Convexity structures in T0-quasi-metric spaces

Hans Peter A. Künzi; Filiz Yildiz

doi:10.1016/j.topol.2015.12.009

Convexity structures in T₀-quasi-metric spaces

Hans Peter A. Künzi
, Filiz Yildiz

Division of Topology

University of Cape Town

Research output: Contribution to journal › Article › peer-review

17 Citations (Scopus)

Abstract

The authors define and investigate convexity structures in the sense of Takahashi in T₀-quasi-metric spaces. They prove that numerous important results about convexity structures in metric spaces can be generalized to the quasi-metric setting. They also show that the latter convexity structures naturally occur in asymmetrically normed real vector spaces and in q-hyperconvex T₀-quasi-metric spaces. In the T₀-quasi-metric setting they explore various interesting additional conditions that convexity structures in the sense of Takahashi can satisfy.

Original language	English
Pages (from-to)	2-18
Number of pages	17
Journal	Topology and its Applications
Volume	200
DOIs	https://doi.org/10.1016/j.topol.2015.12.009
Publication status	Published - 1 Mar 2016

Keywords

Asymmetrically normed vector space
Convexity structure
Hausdorff quasi-pseudometric
Q-Hyperconvex
Strictly convex
T-Quasi-metric

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10.1016/j.topol.2015.12.009

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abstract = "The authors define and investigate convexity structures in the sense of Takahashi in T0-quasi-metric spaces. They prove that numerous important results about convexity structures in metric spaces can be generalized to the quasi-metric setting. They also show that the latter convexity structures naturally occur in asymmetrically normed real vector spaces and in q-hyperconvex T0-quasi-metric spaces. In the T0-quasi-metric setting they explore various interesting additional conditions that convexity structures in the sense of Takahashi can satisfy.",

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AU - Yildiz, Filiz

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N2 - The authors define and investigate convexity structures in the sense of Takahashi in T0-quasi-metric spaces. They prove that numerous important results about convexity structures in metric spaces can be generalized to the quasi-metric setting. They also show that the latter convexity structures naturally occur in asymmetrically normed real vector spaces and in q-hyperconvex T0-quasi-metric spaces. In the T0-quasi-metric setting they explore various interesting additional conditions that convexity structures in the sense of Takahashi can satisfy.

AB - The authors define and investigate convexity structures in the sense of Takahashi in T0-quasi-metric spaces. They prove that numerous important results about convexity structures in metric spaces can be generalized to the quasi-metric setting. They also show that the latter convexity structures naturally occur in asymmetrically normed real vector spaces and in q-hyperconvex T0-quasi-metric spaces. In the T0-quasi-metric setting they explore various interesting additional conditions that convexity structures in the sense of Takahashi can satisfy.

KW - Asymmetrically normed vector space

KW - Convexity structure

KW - Hausdorff quasi-pseudometric

KW - Q-Hyperconvex

KW - Strictly convex

KW - T-Quasi-metric

UR - https://www.scopus.com/pages/publications/84958012827

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DO - 10.1016/j.topol.2015.12.009

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SN - 0166-8641

VL - 200

SP - 2

EP - 18

JO - Topology and its Applications

JF - Topology and its Applications

ER -

Convexity structures in T₀-quasi-metric spaces

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Keywords

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