Geodesic
On essentially 4-edge-connected cubic bricks
Nishad Kothari1 ; Marcelo H. de Carvalho2 ; Cláudio L. Lucchesi3 ; Charles H. C. Little4
1Department of Combinatorics and Optimization, University of Waterloo
2UFMS Campo Grande, Brazil
3University of Campinas, Brazil
4Massey University, New Zealand
The electronic journal of combinatorics, Tome 27 (2020) no. 1
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Lovász (1987) proved that every matching covered graph $G$ may be uniquely decomposed into a list of bricks (nonbipartite) and braces (bipartite); we let $b(G)$ denote the number of bricks. An edge $e$ is removable if $G-e$ is also matching covered; furthermore, $e$ is $b$-invariant if $b(G-e)=1$, and $e$ is quasi-$b$-invariant if $b(G-e)=2$. (Each edge of the Petersen graph is quasi-$b$-invariant.) A brick $G$ is near-bipartite if it has a pair of edges $\{e,f\}$ so that $G-e-f$ is matching covered and bipartite; such a pair $\{e,f\}$ is a removable doubleton. (Each of $K_4$ and the triangular prism $\overline{C_6}$ has three removable doubletons.) Carvalho, Lucchesi and Murty (2002) proved a conjecture of Lovász which states that every brick, distinct from $K_4$, $\overline{C_6}$ and the Petersen graph, has a $b$-invariant edge. A cubic graph is essentially $4$-edge-connected if it is $2$-edge-connected and if its only $3$-cuts are the trivial ones; it is well-known that each such graph is either a brick or a brace; we provide a graph-theoretical proof of this fact. We prove that if $G$ is any essentially $4$-edge-connected cubic brick then its edge-set may be partitioned into three (possibly empty) sets: (i) edges that participate in a removable doubleton, (ii) $b$-invariant edges, and (iii) quasi-$b$-invariant edges; our Main Theorem states that if $G$ has two adjacent quasi-$b$-invariant edges, say $e_1$ and $e_2$, then either $G$ is the Petersen graph or the (near-bipartite) Cubeplex graph, or otherwise, each edge of $G$ (distinct from $e_1$ and $e_2$) is $b$-invariant. As a corollary, we deduce that each essentially $4$-edge-connected cubic non-near-bipartite brick $G$, distinct from the Petersen graph, has at least $|V(G)|$ $b$-invariant edges.
DOI : 10.37236/8594
Classification : 05C70, 05C75, 05C40

Nishad Kothari  1   ; Marcelo H. de Carvalho  2   ; Cláudio L. Lucchesi  3   ; Charles H. C. Little  4

1 Department of Combinatorics and Optimization, University of Waterloo
2 UFMS Campo Grande, Brazil
3 University of Campinas, Brazil
4 Massey University, New Zealand 
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     author = {Nishad Kothari and Marcelo H. de Carvalho and Cl\'audio L. Lucchesi and Charles H. C. Little},
     title = {On essentially 4-edge-connected cubic bricks},
     journal = {The electronic journal of combinatorics},
     year = {2020},
     volume = {27},
     number = {1},
     doi = {10.37236/8594},
     zbl = {1431.05123},
     url = {http://geodesic.mathdoc.fr/articles/10.37236/8594/}
}
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Nishad Kothari; Marcelo H. de Carvalho; Cláudio L. Lucchesi; Charles H. C. Little. On essentially 4-edge-connected cubic bricks. The electronic journal of combinatorics, Tome 27 (2020) no. 1. doi: 10.37236/8594

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