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Two fixed-point theoremsTwo fixed point theorems implementing a more general principle for partially ordered sets (which
Minimum of a functional in a metric space and fixed points are valid are given. Then, these theorems are applied to proving theorems on fixed points of univalent
ON FIXED POINTS OF CONTRACTION MAPS ACTING IN (q(1), q(2))-QUASIMETRIC SPACES AND GEOMETRIC PROPERTIES OF THESE SPACESWe study geometric properties of (q(1), q(2))-quasimetric spaces and fixed point theorems
On fixed points of contraction maps acting in (q 1 ; q 2 )-quasimetric spaces and geometric properties of these spacesWe study geometric properties of (q 1 ; q 2 )-quasimetric spaces and fixed point theorems
Kantorovich’s Fixed Point Theorem in Metric Spaces and Coincidence PointsExistence and uniqueness theorems are obtained for a fixed point of a mapping from a complete
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
On generalized boundary value problems for a class of fractional differential inclusionsfixed point theorem
Covering mappings in metric spaces and fixed points condition with Lipschitz constant less than 1 has a fixed point. Milyutin's covering mapping theorem says
Fixed-point Selection Functions ∈ A, if it is non-complete, then any function $$f\leq_{R}A$$ has a fixed-point $$e$$: $$\Omega
Solvability of Langevin equations with two Hadamard fractional derivatives via Mittag–Leffler functions by using Schauder's fixed point theorem and Banach's fixed point theorem, respectively. An example is given
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