Daniel Souza scite author profile

Daniel Souza

2Publications

11Citation Statements Received

103Citation Statements Given

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Universidad de Sevilla

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New examples of subsets of c with the FPP and stability of the FPP in hyperconvex spaces

Espínola-García

Japón

Souza

2021

J. Fixed Point Theory Appl.

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The purpose of this work is two-fold. On the one side, we focus on the space of real convergent sequences c where we study non-weakly compact sets with the fixed point property. Our approach brings a positive answer to a recent question raised by Gallagher et al. in (J Math Anal Appl 431(1):471–481, 2015). On the other side, we introduce a new metric structure closely related to the notion of relative uniform normal structure, for which we show that it implies the fixed point property under adequate conditions. This will provide some stability fixed point results in the context of hyperconvex metric spaces. As a particular case, we will prove that the set $$M=[-1,1]^\mathbb {N}$$ M = [ - 1 , 1 ] N has the fixed point property for d-nonexpansive mappings where $$d(\cdot ,\cdot )$$ d ( · , · ) is a metric verifying certain restrictions. Applications to some Nakano-type norms are also given.

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Fixed Points and Common Fixed Points for Orbit-Nonexpansive Mappings in Metric Spaces

2023

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In this paper, we introduce an interlacing condition on the elements of a family of operators that allows us to gather together a number of results on fixed points and common fixed points for single and families of mappings defined on metric spaces. The innovative concept studied here deals with nonexpansivity conditions with respect to orbits and under assumptions that only depend on the features of the closed balls of the metric space.

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Daniel Souza

New examples of subsets of c with the FPP and stability of the FPP in hyperconvex spaces

Fixed Points and Common Fixed Points for Orbit-Nonexpansive Mappings in Metric Spaces

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