On the Ban-Linial Conjecture
Abstract
Let G be a graph and let \X0,X1\ be a partition of V(G). This partition is called external or unfriendly if every x ∈ Xi has at least as many neighbours in X1-i as in Xi. Every maximum edge-cut gives rise to an external partition, so these partitions are always guaranteed to exist. However, it remains a challenge to find such partitions with additional restrictions. Ban and Linial have conjectured that in the case when G is cubic, there always exists an external partition \X0,X1\ for which -2 |X0| - |X1| 2. We prove this in two special cases: whenever G can be decomposed into a cycle and a tree, and whenever G has a cubic tree T for which G - E(T) is bipartite.
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