Add to ORKGDropping the condition of convexity on the domain of a nonexpansive mapping is a difficult and unusual task in metric fixed point theory. Hilbert geometry has been one of the most fruitful at which authors have succeeded to drop such condition. In this work we revisit some of the results in that direction to study their validity in $\text{\rm CAT}(0)$ spaces (geodesic spaces of global nonpositive curvature in the sense of Gromov). We show that, although the geometry of $\text{\rm CAT}(0)$ spaces resembles at certain points that one of Hilbert spaces, much more than the $\text{\rm CAT}(0)$ condition is required in order to obtain counterparts of fixed point results for non-convex sets in Hilbert spaces. We provide significant examples showin...
Takahashi [10] introduced a notion of convexity in metric spaces and studied some fixed point theore...
Heinrich Tietze has shown that for a closed connected subset of euclidean space being convex is a lo...
This is a monograph on fixed point theory, covering the purely metric aspects of the theory–particul...
Research Doctorate - Doctor of Philosophy (PhD)This thesis deals with nonlinear analysis in geodesic...
In this work we study the fixed point property for nonexpansive self-mappings defined on convex and ...
AbstractWe show that the fixed point set of a quasi-nonexpansive selfmap of a nonempty convex subset...
This paper features the search for common fixed points of two operators in the nonlinear metric sett...
AbstractCommon fixed point results for families of single-valued nonexpansive or quasi-nonexpansive ...
AbstractIn this paper we show that some of the recent results on fixed point for CAT(0) spaces still...
In this paper we show that some of the recent results on ¯xed point for CAT(0) spaces still hold tr...
We state existence and convergence theorems for finding fixed points of spherically nonspreading map...
We show that ifU is a bounded open set in a complete CAT(0) spaceX, and if f:U → X is nonexpansive, ...
We show that ifU is a bounded open set in a complete CAT(0) spaceX, and if f:U → X is nonexpansive, ...
We introduce Prešić-Kannan nonexpansive mappings on the product spaces and show that they have a uni...
MSc (Mathematics), North-West University, Mafikeng CampusIn this MSc dissertation, we generalize the...
Takahashi [10] introduced a notion of convexity in metric spaces and studied some fixed point theore...
Heinrich Tietze has shown that for a closed connected subset of euclidean space being convex is a lo...
This is a monograph on fixed point theory, covering the purely metric aspects of the theory–particul...
Research Doctorate - Doctor of Philosophy (PhD)This thesis deals with nonlinear analysis in geodesic...
In this work we study the fixed point property for nonexpansive self-mappings defined on convex and ...
AbstractWe show that the fixed point set of a quasi-nonexpansive selfmap of a nonempty convex subset...
This paper features the search for common fixed points of two operators in the nonlinear metric sett...
AbstractCommon fixed point results for families of single-valued nonexpansive or quasi-nonexpansive ...
AbstractIn this paper we show that some of the recent results on fixed point for CAT(0) spaces still...
In this paper we show that some of the recent results on ¯xed point for CAT(0) spaces still hold tr...
We state existence and convergence theorems for finding fixed points of spherically nonspreading map...
We show that ifU is a bounded open set in a complete CAT(0) spaceX, and if f:U → X is nonexpansive, ...
We show that ifU is a bounded open set in a complete CAT(0) spaceX, and if f:U → X is nonexpansive, ...
We introduce Prešić-Kannan nonexpansive mappings on the product spaces and show that they have a uni...
MSc (Mathematics), North-West University, Mafikeng CampusIn this MSc dissertation, we generalize the...
Takahashi [10] introduced a notion of convexity in metric spaces and studied some fixed point theore...
Heinrich Tietze has shown that for a closed connected subset of euclidean space being convex is a lo...
This is a monograph on fixed point theory, covering the purely metric aspects of the theory–particul...