On Some Characterizations of Antipodal Partial Cubes

On Some Characterizations of Antipodal Partial Cubes

We prove that any harmonic partial cube is antipodal, which was conjectured by Fukuda and K. Handa, Antipodal graphs and oriented matroids, Discrete Math. 111 (1993) 245–256. Then we prove that a partial cube G is antipodal if and only if the subgraphs induced by Wab and Wba are isomorphic for every...

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Bibliographic Details
Main Author: Polat Norbert
Format: Article
Language:English
Published: University of Zielona Góra 2019-05-01
Series:Discussiones Mathematicae Graph Theory
Subjects:
diametrical graph
harmonic graph
antipodal graph
distance-balanced graph
partial cube
pre-hull number
05c12
05c75
Online Access:https://doi.org/10.7151/dmgt.2083
Description
Summary:We prove that any harmonic partial cube is antipodal, which was conjectured by Fukuda and K. Handa, Antipodal graphs and oriented matroids, Discrete Math. 111 (1993) 245–256. Then we prove that a partial cube G is antipodal if and only if the subgraphs induced by Wab and Wba are isomorphic for every edge ab of G. This gives a positive answer to a question of Klavžar and Kovše, On even and harmonic-even partial cubes, Ars Combin. 93 (2009) 77–86. Finally we prove that the distance-balanced partial cube that are antipodal are those whose pre-hull number is at most 1.
ISSN:2083-5892

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