Generating Near-Bipartite Bricks

TL;DR

This paper develops a specific generation procedure for near-bipartite bricks, a class of graphs important in matching theory, by identifying thin edges that preserve near-bipartiteness upon removal.

Contribution

It establishes that every near-bipartite brick, excluding two known exceptions, contains a thin edge whose removal results in a near-bipartite brick, enabling a targeted generation method.

Findings

Every near-bipartite brick (except K4 and C6) has a thin edge leading to a near-bipartite brick.

The result facilitates a generation theorem for simple near-bipartite bricks.

The approach extends the theory of brick generation to a specialized class of graphs.

Abstract

A $3$-connected graph $G$ is a brick if, for any two vertices $u$ and $v$, the graph $G-\{u,v\}$ has a perfect matching. Deleting an edge $e$ from a brick $G$ results in a graph with zero, one or two vertices of degree two. The bicontraction of a vertex of degree two consists of contracting the two edges incident with it; and the retract of $G-e$ is the graph $J$ obtained from it by bicontracting all its vertices of degree two. An edge $e$ is thin if $J$ is also a brick. Carvalho, Lucchesi and Murty [How to build a brick, Discrete Mathematics 306 (2006), 2383-2410] showed that every brick, distinct from $K_4$, the triangular prism $\overline{C_6}$ and the Petersen graph, has a thin edge. Their theorem yields a generation procedure for bricks, using which they showed that every simple planar solid brick is an odd wheel. A brick $G$ is near-bipartite if it has a pair of edges $\alpha$ and $\beta$ such that $G-\{\alpha,\beta\}$ is bipartite and matching covered; examples are $K_4$ and $\overline{C_6}$. The significance of near-bipartite graphs arises from the theory of ear decompositions of matching covered graphs. The object of this paper is to establish a generation procedure which is specific to the class of near-bipartite bricks. In particular, we prove that if $G$ is any near-bipartite brick, distinct from $K_4$ and $\overline{C_6}$, then $G$ has a thin edge $e$ so that the retract $J$ of $G-e$ is also near-bipartite. In a subsequent work, with Marcelo H. de Carvalho, we use the results of this paper to prove a generation theorem for simple near-bipartite bricks.