Gábor Gévay scite author profile

We call a convex polytope P of dimension 3 admissible if it has the following two properties: (1) for each vertex of P the set of its first-neighbours is coplanar; (2) all planes determined by the first-neighbours are distinct. It is shown that the Levi graph of a point-plane configuration obtained by V-construction from an admissible polytope P is the Kronecker cover of the 1-skeleton of P. We investigate the combinatorial nature of the V-construction and use it on unit-distance graphs to construct novel isometric point-circle configurations. In particular, we present an infinite series all of whose members are subconfigurations of the renowned Clifford configurations.

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Symmetric matroid polytopes and their generation

Bokowski

Bremner

Gévay

2009

European Journal of Combinatorics

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Distributed Graph Analytics with Datalog Queries in Flink

Imran

Gévay

Markl

2020

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On polyhedral realizations of Hurwitz's regular map {3, 7}_18 of genus 7 with geometric symmetries

Bokowski

Gévay

2021

Art Discrete Appl. Math.

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Gábor Gévay

Large-Scale Data Stream Processing Systems

Kronecker covers, V-construction, unit-distance graphs and isometric point-circle configurations

Symmetric matroid polytopes and their generation

Distributed Graph Analytics with Datalog Queries in Flink

On polyhedral realizations of Hurwitz's regular map {3, 7}_18 of genus 7 with geometric symmetries

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