Duality and tangles of set separations

Reinhard Diestel; Christian Elbracht; Joshua Erde; Maximilian Teegen

doi:10.4310/JOC.2024.v15.n1.a1

Duality and tangles of set separations

Reinhard Diestel, Christian Elbracht, Joshua Erde, Maximilian Teegen

Institut für Diskrete Mathematik (5050)

Publikation: Beitrag in einer Fachzeitschrift › Artikel › Begutachtung

Abstract

Applications of tangles of connectivity systems suggest a duality between these, in which for two sets $X$ and $Y\!$ the elements $x$ of $X$ map to subsets $Y_x$ of $Y\!$, and the elements $y$ of $Y\!$ map to subsets $X_y$ of $X$, so that $x\in X_y$ if and only if $y\in Y_x$ for all $x\in X$ and $y\in Y\!$. We explore this duality, and relate the tangles arising from the dual systems to each other.

Originalsprache	englisch
Seiten (von - bis)	1-39
Fachzeitschrift	Journal of Combinatorics
Jahrgang	15
Ausgabenummer	1
DOIs	https://doi.org/10.4310/JOC.2024.v15.n1.a1
Publikationsstatus	Veröffentlicht - 2024

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10.4310/JOC.2024.v15.n1.a1

2109.08398v1Eingereichtes Manuskript, 646 KBLizenz: CC BY 4.0

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abstract = " Applications of tangles of connectivity systems suggest a duality between these, in which for two sets $X$ and $Y\!$ the elements $x$ of $X$ map to subsets $Y_x$ of $Y\!$, and the elements $y$ of $Y\!$ map to subsets $X_y$ of $X$, so that $x\in X_y$ if and only if $y\in Y_x$ for all $x\in X$ and $y\in Y\!$. We explore this duality, and relate the tangles arising from the dual systems to each other. ",

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author = "Reinhard Diestel and Christian Elbracht and Joshua Erde and Maximilian Teegen",

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T1 - Duality and tangles of set separations

AU - Diestel, Reinhard

AU - Elbracht, Christian

AU - Erde, Joshua

AU - Teegen, Maximilian

N1 - This is the extended version of this paper

PY - 2024

Y1 - 2024

N2 - Applications of tangles of connectivity systems suggest a duality between these, in which for two sets $X$ and $Y\!$ the elements $x$ of $X$ map to subsets $Y_x$ of $Y\!$, and the elements $y$ of $Y\!$ map to subsets $X_y$ of $X$, so that $x\in X_y$ if and only if $y\in Y_x$ for all $x\in X$ and $y\in Y\!$. We explore this duality, and relate the tangles arising from the dual systems to each other.

AB - Applications of tangles of connectivity systems suggest a duality between these, in which for two sets $X$ and $Y\!$ the elements $x$ of $X$ map to subsets $Y_x$ of $Y\!$, and the elements $y$ of $Y\!$ map to subsets $X_y$ of $X$, so that $x\in X_y$ if and only if $y\in Y_x$ for all $x\in X$ and $y\in Y\!$. We explore this duality, and relate the tangles arising from the dual systems to each other.

KW - Tangles

KW - Seperation Systems

KW - Clustering

U2 - 10.4310/JOC.2024.v15.n1.a1

DO - 10.4310/JOC.2024.v15.n1.a1

M3 - Article

SN - 2156-3527

VL - 15

SP - 1

EP - 39

JO - Journal of Combinatorics

JF - Journal of Combinatorics

IS - 1

ER -

Duality and tangles of set separations

Abstract

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