Maximum size binary matroids with no AG(3,2)-minor are graphic
Abstract
We prove that the maximum size of a simple binary matroid of rank r ≥ 5 with no AG(3,2)-minor is r+12 and characterise those matroids achieving this bound. When r ≥ 6, the graphic matroid M(Kr+1) is the unique matroid meeting the bound, but there are a handful of smaller examples. In addition, we determine the size function for non-regular simple binary matroids with no AG(3,2)-minor and characterise the matroids of maximum size for each rank.
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