On the Impossibility of Decomposing Binary Matroids
Abstract
We show that there exist k-colorable matroids that are not (b,c)-decomposable when b and c are constants. A matroid is (b,c)-decomposable, if its ground set of elements can be partitioned into sets X1, X2, …, Xl with the following two properties. Each set Xi has size at most ck. Moreover, for all sets Y such that |Y Xi| ≤ 1 it is the case that Y is b-colorable. A (b,c)-decomposition is a strict generalization of a partition decomposition and, thus, our result refutes a conjecture from arXiv:1911.10485v2 .
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