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Related papers: Snark Designs

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The design spectrum problem is solved for the thirty-eight 24-vertex non-trivial snarks.

Combinatorics · Mathematics 2016-07-19 Anthony D. Forbes

The essential requirement for a cubic graph to be called a snark is that it can not be edge-coloured with three colours. To avoid trivial cases, varying restrictions on the connectivity are imposed. Snarks are not only interesting in…

Combinatorics · Mathematics 2026-03-19 Gunnar Brinkmann , Steven Van Overberghe

A snark is a bridgeless cubic graph which is not 3-edge-colourable. The oddness of a bridgeless cubic graph is the minimum number of odd components in any 2-factor of the graph. Lukot'ka, M\'acajov\'a, Maz\'ak and \v{S}koviera showed in…

Combinatorics · Mathematics 2018-04-30 Jan Goedgebeur

The aim of this paper is to classify all snarks up to order $36$ and explain the reasons of their uncolourability. The crucial part of our approach is a computer-assisted structural analysis of cyclically $5$-connected critical snarks,…

Discrete Mathematics · Computer Science 2021-12-09 Ján Mazák , Jozef Rajník , Martin Škoviera

The oddness of a cubic graph is the smallest number of odd circuits in a 2-factor of the graph. This invariant is widely considered to be one of the most important measures of uncolourability of cubic graphs and as such has been repeatedly…

Combinatorics · Mathematics 2019-01-31 Jan Goedgebeur , Edita Máčajová , Martin Škoviera

In this note we construct two infinite snark families which have high oddness and low circumference compared to the number of vertices. Using this construction, we also give a counterexample to a suggested strengthening of Fulkerson's…

Combinatorics · Mathematics 2012-03-12 Jonas Hägglund

The family of snarks -- connected bridgeless cubic graphs that cannot be 3-edge-coloured -- is well-known as a potential source of counterexamples to several important and long-standing conjectures in graph theory. These include the cycle…

Combinatorics · Mathematics 2019-01-11 Jan Goedgebeur , Edita Máčajová , Martin Škoviera

We estimate the minimum number of vertices of a cubic graph with given oddness and cyclic connectivity. We prove that a bridgeless cubic graph $G$ with oddness $\omega(G)$ other than the Petersen graph has at least $5.41\cdot\omega(G)$…

Discrete Mathematics · Computer Science 2012-12-18 Robert Lukotka , Edita Macajova , Jan Mazak , Martin Skoviera

For many of the unsolved problems concerning cycles and matchings in graphs it is known that it is sufficient to prove them for \emph{snarks}, the class of nontrivial 3-regular graphs which cannot be 3-edge coloured. In the first part of…

Combinatorics · Mathematics 2013-07-01 Gunnar Brinkmann , Jan Goedgebeur , Jonas Hägglund , Klas Markström

Graph pebbling is a game played on graphs with pebbles on their vertices. A pebbling move removes two pebbles from one vertex and places one pebble on an adjacent vertex. The pebbling number $\pi(G)$ is the smallest $t$ so that from any…

Combinatorics · Mathematics 2024-03-05 Matheus Adauto , Celina de Figueiredo , Glenn Hurlbert , Diana Sasaki

An edge e is normal in a proper edge-coloring of a cubic graph G if the number of distinct colors on four edges incident to e is 2 or 4: A normal edge-coloring of G is a proper edge-coloring in which every edge of G is normal. The Petersen…

Combinatorics · Mathematics 2024-08-05 Jelena Sedlar , Riste Škrekovski

The colouring defect of a cubic graph, introduced by Steffen in 2015, is the minimum number of edges that are left uncovered by any set of three perfect matchings. Since a cubic graph has defect $0$ if and only if it is $3$-edge-colourable,…

Combinatorics · Mathematics 2022-03-17 Ján Karabáš , Edita Máčajová , Roman Nedela , Martin Škoviera

Snarks are $2$-connected cubic graphs that do not admit a proper $3$-edge-coloring. For a cubic graph $G$, its resistance $r(G)$ is the minimum number of edges whose removal results in a $3$-edge-colorable graph, while its flow resistance…

Combinatorics · Mathematics 2026-04-27 Davide Mattiolo , Pietro Negrini , Silvia M. C. Pagani

The well-known 5-flow Conjecture of Tutte, stated originally for integer flows, claims that every bridgeless graph has circular flow number at most 5. It is a classical result that the study of the 5-flow Conjecture can be reduced to cubic…

Combinatorics · Mathematics 2018-04-04 Jan Goedgebeur , Davide Mattiolo , Giuseppe Mazzuoccolo

It is well-known that the circular flow number of a bridgeless cubic graph can be computed in terms of certain partitions of its vertex-set with prescribed properties. In the present paper, we first study some of these properties that turn…

Combinatorics · Mathematics 2019-09-24 Jan Goedgebeur , Davide Mattiolo , Giuseppe Mazzuoccolo

A normal 5-edge-coloring of a cubic graph is a coloring such that for every edge the number of distinct colors incident to its end-vertices is 3 or 5 (and not 4). The well known Petersen Coloring Conjecture is equivalent to the statement…

Combinatorics · Mathematics 2023-12-18 Jelena Sedlar , Riste Škrekovski

In 1976, Loupekine introduced (via Isaacs) a very general way of constructing new snarks from old snarks by cyclically connecting multipoles constructed from smaller snarks. In this paper, we generalize Loupekine's construction to produce a…

Combinatorics · Mathematics 2019-04-12 Leah Wrenn Berman , Déborah Oliveros , Gordon I. Williams

This is a survey or exposition of a particular collection of results and open problems involving snarks --- simple "cubic" (3-valent) graphs for which, for nontrivial reasons, the edges cannot be 3-colored. The results and problems here are…

Combinatorics · Mathematics 2014-03-11 Richard C. Bradley

The design spectrum has been determined for ten of the 15 graphs with six vertices and ten edges. In this paper we solve the design spectrum problem for the remaining five graphs with three possible exceptions.

Combinatorics · Mathematics 2020-04-21 Anthony D. Forbes , Terry S. Griggs

In graph theory, a Snark is a connected, bridgeless, Cubic graph that cannot be edge-colored with only three colors. Additionally, to avoid some trivial cases, a Snark is typically required to have a girth of minimum five and a cyclic…

Combinatorics · Mathematics 2025-11-13 Bansari. J. Rayjada , Jekil. A. Gadhiya , Mahadityasinh. A. Sarvaiya
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