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New Fixed Point Results on L-rational Contraction Mappings in b-Metric-Like SpacesThe purpose of this paper is to prove some new results for
L-rational contractive and cyclic
L-rational
Some New Fixed Point Results in b-metric Space with Rational Generalized Contractive Condition-metric
space. Where we confirm the existence of the fixed point for self mapping T satisfying some rational
Caristi’s Inequality and α-Contraction Mappings of this development mappings of complete metric spaces which are contractions with respect to a function of two vector
Coincidence Point Results and its Applications in Partially Ordered Metric Spaces satisfying a certain rational type contraction condition in the frame of
a metric spaces endowed with partial
Covering mappings in metric spaces and fixed points including contraction mapping principle and Milyutin's covering mapping theorem. The contraction mapping
On the approximate conformal mapping of the unit disk on a simply connected domain mapping of the unit disk on an arbitrary simply connected domain with the given smooth parametrically
Locally covering maps in metric spaces and coincidence points. These assertions extend some classical contraction map principles. We define the notion of α-covering multimap at a
Fiberwise function contraction mapping principleFor metric maps, continuous and retract sections consisting of fix points are obtained. This is a
On the Borsuk-Ulam Theorem for Lipschitz Mappings on an Infinite-Dimensional Space Lipschitz mapping. A kind of analogue of the infinite-dimensional version of the Borsuk-Ulam theorem
A hybrid fixed-point theorem for set-valued maps-valued maps with noncompact images have also been proved. The set-valued contraction in these versions
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