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Coincidence points of two mapsThe problem of finding coincidence points of two maps is studied. An iteration method
Coincidence points principle for set-valued mappings in partially ordered spaces spaces is introduced. The coincidence points problem for set-valued mappings in partially ordered spaces
Continuous Dependence of Coincidence Points on a ParameterThe coincidence points existence problem with a parameter is considered. Sufficient conditions
An iterative method for finding coincidence points of two mappingsThe problem of finding coincidence points of two mappings of which one is a covering, while
Coincidence Points in Generalized Metric SpacesCovering mappings in generalized metric spaces are considered. The coincidence points theorems
Comparison of some types of locally covering mappings. Several examples related to these definitions and coincidence points theorems of covering and Lipschitz
On fixed points and coincidence points of mappings in (On fixed points and coincidence points of mappings in (
On coincidence points for vector mappings. In the scalar case the obtained statements are equivalent to the coincidence point theorems by A. V. Arutyunov
On coincidence points of multivalued vector mappings of metric spaces of metric spaces. A vector analog of Arutyunov’s coincidence-point theorem for two multivalued mappings
Stability theorems for estimating the distance to a set of coincidence pointsCoincidence points of two set-valued mappings of metric spaces are analyzed. Uniform estimates
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