Continuous Dependence for Two Implicit Kirk-Type Algorithms in General Hyperbolic Spaces

A Kirk Type Characterization of Completeness for Partial Metric Spaces

One-step Implicit Algorithm for Two Finite Families of Nonexpansive Maps in Hyperbolic Spaces

We propose and analyze an algorithm for two finite families of nonexpansive maps on a hyperbolic space. Our results refine and generalize several recent and comparable results in uniformly convex Banach spaces as well as CAT (0) spaces.

An implicit algorithm for two finite families of nonexpansive maps in hyperbolic spaces

* Correspondence: arahim@kfupm. edu.sa Department of Mathematics and Statistics, King Fahd University of Petroleum and Minerals, Dhahran 31261, Saudia Arabia Full list of author information is available at the end of the article Abstract In this article, we propose and analyze an implicit algorithm for two finite families of nonexpansive maps in hyperbolic spaces. Results concerning Δ-convergen...

Existence and convergence results for monotone nonexpansive type mappings in‎ ‎partially ordered hyperbolic metric spaces

‎We present some existence and convergence results for a general class of nonexpansive mappings in partially ordered hyperbolic metric spaces‎. ‎We also give some examples to show the generality of the mappings considered herein.

On isomorphism of two bases in Morrey-Lebesgue type spaces

Double system of exponents with complex-valued coefficients is considered. Under some conditions on the coefficients, we prove that if this system forms a basis for the Morrey-Lebesgue type space on $left[-pi , pi right]$, then it is isomorphic to the classical system of exponents in this space.