact. Various versions of hybrid theorems for set-valued
Stability of coincidence points and set-valued covering maps in metric spaces
Arutyunov A.V.
A study was conducted to demonstrate stability of coincidence points and set-valued covering maps
Stability of coincidence points and properties of covering mappings
Arutyunov A.V.
Properties of closed set-valued covering mappings acting from one metric space into another
Coincidence points principle for set-valued mappings in partially ordered spaces
Arutyunov A.V., Zhukovskiy E.S., Zhukovskiy S.E.
In the paper the concept of covering (regularity) for set-valued mappings in partially ordered
Covering mappings in metric spaces and fixed points
Arutyunov A.V.
the Lipschitz condition with Lipschitz β <α, the mapping is (α-β) covering. The set valued mapping was said
On Lipschitz-like continuity of a class of set-valued mappings
Bednarczuk, E., Minchenko, L. I., Rutkowski, K. E., Минченко, Л. И.
We study set-valued mappings defined by solution sets of parametric systems of equalities
Specific selections for set-valued mappings
Arutyunov A.V.
Specific selections for set-valued mappings

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